YES(?,O(1)) * Step 1: ArgumentFilter WORST_CASE(?,O(1)) + Considered Problem: Rules: 0. f11(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f13(A,B,C,D,E,F,G,H,I,J,K,L,M) [0 >= A] (?,1) 1. f11(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f13(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 2] (?,1) 2. f13(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f15(A,B,C,D,E,F,G,H,I,J,K,L,M) [1 >= A] (?,1) 3. f13(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f15(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 3] (?,1) 4. f15(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f17(A,B,C,D,E,F,G,H,I,J,K,L,M) [2 >= A] (?,1) 5. f15(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f17(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 4] (?,1) 6. f17(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f19(A,B,C,D,E,F,G,H,I,J,K,L,M) [3 >= A] (?,1) 7. f17(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f19(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 5] (?,1) 8. f19(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f21(A,B,C,D,E,F,G,H,I,J,K,L,M) [4 >= A] (?,1) 9. f19(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f21(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 6] (?,1) 10. f21(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f23(A,B,C,D,E,F,G,H,I,J,K,L,M) [5 >= A] (?,1) 11. f21(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f23(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 7] (?,1) 12. f23(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f25(A,B,C,D,E,F,G,H,I,J,K,L,M) [6 >= A] (?,1) 13. f23(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f25(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 8] (?,1) 14. f25(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f27(A,B,C,D,E,F,G,H,I,J,K,L,M) [7 >= A] (?,1) 15. f25(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f27(A,B,C,D,E,F,G,H,I,J,K,L,M) [A >= 9] (?,1) 16. f65(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f67(A,B,C,D,E,F,G,H,I,J,K,L,M) [0 >= B] (?,1) 17. f65(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f67(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 2] (?,1) 18. f67(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f69(A,B,C,D,E,F,G,H,I,J,K,L,M) [1 >= B] (?,1) 19. f67(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f69(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 3] (?,1) 20. f69(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f71(A,B,C,D,E,F,G,H,I,J,K,L,M) [2 >= B] (?,1) 21. f69(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f71(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 4] (?,1) 22. f71(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f73(A,B,C,D,E,F,G,H,I,J,K,L,M) [3 >= B] (?,1) 23. f71(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f73(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 5] (?,1) 24. f73(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f75(A,B,C,D,E,F,G,H,I,J,K,L,M) [4 >= B] (?,1) 25. f73(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f75(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 6] (?,1) 26. f75(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f77(A,B,C,D,E,F,G,H,I,J,K,L,M) [5 >= B] (?,1) 27. f75(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f77(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 7] (?,1) 28. f77(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f79(A,B,C,D,E,F,G,H,I,J,K,L,M) [6 >= B] (?,1) 29. f77(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f79(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 8] (?,1) 30. f79(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f81(A,B,C,D,E,F,G,H,I,J,K,L,M) [7 >= B] (?,1) 31. f79(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f81(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 9] (?,1) 32. f81(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f83(A,B,C,D,E,F,G,H,I,J,K,L,M) [8 >= B] (?,1) 33. f81(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f83(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 10] (?,1) 34. f83(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f85(A,B,C,D,E,F,G,H,I,J,K,L,M) [9 >= B] (?,1) 35. f83(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f85(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 11] (?,1) 36. f85(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f87(A,B,C,D,E,F,G,H,I,J,K,L,M) [10 >= B] (?,1) 37. f85(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f87(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 12] (?,1) 38. f87(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f89(A,B,C,D,E,F,G,H,I,J,K,L,M) [11 >= B] (?,1) 39. f87(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f89(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 13] (?,1) 40. f89(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f91(A,B,C,D,E,F,G,H,I,J,K,L,M) [12 >= B] (?,1) 41. f89(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f91(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 14] (?,1) 42. f91(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f93(A,B,C,D,E,F,G,H,I,J,K,L,M) [13 >= B] (?,1) 43. f91(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f93(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 15] (?,1) 44. f93(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f95(A,B,C,D,E,F,G,H,I,J,K,L,M) [14 >= B] (?,1) 45. f93(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f95(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 16] (?,1) 46. f95(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f97(A,B,C,D,E,F,G,H,I,J,K,L,M) [15 >= B] (?,1) 47. f95(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f97(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 17] (?,1) 48. f97(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f99(A,B,C,D,E,F,G,H,I,J,K,L,M) [16 >= B] (?,1) 49. f97(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f99(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 18] (?,1) 50. f99(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f101(A,B,C,D,E,F,G,H,I,J,K,L,M) [17 >= B] (?,1) 51. f99(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f101(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 19] (?,1) 52. f101(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f103(A,B,C,D,E,F,G,H,I,J,K,L,M) [18 >= B] (?,1) 53. f101(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f103(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 20] (?,1) 54. f103(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f105(A,B,C,D,E,F,G,H,I,J,K,L,M) [19 >= B] (?,1) 55. f103(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f105(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 21] (?,1) 56. f105(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f107(A,B,C,D,E,F,G,H,I,J,K,L,M) [20 >= B] (?,1) 57. f105(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f107(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 22] (?,1) 58. f107(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f109(A,B,C,D,E,F,G,H,I,J,K,L,M) [21 >= B] (?,1) 59. f107(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f109(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 23] (?,1) 60. f109(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f111(A,B,C,D,E,F,G,H,I,J,K,L,M) [22 >= B] (?,1) 61. f109(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f111(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 24] (?,1) 62. f111(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f113(A,B,C,D,E,F,G,H,I,J,K,L,M) [23 >= B] (?,1) 63. f111(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f113(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 25] (?,1) 64. f113(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f115(A,B,C,D,E,F,G,H,I,J,K,L,M) [24 >= B] (?,1) 65. f113(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f115(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 26] (?,1) 66. f115(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f117(A,B,C,D,E,F,G,H,I,J,K,L,M) [25 >= B] (?,1) 67. f115(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f117(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 27] (?,1) 68. f117(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f119(A,B,C,D,E,F,G,H,I,J,K,L,M) [26 >= B] (?,1) 69. f117(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f119(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 28] (?,1) 70. f119(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f121(A,B,C,D,E,F,G,H,I,J,K,L,M) [27 >= B] (?,1) 71. f119(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f121(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 29] (?,1) 72. f121(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f123(A,B,C,D,E,F,G,H,I,J,K,L,M) [28 >= B] (?,1) 73. f121(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f123(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 30] (?,1) 74. f123(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f125(A,B,C,D,E,F,G,H,I,J,K,L,M) [29 >= B] (?,1) 75. f123(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f125(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 31] (?,1) 76. f125(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f127(A,B,C,D,E,F,G,H,I,J,K,L,M) [30 >= B] (?,1) 77. f125(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f127(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 32] (?,1) 78. f127(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f129(A,B,C,D,E,F,G,H,I,J,K,L,M) [31 >= B] (?,1) 79. f127(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f129(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 33] (?,1) 80. f129(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f131(A,B,C,D,E,F,G,H,I,J,K,L,M) [32 >= B] (?,1) 81. f129(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f131(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 34] (?,1) 82. f131(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f133(A,B,C,D,E,F,G,H,I,J,K,L,M) [33 >= B] (?,1) 83. f131(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f133(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 35] (?,1) 84. f133(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f135(A,B,C,D,E,F,G,H,I,J,K,L,M) [34 >= B] (?,1) 85. f133(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f135(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 36] (?,1) 86. f135(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f137(A,B,C,D,E,F,G,H,I,J,K,L,M) [35 >= B] (?,1) 87. f135(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f137(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 37] (?,1) 88. f137(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f139(A,B,C,D,E,F,G,H,I,J,K,L,M) [36 >= B] (?,1) 89. f137(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f139(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 38] (?,1) 90. f139(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f141(A,B,C,D,E,F,G,H,I,J,K,L,M) [37 >= B] (?,1) 91. f139(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f141(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 39] (?,1) 92. f141(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f143(A,B,C,D,E,F,G,H,I,J,K,L,M) [38 >= B] (?,1) 93. f141(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f143(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 40] (?,1) 94. f143(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f145(A,B,C,D,E,F,G,H,I,J,K,L,M) [39 >= B] (?,1) 95. f143(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f145(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 41] (?,1) 96. f145(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f147(A,B,C,D,E,F,G,H,I,J,K,L,M) [40 >= B] (?,1) 97. f145(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f147(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 42] (?,1) 98. f147(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f149(A,B,C,D,E,F,G,H,I,J,K,L,M) [41 >= B] (?,1) 99. f147(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f149(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 43] (?,1) 100. f149(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f151(A,B,C,D,E,F,G,H,I,J,K,L,M) [42 >= B] (?,1) 101. f149(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f151(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 44] (?,1) 102. f151(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f153(A,B,C,D,E,F,G,H,I,J,K,L,M) [43 >= B] (?,1) 103. f151(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f153(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 45] (?,1) 104. f153(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f155(A,B,C,D,E,F,G,H,I,J,K,L,M) [44 >= B] (?,1) 105. f153(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f155(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 46] (?,1) 106. f155(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f157(A,B,C,D,E,F,G,H,I,J,K,L,M) [45 >= B] (?,1) 107. f155(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f157(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 47] (?,1) 108. f157(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f159(A,B,C,D,E,F,G,H,I,J,K,L,M) [46 >= B] (?,1) 109. f157(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f159(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 48] (?,1) 110. f159(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f161(A,B,C,D,E,F,G,H,I,J,K,L,M) [47 >= B] (?,1) 111. f159(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f161(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 49] (?,1) 112. f161(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f163(A,B,C,D,E,F,G,H,I,J,K,L,M) [48 >= B] (?,1) 113. f161(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f163(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 50] (?,1) 114. f163(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f165(A,B,C,D,E,F,G,H,I,J,K,L,M) [49 >= B] (?,1) 115. f163(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f165(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 51] (?,1) 116. f165(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f167(A,B,C,D,E,F,G,H,I,J,K,L,M) [50 >= B] (?,1) 117. f165(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f167(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 52] (?,1) 118. f167(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f169(A,B,C,D,E,F,G,H,I,J,K,L,M) [51 >= B] (?,1) 119. f167(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f169(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 53] (?,1) 120. f169(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f171(A,B,C,D,E,F,G,H,I,J,K,L,M) [52 >= B] (?,1) 121. f169(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f171(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 54] (?,1) 122. f171(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f173(A,B,C,D,E,F,G,H,I,J,K,L,M) [53 >= B] (?,1) 123. f171(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f173(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 55] (?,1) 124. f173(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f175(A,B,C,D,E,F,G,H,I,J,K,L,M) [54 >= B] (?,1) 125. f173(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f175(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 56] (?,1) 126. f175(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f177(A,B,C,D,E,F,G,H,I,J,K,L,M) [55 >= B] (?,1) 127. f175(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f177(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 57] (?,1) 128. f177(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f179(A,B,C,D,E,F,G,H,I,J,K,L,M) [56 >= B] (?,1) 129. f177(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f179(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 58] (?,1) 130. f179(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f181(A,B,C,D,E,F,G,H,I,J,K,L,M) [57 >= B] (?,1) 131. f179(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f181(A,B,C,D,E,F,G,H,I,J,K,L,M) [B >= 59] (?,1) 132. f319(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f321(A,B,C,D,E,F,G,H,I,J,K,L,M) [0 >= C] (?,1) 133. f319(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f321(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 2] (?,1) 134. f321(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f323(A,B,C,D,E,F,G,H,I,J,K,L,M) [1 >= C] (?,1) 135. f321(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f323(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 3] (?,1) 136. f323(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f325(A,B,C,D,E,F,G,H,I,J,K,L,M) [2 >= C] (?,1) 137. f323(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f325(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 4] (?,1) 138. f325(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f327(A,B,C,D,E,F,G,H,I,J,K,L,M) [3 >= C] (?,1) 139. f325(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f327(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 5] (?,1) 140. f327(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f329(A,B,C,D,E,F,G,H,I,J,K,L,M) [4 >= C] (?,1) 141. f327(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f329(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 6] (?,1) 142. f329(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f331(A,B,C,D,E,F,G,H,I,J,K,L,M) [5 >= C] (?,1) 143. f329(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f331(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 7] (?,1) 144. f331(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f333(A,B,C,D,E,F,G,H,I,J,K,L,M) [6 >= C] (?,1) 145. f331(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f333(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 8] (?,1) 146. f333(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f335(A,B,C,D,E,F,G,H,I,J,K,L,M) [7 >= C] (?,1) 147. f333(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f335(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 9] (?,1) 148. f335(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f337(A,B,C,D,E,F,G,H,I,J,K,L,M) [8 >= C] (?,1) 149. f335(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f337(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 10] (?,1) 150. f337(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f339(A,B,C,D,E,F,G,H,I,J,K,L,M) [9 >= C] (?,1) 151. f337(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f339(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 11] (?,1) 152. f339(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f341(A,B,C,D,E,F,G,H,I,J,K,L,M) [10 >= C] (?,1) 153. f339(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f341(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 12] (?,1) 154. f341(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f343(A,B,C,D,E,F,G,H,I,J,K,L,M) [11 >= C] (?,1) 155. f341(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f343(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 13] (?,1) 156. f343(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f345(A,B,C,D,E,F,G,H,I,J,K,L,M) [12 >= C] (?,1) 157. f343(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f345(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 14] (?,1) 158. f345(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f347(A,B,C,D,E,F,G,H,I,J,K,L,M) [13 >= C] (?,1) 159. f345(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f347(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 15] (?,1) 160. f347(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f349(A,B,C,D,E,F,G,H,I,J,K,L,M) [14 >= C] (?,1) 161. f347(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f349(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 16] (?,1) 162. f349(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f351(A,B,C,D,E,F,G,H,I,J,K,L,M) [15 >= C] (?,1) 163. f349(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f351(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 17] (?,1) 164. f351(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f353(A,B,C,D,E,F,G,H,I,J,K,L,M) [16 >= C] (?,1) 165. f351(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f353(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 18] (?,1) 166. f353(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f355(A,B,C,D,E,F,G,H,I,J,K,L,M) [17 >= C] (?,1) 167. f353(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f355(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 19] (?,1) 168. f355(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f357(A,B,C,D,E,F,G,H,I,J,K,L,M) [18 >= C] (?,1) 169. f355(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f357(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 20] (?,1) 170. f357(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f359(A,B,C,D,E,F,G,H,I,J,K,L,M) [19 >= C] (?,1) 171. f357(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f359(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 21] (?,1) 172. f359(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f361(A,B,C,D,E,F,G,H,I,J,K,L,M) [20 >= C] (?,1) 173. f359(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f361(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 22] (?,1) 174. f361(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f363(A,B,C,D,E,F,G,H,I,J,K,L,M) [21 >= C] (?,1) 175. f361(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f363(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 23] (?,1) 176. f363(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f365(A,B,C,D,E,F,G,H,I,J,K,L,M) [22 >= C] (?,1) 177. f363(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f365(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 24] (?,1) 178. f365(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f367(A,B,C,D,E,F,G,H,I,J,K,L,M) [23 >= C] (?,1) 179. f365(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f367(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 25] (?,1) 180. f367(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f369(A,B,C,D,E,F,G,H,I,J,K,L,M) [24 >= C] (?,1) 181. f367(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f369(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 26] (?,1) 182. f369(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f371(A,B,C,D,E,F,G,H,I,J,K,L,M) [25 >= C] (?,1) 183. f369(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f371(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 27] (?,1) 184. f371(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f373(A,B,C,D,E,F,G,H,I,J,K,L,M) [26 >= C] (?,1) 185. f371(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f373(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 28] (?,1) 186. f373(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f375(A,B,C,D,E,F,G,H,I,J,K,L,M) [27 >= C] (?,1) 187. f373(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f375(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 29] (?,1) 188. f375(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f377(A,B,C,D,E,F,G,H,I,J,K,L,M) [28 >= C] (?,1) 189. f375(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f377(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 30] (?,1) 190. f377(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f379(A,B,C,D,E,F,G,H,I,J,K,L,M) [29 >= C] (?,1) 191. f377(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f379(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 31] (?,1) 192. f379(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f381(A,B,C,D,E,F,G,H,I,J,K,L,M) [30 >= C] (?,1) 193. f379(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f381(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 32] (?,1) 194. f381(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f383(A,B,C,D,E,F,G,H,I,J,K,L,M) [31 >= C] (?,1) 195. f381(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f383(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 33] (?,1) 196. f383(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f385(A,B,C,D,E,F,G,H,I,J,K,L,M) [32 >= C] (?,1) 197. f383(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f385(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 34] (?,1) 198. f385(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f387(A,B,C,D,E,F,G,H,I,J,K,L,M) [33 >= C] (?,1) 199. f385(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f387(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 35] (?,1) 200. f387(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f389(A,B,C,D,E,F,G,H,I,J,K,L,M) [34 >= C] (?,1) 201. f387(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f389(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 36] (?,1) 202. f389(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f391(A,B,C,D,E,F,G,H,I,J,K,L,M) [35 >= C] (?,1) 203. f389(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f391(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 37] (?,1) 204. f391(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f393(A,B,C,D,E,F,G,H,I,J,K,L,M) [36 >= C] (?,1) 205. f391(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f393(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 38] (?,1) 206. f393(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f395(A,B,C,D,E,F,G,H,I,J,K,L,M) [37 >= C] (?,1) 207. f393(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f395(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 39] (?,1) 208. f395(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f397(A,B,C,D,E,F,G,H,I,J,K,L,M) [38 >= C] (?,1) 209. f395(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f397(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 40] (?,1) 210. f397(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f399(A,B,C,D,E,F,G,H,I,J,K,L,M) [39 >= C] (?,1) 211. f397(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f399(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 41] (?,1) 212. f399(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f401(A,B,C,D,E,F,G,H,I,J,K,L,M) [40 >= C] (?,1) 213. f399(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f401(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 42] (?,1) 214. f401(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f403(A,B,C,D,E,F,G,H,I,J,K,L,M) [41 >= C] (?,1) 215. f401(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f403(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 43] (?,1) 216. f403(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f405(A,B,C,D,E,F,G,H,I,J,K,L,M) [42 >= C] (?,1) 217. f403(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f405(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 44] (?,1) 218. f405(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f407(A,B,C,D,E,F,G,H,I,J,K,L,M) [43 >= C] (?,1) 219. f405(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f407(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 45] (?,1) 220. f407(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f409(A,B,C,D,E,F,G,H,I,J,K,L,M) [44 >= C] (?,1) 221. f407(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f409(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 46] (?,1) 222. f409(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f411(A,B,C,D,E,F,G,H,I,J,K,L,M) [45 >= C] (?,1) 223. f409(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f411(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 47] (?,1) 224. f411(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f413(A,B,C,D,E,F,G,H,I,J,K,L,M) [46 >= C] (?,1) 225. f411(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f413(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 48] (?,1) 226. f413(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f415(A,B,C,D,E,F,G,H,I,J,K,L,M) [47 >= C] (?,1) 227. f413(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f415(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 49] (?,1) 228. f415(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f417(A,B,C,D,E,F,G,H,I,J,K,L,M) [48 >= C] (?,1) 229. f415(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f417(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 50] (?,1) 230. f417(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f419(A,B,C,D,E,F,G,H,I,J,K,L,M) [49 >= C] (?,1) 231. f417(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f419(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 51] (?,1) 232. f419(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f421(A,B,C,D,E,F,G,H,I,J,K,L,M) [50 >= C] (?,1) 233. f419(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f421(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 52] (?,1) 234. f421(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f423(A,B,C,D,E,F,G,H,I,J,K,L,M) [51 >= C] (?,1) 235. f421(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f423(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 53] (?,1) 236. f423(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f425(A,B,C,D,E,F,G,H,I,J,K,L,M) [52 >= C] (?,1) 237. f423(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f425(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 54] (?,1) 238. f425(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f427(A,B,C,D,E,F,G,H,I,J,K,L,M) [53 >= C] (?,1) 239. f425(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f427(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 55] (?,1) 240. f427(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f429(A,B,C,D,E,F,G,H,I,J,K,L,M) [54 >= C] (?,1) 241. f427(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f429(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 56] (?,1) 242. f429(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f431(A,B,C,D,E,F,G,H,I,J,K,L,M) [55 >= C] (?,1) 243. f429(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f431(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 57] (?,1) 244. f431(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f433(A,B,C,D,E,F,G,H,I,J,K,L,M) [56 >= C] (?,1) 245. f431(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f433(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 58] (?,1) 246. f433(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f435(A,B,C,D,E,F,G,H,I,J,K,L,M) [57 >= C] (?,1) 247. f433(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f435(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 59] (?,1) 248. f435(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f437(A,B,C,D,E,F,G,H,I,J,K,L,M) [58 >= C] (?,1) 249. f435(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f437(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 60] (?,1) 250. f437(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f439(A,B,C,D,E,F,G,H,I,J,K,L,M) [59 >= C] (?,1) 251. f437(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f439(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 61] (?,1) 252. f439(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f441(A,B,C,D,E,F,G,H,I,J,K,L,M) [60 >= C] (?,1) 253. f439(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f441(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 62] (?,1) 254. f441(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f443(A,B,C,D,E,F,G,H,I,J,K,L,M) [61 >= C] (?,1) 255. f441(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f443(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 63] (?,1) 256. f443(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f445(A,B,C,D,E,F,G,H,I,J,K,L,M) [62 >= C] (?,1) 257. f443(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f445(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 64] (?,1) 258. f445(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f447(A,B,C,D,E,F,G,H,I,J,K,L,M) [63 >= C] (?,1) 259. f445(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f447(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 65] (?,1) 260. f447(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f449(A,B,C,D,E,F,G,H,I,J,K,L,M) [64 >= C] (?,1) 261. f447(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f449(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 66] (?,1) 262. f449(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f451(A,B,C,D,E,F,G,H,I,J,K,L,M) [65 >= C] (?,1) 263. f449(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f451(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 67] (?,1) 264. f451(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f453(A,B,C,D,E,F,G,H,I,J,K,L,M) [66 >= C] (?,1) 265. f451(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f453(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 68] (?,1) 266. f453(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f455(A,B,C,D,E,F,G,H,I,J,K,L,M) [67 >= C] (?,1) 267. f453(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f455(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 69] (?,1) 268. f455(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f457(A,B,C,D,E,F,G,H,I,J,K,L,M) [68 >= C] (?,1) 269. f455(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f457(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 70] (?,1) 270. f457(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f459(A,B,C,D,E,F,G,H,I,J,K,L,M) [69 >= C] (?,1) 271. f457(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f459(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 71] (?,1) 272. f459(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f461(A,B,C,D,E,F,G,H,I,J,K,L,M) [70 >= C] (?,1) 273. f459(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f461(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 72] (?,1) 274. f461(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f463(A,B,C,D,E,F,G,H,I,J,K,L,M) [71 >= C] (?,1) 275. f461(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f463(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 73] (?,1) 276. f463(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f465(A,B,C,D,E,F,G,H,I,J,K,L,M) [72 >= C] (?,1) 277. f463(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f465(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 74] (?,1) 278. f465(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f467(A,B,C,D,E,F,G,H,I,J,K,L,M) [73 >= C] (?,1) 279. f465(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f467(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 75] (?,1) 280. f467(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f469(A,B,C,D,E,F,G,H,I,J,K,L,M) [74 >= C] (?,1) 281. f467(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f469(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 76] (?,1) 282. f469(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f471(A,B,C,D,E,F,G,H,I,J,K,L,M) [75 >= C] (?,1) 283. f469(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f471(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 77] (?,1) 284. f471(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f473(A,B,C,D,E,F,G,H,I,J,K,L,M) [76 >= C] (?,1) 285. f471(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f473(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 78] (?,1) 286. f473(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f475(A,B,C,D,E,F,G,H,I,J,K,L,M) [77 >= C] (?,1) 287. f473(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f475(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 79] (?,1) 288. f475(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f477(A,B,C,D,E,F,G,H,I,J,K,L,M) [78 >= C] (?,1) 289. f475(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f477(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 80] (?,1) 290. f477(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f479(A,B,C,D,E,F,G,H,I,J,K,L,M) [79 >= C] (?,1) 291. f477(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f479(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 81] (?,1) 292. f479(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f481(A,B,C,D,E,F,G,H,I,J,K,L,M) [80 >= C] (?,1) 293. f479(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f481(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 82] (?,1) 294. f481(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f483(A,B,C,D,E,F,G,H,I,J,K,L,M) [81 >= C] (?,1) 295. f481(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f483(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 83] (?,1) 296. f483(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f485(A,B,C,D,E,F,G,H,I,J,K,L,M) [82 >= C] (?,1) 297. f483(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f485(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 84] (?,1) 298. f485(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f487(A,B,C,D,E,F,G,H,I,J,K,L,M) [83 >= C] (?,1) 299. f485(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f487(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 85] (?,1) 300. f487(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f489(A,B,C,D,E,F,G,H,I,J,K,L,M) [84 >= C] (?,1) 301. f487(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f489(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 86] (?,1) 302. f489(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f491(A,B,C,D,E,F,G,H,I,J,K,L,M) [85 >= C] (?,1) 303. f489(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f491(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 87] (?,1) 304. f491(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f493(A,B,C,D,E,F,G,H,I,J,K,L,M) [86 >= C] (?,1) 305. f491(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f493(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 88] (?,1) 306. f493(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f495(A,B,C,D,E,F,G,H,I,J,K,L,M) [87 >= C] (?,1) 307. f493(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f495(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 89] (?,1) 308. f495(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f497(A,B,C,D,E,F,G,H,I,J,K,L,M) [88 >= C] (?,1) 309. f495(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f497(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 90] (?,1) 310. f497(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f499(A,B,C,D,E,F,G,H,I,J,K,L,M) [89 >= C] (?,1) 311. f497(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f499(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 91] (?,1) 312. f499(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f501(A,B,C,D,E,F,G,H,I,J,K,L,M) [90 >= C] (?,1) 313. f499(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f501(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 92] (?,1) 314. f501(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f503(A,B,C,D,E,F,G,H,I,J,K,L,M) [91 >= C] (?,1) 315. f501(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f503(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 93] (?,1) 316. f503(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f505(A,B,C,D,E,F,G,H,I,J,K,L,M) [92 >= C] (?,1) 317. f503(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f505(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 94] (?,1) 318. f505(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f507(A,B,C,D,E,F,G,H,I,J,K,L,M) [93 >= C] (?,1) 319. f505(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f507(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 95] (?,1) 320. f507(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f509(A,B,C,D,E,F,G,H,I,J,K,L,M) [94 >= C] (?,1) 321. f507(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f509(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 96] (?,1) 322. f509(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f511(A,B,C,D,E,F,G,H,I,J,K,L,M) [95 >= C] (?,1) 323. f509(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f511(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 97] (?,1) 324. f511(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f513(A,B,C,D,E,F,G,H,I,J,K,L,M) [96 >= C] (?,1) 325. f511(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f513(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 98] (?,1) 326. f513(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f515(A,B,C,D,E,F,G,H,I,J,K,L,M) [97 >= C] (?,1) 327. f513(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f515(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 99] (?,1) 328. f515(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f517(A,B,C,D,E,F,G,H,I,J,K,L,M) [98 >= C] (?,1) 329. f515(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f517(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 100] (?,1) 330. f517(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f519(A,B,C,D,E,F,G,H,I,J,K,L,M) [99 >= C] (?,1) 331. f517(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f519(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 101] (?,1) 332. f519(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f521(A,B,C,D,E,F,G,H,I,J,K,L,M) [100 >= C] (?,1) 333. f519(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f521(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 102] (?,1) 334. f521(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f523(A,B,C,D,E,F,G,H,I,J,K,L,M) [101 >= C] (?,1) 335. f521(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f523(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 103] (?,1) 336. f523(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f525(A,B,C,D,E,F,G,H,I,J,K,L,M) [102 >= C] (?,1) 337. f523(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f525(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 104] (?,1) 338. f525(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f527(A,B,C,D,E,F,G,H,I,J,K,L,M) [103 >= C] (?,1) 339. f525(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f527(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 105] (?,1) 340. f527(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f529(A,B,C,D,E,F,G,H,I,J,K,L,M) [104 >= C] (?,1) 341. f527(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f529(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 106] (?,1) 342. f529(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f531(A,B,C,D,E,F,G,H,I,J,K,L,M) [105 >= C] (?,1) 343. f529(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f531(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 107] (?,1) 344. f531(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f533(A,B,C,D,E,F,G,H,I,J,K,L,M) [106 >= C] (?,1) 345. f531(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f533(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 108] (?,1) 346. f533(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f535(A,B,C,D,E,F,G,H,I,J,K,L,M) [107 >= C] (?,1) 347. f533(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f535(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 109] (?,1) 348. f535(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f537(A,B,C,D,E,F,G,H,I,J,K,L,M) [108 >= C] (?,1) 349. f535(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f537(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 110] (?,1) 350. f537(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f539(A,B,C,D,E,F,G,H,I,J,K,L,M) [109 >= C] (?,1) 351. f537(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f539(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 111] (?,1) 352. f539(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f541(A,B,C,D,E,F,G,H,I,J,K,L,M) [110 >= C] (?,1) 353. f539(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f541(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 112] (?,1) 354. f541(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f543(A,B,C,D,E,F,G,H,I,J,K,L,M) [111 >= C] (?,1) 355. f541(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f543(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 113] (?,1) 356. f543(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f545(A,B,C,D,E,F,G,H,I,J,K,L,M) [112 >= C] (?,1) 357. f543(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f545(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 114] (?,1) 358. f545(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f547(A,B,C,D,E,F,G,H,I,J,K,L,M) [113 >= C] (?,1) 359. f545(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f547(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 115] (?,1) 360. f547(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f549(A,B,C,D,E,F,G,H,I,J,K,L,M) [114 >= C] (?,1) 361. f547(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f549(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 116] (?,1) 362. f549(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f551(A,B,C,D,E,F,G,H,I,J,K,L,M) [115 >= C] (?,1) 363. f549(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f551(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 117] (?,1) 364. f551(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f553(A,B,C,D,E,F,G,H,I,J,K,L,M) [116 >= C] (?,1) 365. f551(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f553(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 118] (?,1) 366. f553(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f555(A,B,C,D,E,F,G,H,I,J,K,L,M) [117 >= C] (?,1) 367. f553(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f555(A,B,C,D,E,F,G,H,I,J,K,L,M) [C >= 119] (?,1) 368. f0(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(0,B,C,0,0,F,G,H,I,J,K,L,M) True (1,1) 369. f7(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f11(A,B,C,D,E,F,G,H,I,J,K,L,M) [0 >= 1 + A && 9 >= A] (?,1) 370. f7(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f11(A,B,C,D,E,F,G,H,I,J,K,L,M) [9 >= A && A >= 1] (?,1) 371. f61(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f65(A,B,C,D,E,F,G,H,I,J,K,L,M) [0 >= 1 + B && 49 >= B] (?,1) 372. f61(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f65(A,B,C,D,E,F,G,H,I,J,K,L,M) [49 >= B && B >= 1] (?,1) 373. f315(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f319(A,B,C,D,E,F,G,H,I,J,K,L,M) [0 >= 1 + C && 119 >= C] (?,1) 374. f315(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f319(A,B,C,D,E,F,G,H,I,J,K,L,M) [119 >= C && C >= 1] (?,1) 375. f555(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,1 + C,D,E,-1 + F,G,H,I,J,K,L,M) [118 >= C] (?,1) 376. f555(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,1 + C,D,E,-1 + F,G,H,I,J,K,L,M) [C >= 120] (?,1) 377. f555(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,120,D,E,1 + F,G,H,I,J,K,L,M) [C = 119] (?,1) 378. f553(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,119,D,E,1 + F,G,H,I,J,K,L,M) [C = 118] (?,1) 379. f551(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,118,D,E,1 + F,G,H,I,J,K,L,M) [C = 117] (?,1) 380. f549(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,117,D,E,1 + F,G,H,I,J,K,L,M) [C = 116] (?,1) 381. f547(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,116,D,E,1 + F,G,H,I,J,K,L,M) [C = 115] (?,1) 382. f545(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,115,D,E,1 + F,G,H,I,J,K,L,M) [C = 114] (?,1) 383. f543(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,114,D,E,1 + F,G,H,I,J,K,L,M) [C = 113] (?,1) 384. f541(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,113,D,E,1 + F,G,H,I,J,K,L,M) [C = 112] (?,1) 385. f539(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,112,D,E,1 + F,G,H,I,J,K,L,M) [C = 111] (?,1) 386. f537(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,111,D,E,1 + F,G,H,I,J,K,L,M) [C = 110] (?,1) 387. f535(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,110,D,E,1 + F,G,H,I,J,K,L,M) [C = 109] (?,1) 388. f533(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,109,D,E,1 + F,G,H,I,J,K,L,M) [C = 108] (?,1) 389. f531(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,108,D,E,1 + F,G,H,I,J,K,L,M) [C = 107] (?,1) 390. f529(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,107,D,E,1 + F,G,H,I,J,K,L,M) [C = 106] (?,1) 391. f527(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,106,D,E,1 + F,G,H,I,J,K,L,M) [C = 105] (?,1) 392. f525(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,105,D,E,1 + F,G,H,I,J,K,L,M) [C = 104] (?,1) 393. f523(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,104,D,E,1 + F,G,H,I,J,K,L,M) [C = 103] (?,1) 394. f521(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,103,D,E,1 + F,G,H,I,J,K,L,M) [C = 102] (?,1) 395. f519(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,102,D,E,1 + F,G,H,I,J,K,L,M) [C = 101] (?,1) 396. f517(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,101,D,E,1 + F,G,H,I,J,K,L,M) [C = 100] (?,1) 397. f515(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,100,D,E,1 + F,G,H,I,J,K,L,M) [C = 99] (?,1) 398. f513(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,99,D,E,1 + F,G,H,I,J,K,L,M) [C = 98] (?,1) 399. f511(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,98,D,E,1 + F,G,H,I,J,K,L,M) [C = 97] (?,1) 400. f509(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,97,D,E,1 + F,G,H,I,J,K,L,M) [C = 96] (?,1) 401. f507(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,96,D,E,1 + F,G,H,I,J,K,L,M) [C = 95] (?,1) 402. f505(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,95,D,E,1 + F,G,H,I,J,K,L,M) [C = 94] (?,1) 403. f503(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,94,D,E,1 + F,G,H,I,J,K,L,M) [C = 93] (?,1) 404. f501(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,93,D,E,1 + F,G,H,I,J,K,L,M) [C = 92] (?,1) 405. f499(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,92,D,E,1 + F,G,H,I,J,K,L,M) [C = 91] (?,1) 406. f497(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,91,D,E,1 + F,G,H,I,J,K,L,M) [C = 90] (?,1) 407. f495(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,90,D,E,1 + F,G,H,I,J,K,L,M) [C = 89] (?,1) 408. f493(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,89,D,E,1 + F,G,H,I,J,K,L,M) [C = 88] (?,1) 409. f491(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,88,D,E,1 + F,G,H,I,J,K,L,M) [C = 87] (?,1) 410. f489(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,87,D,E,1 + F,G,H,I,J,K,L,M) [C = 86] (?,1) 411. f487(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,86,D,E,1 + F,G,H,I,J,K,L,M) [C = 85] (?,1) 412. f485(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,85,D,E,1 + F,G,H,I,J,K,L,M) [C = 84] (?,1) 413. f483(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,84,D,E,1 + F,G,H,I,J,K,L,M) [C = 83] (?,1) 414. f481(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,83,D,E,1 + F,G,H,I,J,K,L,M) [C = 82] (?,1) 415. f479(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,82,D,E,1 + F,G,H,I,J,K,L,M) [C = 81] (?,1) 416. f477(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,81,D,E,1 + F,G,H,I,J,K,L,M) [C = 80] (?,1) 417. f475(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,80,D,E,1 + F,G,H,I,J,K,L,M) [C = 79] (?,1) 418. f473(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,79,D,E,1 + F,G,H,I,J,K,L,M) [C = 78] (?,1) 419. f471(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,78,D,E,1 + F,G,H,I,J,K,L,M) [C = 77] (?,1) 420. f469(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,77,D,E,1 + F,G,H,I,J,K,L,M) [C = 76] (?,1) 421. f467(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,76,D,E,1 + F,G,H,I,J,K,L,M) [C = 75] (?,1) 422. f465(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,75,D,E,1 + F,G,H,I,J,K,L,M) [C = 74] (?,1) 423. f463(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,74,D,E,1 + F,G,H,I,J,K,L,M) [C = 73] (?,1) 424. f461(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,73,D,E,1 + F,G,H,I,J,K,L,M) [C = 72] (?,1) 425. f459(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,72,D,E,1 + F,G,H,I,J,K,L,M) [C = 71] (?,1) 426. f457(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,71,D,E,1 + F,G,H,I,J,K,L,M) [C = 70] (?,1) 427. f455(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,70,D,E,1 + F,G,H,I,J,K,L,M) [C = 69] (?,1) 428. f453(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,69,D,E,1 + F,G,H,I,J,K,L,M) [C = 68] (?,1) 429. f451(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,68,D,E,1 + F,G,H,I,J,K,L,M) [C = 67] (?,1) 430. f449(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,67,D,E,1 + F,G,H,I,J,K,L,M) [C = 66] (?,1) 431. f447(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,66,D,E,1 + F,G,H,I,J,K,L,M) [C = 65] (?,1) 432. f445(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,65,D,E,1 + F,G,H,I,J,K,L,M) [C = 64] (?,1) 433. f443(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,64,D,E,1 + F,G,H,I,J,K,L,M) [C = 63] (?,1) 434. f441(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,63,D,E,1 + F,G,H,I,J,K,L,M) [C = 62] (?,1) 435. f439(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,62,D,E,1 + F,G,H,I,J,K,L,M) [C = 61] (?,1) 436. f437(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,61,D,E,1 + F,G,H,I,J,K,L,M) [C = 60] (?,1) 437. f435(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,60,D,E,1 + F,G,H,I,J,K,L,M) [C = 59] (?,1) 438. f433(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,59,D,E,1 + F,G,H,I,J,K,L,M) [C = 58] (?,1) 439. f431(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,58,D,E,1 + F,G,H,I,J,K,L,M) [C = 57] (?,1) 440. f429(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,57,D,E,1 + F,G,H,I,J,K,L,M) [C = 56] (?,1) 441. f427(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,56,D,E,1 + F,G,H,I,J,K,L,M) [C = 55] (?,1) 442. f425(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,55,D,E,1 + F,G,H,I,J,K,L,M) [C = 54] (?,1) 443. f423(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,54,D,E,1 + F,G,H,I,J,K,L,M) [C = 53] (?,1) 444. f421(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,53,D,E,1 + F,G,H,I,J,K,L,M) [C = 52] (?,1) 445. f419(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,52,D,E,1 + F,G,H,I,J,K,L,M) [C = 51] (?,1) 446. f417(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,51,D,E,1 + F,G,H,I,J,K,L,M) [C = 50] (?,1) 447. f415(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,50,D,E,1 + F,G,H,I,J,K,L,M) [C = 49] (?,1) 448. f413(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,49,D,E,1 + F,G,H,I,J,K,L,M) [C = 48] (?,1) 449. f411(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,48,D,E,1 + F,G,H,I,J,K,L,M) [C = 47] (?,1) 450. f409(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,47,D,E,1 + F,G,H,I,J,K,L,M) [C = 46] (?,1) 451. f407(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,46,D,E,1 + F,G,H,I,J,K,L,M) [C = 45] (?,1) 452. f405(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,45,D,E,1 + F,G,H,I,J,K,L,M) [C = 44] (?,1) 453. f403(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,44,D,E,1 + F,G,H,I,J,K,L,M) [C = 43] (?,1) 454. f401(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,43,D,E,1 + F,G,H,I,J,K,L,M) [C = 42] (?,1) 455. f399(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,42,D,E,1 + F,G,H,I,J,K,L,M) [C = 41] (?,1) 456. f397(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,41,D,E,1 + F,G,H,I,J,K,L,M) [C = 40] (?,1) 457. f395(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,40,D,E,1 + F,G,H,I,J,K,L,M) [C = 39] (?,1) 458. f393(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,39,D,E,1 + F,G,H,I,J,K,L,M) [C = 38] (?,1) 459. f391(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,38,D,E,1 + F,G,H,I,J,K,L,M) [C = 37] (?,1) 460. f389(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,37,D,E,1 + F,G,H,I,J,K,L,M) [C = 36] (?,1) 461. f387(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,36,D,E,1 + F,G,H,I,J,K,L,M) [C = 35] (?,1) 462. f385(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,35,D,E,1 + F,G,H,I,J,K,L,M) [C = 34] (?,1) 463. f383(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,34,D,E,1 + F,G,H,I,J,K,L,M) [C = 33] (?,1) 464. f381(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,33,D,E,1 + F,G,H,I,J,K,L,M) [C = 32] (?,1) 465. f379(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,32,D,E,1 + F,G,H,I,J,K,L,M) [C = 31] (?,1) 466. f377(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,31,D,E,1 + F,G,H,I,J,K,L,M) [C = 30] (?,1) 467. f375(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,30,D,E,1 + F,G,H,I,J,K,L,M) [C = 29] (?,1) 468. f373(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,29,D,E,1 + F,G,H,I,J,K,L,M) [C = 28] (?,1) 469. f371(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,28,D,E,1 + F,G,H,I,J,K,L,M) [C = 27] (?,1) 470. f369(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,27,D,E,1 + F,G,H,I,J,K,L,M) [C = 26] (?,1) 471. f367(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,26,D,E,1 + F,G,H,I,J,K,L,M) [C = 25] (?,1) 472. f365(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,25,D,E,1 + F,G,H,I,J,K,L,M) [C = 24] (?,1) 473. f363(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,24,D,E,1 + F,G,H,I,J,K,L,M) [C = 23] (?,1) 474. f361(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,23,D,E,1 + F,G,H,I,J,K,L,M) [C = 22] (?,1) 475. f359(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,22,D,E,1 + F,G,H,I,J,K,L,M) [C = 21] (?,1) 476. f357(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,21,D,E,1 + F,G,H,I,J,K,L,M) [C = 20] (?,1) 477. f355(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,20,D,E,1 + F,G,H,I,J,K,L,M) [C = 19] (?,1) 478. f353(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,19,D,E,1 + F,G,H,I,J,K,L,M) [C = 18] (?,1) 479. f351(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,18,D,E,1 + F,G,H,I,J,K,L,M) [C = 17] (?,1) 480. f349(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,17,D,E,1 + F,G,H,I,J,K,L,M) [C = 16] (?,1) 481. f347(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,16,D,E,1 + F,G,H,I,J,K,L,M) [C = 15] (?,1) 482. f345(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,15,D,E,1 + F,G,H,I,J,K,L,M) [C = 14] (?,1) 483. f343(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,14,D,E,1 + F,G,H,I,J,K,L,M) [C = 13] (?,1) 484. f341(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,13,D,E,1 + F,G,H,I,J,K,L,M) [C = 12] (?,1) 485. f339(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,12,D,E,1 + F,G,H,I,J,K,L,M) [C = 11] (?,1) 486. f337(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,11,D,E,1 + F,G,H,I,J,K,L,M) [C = 10] (?,1) 487. f335(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,10,D,E,1 + F,G,H,I,J,K,L,M) [C = 9] (?,1) 488. f333(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,9,D,E,1 + F,G,H,I,J,K,L,M) [C = 8] (?,1) 489. f331(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,8,D,E,1 + F,G,H,I,J,K,L,M) [C = 7] (?,1) 490. f329(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,7,D,E,1 + F,G,H,I,J,K,L,M) [C = 6] (?,1) 491. f327(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,6,D,E,1 + F,G,H,I,J,K,L,M) [C = 5] (?,1) 492. f325(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,5,D,E,1 + F,G,H,I,J,K,L,M) [C = 4] (?,1) 493. f323(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,4,D,E,1 + F,G,H,I,J,K,L,M) [C = 3] (?,1) 494. f321(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,3,D,E,1 + F,G,H,I,J,K,L,M) [C = 2] (?,1) 495. f319(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,2,D,E,1 + F,G,H,I,J,K,L,M) [C = 1] (?,1) 496. f315(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,1,D,E,1 + F,G,H,I,J,K,L,M) [C = 0] (?,1) 497. f315(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f808(A,B,C,F,E,F,F,F,I,J,K,L,M) [C >= 120] (?,1) 498. f181(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,1 + B,C,D,E,F,G,H,-1 + I,J,K,L,M) [58 >= B] (?,1) 499. f181(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,1 + B,C,D,E,F,G,H,-1 + I,J,K,L,M) [B >= 60] (?,1) 500. f181(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,60,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 59] (?,1) 501. f179(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,59,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 58] (?,1) 502. f177(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,58,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 57] (?,1) 503. f175(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,57,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 56] (?,1) 504. f173(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,56,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 55] (?,1) 505. f171(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,55,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 54] (?,1) 506. f169(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,54,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 53] (?,1) 507. f167(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,53,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 52] (?,1) 508. f165(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,52,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 51] (?,1) 509. f163(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,51,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 50] (?,1) 510. f161(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,50,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 49] (?,1) 511. f159(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,49,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 48] (?,1) 512. f157(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,48,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 47] (?,1) 513. f155(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,47,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 46] (?,1) 514. f153(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,46,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 45] (?,1) 515. f151(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,45,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 44] (?,1) 516. f149(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,44,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 43] (?,1) 517. f147(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,43,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 42] (?,1) 518. f145(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,42,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 41] (?,1) 519. f143(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,41,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 40] (?,1) 520. f141(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,40,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 39] (?,1) 521. f139(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,39,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 38] (?,1) 522. f137(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,38,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 37] (?,1) 523. f135(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,37,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 36] (?,1) 524. f133(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,36,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 35] (?,1) 525. f131(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,35,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 34] (?,1) 526. f129(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,34,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 33] (?,1) 527. f127(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,33,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 32] (?,1) 528. f125(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,32,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 31] (?,1) 529. f123(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,31,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 30] (?,1) 530. f121(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,30,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 29] (?,1) 531. f119(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,29,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 28] (?,1) 532. f117(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,28,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 27] (?,1) 533. f115(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,27,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 26] (?,1) 534. f113(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,26,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 25] (?,1) 535. f111(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,25,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 24] (?,1) 536. f109(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,24,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 23] (?,1) 537. f107(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,23,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 22] (?,1) 538. f105(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,22,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 21] (?,1) 539. f103(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,21,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 20] (?,1) 540. f101(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,20,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 19] (?,1) 541. f99(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,19,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 18] (?,1) 542. f97(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,18,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 17] (?,1) 543. f95(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,17,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 16] (?,1) 544. f93(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,16,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 15] (?,1) 545. f91(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,15,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 14] (?,1) 546. f89(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,14,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 13] (?,1) 547. f87(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,13,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 12] (?,1) 548. f85(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,12,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 11] (?,1) 549. f83(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,11,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 10] (?,1) 550. f81(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,10,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 9] (?,1) 551. f79(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,9,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 8] (?,1) 552. f77(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,8,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 7] (?,1) 553. f75(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,7,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 6] (?,1) 554. f73(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,6,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 5] (?,1) 555. f71(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,5,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 4] (?,1) 556. f69(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,4,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 3] (?,1) 557. f67(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,3,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 2] (?,1) 558. f65(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,2,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 1] (?,1) 559. f61(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,1,C,D,E,F,G,H,1 + I,J,K,L,M) [B = 0] (?,1) 560. f61(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f315(A,B,0,I,E,I,G,H,I,I,I,L,M) [B >= 50] (?,1) 561. f27(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(1 + A,B,C,D,-1 + E,F,G,H,I,J,K,L,M) [8 >= A] (?,1) 562. f27(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(1 + A,B,C,D,-1 + E,F,G,H,I,J,K,L,M) [A >= 10] (?,1) 563. f27(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(10,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 9] (?,1) 564. f25(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(9,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 8] (?,1) 565. f23(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(8,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 7] (?,1) 566. f21(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(7,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 6] (?,1) 567. f19(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(6,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 5] (?,1) 568. f17(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(5,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 4] (?,1) 569. f15(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(4,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 3] (?,1) 570. f13(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(3,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 2] (?,1) 571. f11(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(2,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 1] (?,1) 572. f7(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f7(1,B,C,D,1 + E,F,G,H,I,J,K,L,M) [A = 0] (?,1) 573. f7(A,B,C,D,E,F,G,H,I,J,K,L,M) -> f61(A,0,C,E,E,F,G,H,E,J,K,E,E) [A >= 10] (?,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [0->{2,3,570},1->{2,3,570},2->{4,5,569},3->{4,5,569},4->{6,7,568},5->{6,7,568},6->{8,9,567},7->{8,9,567} ,8->{10,11,566},9->{10,11,566},10->{12,13,565},11->{12,13,565},12->{14,15,564},13->{14,15,564},14->{561,562 ,563},15->{561,562,563},16->{18,19,557},17->{18,19,557},18->{20,21,556},19->{20,21,556},20->{22,23,555} ,21->{22,23,555},22->{24,25,554},23->{24,25,554},24->{26,27,553},25->{26,27,553},26->{28,29,552},27->{28,29 ,552},28->{30,31,551},29->{30,31,551},30->{32,33,550},31->{32,33,550},32->{34,35,549},33->{34,35,549} ,34->{36,37,548},35->{36,37,548},36->{38,39,547},37->{38,39,547},38->{40,41,546},39->{40,41,546},40->{42,43 ,545},41->{42,43,545},42->{44,45,544},43->{44,45,544},44->{46,47,543},45->{46,47,543},46->{48,49,542} ,47->{48,49,542},48->{50,51,541},49->{50,51,541},50->{52,53,540},51->{52,53,540},52->{54,55,539},53->{54,55 ,539},54->{56,57,538},55->{56,57,538},56->{58,59,537},57->{58,59,537},58->{60,61,536},59->{60,61,536} ,60->{62,63,535},61->{62,63,535},62->{64,65,534},63->{64,65,534},64->{66,67,533},65->{66,67,533},66->{68,69 ,532},67->{68,69,532},68->{70,71,531},69->{70,71,531},70->{72,73,530},71->{72,73,530},72->{74,75,529} ,73->{74,75,529},74->{76,77,528},75->{76,77,528},76->{78,79,527},77->{78,79,527},78->{80,81,526},79->{80,81 ,526},80->{82,83,525},81->{82,83,525},82->{84,85,524},83->{84,85,524},84->{86,87,523},85->{86,87,523} ,86->{88,89,522},87->{88,89,522},88->{90,91,521},89->{90,91,521},90->{92,93,520},91->{92,93,520},92->{94,95 ,519},93->{94,95,519},94->{96,97,518},95->{96,97,518},96->{98,99,517},97->{98,99,517},98->{100,101,516} ,99->{100,101,516},100->{102,103,515},101->{102,103,515},102->{104,105,514},103->{104,105,514},104->{106,107 ,513},105->{106,107,513},106->{108,109,512},107->{108,109,512},108->{110,111,511},109->{110,111,511} ,110->{112,113,510},111->{112,113,510},112->{114,115,509},113->{114,115,509},114->{116,117,508},115->{116 ,117,508},116->{118,119,507},117->{118,119,507},118->{120,121,506},119->{120,121,506},120->{122,123,505} ,121->{122,123,505},122->{124,125,504},123->{124,125,504},124->{126,127,503},125->{126,127,503},126->{128 ,129,502},127->{128,129,502},128->{130,131,501},129->{130,131,501},130->{498,499,500},131->{498,499,500} ,132->{134,135,494},133->{134,135,494},134->{136,137,493},135->{136,137,493},136->{138,139,492},137->{138 ,139,492},138->{140,141,491},139->{140,141,491},140->{142,143,490},141->{142,143,490},142->{144,145,489} ,143->{144,145,489},144->{146,147,488},145->{146,147,488},146->{148,149,487},147->{148,149,487},148->{150 ,151,486},149->{150,151,486},150->{152,153,485},151->{152,153,485},152->{154,155,484},153->{154,155,484} ,154->{156,157,483},155->{156,157,483},156->{158,159,482},157->{158,159,482},158->{160,161,481},159->{160 ,161,481},160->{162,163,480},161->{162,163,480},162->{164,165,479},163->{164,165,479},164->{166,167,478} ,165->{166,167,478},166->{168,169,477},167->{168,169,477},168->{170,171,476},169->{170,171,476},170->{172 ,173,475},171->{172,173,475},172->{174,175,474},173->{174,175,474},174->{176,177,473},175->{176,177,473} ,176->{178,179,472},177->{178,179,472},178->{180,181,471},179->{180,181,471},180->{182,183,470},181->{182 ,183,470},182->{184,185,469},183->{184,185,469},184->{186,187,468},185->{186,187,468},186->{188,189,467} ,187->{188,189,467},188->{190,191,466},189->{190,191,466},190->{192,193,465},191->{192,193,465},192->{194 ,195,464},193->{194,195,464},194->{196,197,463},195->{196,197,463},196->{198,199,462},197->{198,199,462} ,198->{200,201,461},199->{200,201,461},200->{202,203,460},201->{202,203,460},202->{204,205,459},203->{204 ,205,459},204->{206,207,458},205->{206,207,458},206->{208,209,457},207->{208,209,457},208->{210,211,456} ,209->{210,211,456},210->{212,213,455},211->{212,213,455},212->{214,215,454},213->{214,215,454},214->{216 ,217,453},215->{216,217,453},216->{218,219,452},217->{218,219,452},218->{220,221,451},219->{220,221,451} ,220->{222,223,450},221->{222,223,450},222->{224,225,449},223->{224,225,449},224->{226,227,448},225->{226 ,227,448},226->{228,229,447},227->{228,229,447},228->{230,231,446},229->{230,231,446},230->{232,233,445} ,231->{232,233,445},232->{234,235,444},233->{234,235,444},234->{236,237,443},235->{236,237,443},236->{238 ,239,442},237->{238,239,442},238->{240,241,441},239->{240,241,441},240->{242,243,440},241->{242,243,440} ,242->{244,245,439},243->{244,245,439},244->{246,247,438},245->{246,247,438},246->{248,249,437},247->{248 ,249,437},248->{250,251,436},249->{250,251,436},250->{252,253,435},251->{252,253,435},252->{254,255,434} ,253->{254,255,434},254->{256,257,433},255->{256,257,433},256->{258,259,432},257->{258,259,432},258->{260 ,261,431},259->{260,261,431},260->{262,263,430},261->{262,263,430},262->{264,265,429},263->{264,265,429} ,264->{266,267,428},265->{266,267,428},266->{268,269,427},267->{268,269,427},268->{270,271,426},269->{270 ,271,426},270->{272,273,425},271->{272,273,425},272->{274,275,424},273->{274,275,424},274->{276,277,423} ,275->{276,277,423},276->{278,279,422},277->{278,279,422},278->{280,281,421},279->{280,281,421},280->{282 ,283,420},281->{282,283,420},282->{284,285,419},283->{284,285,419},284->{286,287,418},285->{286,287,418} ,286->{288,289,417},287->{288,289,417},288->{290,291,416},289->{290,291,416},290->{292,293,415},291->{292 ,293,415},292->{294,295,414},293->{294,295,414},294->{296,297,413},295->{296,297,413},296->{298,299,412} ,297->{298,299,412},298->{300,301,411},299->{300,301,411},300->{302,303,410},301->{302,303,410},302->{304 ,305,409},303->{304,305,409},304->{306,307,408},305->{306,307,408},306->{308,309,407},307->{308,309,407} ,308->{310,311,406},309->{310,311,406},310->{312,313,405},311->{312,313,405},312->{314,315,404},313->{314 ,315,404},314->{316,317,403},315->{316,317,403},316->{318,319,402},317->{318,319,402},318->{320,321,401} ,319->{320,321,401},320->{322,323,400},321->{322,323,400},322->{324,325,399},323->{324,325,399},324->{326 ,327,398},325->{326,327,398},326->{328,329,397},327->{328,329,397},328->{330,331,396},329->{330,331,396} ,330->{332,333,395},331->{332,333,395},332->{334,335,394},333->{334,335,394},334->{336,337,393},335->{336 ,337,393},336->{338,339,392},337->{338,339,392},338->{340,341,391},339->{340,341,391},340->{342,343,390} ,341->{342,343,390},342->{344,345,389},343->{344,345,389},344->{346,347,388},345->{346,347,388},346->{348 ,349,387},347->{348,349,387},348->{350,351,386},349->{350,351,386},350->{352,353,385},351->{352,353,385} ,352->{354,355,384},353->{354,355,384},354->{356,357,383},355->{356,357,383},356->{358,359,382},357->{358 ,359,382},358->{360,361,381},359->{360,361,381},360->{362,363,380},361->{362,363,380},362->{364,365,379} ,363->{364,365,379},364->{366,367,378},365->{366,367,378},366->{375,376,377},367->{375,376,377},368->{369 ,370,572,573},369->{0,1,571},370->{0,1,571},371->{16,17,558},372->{16,17,558},373->{132,133,495},374->{132 ,133,495},375->{373,374,496,497},376->{373,374,496,497},377->{373,374,496,497},378->{373,374,496,497} ,379->{373,374,496,497},380->{373,374,496,497},381->{373,374,496,497},382->{373,374,496,497},383->{373,374 ,496,497},384->{373,374,496,497},385->{373,374,496,497},386->{373,374,496,497},387->{373,374,496,497} ,388->{373,374,496,497},389->{373,374,496,497},390->{373,374,496,497},391->{373,374,496,497},392->{373,374 ,496,497},393->{373,374,496,497},394->{373,374,496,497},395->{373,374,496,497},396->{373,374,496,497} ,397->{373,374,496,497},398->{373,374,496,497},399->{373,374,496,497},400->{373,374,496,497},401->{373,374 ,496,497},402->{373,374,496,497},403->{373,374,496,497},404->{373,374,496,497},405->{373,374,496,497} ,406->{373,374,496,497},407->{373,374,496,497},408->{373,374,496,497},409->{373,374,496,497},410->{373,374 ,496,497},411->{373,374,496,497},412->{373,374,496,497},413->{373,374,496,497},414->{373,374,496,497} ,415->{373,374,496,497},416->{373,374,496,497},417->{373,374,496,497},418->{373,374,496,497},419->{373,374 ,496,497},420->{373,374,496,497},421->{373,374,496,497},422->{373,374,496,497},423->{373,374,496,497} ,424->{373,374,496,497},425->{373,374,496,497},426->{373,374,496,497},427->{373,374,496,497},428->{373,374 ,496,497},429->{373,374,496,497},430->{373,374,496,497},431->{373,374,496,497},432->{373,374,496,497} ,433->{373,374,496,497},434->{373,374,496,497},435->{373,374,496,497},436->{373,374,496,497},437->{373,374 ,496,497},438->{373,374,496,497},439->{373,374,496,497},440->{373,374,496,497},441->{373,374,496,497} ,442->{373,374,496,497},443->{373,374,496,497},444->{373,374,496,497},445->{373,374,496,497},446->{373,374 ,496,497},447->{373,374,496,497},448->{373,374,496,497},449->{373,374,496,497},450->{373,374,496,497} ,451->{373,374,496,497},452->{373,374,496,497},453->{373,374,496,497},454->{373,374,496,497},455->{373,374 ,496,497},456->{373,374,496,497},457->{373,374,496,497},458->{373,374,496,497},459->{373,374,496,497} ,460->{373,374,496,497},461->{373,374,496,497},462->{373,374,496,497},463->{373,374,496,497},464->{373,374 ,496,497},465->{373,374,496,497},466->{373,374,496,497},467->{373,374,496,497},468->{373,374,496,497} ,469->{373,374,496,497},470->{373,374,496,497},471->{373,374,496,497},472->{373,374,496,497},473->{373,374 ,496,497},474->{373,374,496,497},475->{373,374,496,497},476->{373,374,496,497},477->{373,374,496,497} ,478->{373,374,496,497},479->{373,374,496,497},480->{373,374,496,497},481->{373,374,496,497},482->{373,374 ,496,497},483->{373,374,496,497},484->{373,374,496,497},485->{373,374,496,497},486->{373,374,496,497} ,487->{373,374,496,497},488->{373,374,496,497},489->{373,374,496,497},490->{373,374,496,497},491->{373,374 ,496,497},492->{373,374,496,497},493->{373,374,496,497},494->{373,374,496,497},495->{373,374,496,497} ,496->{373,374,496,497},497->{},498->{371,372,559,560},499->{371,372,559,560},500->{371,372,559,560} ,501->{371,372,559,560},502->{371,372,559,560},503->{371,372,559,560},504->{371,372,559,560},505->{371,372 ,559,560},506->{371,372,559,560},507->{371,372,559,560},508->{371,372,559,560},509->{371,372,559,560} ,510->{371,372,559,560},511->{371,372,559,560},512->{371,372,559,560},513->{371,372,559,560},514->{371,372 ,559,560},515->{371,372,559,560},516->{371,372,559,560},517->{371,372,559,560},518->{371,372,559,560} ,519->{371,372,559,560},520->{371,372,559,560},521->{371,372,559,560},522->{371,372,559,560},523->{371,372 ,559,560},524->{371,372,559,560},525->{371,372,559,560},526->{371,372,559,560},527->{371,372,559,560} ,528->{371,372,559,560},529->{371,372,559,560},530->{371,372,559,560},531->{371,372,559,560},532->{371,372 ,559,560},533->{371,372,559,560},534->{371,372,559,560},535->{371,372,559,560},536->{371,372,559,560} ,537->{371,372,559,560},538->{371,372,559,560},539->{371,372,559,560},540->{371,372,559,560},541->{371,372 ,559,560},542->{371,372,559,560},543->{371,372,559,560},544->{371,372,559,560},545->{371,372,559,560} ,546->{371,372,559,560},547->{371,372,559,560},548->{371,372,559,560},549->{371,372,559,560},550->{371,372 ,559,560},551->{371,372,559,560},552->{371,372,559,560},553->{371,372,559,560},554->{371,372,559,560} ,555->{371,372,559,560},556->{371,372,559,560},557->{371,372,559,560},558->{371,372,559,560},559->{371,372 ,559,560},560->{373,374,496,497},561->{369,370,572,573},562->{369,370,572,573},563->{369,370,572,573} ,564->{369,370,572,573},565->{369,370,572,573},566->{369,370,572,573},567->{369,370,572,573},568->{369,370 ,572,573},569->{369,370,572,573},570->{369,370,572,573},571->{369,370,572,573},572->{369,370,572,573} ,573->{371,372,559,560}] + Applied Processor: ArgumentFilter [3,4,5,6,7,8,9,10,11,12] + Details: We remove following argument positions: [3,4,5,6,7,8,9,10,11,12]. * Step 2: UnsatPaths WORST_CASE(?,O(1)) + Considered Problem: Rules: 0. f11(A,B,C) -> f13(A,B,C) [0 >= A] (?,1) 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 2. f13(A,B,C) -> f15(A,B,C) [1 >= A] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 4. f15(A,B,C) -> f17(A,B,C) [2 >= A] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 6. f17(A,B,C) -> f19(A,B,C) [3 >= A] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 8. f19(A,B,C) -> f21(A,B,C) [4 >= A] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 10. f21(A,B,C) -> f23(A,B,C) [5 >= A] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 12. f23(A,B,C) -> f25(A,B,C) [6 >= A] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 14. f25(A,B,C) -> f27(A,B,C) [7 >= A] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (?,1) 16. f65(A,B,C) -> f67(A,B,C) [0 >= B] (?,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 18. f67(A,B,C) -> f69(A,B,C) [1 >= B] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 20. f69(A,B,C) -> f71(A,B,C) [2 >= B] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 22. f71(A,B,C) -> f73(A,B,C) [3 >= B] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 24. f73(A,B,C) -> f75(A,B,C) [4 >= B] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 26. f75(A,B,C) -> f77(A,B,C) [5 >= B] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 28. f77(A,B,C) -> f79(A,B,C) [6 >= B] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 30. f79(A,B,C) -> f81(A,B,C) [7 >= B] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 32. f81(A,B,C) -> f83(A,B,C) [8 >= B] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 34. f83(A,B,C) -> f85(A,B,C) [9 >= B] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 36. f85(A,B,C) -> f87(A,B,C) [10 >= B] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 38. f87(A,B,C) -> f89(A,B,C) [11 >= B] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 40. f89(A,B,C) -> f91(A,B,C) [12 >= B] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 42. f91(A,B,C) -> f93(A,B,C) [13 >= B] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 44. f93(A,B,C) -> f95(A,B,C) [14 >= B] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 46. f95(A,B,C) -> f97(A,B,C) [15 >= B] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 48. f97(A,B,C) -> f99(A,B,C) [16 >= B] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 50. f99(A,B,C) -> f101(A,B,C) [17 >= B] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 52. f101(A,B,C) -> f103(A,B,C) [18 >= B] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 54. f103(A,B,C) -> f105(A,B,C) [19 >= B] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 56. f105(A,B,C) -> f107(A,B,C) [20 >= B] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 58. f107(A,B,C) -> f109(A,B,C) [21 >= B] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 60. f109(A,B,C) -> f111(A,B,C) [22 >= B] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 62. f111(A,B,C) -> f113(A,B,C) [23 >= B] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 64. f113(A,B,C) -> f115(A,B,C) [24 >= B] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 66. f115(A,B,C) -> f117(A,B,C) [25 >= B] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 68. f117(A,B,C) -> f119(A,B,C) [26 >= B] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 70. f119(A,B,C) -> f121(A,B,C) [27 >= B] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 72. f121(A,B,C) -> f123(A,B,C) [28 >= B] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 74. f123(A,B,C) -> f125(A,B,C) [29 >= B] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 76. f125(A,B,C) -> f127(A,B,C) [30 >= B] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 78. f127(A,B,C) -> f129(A,B,C) [31 >= B] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 80. f129(A,B,C) -> f131(A,B,C) [32 >= B] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 82. f131(A,B,C) -> f133(A,B,C) [33 >= B] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 84. f133(A,B,C) -> f135(A,B,C) [34 >= B] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 86. f135(A,B,C) -> f137(A,B,C) [35 >= B] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 88. f137(A,B,C) -> f139(A,B,C) [36 >= B] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 90. f139(A,B,C) -> f141(A,B,C) [37 >= B] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 92. f141(A,B,C) -> f143(A,B,C) [38 >= B] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 94. f143(A,B,C) -> f145(A,B,C) [39 >= B] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 96. f145(A,B,C) -> f147(A,B,C) [40 >= B] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 98. f147(A,B,C) -> f149(A,B,C) [41 >= B] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 100. f149(A,B,C) -> f151(A,B,C) [42 >= B] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 102. f151(A,B,C) -> f153(A,B,C) [43 >= B] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 104. f153(A,B,C) -> f155(A,B,C) [44 >= B] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 106. f155(A,B,C) -> f157(A,B,C) [45 >= B] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 108. f157(A,B,C) -> f159(A,B,C) [46 >= B] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 110. f159(A,B,C) -> f161(A,B,C) [47 >= B] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (?,1) 112. f161(A,B,C) -> f163(A,B,C) [48 >= B] (?,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (?,1) 114. f163(A,B,C) -> f165(A,B,C) [49 >= B] (?,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (?,1) 116. f165(A,B,C) -> f167(A,B,C) [50 >= B] (?,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (?,1) 118. f167(A,B,C) -> f169(A,B,C) [51 >= B] (?,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (?,1) 120. f169(A,B,C) -> f171(A,B,C) [52 >= B] (?,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (?,1) 122. f171(A,B,C) -> f173(A,B,C) [53 >= B] (?,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (?,1) 124. f173(A,B,C) -> f175(A,B,C) [54 >= B] (?,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (?,1) 126. f175(A,B,C) -> f177(A,B,C) [55 >= B] (?,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (?,1) 128. f177(A,B,C) -> f179(A,B,C) [56 >= B] (?,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (?,1) 130. f179(A,B,C) -> f181(A,B,C) [57 >= B] (?,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (?,1) 132. f319(A,B,C) -> f321(A,B,C) [0 >= C] (?,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 134. f321(A,B,C) -> f323(A,B,C) [1 >= C] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 136. f323(A,B,C) -> f325(A,B,C) [2 >= C] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 138. f325(A,B,C) -> f327(A,B,C) [3 >= C] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 140. f327(A,B,C) -> f329(A,B,C) [4 >= C] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 142. f329(A,B,C) -> f331(A,B,C) [5 >= C] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 144. f331(A,B,C) -> f333(A,B,C) [6 >= C] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 146. f333(A,B,C) -> f335(A,B,C) [7 >= C] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 148. f335(A,B,C) -> f337(A,B,C) [8 >= C] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 150. f337(A,B,C) -> f339(A,B,C) [9 >= C] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 152. f339(A,B,C) -> f341(A,B,C) [10 >= C] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 154. f341(A,B,C) -> f343(A,B,C) [11 >= C] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 156. f343(A,B,C) -> f345(A,B,C) [12 >= C] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 158. f345(A,B,C) -> f347(A,B,C) [13 >= C] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 160. f347(A,B,C) -> f349(A,B,C) [14 >= C] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 162. f349(A,B,C) -> f351(A,B,C) [15 >= C] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 164. f351(A,B,C) -> f353(A,B,C) [16 >= C] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 166. f353(A,B,C) -> f355(A,B,C) [17 >= C] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 168. f355(A,B,C) -> f357(A,B,C) [18 >= C] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 170. f357(A,B,C) -> f359(A,B,C) [19 >= C] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 172. f359(A,B,C) -> f361(A,B,C) [20 >= C] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 174. f361(A,B,C) -> f363(A,B,C) [21 >= C] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 176. f363(A,B,C) -> f365(A,B,C) [22 >= C] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 178. f365(A,B,C) -> f367(A,B,C) [23 >= C] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 180. f367(A,B,C) -> f369(A,B,C) [24 >= C] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 182. f369(A,B,C) -> f371(A,B,C) [25 >= C] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 184. f371(A,B,C) -> f373(A,B,C) [26 >= C] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 186. f373(A,B,C) -> f375(A,B,C) [27 >= C] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 188. f375(A,B,C) -> f377(A,B,C) [28 >= C] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 190. f377(A,B,C) -> f379(A,B,C) [29 >= C] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 192. f379(A,B,C) -> f381(A,B,C) [30 >= C] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 194. f381(A,B,C) -> f383(A,B,C) [31 >= C] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 196. f383(A,B,C) -> f385(A,B,C) [32 >= C] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 198. f385(A,B,C) -> f387(A,B,C) [33 >= C] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 200. f387(A,B,C) -> f389(A,B,C) [34 >= C] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 202. f389(A,B,C) -> f391(A,B,C) [35 >= C] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 204. f391(A,B,C) -> f393(A,B,C) [36 >= C] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 206. f393(A,B,C) -> f395(A,B,C) [37 >= C] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 208. f395(A,B,C) -> f397(A,B,C) [38 >= C] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 210. f397(A,B,C) -> f399(A,B,C) [39 >= C] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 212. f399(A,B,C) -> f401(A,B,C) [40 >= C] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 214. f401(A,B,C) -> f403(A,B,C) [41 >= C] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 216. f403(A,B,C) -> f405(A,B,C) [42 >= C] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 218. f405(A,B,C) -> f407(A,B,C) [43 >= C] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 220. f407(A,B,C) -> f409(A,B,C) [44 >= C] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 222. f409(A,B,C) -> f411(A,B,C) [45 >= C] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 224. f411(A,B,C) -> f413(A,B,C) [46 >= C] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 226. f413(A,B,C) -> f415(A,B,C) [47 >= C] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 228. f415(A,B,C) -> f417(A,B,C) [48 >= C] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 230. f417(A,B,C) -> f419(A,B,C) [49 >= C] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 232. f419(A,B,C) -> f421(A,B,C) [50 >= C] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 234. f421(A,B,C) -> f423(A,B,C) [51 >= C] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 236. f423(A,B,C) -> f425(A,B,C) [52 >= C] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 238. f425(A,B,C) -> f427(A,B,C) [53 >= C] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 240. f427(A,B,C) -> f429(A,B,C) [54 >= C] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 242. f429(A,B,C) -> f431(A,B,C) [55 >= C] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 244. f431(A,B,C) -> f433(A,B,C) [56 >= C] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 246. f433(A,B,C) -> f435(A,B,C) [57 >= C] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 248. f435(A,B,C) -> f437(A,B,C) [58 >= C] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 250. f437(A,B,C) -> f439(A,B,C) [59 >= C] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 252. f439(A,B,C) -> f441(A,B,C) [60 >= C] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 254. f441(A,B,C) -> f443(A,B,C) [61 >= C] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 256. f443(A,B,C) -> f445(A,B,C) [62 >= C] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 258. f445(A,B,C) -> f447(A,B,C) [63 >= C] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 260. f447(A,B,C) -> f449(A,B,C) [64 >= C] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 262. f449(A,B,C) -> f451(A,B,C) [65 >= C] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 264. f451(A,B,C) -> f453(A,B,C) [66 >= C] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 266. f453(A,B,C) -> f455(A,B,C) [67 >= C] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 268. f455(A,B,C) -> f457(A,B,C) [68 >= C] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 270. f457(A,B,C) -> f459(A,B,C) [69 >= C] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 272. f459(A,B,C) -> f461(A,B,C) [70 >= C] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 274. f461(A,B,C) -> f463(A,B,C) [71 >= C] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 276. f463(A,B,C) -> f465(A,B,C) [72 >= C] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 278. f465(A,B,C) -> f467(A,B,C) [73 >= C] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 280. f467(A,B,C) -> f469(A,B,C) [74 >= C] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 282. f469(A,B,C) -> f471(A,B,C) [75 >= C] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 284. f471(A,B,C) -> f473(A,B,C) [76 >= C] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 286. f473(A,B,C) -> f475(A,B,C) [77 >= C] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 288. f475(A,B,C) -> f477(A,B,C) [78 >= C] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 290. f477(A,B,C) -> f479(A,B,C) [79 >= C] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 292. f479(A,B,C) -> f481(A,B,C) [80 >= C] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 294. f481(A,B,C) -> f483(A,B,C) [81 >= C] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 296. f483(A,B,C) -> f485(A,B,C) [82 >= C] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 298. f485(A,B,C) -> f487(A,B,C) [83 >= C] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 300. f487(A,B,C) -> f489(A,B,C) [84 >= C] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 302. f489(A,B,C) -> f491(A,B,C) [85 >= C] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 304. f491(A,B,C) -> f493(A,B,C) [86 >= C] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 306. f493(A,B,C) -> f495(A,B,C) [87 >= C] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 308. f495(A,B,C) -> f497(A,B,C) [88 >= C] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 310. f497(A,B,C) -> f499(A,B,C) [89 >= C] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 312. f499(A,B,C) -> f501(A,B,C) [90 >= C] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 314. f501(A,B,C) -> f503(A,B,C) [91 >= C] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 316. f503(A,B,C) -> f505(A,B,C) [92 >= C] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 318. f505(A,B,C) -> f507(A,B,C) [93 >= C] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 320. f507(A,B,C) -> f509(A,B,C) [94 >= C] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 322. f509(A,B,C) -> f511(A,B,C) [95 >= C] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 324. f511(A,B,C) -> f513(A,B,C) [96 >= C] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 326. f513(A,B,C) -> f515(A,B,C) [97 >= C] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 328. f515(A,B,C) -> f517(A,B,C) [98 >= C] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 330. f517(A,B,C) -> f519(A,B,C) [99 >= C] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 332. f519(A,B,C) -> f521(A,B,C) [100 >= C] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 334. f521(A,B,C) -> f523(A,B,C) [101 >= C] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 336. f523(A,B,C) -> f525(A,B,C) [102 >= C] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 338. f525(A,B,C) -> f527(A,B,C) [103 >= C] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 340. f527(A,B,C) -> f529(A,B,C) [104 >= C] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 342. f529(A,B,C) -> f531(A,B,C) [105 >= C] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 344. f531(A,B,C) -> f533(A,B,C) [106 >= C] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 346. f533(A,B,C) -> f535(A,B,C) [107 >= C] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 348. f535(A,B,C) -> f537(A,B,C) [108 >= C] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 350. f537(A,B,C) -> f539(A,B,C) [109 >= C] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 352. f539(A,B,C) -> f541(A,B,C) [110 >= C] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 354. f541(A,B,C) -> f543(A,B,C) [111 >= C] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 356. f543(A,B,C) -> f545(A,B,C) [112 >= C] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 358. f545(A,B,C) -> f547(A,B,C) [113 >= C] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 360. f547(A,B,C) -> f549(A,B,C) [114 >= C] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 362. f549(A,B,C) -> f551(A,B,C) [115 >= C] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 364. f551(A,B,C) -> f553(A,B,C) [116 >= C] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 366. f553(A,B,C) -> f555(A,B,C) [117 >= C] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (?,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 369. f7(A,B,C) -> f11(A,B,C) [0 >= 1 + A && 9 >= A] (?,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 371. f61(A,B,C) -> f65(A,B,C) [0 >= 1 + B && 49 >= B] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 373. f315(A,B,C) -> f319(A,B,C) [0 >= 1 + C && 119 >= C] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 375. f555(A,B,C) -> f315(A,B,1 + C) [118 >= C] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (?,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (?,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (?,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (?,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (?,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (?,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (?,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (?,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (?,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (?,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (?,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (?,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (?,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (?,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (?,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (?,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (?,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (?,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (?,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (?,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (?,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (?,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (?,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (?,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (?,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (?,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (?,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (?,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (?,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (?,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (?,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (?,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (?,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (?,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (?,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (?,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (?,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (?,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (?,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (?,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (?,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (?,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (?,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (?,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (?,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (?,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (?,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (?,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (?,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (?,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (?,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (?,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (?,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (?,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (?,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (?,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (?,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (?,1) 498. f181(A,B,C) -> f61(A,1 + B,C) [58 >= B] (?,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (?,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (?,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (?,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (?,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (?,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (?,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (?,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (?,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (?,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (?,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (?,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (?,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (?,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (?,1) 561. f27(A,B,C) -> f7(1 + A,B,C) [8 >= A] (?,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (?,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (?,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (?,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (?,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (?,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (?,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (?,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [0->{2,3,570},1->{2,3,570},2->{4,5,569},3->{4,5,569},4->{6,7,568},5->{6,7,568},6->{8,9,567},7->{8,9,567} ,8->{10,11,566},9->{10,11,566},10->{12,13,565},11->{12,13,565},12->{14,15,564},13->{14,15,564},14->{561,562 ,563},15->{561,562,563},16->{18,19,557},17->{18,19,557},18->{20,21,556},19->{20,21,556},20->{22,23,555} ,21->{22,23,555},22->{24,25,554},23->{24,25,554},24->{26,27,553},25->{26,27,553},26->{28,29,552},27->{28,29 ,552},28->{30,31,551},29->{30,31,551},30->{32,33,550},31->{32,33,550},32->{34,35,549},33->{34,35,549} ,34->{36,37,548},35->{36,37,548},36->{38,39,547},37->{38,39,547},38->{40,41,546},39->{40,41,546},40->{42,43 ,545},41->{42,43,545},42->{44,45,544},43->{44,45,544},44->{46,47,543},45->{46,47,543},46->{48,49,542} ,47->{48,49,542},48->{50,51,541},49->{50,51,541},50->{52,53,540},51->{52,53,540},52->{54,55,539},53->{54,55 ,539},54->{56,57,538},55->{56,57,538},56->{58,59,537},57->{58,59,537},58->{60,61,536},59->{60,61,536} ,60->{62,63,535},61->{62,63,535},62->{64,65,534},63->{64,65,534},64->{66,67,533},65->{66,67,533},66->{68,69 ,532},67->{68,69,532},68->{70,71,531},69->{70,71,531},70->{72,73,530},71->{72,73,530},72->{74,75,529} ,73->{74,75,529},74->{76,77,528},75->{76,77,528},76->{78,79,527},77->{78,79,527},78->{80,81,526},79->{80,81 ,526},80->{82,83,525},81->{82,83,525},82->{84,85,524},83->{84,85,524},84->{86,87,523},85->{86,87,523} ,86->{88,89,522},87->{88,89,522},88->{90,91,521},89->{90,91,521},90->{92,93,520},91->{92,93,520},92->{94,95 ,519},93->{94,95,519},94->{96,97,518},95->{96,97,518},96->{98,99,517},97->{98,99,517},98->{100,101,516} ,99->{100,101,516},100->{102,103,515},101->{102,103,515},102->{104,105,514},103->{104,105,514},104->{106,107 ,513},105->{106,107,513},106->{108,109,512},107->{108,109,512},108->{110,111,511},109->{110,111,511} ,110->{112,113,510},111->{112,113,510},112->{114,115,509},113->{114,115,509},114->{116,117,508},115->{116 ,117,508},116->{118,119,507},117->{118,119,507},118->{120,121,506},119->{120,121,506},120->{122,123,505} ,121->{122,123,505},122->{124,125,504},123->{124,125,504},124->{126,127,503},125->{126,127,503},126->{128 ,129,502},127->{128,129,502},128->{130,131,501},129->{130,131,501},130->{498,499,500},131->{498,499,500} ,132->{134,135,494},133->{134,135,494},134->{136,137,493},135->{136,137,493},136->{138,139,492},137->{138 ,139,492},138->{140,141,491},139->{140,141,491},140->{142,143,490},141->{142,143,490},142->{144,145,489} ,143->{144,145,489},144->{146,147,488},145->{146,147,488},146->{148,149,487},147->{148,149,487},148->{150 ,151,486},149->{150,151,486},150->{152,153,485},151->{152,153,485},152->{154,155,484},153->{154,155,484} ,154->{156,157,483},155->{156,157,483},156->{158,159,482},157->{158,159,482},158->{160,161,481},159->{160 ,161,481},160->{162,163,480},161->{162,163,480},162->{164,165,479},163->{164,165,479},164->{166,167,478} ,165->{166,167,478},166->{168,169,477},167->{168,169,477},168->{170,171,476},169->{170,171,476},170->{172 ,173,475},171->{172,173,475},172->{174,175,474},173->{174,175,474},174->{176,177,473},175->{176,177,473} ,176->{178,179,472},177->{178,179,472},178->{180,181,471},179->{180,181,471},180->{182,183,470},181->{182 ,183,470},182->{184,185,469},183->{184,185,469},184->{186,187,468},185->{186,187,468},186->{188,189,467} ,187->{188,189,467},188->{190,191,466},189->{190,191,466},190->{192,193,465},191->{192,193,465},192->{194 ,195,464},193->{194,195,464},194->{196,197,463},195->{196,197,463},196->{198,199,462},197->{198,199,462} ,198->{200,201,461},199->{200,201,461},200->{202,203,460},201->{202,203,460},202->{204,205,459},203->{204 ,205,459},204->{206,207,458},205->{206,207,458},206->{208,209,457},207->{208,209,457},208->{210,211,456} ,209->{210,211,456},210->{212,213,455},211->{212,213,455},212->{214,215,454},213->{214,215,454},214->{216 ,217,453},215->{216,217,453},216->{218,219,452},217->{218,219,452},218->{220,221,451},219->{220,221,451} ,220->{222,223,450},221->{222,223,450},222->{224,225,449},223->{224,225,449},224->{226,227,448},225->{226 ,227,448},226->{228,229,447},227->{228,229,447},228->{230,231,446},229->{230,231,446},230->{232,233,445} ,231->{232,233,445},232->{234,235,444},233->{234,235,444},234->{236,237,443},235->{236,237,443},236->{238 ,239,442},237->{238,239,442},238->{240,241,441},239->{240,241,441},240->{242,243,440},241->{242,243,440} ,242->{244,245,439},243->{244,245,439},244->{246,247,438},245->{246,247,438},246->{248,249,437},247->{248 ,249,437},248->{250,251,436},249->{250,251,436},250->{252,253,435},251->{252,253,435},252->{254,255,434} ,253->{254,255,434},254->{256,257,433},255->{256,257,433},256->{258,259,432},257->{258,259,432},258->{260 ,261,431},259->{260,261,431},260->{262,263,430},261->{262,263,430},262->{264,265,429},263->{264,265,429} ,264->{266,267,428},265->{266,267,428},266->{268,269,427},267->{268,269,427},268->{270,271,426},269->{270 ,271,426},270->{272,273,425},271->{272,273,425},272->{274,275,424},273->{274,275,424},274->{276,277,423} ,275->{276,277,423},276->{278,279,422},277->{278,279,422},278->{280,281,421},279->{280,281,421},280->{282 ,283,420},281->{282,283,420},282->{284,285,419},283->{284,285,419},284->{286,287,418},285->{286,287,418} ,286->{288,289,417},287->{288,289,417},288->{290,291,416},289->{290,291,416},290->{292,293,415},291->{292 ,293,415},292->{294,295,414},293->{294,295,414},294->{296,297,413},295->{296,297,413},296->{298,299,412} ,297->{298,299,412},298->{300,301,411},299->{300,301,411},300->{302,303,410},301->{302,303,410},302->{304 ,305,409},303->{304,305,409},304->{306,307,408},305->{306,307,408},306->{308,309,407},307->{308,309,407} ,308->{310,311,406},309->{310,311,406},310->{312,313,405},311->{312,313,405},312->{314,315,404},313->{314 ,315,404},314->{316,317,403},315->{316,317,403},316->{318,319,402},317->{318,319,402},318->{320,321,401} ,319->{320,321,401},320->{322,323,400},321->{322,323,400},322->{324,325,399},323->{324,325,399},324->{326 ,327,398},325->{326,327,398},326->{328,329,397},327->{328,329,397},328->{330,331,396},329->{330,331,396} ,330->{332,333,395},331->{332,333,395},332->{334,335,394},333->{334,335,394},334->{336,337,393},335->{336 ,337,393},336->{338,339,392},337->{338,339,392},338->{340,341,391},339->{340,341,391},340->{342,343,390} ,341->{342,343,390},342->{344,345,389},343->{344,345,389},344->{346,347,388},345->{346,347,388},346->{348 ,349,387},347->{348,349,387},348->{350,351,386},349->{350,351,386},350->{352,353,385},351->{352,353,385} ,352->{354,355,384},353->{354,355,384},354->{356,357,383},355->{356,357,383},356->{358,359,382},357->{358 ,359,382},358->{360,361,381},359->{360,361,381},360->{362,363,380},361->{362,363,380},362->{364,365,379} ,363->{364,365,379},364->{366,367,378},365->{366,367,378},366->{375,376,377},367->{375,376,377},368->{369 ,370,572,573},369->{0,1,571},370->{0,1,571},371->{16,17,558},372->{16,17,558},373->{132,133,495},374->{132 ,133,495},375->{373,374,496,497},376->{373,374,496,497},377->{373,374,496,497},378->{373,374,496,497} ,379->{373,374,496,497},380->{373,374,496,497},381->{373,374,496,497},382->{373,374,496,497},383->{373,374 ,496,497},384->{373,374,496,497},385->{373,374,496,497},386->{373,374,496,497},387->{373,374,496,497} ,388->{373,374,496,497},389->{373,374,496,497},390->{373,374,496,497},391->{373,374,496,497},392->{373,374 ,496,497},393->{373,374,496,497},394->{373,374,496,497},395->{373,374,496,497},396->{373,374,496,497} ,397->{373,374,496,497},398->{373,374,496,497},399->{373,374,496,497},400->{373,374,496,497},401->{373,374 ,496,497},402->{373,374,496,497},403->{373,374,496,497},404->{373,374,496,497},405->{373,374,496,497} ,406->{373,374,496,497},407->{373,374,496,497},408->{373,374,496,497},409->{373,374,496,497},410->{373,374 ,496,497},411->{373,374,496,497},412->{373,374,496,497},413->{373,374,496,497},414->{373,374,496,497} ,415->{373,374,496,497},416->{373,374,496,497},417->{373,374,496,497},418->{373,374,496,497},419->{373,374 ,496,497},420->{373,374,496,497},421->{373,374,496,497},422->{373,374,496,497},423->{373,374,496,497} ,424->{373,374,496,497},425->{373,374,496,497},426->{373,374,496,497},427->{373,374,496,497},428->{373,374 ,496,497},429->{373,374,496,497},430->{373,374,496,497},431->{373,374,496,497},432->{373,374,496,497} ,433->{373,374,496,497},434->{373,374,496,497},435->{373,374,496,497},436->{373,374,496,497},437->{373,374 ,496,497},438->{373,374,496,497},439->{373,374,496,497},440->{373,374,496,497},441->{373,374,496,497} ,442->{373,374,496,497},443->{373,374,496,497},444->{373,374,496,497},445->{373,374,496,497},446->{373,374 ,496,497},447->{373,374,496,497},448->{373,374,496,497},449->{373,374,496,497},450->{373,374,496,497} ,451->{373,374,496,497},452->{373,374,496,497},453->{373,374,496,497},454->{373,374,496,497},455->{373,374 ,496,497},456->{373,374,496,497},457->{373,374,496,497},458->{373,374,496,497},459->{373,374,496,497} ,460->{373,374,496,497},461->{373,374,496,497},462->{373,374,496,497},463->{373,374,496,497},464->{373,374 ,496,497},465->{373,374,496,497},466->{373,374,496,497},467->{373,374,496,497},468->{373,374,496,497} ,469->{373,374,496,497},470->{373,374,496,497},471->{373,374,496,497},472->{373,374,496,497},473->{373,374 ,496,497},474->{373,374,496,497},475->{373,374,496,497},476->{373,374,496,497},477->{373,374,496,497} ,478->{373,374,496,497},479->{373,374,496,497},480->{373,374,496,497},481->{373,374,496,497},482->{373,374 ,496,497},483->{373,374,496,497},484->{373,374,496,497},485->{373,374,496,497},486->{373,374,496,497} ,487->{373,374,496,497},488->{373,374,496,497},489->{373,374,496,497},490->{373,374,496,497},491->{373,374 ,496,497},492->{373,374,496,497},493->{373,374,496,497},494->{373,374,496,497},495->{373,374,496,497} ,496->{373,374,496,497},497->{},498->{371,372,559,560},499->{371,372,559,560},500->{371,372,559,560} ,501->{371,372,559,560},502->{371,372,559,560},503->{371,372,559,560},504->{371,372,559,560},505->{371,372 ,559,560},506->{371,372,559,560},507->{371,372,559,560},508->{371,372,559,560},509->{371,372,559,560} ,510->{371,372,559,560},511->{371,372,559,560},512->{371,372,559,560},513->{371,372,559,560},514->{371,372 ,559,560},515->{371,372,559,560},516->{371,372,559,560},517->{371,372,559,560},518->{371,372,559,560} ,519->{371,372,559,560},520->{371,372,559,560},521->{371,372,559,560},522->{371,372,559,560},523->{371,372 ,559,560},524->{371,372,559,560},525->{371,372,559,560},526->{371,372,559,560},527->{371,372,559,560} ,528->{371,372,559,560},529->{371,372,559,560},530->{371,372,559,560},531->{371,372,559,560},532->{371,372 ,559,560},533->{371,372,559,560},534->{371,372,559,560},535->{371,372,559,560},536->{371,372,559,560} ,537->{371,372,559,560},538->{371,372,559,560},539->{371,372,559,560},540->{371,372,559,560},541->{371,372 ,559,560},542->{371,372,559,560},543->{371,372,559,560},544->{371,372,559,560},545->{371,372,559,560} ,546->{371,372,559,560},547->{371,372,559,560},548->{371,372,559,560},549->{371,372,559,560},550->{371,372 ,559,560},551->{371,372,559,560},552->{371,372,559,560},553->{371,372,559,560},554->{371,372,559,560} ,555->{371,372,559,560},556->{371,372,559,560},557->{371,372,559,560},558->{371,372,559,560},559->{371,372 ,559,560},560->{373,374,496,497},561->{369,370,572,573},562->{369,370,572,573},563->{369,370,572,573} ,564->{369,370,572,573},565->{369,370,572,573},566->{369,370,572,573},567->{369,370,572,573},568->{369,370 ,572,573},569->{369,370,572,573},570->{369,370,572,573},571->{369,370,572,573},572->{369,370,572,573} ,573->{371,372,559,560}] + Applied Processor: UnsatPaths + Details: We remove following edges from the transition graph: [(0,3) ,(0,570) ,(1,2) ,(2,5) ,(2,569) ,(3,4) ,(4,7) ,(4,568) ,(5,6) ,(6,9) ,(6,567) ,(7,8) ,(8,11) ,(8,566) ,(9,10) ,(10,13) ,(10,565) ,(11,12) ,(12,15) ,(12,564) ,(13,14) ,(14,562) ,(14,563) ,(15,561) ,(16,19) ,(16,557) ,(17,18) ,(18,21) ,(18,556) ,(19,20) ,(20,23) ,(20,555) ,(21,22) ,(22,25) ,(22,554) ,(23,24) ,(24,27) ,(24,553) ,(25,26) ,(26,29) ,(26,552) ,(27,28) ,(28,31) ,(28,551) ,(29,30) ,(30,33) ,(30,550) ,(31,32) ,(32,35) ,(32,549) ,(33,34) ,(34,37) ,(34,548) ,(35,36) ,(36,39) ,(36,547) ,(37,38) ,(38,41) ,(38,546) ,(39,40) ,(40,43) ,(40,545) ,(41,42) ,(42,45) ,(42,544) ,(43,44) ,(44,47) ,(44,543) ,(45,46) ,(46,49) ,(46,542) ,(47,48) ,(48,51) ,(48,541) ,(49,50) ,(50,53) ,(50,540) ,(51,52) ,(52,55) ,(52,539) ,(53,54) ,(54,57) ,(54,538) ,(55,56) ,(56,59) ,(56,537) ,(57,58) ,(58,61) ,(58,536) ,(59,60) ,(60,63) ,(60,535) ,(61,62) ,(62,65) ,(62,534) ,(63,64) ,(64,67) ,(64,533) ,(65,66) ,(66,69) ,(66,532) ,(67,68) ,(68,71) ,(68,531) ,(69,70) ,(70,73) ,(70,530) ,(71,72) ,(72,75) ,(72,529) ,(73,74) ,(74,77) ,(74,528) ,(75,76) ,(76,79) ,(76,527) ,(77,78) ,(78,81) ,(78,526) ,(79,80) ,(80,83) ,(80,525) ,(81,82) ,(82,85) ,(82,524) ,(83,84) ,(84,87) ,(84,523) ,(85,86) ,(86,89) ,(86,522) ,(87,88) ,(88,91) ,(88,521) ,(89,90) ,(90,93) ,(90,520) ,(91,92) ,(92,95) ,(92,519) ,(93,94) ,(94,97) ,(94,518) ,(95,96) ,(96,99) ,(96,517) ,(97,98) ,(98,101) ,(98,516) ,(99,100) ,(100,103) ,(100,515) ,(101,102) ,(102,105) ,(102,514) ,(103,104) ,(104,107) ,(104,513) ,(105,106) ,(106,109) ,(106,512) ,(107,108) ,(108,111) ,(108,511) ,(109,110) ,(110,113) ,(110,510) ,(111,112) ,(112,115) ,(112,509) ,(113,114) ,(114,117) ,(114,508) ,(115,116) ,(116,119) ,(116,507) ,(117,118) ,(118,121) ,(118,506) ,(119,120) ,(120,123) ,(120,505) ,(121,122) ,(122,125) ,(122,504) ,(123,124) ,(124,127) ,(124,503) ,(125,126) ,(126,129) ,(126,502) ,(127,128) ,(128,131) ,(128,501) ,(129,130) ,(130,499) ,(130,500) ,(131,498) ,(132,135) ,(132,494) ,(133,134) ,(134,137) ,(134,493) ,(135,136) ,(136,139) ,(136,492) ,(137,138) ,(138,141) ,(138,491) ,(139,140) ,(140,143) ,(140,490) ,(141,142) ,(142,145) ,(142,489) ,(143,144) ,(144,147) ,(144,488) ,(145,146) ,(146,149) ,(146,487) ,(147,148) ,(148,151) ,(148,486) ,(149,150) ,(150,153) ,(150,485) ,(151,152) ,(152,155) ,(152,484) ,(153,154) ,(154,157) ,(154,483) ,(155,156) ,(156,159) ,(156,482) ,(157,158) ,(158,161) ,(158,481) ,(159,160) ,(160,163) ,(160,480) ,(161,162) ,(162,165) ,(162,479) ,(163,164) ,(164,167) ,(164,478) ,(165,166) ,(166,169) ,(166,477) ,(167,168) ,(168,171) ,(168,476) ,(169,170) ,(170,173) ,(170,475) ,(171,172) ,(172,175) ,(172,474) ,(173,174) ,(174,177) ,(174,473) ,(175,176) ,(176,179) ,(176,472) ,(177,178) ,(178,181) ,(178,471) ,(179,180) ,(180,183) ,(180,470) ,(181,182) ,(182,185) ,(182,469) ,(183,184) ,(184,187) ,(184,468) ,(185,186) ,(186,189) ,(186,467) ,(187,188) ,(188,191) ,(188,466) ,(189,190) ,(190,193) ,(190,465) ,(191,192) ,(192,195) ,(192,464) ,(193,194) ,(194,197) ,(194,463) ,(195,196) ,(196,199) ,(196,462) ,(197,198) ,(198,201) ,(198,461) ,(199,200) ,(200,203) ,(200,460) ,(201,202) ,(202,205) ,(202,459) ,(203,204) ,(204,207) ,(204,458) ,(205,206) ,(206,209) ,(206,457) ,(207,208) ,(208,211) ,(208,456) ,(209,210) ,(210,213) ,(210,455) ,(211,212) ,(212,215) ,(212,454) ,(213,214) ,(214,217) ,(214,453) ,(215,216) ,(216,219) ,(216,452) ,(217,218) ,(218,221) ,(218,451) ,(219,220) ,(220,223) ,(220,450) ,(221,222) ,(222,225) ,(222,449) ,(223,224) ,(224,227) ,(224,448) ,(225,226) ,(226,229) ,(226,447) ,(227,228) ,(228,231) ,(228,446) ,(229,230) ,(230,233) ,(230,445) ,(231,232) ,(232,235) ,(232,444) ,(233,234) ,(234,237) ,(234,443) ,(235,236) ,(236,239) ,(236,442) ,(237,238) ,(238,241) ,(238,441) ,(239,240) ,(240,243) ,(240,440) ,(241,242) ,(242,245) ,(242,439) ,(243,244) ,(244,247) ,(244,438) ,(245,246) ,(246,249) ,(246,437) ,(247,248) ,(248,251) ,(248,436) ,(249,250) ,(250,253) ,(250,435) ,(251,252) ,(252,255) ,(252,434) ,(253,254) ,(254,257) ,(254,433) ,(255,256) ,(256,259) ,(256,432) ,(257,258) ,(258,261) ,(258,431) ,(259,260) ,(260,263) ,(260,430) ,(261,262) ,(262,265) ,(262,429) ,(263,264) ,(264,267) ,(264,428) ,(265,266) ,(266,269) ,(266,427) ,(267,268) ,(268,271) ,(268,426) ,(269,270) ,(270,273) ,(270,425) ,(271,272) ,(272,275) ,(272,424) ,(273,274) ,(274,277) ,(274,423) ,(275,276) ,(276,279) ,(276,422) ,(277,278) ,(278,281) ,(278,421) ,(279,280) ,(280,283) ,(280,420) ,(281,282) ,(282,285) ,(282,419) ,(283,284) ,(284,287) ,(284,418) ,(285,286) ,(286,289) ,(286,417) ,(287,288) ,(288,291) ,(288,416) ,(289,290) ,(290,293) ,(290,415) ,(291,292) ,(292,295) ,(292,414) ,(293,294) ,(294,297) ,(294,413) ,(295,296) ,(296,299) ,(296,412) ,(297,298) ,(298,301) ,(298,411) ,(299,300) ,(300,303) ,(300,410) ,(301,302) ,(302,305) ,(302,409) ,(303,304) ,(304,307) ,(304,408) ,(305,306) ,(306,309) ,(306,407) ,(307,308) ,(308,311) ,(308,406) ,(309,310) ,(310,313) ,(310,405) ,(311,312) ,(312,315) ,(312,404) ,(313,314) ,(314,317) ,(314,403) ,(315,316) ,(316,319) ,(316,402) ,(317,318) ,(318,321) ,(318,401) ,(319,320) ,(320,323) ,(320,400) ,(321,322) ,(322,325) ,(322,399) ,(323,324) ,(324,327) ,(324,398) ,(325,326) ,(326,329) ,(326,397) ,(327,328) ,(328,331) ,(328,396) ,(329,330) ,(330,333) ,(330,395) ,(331,332) ,(332,335) ,(332,394) ,(333,334) ,(334,337) ,(334,393) ,(335,336) ,(336,339) ,(336,392) ,(337,338) ,(338,341) ,(338,391) ,(339,340) ,(340,343) ,(340,390) ,(341,342) ,(342,345) ,(342,389) ,(343,344) ,(344,347) ,(344,388) ,(345,346) ,(346,349) ,(346,387) ,(347,348) ,(348,351) ,(348,386) ,(349,350) ,(350,353) ,(350,385) ,(351,352) ,(352,355) ,(352,384) ,(353,354) ,(354,357) ,(354,383) ,(355,356) ,(356,359) ,(356,382) ,(357,358) ,(358,361) ,(358,381) ,(359,360) ,(360,363) ,(360,380) ,(361,362) ,(362,365) ,(362,379) ,(363,364) ,(364,367) ,(364,378) ,(365,366) ,(366,376) ,(366,377) ,(367,375) ,(368,369) ,(368,370) ,(368,573) ,(369,1) ,(369,571) ,(370,0) ,(371,17) ,(371,558) ,(372,16) ,(373,133) ,(373,495) ,(374,132) ,(375,497) ,(376,373) ,(376,374) ,(376,496) ,(377,373) ,(377,374) ,(377,496) ,(378,373) ,(378,496) ,(378,497) ,(379,373) ,(379,496) ,(379,497) ,(380,373) ,(380,496) ,(380,497) ,(381,373) ,(381,496) ,(381,497) ,(382,373) ,(382,496) ,(382,497) ,(383,373) ,(383,496) ,(383,497) ,(384,373) ,(384,496) ,(384,497) ,(385,373) ,(385,496) ,(385,497) ,(386,373) ,(386,496) ,(386,497) ,(387,373) ,(387,496) ,(387,497) ,(388,373) ,(388,496) ,(388,497) ,(389,373) ,(389,496) ,(389,497) ,(390,373) ,(390,496) ,(390,497) ,(391,373) ,(391,496) ,(391,497) ,(392,373) ,(392,496) ,(392,497) ,(393,373) ,(393,496) ,(393,497) ,(394,373) ,(394,496) ,(394,497) ,(395,373) ,(395,496) ,(395,497) ,(396,373) ,(396,496) ,(396,497) ,(397,373) ,(397,496) ,(397,497) ,(398,373) ,(398,496) ,(398,497) ,(399,373) ,(399,496) ,(399,497) ,(400,373) ,(400,496) ,(400,497) ,(401,373) ,(401,496) ,(401,497) ,(402,373) ,(402,496) ,(402,497) ,(403,373) ,(403,496) ,(403,497) ,(404,373) ,(404,496) ,(404,497) ,(405,373) ,(405,496) ,(405,497) ,(406,373) ,(406,496) ,(406,497) ,(407,373) ,(407,496) ,(407,497) ,(408,373) ,(408,496) ,(408,497) ,(409,373) ,(409,496) ,(409,497) ,(410,373) ,(410,496) ,(410,497) ,(411,373) ,(411,496) ,(411,497) ,(412,373) ,(412,496) ,(412,497) ,(413,373) ,(413,496) ,(413,497) ,(414,373) ,(414,496) ,(414,497) ,(415,373) ,(415,496) ,(415,497) ,(416,373) ,(416,496) ,(416,497) ,(417,373) ,(417,496) ,(417,497) ,(418,373) ,(418,496) ,(418,497) ,(419,373) ,(419,496) ,(419,497) ,(420,373) ,(420,496) ,(420,497) ,(421,373) ,(421,496) ,(421,497) ,(422,373) ,(422,496) ,(422,497) ,(423,373) ,(423,496) ,(423,497) ,(424,373) ,(424,496) ,(424,497) ,(425,373) ,(425,496) ,(425,497) ,(426,373) ,(426,496) ,(426,497) ,(427,373) ,(427,496) ,(427,497) ,(428,373) ,(428,496) ,(428,497) ,(429,373) ,(429,496) ,(429,497) ,(430,373) ,(430,496) ,(430,497) ,(431,373) ,(431,496) ,(431,497) ,(432,373) ,(432,496) ,(432,497) ,(433,373) ,(433,496) ,(433,497) ,(434,373) ,(434,496) ,(434,497) ,(435,373) ,(435,496) ,(435,497) ,(436,373) ,(436,496) ,(436,497) ,(437,373) ,(437,496) ,(437,497) ,(438,373) ,(438,496) ,(438,497) ,(439,373) ,(439,496) ,(439,497) ,(440,373) ,(440,496) ,(440,497) ,(441,373) ,(441,496) ,(441,497) ,(442,373) ,(442,496) ,(442,497) ,(443,373) ,(443,496) ,(443,497) ,(444,373) ,(444,496) ,(444,497) ,(445,373) ,(445,496) ,(445,497) ,(446,373) ,(446,496) ,(446,497) ,(447,373) ,(447,496) ,(447,497) ,(448,373) ,(448,496) ,(448,497) ,(449,373) ,(449,496) ,(449,497) ,(450,373) ,(450,496) ,(450,497) ,(451,373) ,(451,496) ,(451,497) ,(452,373) ,(452,496) ,(452,497) ,(453,373) ,(453,496) ,(453,497) ,(454,373) ,(454,496) ,(454,497) ,(455,373) ,(455,496) ,(455,497) ,(456,373) ,(456,496) ,(456,497) ,(457,373) ,(457,496) ,(457,497) ,(458,373) ,(458,496) ,(458,497) ,(459,373) ,(459,496) ,(459,497) ,(460,373) ,(460,496) ,(460,497) ,(461,373) ,(461,496) ,(461,497) ,(462,373) ,(462,496) ,(462,497) ,(463,373) ,(463,496) ,(463,497) ,(464,373) ,(464,496) ,(464,497) ,(465,373) ,(465,496) ,(465,497) ,(466,373) ,(466,496) ,(466,497) ,(467,373) ,(467,496) ,(467,497) ,(468,373) ,(468,496) ,(468,497) ,(469,373) ,(469,496) ,(469,497) ,(470,373) ,(470,496) ,(470,497) ,(471,373) ,(471,496) ,(471,497) ,(472,373) ,(472,496) ,(472,497) ,(473,373) ,(473,496) ,(473,497) ,(474,373) ,(474,496) ,(474,497) ,(475,373) ,(475,496) ,(475,497) ,(476,373) ,(476,496) ,(476,497) ,(477,373) ,(477,496) ,(477,497) ,(478,373) ,(478,496) ,(478,497) ,(479,373) ,(479,496) ,(479,497) ,(480,373) ,(480,496) ,(480,497) ,(481,373) ,(481,496) ,(481,497) ,(482,373) ,(482,496) ,(482,497) ,(483,373) ,(483,496) ,(483,497) ,(484,373) ,(484,496) ,(484,497) ,(485,373) ,(485,496) ,(485,497) ,(486,373) ,(486,496) ,(486,497) ,(487,373) ,(487,496) ,(487,497) ,(488,373) ,(488,496) ,(488,497) ,(489,373) ,(489,496) ,(489,497) ,(490,373) ,(490,496) ,(490,497) ,(491,373) ,(491,496) ,(491,497) ,(492,373) ,(492,496) ,(492,497) ,(493,373) ,(493,496) ,(493,497) ,(494,373) ,(494,496) ,(494,497) ,(495,373) ,(495,496) ,(495,497) ,(496,373) ,(496,496) ,(496,497) ,(499,371) ,(499,372) ,(499,559) ,(500,371) ,(500,372) ,(500,559) ,(501,371) ,(501,372) ,(501,559) ,(502,371) ,(502,372) ,(502,559) ,(503,371) ,(503,372) ,(503,559) ,(504,371) ,(504,372) ,(504,559) ,(505,371) ,(505,372) ,(505,559) ,(506,371) ,(506,372) ,(506,559) ,(507,371) ,(507,372) ,(507,559) ,(508,371) ,(508,372) ,(508,559) ,(509,371) ,(509,372) ,(509,559) ,(510,371) ,(510,372) ,(510,559) ,(511,371) ,(511,559) ,(511,560) ,(512,371) ,(512,559) ,(512,560) ,(513,371) ,(513,559) ,(513,560) ,(514,371) ,(514,559) ,(514,560) ,(515,371) ,(515,559) ,(515,560) ,(516,371) ,(516,559) ,(516,560) ,(517,371) ,(517,559) ,(517,560) ,(518,371) ,(518,559) ,(518,560) ,(519,371) ,(519,559) ,(519,560) ,(520,371) ,(520,559) ,(520,560) ,(521,371) ,(521,559) ,(521,560) ,(522,371) ,(522,559) ,(522,560) ,(523,371) ,(523,559) ,(523,560) ,(524,371) ,(524,559) ,(524,560) ,(525,371) ,(525,559) ,(525,560) ,(526,371) ,(526,559) ,(526,560) ,(527,371) ,(527,559) ,(527,560) ,(528,371) ,(528,559) ,(528,560) ,(529,371) ,(529,559) ,(529,560) ,(530,371) ,(530,559) ,(530,560) ,(531,371) ,(531,559) ,(531,560) ,(532,371) ,(532,559) ,(532,560) ,(533,371) ,(533,559) ,(533,560) ,(534,371) ,(534,559) ,(534,560) ,(535,371) ,(535,559) ,(535,560) ,(536,371) ,(536,559) ,(536,560) ,(537,371) ,(537,559) ,(537,560) ,(538,371) ,(538,559) ,(538,560) ,(539,371) ,(539,559) ,(539,560) ,(540,371) ,(540,559) ,(540,560) ,(541,371) ,(541,559) ,(541,560) ,(542,371) ,(542,559) ,(542,560) ,(543,371) ,(543,559) ,(543,560) ,(544,371) ,(544,559) ,(544,560) ,(545,371) ,(545,559) ,(545,560) ,(546,371) ,(546,559) ,(546,560) ,(547,371) ,(547,559) ,(547,560) ,(548,371) ,(548,559) ,(548,560) ,(549,371) ,(549,559) ,(549,560) ,(550,371) ,(550,559) ,(550,560) ,(551,371) ,(551,559) ,(551,560) ,(552,371) ,(552,559) ,(552,560) ,(553,371) ,(553,559) ,(553,560) ,(554,371) ,(554,559) ,(554,560) ,(555,371) ,(555,559) ,(555,560) ,(556,371) ,(556,559) ,(556,560) ,(557,371) ,(557,559) ,(557,560) ,(558,371) ,(558,559) ,(558,560) ,(559,371) ,(559,559) ,(559,560) ,(560,373) ,(560,374) ,(560,497) ,(561,573) ,(562,369) ,(562,370) ,(562,572) ,(563,369) ,(563,370) ,(563,572) ,(564,369) ,(564,572) ,(564,573) ,(565,369) ,(565,572) ,(565,573) ,(566,369) ,(566,572) ,(566,573) ,(567,369) ,(567,572) ,(567,573) ,(568,369) ,(568,572) ,(568,573) ,(569,369) ,(569,572) ,(569,573) ,(570,369) ,(570,572) ,(570,573) ,(571,369) ,(571,572) ,(571,573) ,(572,369) ,(572,572) ,(572,573) ,(573,371) ,(573,372) ,(573,560)] * Step 3: UnreachableRules WORST_CASE(?,O(1)) + Considered Problem: Rules: 0. f11(A,B,C) -> f13(A,B,C) [0 >= A] (?,1) 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 2. f13(A,B,C) -> f15(A,B,C) [1 >= A] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 4. f15(A,B,C) -> f17(A,B,C) [2 >= A] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 6. f17(A,B,C) -> f19(A,B,C) [3 >= A] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 8. f19(A,B,C) -> f21(A,B,C) [4 >= A] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 10. f21(A,B,C) -> f23(A,B,C) [5 >= A] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 12. f23(A,B,C) -> f25(A,B,C) [6 >= A] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 14. f25(A,B,C) -> f27(A,B,C) [7 >= A] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (?,1) 16. f65(A,B,C) -> f67(A,B,C) [0 >= B] (?,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 18. f67(A,B,C) -> f69(A,B,C) [1 >= B] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 20. f69(A,B,C) -> f71(A,B,C) [2 >= B] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 22. f71(A,B,C) -> f73(A,B,C) [3 >= B] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 24. f73(A,B,C) -> f75(A,B,C) [4 >= B] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 26. f75(A,B,C) -> f77(A,B,C) [5 >= B] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 28. f77(A,B,C) -> f79(A,B,C) [6 >= B] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 30. f79(A,B,C) -> f81(A,B,C) [7 >= B] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 32. f81(A,B,C) -> f83(A,B,C) [8 >= B] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 34. f83(A,B,C) -> f85(A,B,C) [9 >= B] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 36. f85(A,B,C) -> f87(A,B,C) [10 >= B] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 38. f87(A,B,C) -> f89(A,B,C) [11 >= B] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 40. f89(A,B,C) -> f91(A,B,C) [12 >= B] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 42. f91(A,B,C) -> f93(A,B,C) [13 >= B] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 44. f93(A,B,C) -> f95(A,B,C) [14 >= B] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 46. f95(A,B,C) -> f97(A,B,C) [15 >= B] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 48. f97(A,B,C) -> f99(A,B,C) [16 >= B] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 50. f99(A,B,C) -> f101(A,B,C) [17 >= B] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 52. f101(A,B,C) -> f103(A,B,C) [18 >= B] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 54. f103(A,B,C) -> f105(A,B,C) [19 >= B] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 56. f105(A,B,C) -> f107(A,B,C) [20 >= B] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 58. f107(A,B,C) -> f109(A,B,C) [21 >= B] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 60. f109(A,B,C) -> f111(A,B,C) [22 >= B] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 62. f111(A,B,C) -> f113(A,B,C) [23 >= B] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 64. f113(A,B,C) -> f115(A,B,C) [24 >= B] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 66. f115(A,B,C) -> f117(A,B,C) [25 >= B] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 68. f117(A,B,C) -> f119(A,B,C) [26 >= B] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 70. f119(A,B,C) -> f121(A,B,C) [27 >= B] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 72. f121(A,B,C) -> f123(A,B,C) [28 >= B] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 74. f123(A,B,C) -> f125(A,B,C) [29 >= B] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 76. f125(A,B,C) -> f127(A,B,C) [30 >= B] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 78. f127(A,B,C) -> f129(A,B,C) [31 >= B] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 80. f129(A,B,C) -> f131(A,B,C) [32 >= B] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 82. f131(A,B,C) -> f133(A,B,C) [33 >= B] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 84. f133(A,B,C) -> f135(A,B,C) [34 >= B] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 86. f135(A,B,C) -> f137(A,B,C) [35 >= B] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 88. f137(A,B,C) -> f139(A,B,C) [36 >= B] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 90. f139(A,B,C) -> f141(A,B,C) [37 >= B] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 92. f141(A,B,C) -> f143(A,B,C) [38 >= B] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 94. f143(A,B,C) -> f145(A,B,C) [39 >= B] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 96. f145(A,B,C) -> f147(A,B,C) [40 >= B] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 98. f147(A,B,C) -> f149(A,B,C) [41 >= B] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 100. f149(A,B,C) -> f151(A,B,C) [42 >= B] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 102. f151(A,B,C) -> f153(A,B,C) [43 >= B] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 104. f153(A,B,C) -> f155(A,B,C) [44 >= B] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 106. f155(A,B,C) -> f157(A,B,C) [45 >= B] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 108. f157(A,B,C) -> f159(A,B,C) [46 >= B] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 110. f159(A,B,C) -> f161(A,B,C) [47 >= B] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (?,1) 112. f161(A,B,C) -> f163(A,B,C) [48 >= B] (?,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (?,1) 114. f163(A,B,C) -> f165(A,B,C) [49 >= B] (?,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (?,1) 116. f165(A,B,C) -> f167(A,B,C) [50 >= B] (?,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (?,1) 118. f167(A,B,C) -> f169(A,B,C) [51 >= B] (?,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (?,1) 120. f169(A,B,C) -> f171(A,B,C) [52 >= B] (?,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (?,1) 122. f171(A,B,C) -> f173(A,B,C) [53 >= B] (?,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (?,1) 124. f173(A,B,C) -> f175(A,B,C) [54 >= B] (?,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (?,1) 126. f175(A,B,C) -> f177(A,B,C) [55 >= B] (?,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (?,1) 128. f177(A,B,C) -> f179(A,B,C) [56 >= B] (?,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (?,1) 130. f179(A,B,C) -> f181(A,B,C) [57 >= B] (?,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (?,1) 132. f319(A,B,C) -> f321(A,B,C) [0 >= C] (?,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 134. f321(A,B,C) -> f323(A,B,C) [1 >= C] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 136. f323(A,B,C) -> f325(A,B,C) [2 >= C] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 138. f325(A,B,C) -> f327(A,B,C) [3 >= C] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 140. f327(A,B,C) -> f329(A,B,C) [4 >= C] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 142. f329(A,B,C) -> f331(A,B,C) [5 >= C] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 144. f331(A,B,C) -> f333(A,B,C) [6 >= C] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 146. f333(A,B,C) -> f335(A,B,C) [7 >= C] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 148. f335(A,B,C) -> f337(A,B,C) [8 >= C] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 150. f337(A,B,C) -> f339(A,B,C) [9 >= C] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 152. f339(A,B,C) -> f341(A,B,C) [10 >= C] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 154. f341(A,B,C) -> f343(A,B,C) [11 >= C] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 156. f343(A,B,C) -> f345(A,B,C) [12 >= C] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 158. f345(A,B,C) -> f347(A,B,C) [13 >= C] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 160. f347(A,B,C) -> f349(A,B,C) [14 >= C] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 162. f349(A,B,C) -> f351(A,B,C) [15 >= C] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 164. f351(A,B,C) -> f353(A,B,C) [16 >= C] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 166. f353(A,B,C) -> f355(A,B,C) [17 >= C] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 168. f355(A,B,C) -> f357(A,B,C) [18 >= C] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 170. f357(A,B,C) -> f359(A,B,C) [19 >= C] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 172. f359(A,B,C) -> f361(A,B,C) [20 >= C] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 174. f361(A,B,C) -> f363(A,B,C) [21 >= C] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 176. f363(A,B,C) -> f365(A,B,C) [22 >= C] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 178. f365(A,B,C) -> f367(A,B,C) [23 >= C] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 180. f367(A,B,C) -> f369(A,B,C) [24 >= C] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 182. f369(A,B,C) -> f371(A,B,C) [25 >= C] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 184. f371(A,B,C) -> f373(A,B,C) [26 >= C] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 186. f373(A,B,C) -> f375(A,B,C) [27 >= C] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 188. f375(A,B,C) -> f377(A,B,C) [28 >= C] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 190. f377(A,B,C) -> f379(A,B,C) [29 >= C] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 192. f379(A,B,C) -> f381(A,B,C) [30 >= C] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 194. f381(A,B,C) -> f383(A,B,C) [31 >= C] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 196. f383(A,B,C) -> f385(A,B,C) [32 >= C] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 198. f385(A,B,C) -> f387(A,B,C) [33 >= C] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 200. f387(A,B,C) -> f389(A,B,C) [34 >= C] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 202. f389(A,B,C) -> f391(A,B,C) [35 >= C] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 204. f391(A,B,C) -> f393(A,B,C) [36 >= C] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 206. f393(A,B,C) -> f395(A,B,C) [37 >= C] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 208. f395(A,B,C) -> f397(A,B,C) [38 >= C] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 210. f397(A,B,C) -> f399(A,B,C) [39 >= C] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 212. f399(A,B,C) -> f401(A,B,C) [40 >= C] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 214. f401(A,B,C) -> f403(A,B,C) [41 >= C] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 216. f403(A,B,C) -> f405(A,B,C) [42 >= C] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 218. f405(A,B,C) -> f407(A,B,C) [43 >= C] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 220. f407(A,B,C) -> f409(A,B,C) [44 >= C] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 222. f409(A,B,C) -> f411(A,B,C) [45 >= C] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 224. f411(A,B,C) -> f413(A,B,C) [46 >= C] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 226. f413(A,B,C) -> f415(A,B,C) [47 >= C] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 228. f415(A,B,C) -> f417(A,B,C) [48 >= C] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 230. f417(A,B,C) -> f419(A,B,C) [49 >= C] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 232. f419(A,B,C) -> f421(A,B,C) [50 >= C] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 234. f421(A,B,C) -> f423(A,B,C) [51 >= C] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 236. f423(A,B,C) -> f425(A,B,C) [52 >= C] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 238. f425(A,B,C) -> f427(A,B,C) [53 >= C] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 240. f427(A,B,C) -> f429(A,B,C) [54 >= C] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 242. f429(A,B,C) -> f431(A,B,C) [55 >= C] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 244. f431(A,B,C) -> f433(A,B,C) [56 >= C] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 246. f433(A,B,C) -> f435(A,B,C) [57 >= C] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 248. f435(A,B,C) -> f437(A,B,C) [58 >= C] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 250. f437(A,B,C) -> f439(A,B,C) [59 >= C] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 252. f439(A,B,C) -> f441(A,B,C) [60 >= C] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 254. f441(A,B,C) -> f443(A,B,C) [61 >= C] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 256. f443(A,B,C) -> f445(A,B,C) [62 >= C] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 258. f445(A,B,C) -> f447(A,B,C) [63 >= C] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 260. f447(A,B,C) -> f449(A,B,C) [64 >= C] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 262. f449(A,B,C) -> f451(A,B,C) [65 >= C] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 264. f451(A,B,C) -> f453(A,B,C) [66 >= C] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 266. f453(A,B,C) -> f455(A,B,C) [67 >= C] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 268. f455(A,B,C) -> f457(A,B,C) [68 >= C] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 270. f457(A,B,C) -> f459(A,B,C) [69 >= C] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 272. f459(A,B,C) -> f461(A,B,C) [70 >= C] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 274. f461(A,B,C) -> f463(A,B,C) [71 >= C] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 276. f463(A,B,C) -> f465(A,B,C) [72 >= C] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 278. f465(A,B,C) -> f467(A,B,C) [73 >= C] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 280. f467(A,B,C) -> f469(A,B,C) [74 >= C] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 282. f469(A,B,C) -> f471(A,B,C) [75 >= C] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 284. f471(A,B,C) -> f473(A,B,C) [76 >= C] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 286. f473(A,B,C) -> f475(A,B,C) [77 >= C] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 288. f475(A,B,C) -> f477(A,B,C) [78 >= C] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 290. f477(A,B,C) -> f479(A,B,C) [79 >= C] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 292. f479(A,B,C) -> f481(A,B,C) [80 >= C] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 294. f481(A,B,C) -> f483(A,B,C) [81 >= C] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 296. f483(A,B,C) -> f485(A,B,C) [82 >= C] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 298. f485(A,B,C) -> f487(A,B,C) [83 >= C] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 300. f487(A,B,C) -> f489(A,B,C) [84 >= C] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 302. f489(A,B,C) -> f491(A,B,C) [85 >= C] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 304. f491(A,B,C) -> f493(A,B,C) [86 >= C] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 306. f493(A,B,C) -> f495(A,B,C) [87 >= C] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 308. f495(A,B,C) -> f497(A,B,C) [88 >= C] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 310. f497(A,B,C) -> f499(A,B,C) [89 >= C] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 312. f499(A,B,C) -> f501(A,B,C) [90 >= C] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 314. f501(A,B,C) -> f503(A,B,C) [91 >= C] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 316. f503(A,B,C) -> f505(A,B,C) [92 >= C] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 318. f505(A,B,C) -> f507(A,B,C) [93 >= C] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 320. f507(A,B,C) -> f509(A,B,C) [94 >= C] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 322. f509(A,B,C) -> f511(A,B,C) [95 >= C] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 324. f511(A,B,C) -> f513(A,B,C) [96 >= C] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 326. f513(A,B,C) -> f515(A,B,C) [97 >= C] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 328. f515(A,B,C) -> f517(A,B,C) [98 >= C] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 330. f517(A,B,C) -> f519(A,B,C) [99 >= C] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 332. f519(A,B,C) -> f521(A,B,C) [100 >= C] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 334. f521(A,B,C) -> f523(A,B,C) [101 >= C] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 336. f523(A,B,C) -> f525(A,B,C) [102 >= C] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 338. f525(A,B,C) -> f527(A,B,C) [103 >= C] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 340. f527(A,B,C) -> f529(A,B,C) [104 >= C] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 342. f529(A,B,C) -> f531(A,B,C) [105 >= C] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 344. f531(A,B,C) -> f533(A,B,C) [106 >= C] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 346. f533(A,B,C) -> f535(A,B,C) [107 >= C] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 348. f535(A,B,C) -> f537(A,B,C) [108 >= C] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 350. f537(A,B,C) -> f539(A,B,C) [109 >= C] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 352. f539(A,B,C) -> f541(A,B,C) [110 >= C] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 354. f541(A,B,C) -> f543(A,B,C) [111 >= C] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 356. f543(A,B,C) -> f545(A,B,C) [112 >= C] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 358. f545(A,B,C) -> f547(A,B,C) [113 >= C] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 360. f547(A,B,C) -> f549(A,B,C) [114 >= C] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 362. f549(A,B,C) -> f551(A,B,C) [115 >= C] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 364. f551(A,B,C) -> f553(A,B,C) [116 >= C] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 366. f553(A,B,C) -> f555(A,B,C) [117 >= C] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (?,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 369. f7(A,B,C) -> f11(A,B,C) [0 >= 1 + A && 9 >= A] (?,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 371. f61(A,B,C) -> f65(A,B,C) [0 >= 1 + B && 49 >= B] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 373. f315(A,B,C) -> f319(A,B,C) [0 >= 1 + C && 119 >= C] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 375. f555(A,B,C) -> f315(A,B,1 + C) [118 >= C] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (?,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (?,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (?,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (?,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (?,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (?,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (?,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (?,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (?,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (?,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (?,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (?,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (?,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (?,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (?,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (?,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (?,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (?,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (?,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (?,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (?,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (?,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (?,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (?,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (?,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (?,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (?,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (?,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (?,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (?,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (?,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (?,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (?,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (?,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (?,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (?,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (?,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (?,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (?,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (?,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (?,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (?,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (?,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (?,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (?,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (?,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (?,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (?,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (?,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (?,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (?,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (?,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (?,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (?,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (?,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (?,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (?,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (?,1) 498. f181(A,B,C) -> f61(A,1 + B,C) [58 >= B] (?,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (?,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (?,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (?,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (?,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (?,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (?,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (?,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (?,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (?,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (?,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (?,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (?,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (?,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (?,1) 561. f27(A,B,C) -> f7(1 + A,B,C) [8 >= A] (?,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (?,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (?,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (?,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (?,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (?,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (?,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (?,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [0->{2},1->{3,570},2->{4},3->{5,569},4->{6},5->{7,568},6->{8},7->{9,567},8->{10},9->{11,566},10->{12} ,11->{13,565},12->{14},13->{15,564},14->{561},15->{562,563},16->{18},17->{19,557},18->{20},19->{21,556} ,20->{22},21->{23,555},22->{24},23->{25,554},24->{26},25->{27,553},26->{28},27->{29,552},28->{30},29->{31 ,551},30->{32},31->{33,550},32->{34},33->{35,549},34->{36},35->{37,548},36->{38},37->{39,547},38->{40} ,39->{41,546},40->{42},41->{43,545},42->{44},43->{45,544},44->{46},45->{47,543},46->{48},47->{49,542} ,48->{50},49->{51,541},50->{52},51->{53,540},52->{54},53->{55,539},54->{56},55->{57,538},56->{58},57->{59 ,537},58->{60},59->{61,536},60->{62},61->{63,535},62->{64},63->{65,534},64->{66},65->{67,533},66->{68} ,67->{69,532},68->{70},69->{71,531},70->{72},71->{73,530},72->{74},73->{75,529},74->{76},75->{77,528} ,76->{78},77->{79,527},78->{80},79->{81,526},80->{82},81->{83,525},82->{84},83->{85,524},84->{86},85->{87 ,523},86->{88},87->{89,522},88->{90},89->{91,521},90->{92},91->{93,520},92->{94},93->{95,519},94->{96} ,95->{97,518},96->{98},97->{99,517},98->{100},99->{101,516},100->{102},101->{103,515},102->{104},103->{105 ,514},104->{106},105->{107,513},106->{108},107->{109,512},108->{110},109->{111,511},110->{112},111->{113 ,510},112->{114},113->{115,509},114->{116},115->{117,508},116->{118},117->{119,507},118->{120},119->{121 ,506},120->{122},121->{123,505},122->{124},123->{125,504},124->{126},125->{127,503},126->{128},127->{129 ,502},128->{130},129->{131,501},130->{498},131->{499,500},132->{134},133->{135,494},134->{136},135->{137 ,493},136->{138},137->{139,492},138->{140},139->{141,491},140->{142},141->{143,490},142->{144},143->{145 ,489},144->{146},145->{147,488},146->{148},147->{149,487},148->{150},149->{151,486},150->{152},151->{153 ,485},152->{154},153->{155,484},154->{156},155->{157,483},156->{158},157->{159,482},158->{160},159->{161 ,481},160->{162},161->{163,480},162->{164},163->{165,479},164->{166},165->{167,478},166->{168},167->{169 ,477},168->{170},169->{171,476},170->{172},171->{173,475},172->{174},173->{175,474},174->{176},175->{177 ,473},176->{178},177->{179,472},178->{180},179->{181,471},180->{182},181->{183,470},182->{184},183->{185 ,469},184->{186},185->{187,468},186->{188},187->{189,467},188->{190},189->{191,466},190->{192},191->{193 ,465},192->{194},193->{195,464},194->{196},195->{197,463},196->{198},197->{199,462},198->{200},199->{201 ,461},200->{202},201->{203,460},202->{204},203->{205,459},204->{206},205->{207,458},206->{208},207->{209 ,457},208->{210},209->{211,456},210->{212},211->{213,455},212->{214},213->{215,454},214->{216},215->{217 ,453},216->{218},217->{219,452},218->{220},219->{221,451},220->{222},221->{223,450},222->{224},223->{225 ,449},224->{226},225->{227,448},226->{228},227->{229,447},228->{230},229->{231,446},230->{232},231->{233 ,445},232->{234},233->{235,444},234->{236},235->{237,443},236->{238},237->{239,442},238->{240},239->{241 ,441},240->{242},241->{243,440},242->{244},243->{245,439},244->{246},245->{247,438},246->{248},247->{249 ,437},248->{250},249->{251,436},250->{252},251->{253,435},252->{254},253->{255,434},254->{256},255->{257 ,433},256->{258},257->{259,432},258->{260},259->{261,431},260->{262},261->{263,430},262->{264},263->{265 ,429},264->{266},265->{267,428},266->{268},267->{269,427},268->{270},269->{271,426},270->{272},271->{273 ,425},272->{274},273->{275,424},274->{276},275->{277,423},276->{278},277->{279,422},278->{280},279->{281 ,421},280->{282},281->{283,420},282->{284},283->{285,419},284->{286},285->{287,418},286->{288},287->{289 ,417},288->{290},289->{291,416},290->{292},291->{293,415},292->{294},293->{295,414},294->{296},295->{297 ,413},296->{298},297->{299,412},298->{300},299->{301,411},300->{302},301->{303,410},302->{304},303->{305 ,409},304->{306},305->{307,408},306->{308},307->{309,407},308->{310},309->{311,406},310->{312},311->{313 ,405},312->{314},313->{315,404},314->{316},315->{317,403},316->{318},317->{319,402},318->{320},319->{321 ,401},320->{322},321->{323,400},322->{324},323->{325,399},324->{326},325->{327,398},326->{328},327->{329 ,397},328->{330},329->{331,396},330->{332},331->{333,395},332->{334},333->{335,394},334->{336},335->{337 ,393},336->{338},337->{339,392},338->{340},339->{341,391},340->{342},341->{343,390},342->{344},343->{345 ,389},344->{346},345->{347,388},346->{348},347->{349,387},348->{350},349->{351,386},350->{352},351->{353 ,385},352->{354},353->{355,384},354->{356},355->{357,383},356->{358},357->{359,382},358->{360},359->{361 ,381},360->{362},361->{363,380},362->{364},363->{365,379},364->{366},365->{367,378},366->{375},367->{376 ,377},368->{572},369->{0},370->{1,571},371->{16},372->{17,558},373->{132},374->{133,495},375->{373,374,496} ,376->{497},377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374} ,385->{374},386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374} ,394->{374},395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374} ,403->{374},404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374} ,412->{374},413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374} ,421->{374},422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374} ,430->{374},431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374} ,439->{374},440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374} ,448->{374},449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374} ,457->{374},458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374} ,466->{374},467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374} ,475->{374},476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374} ,484->{374},485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374} ,493->{374},494->{374},495->{374},496->{374},497->{},498->{371,372,559,560},499->{560},500->{560},501->{560} ,502->{560},503->{560},504->{560},505->{560},506->{560},507->{560},508->{560},509->{560},510->{560} ,511->{372},512->{372},513->{372},514->{372},515->{372},516->{372},517->{372},518->{372},519->{372} ,520->{372},521->{372},522->{372},523->{372},524->{372},525->{372},526->{372},527->{372},528->{372} ,529->{372},530->{372},531->{372},532->{372},533->{372},534->{372},535->{372},536->{372},537->{372} ,538->{372},539->{372},540->{372},541->{372},542->{372},543->{372},544->{372},545->{372},546->{372} ,547->{372},548->{372},549->{372},550->{372},551->{372},552->{372},553->{372},554->{372},555->{372} ,556->{372},557->{372},558->{372},559->{372},560->{496},561->{369,370,572},562->{573},563->{573},564->{370} ,565->{370},566->{370},567->{370},568->{370},569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: UnreachableRules + Details: Following transitions are not reachable from the starting states and are revomed: [0 ,2 ,4 ,6 ,8 ,10 ,12 ,14 ,16 ,18 ,20 ,22 ,24 ,26 ,28 ,30 ,32 ,34 ,36 ,38 ,40 ,42 ,44 ,46 ,48 ,50 ,52 ,54 ,56 ,58 ,60 ,62 ,64 ,66 ,68 ,70 ,72 ,74 ,76 ,78 ,80 ,82 ,84 ,86 ,88 ,90 ,92 ,94 ,96 ,98 ,100 ,102 ,104 ,106 ,108 ,110 ,112 ,114 ,116 ,118 ,120 ,122 ,124 ,126 ,128 ,130 ,132 ,134 ,136 ,138 ,140 ,142 ,144 ,146 ,148 ,150 ,152 ,154 ,156 ,158 ,160 ,162 ,164 ,166 ,168 ,170 ,172 ,174 ,176 ,178 ,180 ,182 ,184 ,186 ,188 ,190 ,192 ,194 ,196 ,198 ,200 ,202 ,204 ,206 ,208 ,210 ,212 ,214 ,216 ,218 ,220 ,222 ,224 ,226 ,228 ,230 ,232 ,234 ,236 ,238 ,240 ,242 ,244 ,246 ,248 ,250 ,252 ,254 ,256 ,258 ,260 ,262 ,264 ,266 ,268 ,270 ,272 ,274 ,276 ,278 ,280 ,282 ,284 ,286 ,288 ,290 ,292 ,294 ,296 ,298 ,300 ,302 ,304 ,306 ,308 ,310 ,312 ,314 ,316 ,318 ,320 ,322 ,324 ,326 ,328 ,330 ,332 ,334 ,336 ,338 ,340 ,342 ,344 ,346 ,348 ,350 ,352 ,354 ,356 ,358 ,360 ,362 ,364 ,366 ,369 ,371 ,373 ,375 ,498 ,561] * Step 4: TrivialSCCs WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (?,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (?,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (?,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (?,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (?,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (?,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (?,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (?,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (?,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (?,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (?,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (?,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (?,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (?,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (?,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (?,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (?,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (?,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (?,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (?,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (?,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (?,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (?,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (?,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (?,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (?,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (?,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (?,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (?,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (?,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (?,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (?,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (?,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (?,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (?,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (?,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (?,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (?,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (?,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (?,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (?,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (?,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (?,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (?,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (?,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (?,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (?,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (?,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (?,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (?,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (?,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (?,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (?,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (?,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (?,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (?,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (?,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (?,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (?,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (?,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (?,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (?,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (?,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (?,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (?,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (?,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (?,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (?,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (?,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (?,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (?,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (?,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (?,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (?,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (?,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (?,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (?,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (?,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (?,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (?,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (?,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (?,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (?,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (?,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (?,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (?,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (?,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (?,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (?,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (?,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (?,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (?,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: TrivialSCCs + Details: All trivial SCCs of the transition graph admit timebound 1. * Step 5: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (?,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (?,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (?,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (?,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (?,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (?,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (?,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (?,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (?,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (?,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (?,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (?,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (?,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (?,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (?,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (?,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (?,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (?,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (?,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (?,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (?,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (?,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (?,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (?,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (?,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (?,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (?,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (?,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (?,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (?,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (?,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (?,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (?,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (?,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (?,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (?,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (?,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (?,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (?,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (?,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (?,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (?,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (?,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (?,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (?,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (?,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (?,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (?,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (?,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (?,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (?,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (?,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (?,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (?,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (?,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (?,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (?,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 8*x13 p(f101) = -1*x1 p(f103) = -1*x1 p(f105) = -1*x1 p(f107) = -1*x1 p(f109) = -1*x1 p(f11) = -1*x1 + 8*x13 p(f111) = -1*x1 p(f113) = -1*x1 p(f115) = -1*x1 p(f117) = -1*x1 p(f119) = -1*x1 p(f121) = -1*x1 p(f123) = -1*x1 p(f125) = -1*x1 p(f127) = -1*x1 p(f129) = -1*x1 p(f13) = -1*x1 + 8*x13 p(f131) = -1*x1 p(f133) = -1*x1 p(f135) = -1*x1 p(f137) = -1*x1 p(f139) = -1*x1 p(f141) = -1*x1 p(f143) = -1*x1 p(f145) = -1*x1 p(f147) = -1*x1 p(f149) = -1*x1 p(f15) = -1*x1 + 8*x13 p(f151) = -1*x1 p(f153) = -1*x1 p(f155) = -1*x1 p(f157) = -1*x1 p(f159) = -1*x1 p(f161) = -1*x1 p(f163) = -1*x1 p(f165) = -1*x1 p(f167) = -1*x1 p(f169) = -1*x1 p(f17) = -1*x1 + 8*x13 p(f171) = -1*x1 p(f173) = -1*x1 p(f175) = -1*x1 p(f177) = -1*x1 p(f179) = -1*x1 p(f181) = -1*x1 p(f19) = -1*x1 + 8*x13 p(f21) = -1*x1 + 8*x13 p(f23) = -1*x1 + 8*x13 p(f25) = -1*x1 + 7*x13 p(f27) = -1*x1 + 7*x13 p(f315) = -1*x1 p(f319) = -1*x1 p(f321) = -1*x1 p(f323) = -1*x1 p(f325) = -1*x1 p(f327) = -1*x1 p(f329) = -1*x1 p(f331) = -1*x1 p(f333) = -1*x1 p(f335) = -1*x1 p(f337) = -1*x1 p(f339) = -1*x1 p(f341) = -1*x1 p(f343) = -1*x1 p(f345) = -1*x1 p(f347) = -1*x1 p(f349) = -1*x1 p(f351) = -1*x1 p(f353) = -1*x1 p(f355) = -1*x1 p(f357) = -1*x1 p(f359) = -1*x1 p(f361) = -1*x1 p(f363) = -1*x1 p(f365) = -1*x1 p(f367) = -1*x1 p(f369) = -1*x1 p(f371) = -1*x1 p(f373) = -1*x1 p(f375) = -1*x1 p(f377) = -1*x1 p(f379) = -1*x1 p(f381) = -1*x1 p(f383) = -1*x1 p(f385) = -1*x1 p(f387) = -1*x1 p(f389) = -1*x1 p(f391) = -1*x1 p(f393) = -1*x1 p(f395) = -1*x1 p(f397) = -1*x1 p(f399) = -1*x1 p(f401) = -1*x1 p(f403) = -1*x1 p(f405) = -1*x1 p(f407) = -1*x1 p(f409) = -1*x1 p(f411) = -1*x1 p(f413) = -1*x1 p(f415) = -1*x1 p(f417) = -1*x1 p(f419) = -1*x1 p(f421) = -1*x1 p(f423) = -1*x1 p(f425) = -1*x1 p(f427) = -1*x1 p(f429) = -1*x1 p(f431) = -1*x1 p(f433) = -1*x1 p(f435) = -1*x1 p(f437) = -1*x1 p(f439) = -1*x1 p(f441) = -1*x1 p(f443) = -1*x1 p(f445) = -1*x1 p(f447) = -1*x1 p(f449) = -1*x1 p(f451) = -1*x1 p(f453) = -1*x1 p(f455) = -1*x1 p(f457) = -1*x1 p(f459) = -1*x1 p(f461) = -1*x1 p(f463) = -1*x1 p(f465) = -1*x1 p(f467) = -1*x1 p(f469) = -1*x1 p(f471) = -1*x1 p(f473) = -1*x1 p(f475) = -1*x1 p(f477) = -1*x1 p(f479) = -1*x1 p(f481) = -1*x1 p(f483) = -1*x1 p(f485) = -1*x1 p(f487) = -1*x1 p(f489) = -1*x1 p(f491) = -1*x1 p(f493) = -1*x1 p(f495) = -1*x1 p(f497) = -1*x1 p(f499) = -1*x1 p(f501) = -1*x1 p(f503) = -1*x1 p(f505) = -1*x1 p(f507) = -1*x1 p(f509) = -1*x1 p(f511) = -1*x1 p(f513) = -1*x1 p(f515) = -1*x1 p(f517) = -1*x1 p(f519) = -1*x1 p(f521) = -1*x1 p(f523) = -1*x1 p(f525) = -1*x1 p(f527) = -1*x1 p(f529) = -1*x1 p(f531) = -1*x1 p(f533) = -1*x1 p(f535) = -1*x1 p(f537) = -1*x1 p(f539) = -1*x1 p(f541) = -1*x1 p(f543) = -1*x1 p(f545) = -1*x1 p(f547) = -1*x1 p(f549) = -1*x1 p(f551) = -1*x1 p(f553) = -1*x1 p(f555) = -1*x1 p(f61) = -1*x1 p(f65) = -1*x1 p(f67) = -1*x1 p(f69) = -1*x1 p(f7) = -1*x1 + 8*x13 p(f71) = -1*x1 p(f73) = -1*x1 p(f75) = -1*x1 p(f77) = -1*x1 p(f79) = -1*x1 p(f808) = -1*x1 p(f81) = -1*x1 p(f83) = -1*x1 p(f85) = -1*x1 p(f87) = -1*x1 p(f89) = -1*x1 p(f91) = -1*x1 p(f93) = -1*x1 p(f95) = -1*x1 p(f97) = -1*x1 p(f99) = -1*x1 Following rules are strictly oriented: [A = 1] ==> f11(A,B,C) = 8 + -1*A > 6 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 8 + -1*A > 7 = f7(1,B,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 8 + -1*A >= 8 + -1*A = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 8 + -1*A >= 8 + -1*A = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 8 + -1*A >= 8 + -1*A = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 8 + -1*A >= 8 + -1*A = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 8 + -1*A >= 8 + -1*A = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 8 + -1*A >= 8 + -1*A = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 8 + -1*A >= 7 + -1*A = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 7 + -1*A >= 7 + -1*A = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = -1*A >= -1*A = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = -1*A >= -1*A = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = -1*A >= -1*A = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = -1*A >= -1*A = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = -1*A >= -1*A = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = -1*A >= -1*A = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = -1*A >= -1*A = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = -1*A >= -1*A = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = -1*A >= -1*A = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = -1*A >= -1*A = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = -1*A >= -1*A = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = -1*A >= -1*A = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = -1*A >= -1*A = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = -1*A >= -1*A = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = -1*A >= -1*A = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = -1*A >= -1*A = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = -1*A >= -1*A = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = -1*A >= -1*A = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = -1*A >= -1*A = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = -1*A >= -1*A = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = -1*A >= -1*A = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = -1*A >= -1*A = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = -1*A >= -1*A = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = -1*A >= -1*A = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = -1*A >= -1*A = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = -1*A >= -1*A = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = -1*A >= -1*A = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = -1*A >= -1*A = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = -1*A >= -1*A = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = -1*A >= -1*A = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = -1*A >= -1*A = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = -1*A >= -1*A = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = -1*A >= -1*A = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = -1*A >= -1*A = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = -1*A >= -1*A = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = -1*A >= -1*A = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = -1*A >= -1*A = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = -1*A >= -1*A = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = -1*A >= -1*A = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = -1*A >= -1*A = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = -1*A >= -1*A = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = -1*A >= -1*A = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = -1*A >= -1*A = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = -1*A >= -1*A = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = -1*A >= -1*A = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = -1*A >= -1*A = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = -1*A >= -1*A = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = -1*A >= -1*A = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = -1*A >= -1*A = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = -1*A >= -1*A = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = -1*A >= -1*A = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = -1*A >= -1*A = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = -1*A >= -1*A = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = -1*A >= -1*A = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = -1*A >= -1*A = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = -1*A >= -1*A = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = -1*A >= -1*A = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = -1*A >= -1*A = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*A >= -1*A = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*A >= -1*A = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*A >= -1*A = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*A >= -1*A = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*A >= -1*A = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*A >= -1*A = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*A >= -1*A = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*A >= -1*A = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*A >= -1*A = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*A >= -1*A = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*A >= -1*A = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*A >= -1*A = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*A >= -1*A = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*A >= -1*A = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*A >= -1*A = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*A >= -1*A = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*A >= -1*A = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*A >= -1*A = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*A >= -1*A = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*A >= -1*A = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*A >= -1*A = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*A >= -1*A = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*A >= -1*A = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*A >= -1*A = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*A >= -1*A = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*A >= -1*A = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*A >= -1*A = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*A >= -1*A = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*A >= -1*A = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*A >= -1*A = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*A >= -1*A = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*A >= -1*A = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*A >= -1*A = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*A >= -1*A = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*A >= -1*A = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*A >= -1*A = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*A >= -1*A = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*A >= -1*A = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*A >= -1*A = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*A >= -1*A = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*A >= -1*A = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*A >= -1*A = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*A >= -1*A = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*A >= -1*A = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*A >= -1*A = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*A >= -1*A = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*A >= -1*A = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*A >= -1*A = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*A >= -1*A = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*A >= -1*A = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*A >= -1*A = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*A >= -1*A = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*A >= -1*A = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*A >= -1*A = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*A >= -1*A = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*A >= -1*A = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*A >= -1*A = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*A >= -1*A = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*A >= -1*A = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*A >= -1*A = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*A >= -1*A = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*A >= -1*A = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*A >= -1*A = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*A >= -1*A = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*A >= -1*A = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*A >= -1*A = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*A >= -1*A = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*A >= -1*A = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*A >= -1*A = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*A >= -1*A = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*A >= -1*A = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*A >= -1*A = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*A >= -1*A = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*A >= -1*A = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*A >= -1*A = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*A >= -1*A = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*A >= -1*A = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*A >= -1*A = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*A >= -1*A = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*A >= -1*A = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*A >= -1*A = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*A >= -1*A = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*A >= -1*A = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*A >= -1*A = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*A >= -1*A = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*A >= -1*A = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*A >= -1*A = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*A >= -1*A = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*A >= -1*A = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*A >= -1*A = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*A >= -1*A = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*A >= -1*A = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*A >= -1*A = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*A >= -1*A = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*A >= -1*A = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*A >= -1*A = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*A >= -1*A = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*A >= -1*A = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*A >= -1*A = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*A >= -1*A = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*A >= -1*A = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*A >= -1*A = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*A >= -1*A = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*A >= -1*A = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*A >= -1*A = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*A >= -1*A = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*A >= -1*A = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*A >= -1*A = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*A >= -1*A = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*A >= -1*A = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*A >= -1*A = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*A >= -1*A = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*A >= -1*A = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*A >= -1*A = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*A >= -1*A = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*A >= -1*A = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*A >= -1*A = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*A >= -1*A = f555(A,B,C) True ==> f0(A,B,C) = 8 >= 8 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 8 + -1*A >= 8 + -1*A = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = -1*A >= -1*A = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*A >= -1*A = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*A >= -1*A = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*A >= -1*A = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*A >= -1*A = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*A >= -1*A = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*A >= -1*A = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*A >= -1*A = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*A >= -1*A = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*A >= -1*A = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*A >= -1*A = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*A >= -1*A = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*A >= -1*A = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*A >= -1*A = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*A >= -1*A = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*A >= -1*A = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*A >= -1*A = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*A >= -1*A = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*A >= -1*A = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*A >= -1*A = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*A >= -1*A = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*A >= -1*A = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*A >= -1*A = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*A >= -1*A = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*A >= -1*A = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*A >= -1*A = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*A >= -1*A = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*A >= -1*A = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*A >= -1*A = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*A >= -1*A = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*A >= -1*A = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*A >= -1*A = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*A >= -1*A = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*A >= -1*A = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*A >= -1*A = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*A >= -1*A = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*A >= -1*A = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*A >= -1*A = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*A >= -1*A = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*A >= -1*A = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*A >= -1*A = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*A >= -1*A = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*A >= -1*A = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*A >= -1*A = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*A >= -1*A = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*A >= -1*A = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*A >= -1*A = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*A >= -1*A = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*A >= -1*A = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*A >= -1*A = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*A >= -1*A = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*A >= -1*A = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*A >= -1*A = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*A >= -1*A = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*A >= -1*A = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*A >= -1*A = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*A >= -1*A = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*A >= -1*A = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*A >= -1*A = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*A >= -1*A = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*A >= -1*A = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*A >= -1*A = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*A >= -1*A = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*A >= -1*A = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*A >= -1*A = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*A >= -1*A = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*A >= -1*A = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*A >= -1*A = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*A >= -1*A = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*A >= -1*A = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*A >= -1*A = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*A >= -1*A = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*A >= -1*A = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*A >= -1*A = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*A >= -1*A = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*A >= -1*A = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*A >= -1*A = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*A >= -1*A = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*A >= -1*A = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*A >= -1*A = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*A >= -1*A = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*A >= -1*A = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*A >= -1*A = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*A >= -1*A = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*A >= -1*A = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*A >= -1*A = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*A >= -1*A = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*A >= -1*A = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*A >= -1*A = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*A >= -1*A = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*A >= -1*A = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*A >= -1*A = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*A >= -1*A = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*A >= -1*A = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*A >= -1*A = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*A >= -1*A = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*A >= -1*A = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*A >= -1*A = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*A >= -1*A = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*A >= -1*A = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*A >= -1*A = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*A >= -1*A = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*A >= -1*A = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*A >= -1*A = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*A >= -1*A = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*A >= -1*A = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*A >= -1*A = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*A >= -1*A = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*A >= -1*A = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*A >= -1*A = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*A >= -1*A = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*A >= -1*A = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*A >= -1*A = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*A >= -1*A = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*A >= -1*A = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*A >= -1*A = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*A >= -1*A = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*A >= -1*A = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*A >= -1*A = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*A >= -1*A = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*A >= -1*A = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*A >= -1*A = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*A >= -1*A = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*A >= -1*A = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = -1*A >= -1*A = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = -1*A >= -1*A = f61(A,60,C) [B = 58] ==> f179(A,B,C) = -1*A >= -1*A = f61(A,59,C) [B = 57] ==> f177(A,B,C) = -1*A >= -1*A = f61(A,58,C) [B = 56] ==> f175(A,B,C) = -1*A >= -1*A = f61(A,57,C) [B = 55] ==> f173(A,B,C) = -1*A >= -1*A = f61(A,56,C) [B = 54] ==> f171(A,B,C) = -1*A >= -1*A = f61(A,55,C) [B = 53] ==> f169(A,B,C) = -1*A >= -1*A = f61(A,54,C) [B = 52] ==> f167(A,B,C) = -1*A >= -1*A = f61(A,53,C) [B = 51] ==> f165(A,B,C) = -1*A >= -1*A = f61(A,52,C) [B = 50] ==> f163(A,B,C) = -1*A >= -1*A = f61(A,51,C) [B = 49] ==> f161(A,B,C) = -1*A >= -1*A = f61(A,50,C) [B = 48] ==> f159(A,B,C) = -1*A >= -1*A = f61(A,49,C) [B = 47] ==> f157(A,B,C) = -1*A >= -1*A = f61(A,48,C) [B = 46] ==> f155(A,B,C) = -1*A >= -1*A = f61(A,47,C) [B = 45] ==> f153(A,B,C) = -1*A >= -1*A = f61(A,46,C) [B = 44] ==> f151(A,B,C) = -1*A >= -1*A = f61(A,45,C) [B = 43] ==> f149(A,B,C) = -1*A >= -1*A = f61(A,44,C) [B = 42] ==> f147(A,B,C) = -1*A >= -1*A = f61(A,43,C) [B = 41] ==> f145(A,B,C) = -1*A >= -1*A = f61(A,42,C) [B = 40] ==> f143(A,B,C) = -1*A >= -1*A = f61(A,41,C) [B = 39] ==> f141(A,B,C) = -1*A >= -1*A = f61(A,40,C) [B = 38] ==> f139(A,B,C) = -1*A >= -1*A = f61(A,39,C) [B = 37] ==> f137(A,B,C) = -1*A >= -1*A = f61(A,38,C) [B = 36] ==> f135(A,B,C) = -1*A >= -1*A = f61(A,37,C) [B = 35] ==> f133(A,B,C) = -1*A >= -1*A = f61(A,36,C) [B = 34] ==> f131(A,B,C) = -1*A >= -1*A = f61(A,35,C) [B = 33] ==> f129(A,B,C) = -1*A >= -1*A = f61(A,34,C) [B = 32] ==> f127(A,B,C) = -1*A >= -1*A = f61(A,33,C) [B = 31] ==> f125(A,B,C) = -1*A >= -1*A = f61(A,32,C) [B = 30] ==> f123(A,B,C) = -1*A >= -1*A = f61(A,31,C) [B = 29] ==> f121(A,B,C) = -1*A >= -1*A = f61(A,30,C) [B = 28] ==> f119(A,B,C) = -1*A >= -1*A = f61(A,29,C) [B = 27] ==> f117(A,B,C) = -1*A >= -1*A = f61(A,28,C) [B = 26] ==> f115(A,B,C) = -1*A >= -1*A = f61(A,27,C) [B = 25] ==> f113(A,B,C) = -1*A >= -1*A = f61(A,26,C) [B = 24] ==> f111(A,B,C) = -1*A >= -1*A = f61(A,25,C) [B = 23] ==> f109(A,B,C) = -1*A >= -1*A = f61(A,24,C) [B = 22] ==> f107(A,B,C) = -1*A >= -1*A = f61(A,23,C) [B = 21] ==> f105(A,B,C) = -1*A >= -1*A = f61(A,22,C) [B = 20] ==> f103(A,B,C) = -1*A >= -1*A = f61(A,21,C) [B = 19] ==> f101(A,B,C) = -1*A >= -1*A = f61(A,20,C) [B = 18] ==> f99(A,B,C) = -1*A >= -1*A = f61(A,19,C) [B = 17] ==> f97(A,B,C) = -1*A >= -1*A = f61(A,18,C) [B = 16] ==> f95(A,B,C) = -1*A >= -1*A = f61(A,17,C) [B = 15] ==> f93(A,B,C) = -1*A >= -1*A = f61(A,16,C) [B = 14] ==> f91(A,B,C) = -1*A >= -1*A = f61(A,15,C) [B = 13] ==> f89(A,B,C) = -1*A >= -1*A = f61(A,14,C) [B = 12] ==> f87(A,B,C) = -1*A >= -1*A = f61(A,13,C) [B = 11] ==> f85(A,B,C) = -1*A >= -1*A = f61(A,12,C) [B = 10] ==> f83(A,B,C) = -1*A >= -1*A = f61(A,11,C) [B = 9] ==> f81(A,B,C) = -1*A >= -1*A = f61(A,10,C) [B = 8] ==> f79(A,B,C) = -1*A >= -1*A = f61(A,9,C) [B = 7] ==> f77(A,B,C) = -1*A >= -1*A = f61(A,8,C) [B = 6] ==> f75(A,B,C) = -1*A >= -1*A = f61(A,7,C) [B = 5] ==> f73(A,B,C) = -1*A >= -1*A = f61(A,6,C) [B = 4] ==> f71(A,B,C) = -1*A >= -1*A = f61(A,5,C) [B = 3] ==> f69(A,B,C) = -1*A >= -1*A = f61(A,4,C) [B = 2] ==> f67(A,B,C) = -1*A >= -1*A = f61(A,3,C) [B = 1] ==> f65(A,B,C) = -1*A >= -1*A = f61(A,2,C) [B = 0] ==> f61(A,B,C) = -1*A >= -1*A = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = -1*A >= -1*A = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 7 + -1*A >= 7 + -1*A = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 7 + -1*A >= -2 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 7 + -1*A >= -1 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 8 + -1*A >= 0 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 8 + -1*A >= 1 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 8 + -1*A >= 2 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 8 + -1*A >= 3 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 8 + -1*A >= 4 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 8 + -1*A >= 5 = f7(3,B,C) [A >= 10] ==> f7(A,B,C) = 8 + -1*A >= -1*A = f61(A,0,C) * Step 6: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (?,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (?,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (?,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (?,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (?,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (?,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (?,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (?,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (?,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (?,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (?,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (?,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (?,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (?,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (?,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (?,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (?,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (?,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (?,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (?,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (?,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (?,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (?,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (?,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (?,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (?,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (?,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (?,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (?,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (?,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (?,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (?,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (?,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (?,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (?,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (?,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (?,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (?,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (?,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (?,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (?,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (?,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (?,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (?,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (?,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (?,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (?,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (?,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (?,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (?,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (?,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (?,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (?,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (?,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (?,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (?,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 3*x13 p(f101) = -1*x1 + x13 p(f103) = -1*x1 + x13 p(f105) = -1*x1 + x13 p(f107) = -1*x1 + x13 p(f109) = -1*x1 + x13 p(f11) = -1*x1 + 3*x13 p(f111) = -1*x1 + x13 p(f113) = -1*x1 + x13 p(f115) = -1*x1 + x13 p(f117) = -1*x1 + x13 p(f119) = -1*x1 + x13 p(f121) = -1*x1 + x13 p(f123) = -1*x1 + x13 p(f125) = -1*x1 + x13 p(f127) = -1*x1 + x13 p(f129) = -1*x1 + x13 p(f13) = -1*x1 + 3*x13 p(f131) = -1*x1 + x13 p(f133) = -1*x1 + x13 p(f135) = -1*x1 + x13 p(f137) = -1*x1 + x13 p(f139) = -1*x1 + x13 p(f141) = -1*x1 + x13 p(f143) = -1*x1 + x13 p(f145) = -1*x1 + x13 p(f147) = -1*x1 + x13 p(f149) = -1*x1 + x13 p(f15) = -1*x1 + 2*x13 p(f151) = -1*x1 + x13 p(f153) = -1*x1 + x13 p(f155) = -1*x1 + x13 p(f157) = -1*x1 + x13 p(f159) = -1*x1 + x13 p(f161) = -1*x1 + x13 p(f163) = -1*x1 + x13 p(f165) = -1*x1 + x13 p(f167) = -1*x1 + x13 p(f169) = -1*x1 + x13 p(f17) = -1*x1 + 2*x13 p(f171) = -1*x1 + x13 p(f173) = -1*x1 + x13 p(f175) = -1*x1 + x13 p(f177) = -1*x1 + x13 p(f179) = -1*x1 + x13 p(f181) = -1*x1 + x13 p(f19) = -1*x1 + 2*x13 p(f21) = -1*x1 + 2*x13 p(f23) = -1*x1 + 2*x13 p(f25) = -1*x1 + 2*x13 p(f27) = -1*x1 + 2*x13 p(f315) = -1*x1 + x13 p(f319) = -1*x1 + x13 p(f321) = -1*x1 + x13 p(f323) = -1*x1 + x13 p(f325) = -1*x1 + x13 p(f327) = -1*x1 + x13 p(f329) = -1*x1 + x13 p(f331) = -1*x1 + x13 p(f333) = -1*x1 + x13 p(f335) = -1*x1 + x13 p(f337) = -1*x1 + x13 p(f339) = -1*x1 + x13 p(f341) = -1*x1 + x13 p(f343) = -1*x1 + x13 p(f345) = -1*x1 + x13 p(f347) = -1*x1 + x13 p(f349) = -1*x1 + x13 p(f351) = -1*x1 + x13 p(f353) = -1*x1 + x13 p(f355) = -1*x1 + x13 p(f357) = -1*x1 + x13 p(f359) = -1*x1 + x13 p(f361) = -1*x1 + x13 p(f363) = -1*x1 + x13 p(f365) = -1*x1 + x13 p(f367) = -1*x1 + x13 p(f369) = -1*x1 + x13 p(f371) = -1*x1 + x13 p(f373) = -1*x1 + x13 p(f375) = -1*x1 + x13 p(f377) = -1*x1 + x13 p(f379) = -1*x1 + x13 p(f381) = -1*x1 + x13 p(f383) = -1*x1 + x13 p(f385) = -1*x1 + x13 p(f387) = -1*x1 + x13 p(f389) = -1*x1 + x13 p(f391) = -1*x1 + x13 p(f393) = -1*x1 + x13 p(f395) = -1*x1 + x13 p(f397) = -1*x1 + x13 p(f399) = -1*x1 + x13 p(f401) = -1*x1 + x13 p(f403) = -1*x1 + x13 p(f405) = -1*x1 + x13 p(f407) = -1*x1 + x13 p(f409) = -1*x1 + x13 p(f411) = -1*x1 + x13 p(f413) = -1*x1 + x13 p(f415) = -1*x1 + x13 p(f417) = -1*x1 + x13 p(f419) = -1*x1 + x13 p(f421) = -1*x1 + x13 p(f423) = -1*x1 + x13 p(f425) = -1*x1 + x13 p(f427) = -1*x1 + x13 p(f429) = -1*x1 + x13 p(f431) = -1*x1 + x13 p(f433) = -1*x1 + x13 p(f435) = -1*x1 + x13 p(f437) = -1*x1 + x13 p(f439) = -1*x1 + x13 p(f441) = -1*x1 + x13 p(f443) = -1*x1 + x13 p(f445) = -1*x1 + x13 p(f447) = -1*x1 + x13 p(f449) = -1*x1 + x13 p(f451) = -1*x1 + x13 p(f453) = -1*x1 + x13 p(f455) = -1*x1 + x13 p(f457) = -1*x1 + x13 p(f459) = -1*x1 + x13 p(f461) = -1*x1 + x13 p(f463) = -1*x1 + x13 p(f465) = -1*x1 + x13 p(f467) = -1*x1 + x13 p(f469) = -1*x1 + x13 p(f471) = -1*x1 + x13 p(f473) = -1*x1 + x13 p(f475) = -1*x1 + x13 p(f477) = -1*x1 + x13 p(f479) = -1*x1 + x13 p(f481) = -1*x1 + x13 p(f483) = -1*x1 + x13 p(f485) = -1*x1 + x13 p(f487) = -1*x1 + x13 p(f489) = -1*x1 + x13 p(f491) = -1*x1 + x13 p(f493) = -1*x1 + x13 p(f495) = -1*x1 + x13 p(f497) = -1*x1 + x13 p(f499) = -1*x1 + x13 p(f501) = -1*x1 + x13 p(f503) = -1*x1 + x13 p(f505) = -1*x1 + x13 p(f507) = -1*x1 + x13 p(f509) = -1*x1 + x13 p(f511) = -1*x1 + x13 p(f513) = -1*x1 + x13 p(f515) = -1*x1 + x13 p(f517) = -1*x1 + x13 p(f519) = -1*x1 + x13 p(f521) = -1*x1 + x13 p(f523) = -1*x1 + x13 p(f525) = -1*x1 + x13 p(f527) = -1*x1 + x13 p(f529) = -1*x1 + x13 p(f531) = -1*x1 + x13 p(f533) = -1*x1 + x13 p(f535) = -1*x1 + x13 p(f537) = -1*x1 + x13 p(f539) = -1*x1 + x13 p(f541) = -1*x1 + x13 p(f543) = -1*x1 + x13 p(f545) = -1*x1 + x13 p(f547) = -1*x1 + x13 p(f549) = -1*x1 + x13 p(f551) = -1*x1 + x13 p(f553) = -1*x1 + x13 p(f555) = -1*x1 + x13 p(f61) = -1*x1 + x13 p(f65) = -1*x1 + x13 p(f67) = -1*x1 + x13 p(f69) = -1*x1 + x13 p(f7) = -1*x1 + 3*x13 p(f71) = -1*x1 + x13 p(f73) = -1*x1 + x13 p(f75) = -1*x1 + x13 p(f77) = -1*x1 + x13 p(f79) = -1*x1 + x13 p(f808) = -1*x1 + x13 p(f81) = -1*x1 + x13 p(f83) = -1*x1 + x13 p(f85) = -1*x1 + x13 p(f87) = -1*x1 + x13 p(f89) = -1*x1 + x13 p(f91) = -1*x1 + x13 p(f93) = -1*x1 + x13 p(f95) = -1*x1 + x13 p(f97) = -1*x1 + x13 p(f99) = -1*x1 + x13 Following rules are strictly oriented: [A = 2] ==> f13(A,B,C) = 3 + -1*A > 0 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 3 + -1*A > 1 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 3 + -1*A > 2 = f7(1,B,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 3 + -1*A >= 3 + -1*A = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 3 + -1*A >= 2 + -1*A = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 2 + -1*A >= 2 + -1*A = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 2 + -1*A >= 2 + -1*A = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 2 + -1*A >= 2 + -1*A = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 2 + -1*A >= 2 + -1*A = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 2 + -1*A >= 2 + -1*A = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 2 + -1*A >= 2 + -1*A = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 1 + -1*A >= 1 + -1*A = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 1 + -1*A >= 1 + -1*A = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 1 + -1*A >= 1 + -1*A = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 1 + -1*A >= 1 + -1*A = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 1 + -1*A >= 1 + -1*A = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 1 + -1*A >= 1 + -1*A = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 1 + -1*A >= 1 + -1*A = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 1 + -1*A >= 1 + -1*A = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 1 + -1*A >= 1 + -1*A = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 1 + -1*A >= 1 + -1*A = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 1 + -1*A >= 1 + -1*A = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 1 + -1*A >= 1 + -1*A = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 1 + -1*A >= 1 + -1*A = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 1 + -1*A >= 1 + -1*A = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 1 + -1*A >= 1 + -1*A = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 1 + -1*A >= 1 + -1*A = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 1 + -1*A >= 1 + -1*A = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 1 + -1*A >= 1 + -1*A = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 1 + -1*A >= 1 + -1*A = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 1 + -1*A >= 1 + -1*A = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 1 + -1*A >= 1 + -1*A = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 1 + -1*A >= 1 + -1*A = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 1 + -1*A >= 1 + -1*A = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 1 + -1*A >= 1 + -1*A = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 1 + -1*A >= 1 + -1*A = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 1 + -1*A >= 1 + -1*A = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 1 + -1*A >= 1 + -1*A = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 1 + -1*A >= 1 + -1*A = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 1 + -1*A >= 1 + -1*A = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 1 + -1*A >= 1 + -1*A = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 1 + -1*A >= 1 + -1*A = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 1 + -1*A >= 1 + -1*A = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 1 + -1*A >= 1 + -1*A = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 1 + -1*A >= 1 + -1*A = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 1 + -1*A >= 1 + -1*A = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 1 + -1*A >= 1 + -1*A = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 1 + -1*A >= 1 + -1*A = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 1 + -1*A >= 1 + -1*A = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 1 + -1*A >= 1 + -1*A = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 1 + -1*A >= 1 + -1*A = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 1 + -1*A >= 1 + -1*A = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 1 + -1*A >= 1 + -1*A = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 1 + -1*A >= 1 + -1*A = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 1 + -1*A >= 1 + -1*A = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 1 + -1*A >= 1 + -1*A = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 1 + -1*A >= 1 + -1*A = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 1 + -1*A >= 1 + -1*A = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 1 + -1*A >= 1 + -1*A = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 1 + -1*A >= 1 + -1*A = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 1 + -1*A >= 1 + -1*A = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 1 + -1*A >= 1 + -1*A = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 1 + -1*A >= 1 + -1*A = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 1 + -1*A >= 1 + -1*A = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 1 + -1*A >= 1 + -1*A = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 1 + -1*A >= 1 + -1*A = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 1 + -1*A >= 1 + -1*A = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 1 + -1*A >= 1 + -1*A = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 1 + -1*A >= 1 + -1*A = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = 1 + -1*A >= 1 + -1*A = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = 1 + -1*A >= 1 + -1*A = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = 1 + -1*A >= 1 + -1*A = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = 1 + -1*A >= 1 + -1*A = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = 1 + -1*A >= 1 + -1*A = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = 1 + -1*A >= 1 + -1*A = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = 1 + -1*A >= 1 + -1*A = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = 1 + -1*A >= 1 + -1*A = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = 1 + -1*A >= 1 + -1*A = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = 1 + -1*A >= 1 + -1*A = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = 1 + -1*A >= 1 + -1*A = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = 1 + -1*A >= 1 + -1*A = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = 1 + -1*A >= 1 + -1*A = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = 1 + -1*A >= 1 + -1*A = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = 1 + -1*A >= 1 + -1*A = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = 1 + -1*A >= 1 + -1*A = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = 1 + -1*A >= 1 + -1*A = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = 1 + -1*A >= 1 + -1*A = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = 1 + -1*A >= 1 + -1*A = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = 1 + -1*A >= 1 + -1*A = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = 1 + -1*A >= 1 + -1*A = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = 1 + -1*A >= 1 + -1*A = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = 1 + -1*A >= 1 + -1*A = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = 1 + -1*A >= 1 + -1*A = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = 1 + -1*A >= 1 + -1*A = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = 1 + -1*A >= 1 + -1*A = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = 1 + -1*A >= 1 + -1*A = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = 1 + -1*A >= 1 + -1*A = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = 1 + -1*A >= 1 + -1*A = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = 1 + -1*A >= 1 + -1*A = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = 1 + -1*A >= 1 + -1*A = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = 1 + -1*A >= 1 + -1*A = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = 1 + -1*A >= 1 + -1*A = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = 1 + -1*A >= 1 + -1*A = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = 1 + -1*A >= 1 + -1*A = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = 1 + -1*A >= 1 + -1*A = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = 1 + -1*A >= 1 + -1*A = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = 1 + -1*A >= 1 + -1*A = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = 1 + -1*A >= 1 + -1*A = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = 1 + -1*A >= 1 + -1*A = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = 1 + -1*A >= 1 + -1*A = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = 1 + -1*A >= 1 + -1*A = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = 1 + -1*A >= 1 + -1*A = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = 1 + -1*A >= 1 + -1*A = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = 1 + -1*A >= 1 + -1*A = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = 1 + -1*A >= 1 + -1*A = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = 1 + -1*A >= 1 + -1*A = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = 1 + -1*A >= 1 + -1*A = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = 1 + -1*A >= 1 + -1*A = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = 1 + -1*A >= 1 + -1*A = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = 1 + -1*A >= 1 + -1*A = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = 1 + -1*A >= 1 + -1*A = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = 1 + -1*A >= 1 + -1*A = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = 1 + -1*A >= 1 + -1*A = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = 1 + -1*A >= 1 + -1*A = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = 1 + -1*A >= 1 + -1*A = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = 1 + -1*A >= 1 + -1*A = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = 1 + -1*A >= 1 + -1*A = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = 1 + -1*A >= 1 + -1*A = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = 1 + -1*A >= 1 + -1*A = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = 1 + -1*A >= 1 + -1*A = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = 1 + -1*A >= 1 + -1*A = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = 1 + -1*A >= 1 + -1*A = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = 1 + -1*A >= 1 + -1*A = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = 1 + -1*A >= 1 + -1*A = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = 1 + -1*A >= 1 + -1*A = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = 1 + -1*A >= 1 + -1*A = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = 1 + -1*A >= 1 + -1*A = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = 1 + -1*A >= 1 + -1*A = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = 1 + -1*A >= 1 + -1*A = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = 1 + -1*A >= 1 + -1*A = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = 1 + -1*A >= 1 + -1*A = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = 1 + -1*A >= 1 + -1*A = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = 1 + -1*A >= 1 + -1*A = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = 1 + -1*A >= 1 + -1*A = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = 1 + -1*A >= 1 + -1*A = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = 1 + -1*A >= 1 + -1*A = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = 1 + -1*A >= 1 + -1*A = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = 1 + -1*A >= 1 + -1*A = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = 1 + -1*A >= 1 + -1*A = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = 1 + -1*A >= 1 + -1*A = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = 1 + -1*A >= 1 + -1*A = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = 1 + -1*A >= 1 + -1*A = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = 1 + -1*A >= 1 + -1*A = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = 1 + -1*A >= 1 + -1*A = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = 1 + -1*A >= 1 + -1*A = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = 1 + -1*A >= 1 + -1*A = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = 1 + -1*A >= 1 + -1*A = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = 1 + -1*A >= 1 + -1*A = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = 1 + -1*A >= 1 + -1*A = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = 1 + -1*A >= 1 + -1*A = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = 1 + -1*A >= 1 + -1*A = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = 1 + -1*A >= 1 + -1*A = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = 1 + -1*A >= 1 + -1*A = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = 1 + -1*A >= 1 + -1*A = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = 1 + -1*A >= 1 + -1*A = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = 1 + -1*A >= 1 + -1*A = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = 1 + -1*A >= 1 + -1*A = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = 1 + -1*A >= 1 + -1*A = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = 1 + -1*A >= 1 + -1*A = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = 1 + -1*A >= 1 + -1*A = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = 1 + -1*A >= 1 + -1*A = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = 1 + -1*A >= 1 + -1*A = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = 1 + -1*A >= 1 + -1*A = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = 1 + -1*A >= 1 + -1*A = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = 1 + -1*A >= 1 + -1*A = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = 1 + -1*A >= 1 + -1*A = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = 1 + -1*A >= 1 + -1*A = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = 1 + -1*A >= 1 + -1*A = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = 1 + -1*A >= 1 + -1*A = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = 1 + -1*A >= 1 + -1*A = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = 1 + -1*A >= 1 + -1*A = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = 1 + -1*A >= 1 + -1*A = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = 1 + -1*A >= 1 + -1*A = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = 1 + -1*A >= 1 + -1*A = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = 1 + -1*A >= 1 + -1*A = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = 1 + -1*A >= 1 + -1*A = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = 1 + -1*A >= 1 + -1*A = f555(A,B,C) True ==> f0(A,B,C) = 3 >= 3 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 3 + -1*A >= 3 + -1*A = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 1 + -1*A >= 1 + -1*A = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = 1 + -1*A >= 1 + -1*A = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,120) [C = 118] ==> f553(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,119) [C = 117] ==> f551(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,118) [C = 116] ==> f549(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,117) [C = 115] ==> f547(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,116) [C = 114] ==> f545(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,115) [C = 113] ==> f543(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,114) [C = 112] ==> f541(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,113) [C = 111] ==> f539(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,112) [C = 110] ==> f537(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,111) [C = 109] ==> f535(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,110) [C = 108] ==> f533(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,109) [C = 107] ==> f531(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,108) [C = 106] ==> f529(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,107) [C = 105] ==> f527(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,106) [C = 104] ==> f525(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,105) [C = 103] ==> f523(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,104) [C = 102] ==> f521(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,103) [C = 101] ==> f519(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,102) [C = 100] ==> f517(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,101) [C = 99] ==> f515(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,100) [C = 98] ==> f513(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,99) [C = 97] ==> f511(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,98) [C = 96] ==> f509(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,97) [C = 95] ==> f507(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,96) [C = 94] ==> f505(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,95) [C = 93] ==> f503(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,94) [C = 92] ==> f501(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,93) [C = 91] ==> f499(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,92) [C = 90] ==> f497(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,91) [C = 89] ==> f495(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,90) [C = 88] ==> f493(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,89) [C = 87] ==> f491(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,88) [C = 86] ==> f489(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,87) [C = 85] ==> f487(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,86) [C = 84] ==> f485(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,85) [C = 83] ==> f483(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,84) [C = 82] ==> f481(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,83) [C = 81] ==> f479(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,82) [C = 80] ==> f477(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,81) [C = 79] ==> f475(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,80) [C = 78] ==> f473(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,79) [C = 77] ==> f471(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,78) [C = 76] ==> f469(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,77) [C = 75] ==> f467(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,76) [C = 74] ==> f465(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,75) [C = 73] ==> f463(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,74) [C = 72] ==> f461(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,73) [C = 71] ==> f459(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,72) [C = 70] ==> f457(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,71) [C = 69] ==> f455(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,70) [C = 68] ==> f453(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,69) [C = 67] ==> f451(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,68) [C = 66] ==> f449(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,67) [C = 65] ==> f447(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,66) [C = 64] ==> f445(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,65) [C = 63] ==> f443(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,64) [C = 62] ==> f441(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,63) [C = 61] ==> f439(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,62) [C = 60] ==> f437(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,61) [C = 59] ==> f435(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,60) [C = 58] ==> f433(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,59) [C = 57] ==> f431(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,58) [C = 56] ==> f429(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,57) [C = 55] ==> f427(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,56) [C = 54] ==> f425(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,55) [C = 53] ==> f423(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,54) [C = 52] ==> f421(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,53) [C = 51] ==> f419(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,52) [C = 50] ==> f417(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,51) [C = 49] ==> f415(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,50) [C = 48] ==> f413(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,49) [C = 47] ==> f411(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,48) [C = 46] ==> f409(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,47) [C = 45] ==> f407(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,46) [C = 44] ==> f405(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,45) [C = 43] ==> f403(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,44) [C = 42] ==> f401(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,43) [C = 41] ==> f399(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,42) [C = 40] ==> f397(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,41) [C = 39] ==> f395(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,40) [C = 38] ==> f393(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,39) [C = 37] ==> f391(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,38) [C = 36] ==> f389(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,37) [C = 35] ==> f387(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,36) [C = 34] ==> f385(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,35) [C = 33] ==> f383(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,34) [C = 32] ==> f381(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,33) [C = 31] ==> f379(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,32) [C = 30] ==> f377(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,31) [C = 29] ==> f375(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,30) [C = 28] ==> f373(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,29) [C = 27] ==> f371(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,28) [C = 26] ==> f369(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,27) [C = 25] ==> f367(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,26) [C = 24] ==> f365(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,25) [C = 23] ==> f363(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,24) [C = 22] ==> f361(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,23) [C = 21] ==> f359(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,22) [C = 20] ==> f357(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,21) [C = 19] ==> f355(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,20) [C = 18] ==> f353(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,19) [C = 17] ==> f351(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,18) [C = 16] ==> f349(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,17) [C = 15] ==> f347(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,16) [C = 14] ==> f345(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,15) [C = 13] ==> f343(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,14) [C = 12] ==> f341(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,13) [C = 11] ==> f339(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,12) [C = 10] ==> f337(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,11) [C = 9] ==> f335(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,10) [C = 8] ==> f333(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,9) [C = 7] ==> f331(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,8) [C = 6] ==> f329(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,7) [C = 5] ==> f327(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,6) [C = 4] ==> f325(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,5) [C = 3] ==> f323(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,4) [C = 2] ==> f321(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,3) [C = 1] ==> f319(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,2) [C = 0] ==> f315(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = 1 + -1*A >= 1 + -1*A = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 1 + -1*A >= 1 + -1*A = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = 1 + -1*A >= 1 + -1*A = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 2 + -1*A >= 2 + -1*A = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 2 + -1*A >= -7 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 2 + -1*A >= -6 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 2 + -1*A >= -5 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 2 + -1*A >= -4 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 2 + -1*A >= -3 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 2 + -1*A >= -2 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 2 + -1*A >= -1 = f7(4,B,C) [A >= 10] ==> f7(A,B,C) = 3 + -1*A >= 1 + -1*A = f61(A,0,C) * Step 7: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (?,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (?,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (?,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (?,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (?,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (?,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (?,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (?,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (?,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (?,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (?,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (?,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (?,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (?,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (?,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (?,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (?,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (?,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (?,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (?,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (?,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (?,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (?,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (?,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (?,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (?,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (?,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (?,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (?,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (?,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (?,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (?,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (?,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (?,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (?,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (?,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (?,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (?,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (?,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (?,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (?,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (?,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (?,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (?,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (?,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (?,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (?,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (?,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (?,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (?,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (?,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (?,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (?,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (?,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (?,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 118*x13 p(f101) = 118*x13 p(f103) = 118*x13 p(f105) = 118*x13 p(f107) = 118*x13 p(f109) = 118*x13 p(f11) = 118*x13 p(f111) = 118*x13 p(f113) = 118*x13 p(f115) = 118*x13 p(f117) = 118*x13 p(f119) = 118*x13 p(f121) = 118*x13 p(f123) = 118*x13 p(f125) = 118*x13 p(f127) = 118*x13 p(f129) = 118*x13 p(f13) = 118*x13 p(f131) = 118*x13 p(f133) = 118*x13 p(f135) = 118*x13 p(f137) = 118*x13 p(f139) = 118*x13 p(f141) = 118*x13 p(f143) = 118*x13 p(f145) = 118*x13 p(f147) = 118*x13 p(f149) = 118*x13 p(f15) = 118*x13 p(f151) = 118*x13 p(f153) = 118*x13 p(f155) = 118*x13 p(f157) = 118*x13 p(f159) = 118*x13 p(f161) = 118*x13 p(f163) = 118*x13 p(f165) = 118*x13 p(f167) = 118*x13 p(f169) = 118*x13 p(f17) = 118*x13 p(f171) = 118*x13 p(f173) = 118*x13 p(f175) = 118*x13 p(f177) = 118*x13 p(f179) = 118*x13 p(f181) = 118*x13 p(f19) = 118*x13 p(f21) = 118*x13 p(f23) = 118*x13 p(f25) = 118*x13 p(f27) = 118*x13 p(f315) = -1*x3 + 118*x13 p(f319) = -1*x3 + 118*x13 p(f321) = -1*x3 + 118*x13 p(f323) = -1*x3 + 118*x13 p(f325) = -1*x3 + 118*x13 p(f327) = -1*x3 + 118*x13 p(f329) = -1*x3 + 118*x13 p(f331) = -1*x3 + 118*x13 p(f333) = -1*x3 + 118*x13 p(f335) = -1*x3 + 118*x13 p(f337) = -1*x3 + 118*x13 p(f339) = -1*x3 + 118*x13 p(f341) = -1*x3 + 118*x13 p(f343) = -1*x3 + 118*x13 p(f345) = -1*x3 + 118*x13 p(f347) = -1*x3 + 118*x13 p(f349) = -1*x3 + 118*x13 p(f351) = -1*x3 + 118*x13 p(f353) = -1*x3 + 118*x13 p(f355) = -1*x3 + 118*x13 p(f357) = -1*x3 + 118*x13 p(f359) = -1*x3 + 118*x13 p(f361) = -1*x3 + 118*x13 p(f363) = -1*x3 + 118*x13 p(f365) = -1*x3 + 118*x13 p(f367) = -1*x3 + 118*x13 p(f369) = -1*x3 + 118*x13 p(f371) = -1*x3 + 118*x13 p(f373) = -1*x3 + 118*x13 p(f375) = -1*x3 + 118*x13 p(f377) = -1*x3 + 118*x13 p(f379) = -1*x3 + 118*x13 p(f381) = -1*x3 + 118*x13 p(f383) = -1*x3 + 118*x13 p(f385) = -1*x3 + 118*x13 p(f387) = -1*x3 + 118*x13 p(f389) = -1*x3 + 118*x13 p(f391) = -1*x3 + 118*x13 p(f393) = -1*x3 + 118*x13 p(f395) = -1*x3 + 118*x13 p(f397) = -1*x3 + 118*x13 p(f399) = -1*x3 + 118*x13 p(f401) = -1*x3 + 118*x13 p(f403) = -1*x3 + 118*x13 p(f405) = -1*x3 + 118*x13 p(f407) = -1*x3 + 118*x13 p(f409) = -1*x3 + 118*x13 p(f411) = -1*x3 + 118*x13 p(f413) = -1*x3 + 118*x13 p(f415) = -1*x3 + 118*x13 p(f417) = -1*x3 + 118*x13 p(f419) = -1*x3 + 118*x13 p(f421) = -1*x3 + 118*x13 p(f423) = -1*x3 + 118*x13 p(f425) = -1*x3 + 118*x13 p(f427) = -1*x3 + 118*x13 p(f429) = -1*x3 + 118*x13 p(f431) = -1*x3 + 118*x13 p(f433) = -1*x3 + 118*x13 p(f435) = -1*x3 + 118*x13 p(f437) = -1*x3 + 118*x13 p(f439) = -1*x3 + 118*x13 p(f441) = -1*x3 + 118*x13 p(f443) = -1*x3 + 118*x13 p(f445) = -1*x3 + 118*x13 p(f447) = -1*x3 + 118*x13 p(f449) = -1*x3 + 118*x13 p(f451) = -1*x3 + 118*x13 p(f453) = -1*x3 + 118*x13 p(f455) = -1*x3 + 118*x13 p(f457) = -1*x3 + 118*x13 p(f459) = -1*x3 + 118*x13 p(f461) = -1*x3 + 118*x13 p(f463) = -1*x3 + 118*x13 p(f465) = -1*x3 + 118*x13 p(f467) = -1*x3 + 118*x13 p(f469) = -1*x3 + 118*x13 p(f471) = -1*x3 + 118*x13 p(f473) = -1*x3 + 118*x13 p(f475) = -1*x3 + 118*x13 p(f477) = -1*x3 + 118*x13 p(f479) = -1*x3 + 118*x13 p(f481) = -1*x3 + 118*x13 p(f483) = -1*x3 + 118*x13 p(f485) = -1*x3 + 118*x13 p(f487) = -1*x3 + 118*x13 p(f489) = -1*x3 + 118*x13 p(f491) = -1*x3 + 118*x13 p(f493) = -1*x3 + 118*x13 p(f495) = -1*x3 + 118*x13 p(f497) = -1*x3 + 118*x13 p(f499) = -1*x3 + 118*x13 p(f501) = -1*x3 + 118*x13 p(f503) = -1*x3 + 118*x13 p(f505) = -1*x3 + 118*x13 p(f507) = -1*x3 + 118*x13 p(f509) = -1*x3 + 118*x13 p(f511) = -1*x3 + 118*x13 p(f513) = -1*x3 + 118*x13 p(f515) = -1*x3 + 118*x13 p(f517) = -1*x3 + 118*x13 p(f519) = -1*x3 + 118*x13 p(f521) = -1*x3 + 118*x13 p(f523) = -1*x3 + 118*x13 p(f525) = -1*x3 + 118*x13 p(f527) = -1*x3 + 118*x13 p(f529) = -1*x3 + 118*x13 p(f531) = -1*x3 + 118*x13 p(f533) = -1*x3 + 118*x13 p(f535) = -1*x3 + 118*x13 p(f537) = -1*x3 + 118*x13 p(f539) = -1*x3 + 118*x13 p(f541) = -1*x3 + 118*x13 p(f543) = -1*x3 + 118*x13 p(f545) = -1*x3 + 118*x13 p(f547) = -1*x3 + 118*x13 p(f549) = -1*x3 + 118*x13 p(f551) = -1*x3 + 118*x13 p(f553) = -1*x3 + 118*x13 p(f555) = -1*x3 + 117*x13 p(f61) = 118*x13 p(f65) = 118*x13 p(f67) = 118*x13 p(f69) = 118*x13 p(f7) = 118*x13 p(f71) = 118*x13 p(f73) = 118*x13 p(f75) = 118*x13 p(f77) = 118*x13 p(f79) = 118*x13 p(f808) = -1*x3 + 118*x13 p(f81) = 118*x13 p(f83) = 118*x13 p(f85) = 118*x13 p(f87) = 118*x13 p(f89) = 118*x13 p(f91) = 118*x13 p(f93) = 118*x13 p(f95) = 118*x13 p(f97) = 118*x13 p(f99) = 118*x13 Following rules are strictly oriented: [C = 117] ==> f551(A,B,C) = 118 + -1*C > 0 = f315(A,B,118) [C = 116] ==> f549(A,B,C) = 118 + -1*C > 1 = f315(A,B,117) [C = 115] ==> f547(A,B,C) = 118 + -1*C > 2 = f315(A,B,116) [C = 114] ==> f545(A,B,C) = 118 + -1*C > 3 = f315(A,B,115) [C = 113] ==> f543(A,B,C) = 118 + -1*C > 4 = f315(A,B,114) [C = 112] ==> f541(A,B,C) = 118 + -1*C > 5 = f315(A,B,113) [C = 111] ==> f539(A,B,C) = 118 + -1*C > 6 = f315(A,B,112) [C = 110] ==> f537(A,B,C) = 118 + -1*C > 7 = f315(A,B,111) [C = 109] ==> f535(A,B,C) = 118 + -1*C > 8 = f315(A,B,110) [C = 108] ==> f533(A,B,C) = 118 + -1*C > 9 = f315(A,B,109) [C = 107] ==> f531(A,B,C) = 118 + -1*C > 10 = f315(A,B,108) [C = 106] ==> f529(A,B,C) = 118 + -1*C > 11 = f315(A,B,107) [C = 105] ==> f527(A,B,C) = 118 + -1*C > 12 = f315(A,B,106) [C = 104] ==> f525(A,B,C) = 118 + -1*C > 13 = f315(A,B,105) [C = 103] ==> f523(A,B,C) = 118 + -1*C > 14 = f315(A,B,104) [C = 102] ==> f521(A,B,C) = 118 + -1*C > 15 = f315(A,B,103) [C = 101] ==> f519(A,B,C) = 118 + -1*C > 16 = f315(A,B,102) [C = 100] ==> f517(A,B,C) = 118 + -1*C > 17 = f315(A,B,101) [C = 98] ==> f513(A,B,C) = 118 + -1*C > 19 = f315(A,B,99) [C = 97] ==> f511(A,B,C) = 118 + -1*C > 20 = f315(A,B,98) [C = 96] ==> f509(A,B,C) = 118 + -1*C > 21 = f315(A,B,97) [C = 95] ==> f507(A,B,C) = 118 + -1*C > 22 = f315(A,B,96) [C = 94] ==> f505(A,B,C) = 118 + -1*C > 23 = f315(A,B,95) [C = 93] ==> f503(A,B,C) = 118 + -1*C > 24 = f315(A,B,94) [C = 92] ==> f501(A,B,C) = 118 + -1*C > 25 = f315(A,B,93) [C = 91] ==> f499(A,B,C) = 118 + -1*C > 26 = f315(A,B,92) [C = 90] ==> f497(A,B,C) = 118 + -1*C > 27 = f315(A,B,91) [C = 89] ==> f495(A,B,C) = 118 + -1*C > 28 = f315(A,B,90) [C = 88] ==> f493(A,B,C) = 118 + -1*C > 29 = f315(A,B,89) [C = 87] ==> f491(A,B,C) = 118 + -1*C > 30 = f315(A,B,88) [C = 86] ==> f489(A,B,C) = 118 + -1*C > 31 = f315(A,B,87) [C = 85] ==> f487(A,B,C) = 118 + -1*C > 32 = f315(A,B,86) [C = 84] ==> f485(A,B,C) = 118 + -1*C > 33 = f315(A,B,85) [C = 83] ==> f483(A,B,C) = 118 + -1*C > 34 = f315(A,B,84) [C = 82] ==> f481(A,B,C) = 118 + -1*C > 35 = f315(A,B,83) [C = 81] ==> f479(A,B,C) = 118 + -1*C > 36 = f315(A,B,82) [C = 80] ==> f477(A,B,C) = 118 + -1*C > 37 = f315(A,B,81) [C = 79] ==> f475(A,B,C) = 118 + -1*C > 38 = f315(A,B,80) [C = 78] ==> f473(A,B,C) = 118 + -1*C > 39 = f315(A,B,79) [C = 77] ==> f471(A,B,C) = 118 + -1*C > 40 = f315(A,B,78) [C = 76] ==> f469(A,B,C) = 118 + -1*C > 41 = f315(A,B,77) [C = 75] ==> f467(A,B,C) = 118 + -1*C > 42 = f315(A,B,76) [C = 74] ==> f465(A,B,C) = 118 + -1*C > 43 = f315(A,B,75) [C = 73] ==> f463(A,B,C) = 118 + -1*C > 44 = f315(A,B,74) [C = 72] ==> f461(A,B,C) = 118 + -1*C > 45 = f315(A,B,73) [C = 71] ==> f459(A,B,C) = 118 + -1*C > 46 = f315(A,B,72) [C = 70] ==> f457(A,B,C) = 118 + -1*C > 47 = f315(A,B,71) [C = 69] ==> f455(A,B,C) = 118 + -1*C > 48 = f315(A,B,70) [C = 68] ==> f453(A,B,C) = 118 + -1*C > 49 = f315(A,B,69) [C = 67] ==> f451(A,B,C) = 118 + -1*C > 50 = f315(A,B,68) [C = 66] ==> f449(A,B,C) = 118 + -1*C > 51 = f315(A,B,67) [C = 65] ==> f447(A,B,C) = 118 + -1*C > 52 = f315(A,B,66) [C = 63] ==> f443(A,B,C) = 118 + -1*C > 54 = f315(A,B,64) [C = 1] ==> f319(A,B,C) = 118 + -1*C > 116 = f315(A,B,2) [C = 0] ==> f315(A,B,C) = 118 + -1*C > 117 = f315(A,B,1) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 118 >= 118 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 118 >= 118 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 118 >= 118 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 118 >= 118 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 118 >= 118 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 118 >= 118 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 118 >= 118 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 118 >= 118 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 118 >= 118 = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 118 >= 118 = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 118 >= 118 = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 118 >= 118 = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 118 >= 118 = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 118 >= 118 = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 118 >= 118 = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 118 >= 118 = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 118 >= 118 = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 118 >= 118 = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 118 >= 118 = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 118 >= 118 = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 118 >= 118 = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 118 >= 118 = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 118 >= 118 = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 118 >= 118 = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 118 >= 118 = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 118 >= 118 = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 118 >= 118 = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 118 >= 118 = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 118 >= 118 = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 118 >= 118 = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 118 >= 118 = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 118 >= 118 = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 118 >= 118 = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 118 >= 118 = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 118 >= 118 = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 118 >= 118 = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 118 >= 118 = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 118 >= 118 = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 118 >= 118 = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 118 >= 118 = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 118 >= 118 = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 118 >= 118 = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 118 >= 118 = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 118 >= 118 = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 118 >= 118 = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 118 >= 118 = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 118 >= 118 = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 118 >= 118 = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 118 >= 118 = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 118 >= 118 = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 118 >= 118 = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 118 >= 118 = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 118 >= 118 = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 118 >= 118 = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 118 >= 118 = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 118 >= 118 = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 118 >= 118 = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 118 >= 118 = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 118 >= 118 = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 118 >= 118 = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 118 >= 118 = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 118 >= 118 = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 118 >= 118 = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 118 >= 118 = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 118 >= 118 = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 118 >= 118 = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = 118 + -1*C >= 118 + -1*C = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = 118 + -1*C >= 118 + -1*C = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = 118 + -1*C >= 118 + -1*C = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = 118 + -1*C >= 118 + -1*C = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = 118 + -1*C >= 118 + -1*C = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = 118 + -1*C >= 118 + -1*C = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = 118 + -1*C >= 118 + -1*C = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = 118 + -1*C >= 118 + -1*C = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = 118 + -1*C >= 118 + -1*C = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = 118 + -1*C >= 118 + -1*C = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = 118 + -1*C >= 118 + -1*C = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = 118 + -1*C >= 118 + -1*C = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = 118 + -1*C >= 118 + -1*C = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = 118 + -1*C >= 118 + -1*C = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = 118 + -1*C >= 118 + -1*C = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = 118 + -1*C >= 118 + -1*C = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = 118 + -1*C >= 118 + -1*C = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = 118 + -1*C >= 118 + -1*C = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = 118 + -1*C >= 118 + -1*C = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = 118 + -1*C >= 118 + -1*C = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = 118 + -1*C >= 118 + -1*C = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = 118 + -1*C >= 118 + -1*C = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = 118 + -1*C >= 118 + -1*C = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = 118 + -1*C >= 118 + -1*C = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = 118 + -1*C >= 118 + -1*C = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = 118 + -1*C >= 118 + -1*C = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = 118 + -1*C >= 118 + -1*C = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = 118 + -1*C >= 118 + -1*C = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = 118 + -1*C >= 118 + -1*C = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = 118 + -1*C >= 118 + -1*C = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = 118 + -1*C >= 118 + -1*C = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = 118 + -1*C >= 118 + -1*C = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = 118 + -1*C >= 118 + -1*C = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = 118 + -1*C >= 118 + -1*C = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = 118 + -1*C >= 118 + -1*C = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = 118 + -1*C >= 118 + -1*C = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = 118 + -1*C >= 118 + -1*C = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = 118 + -1*C >= 118 + -1*C = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = 118 + -1*C >= 118 + -1*C = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = 118 + -1*C >= 118 + -1*C = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = 118 + -1*C >= 118 + -1*C = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = 118 + -1*C >= 118 + -1*C = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = 118 + -1*C >= 118 + -1*C = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = 118 + -1*C >= 118 + -1*C = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = 118 + -1*C >= 118 + -1*C = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = 118 + -1*C >= 118 + -1*C = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = 118 + -1*C >= 118 + -1*C = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = 118 + -1*C >= 118 + -1*C = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = 118 + -1*C >= 118 + -1*C = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = 118 + -1*C >= 118 + -1*C = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = 118 + -1*C >= 118 + -1*C = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = 118 + -1*C >= 118 + -1*C = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = 118 + -1*C >= 118 + -1*C = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = 118 + -1*C >= 118 + -1*C = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = 118 + -1*C >= 118 + -1*C = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = 118 + -1*C >= 118 + -1*C = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = 118 + -1*C >= 118 + -1*C = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = 118 + -1*C >= 118 + -1*C = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = 118 + -1*C >= 118 + -1*C = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = 118 + -1*C >= 118 + -1*C = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = 118 + -1*C >= 118 + -1*C = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = 118 + -1*C >= 118 + -1*C = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = 118 + -1*C >= 118 + -1*C = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = 118 + -1*C >= 118 + -1*C = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = 118 + -1*C >= 118 + -1*C = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = 118 + -1*C >= 118 + -1*C = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = 118 + -1*C >= 118 + -1*C = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = 118 + -1*C >= 118 + -1*C = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = 118 + -1*C >= 118 + -1*C = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = 118 + -1*C >= 118 + -1*C = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = 118 + -1*C >= 118 + -1*C = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = 118 + -1*C >= 118 + -1*C = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = 118 + -1*C >= 118 + -1*C = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = 118 + -1*C >= 118 + -1*C = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = 118 + -1*C >= 118 + -1*C = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = 118 + -1*C >= 118 + -1*C = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = 118 + -1*C >= 118 + -1*C = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = 118 + -1*C >= 118 + -1*C = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = 118 + -1*C >= 118 + -1*C = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = 118 + -1*C >= 118 + -1*C = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = 118 + -1*C >= 118 + -1*C = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = 118 + -1*C >= 118 + -1*C = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = 118 + -1*C >= 118 + -1*C = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = 118 + -1*C >= 118 + -1*C = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = 118 + -1*C >= 118 + -1*C = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = 118 + -1*C >= 118 + -1*C = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = 118 + -1*C >= 118 + -1*C = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = 118 + -1*C >= 118 + -1*C = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = 118 + -1*C >= 118 + -1*C = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = 118 + -1*C >= 118 + -1*C = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = 118 + -1*C >= 118 + -1*C = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = 118 + -1*C >= 118 + -1*C = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = 118 + -1*C >= 118 + -1*C = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = 118 + -1*C >= 118 + -1*C = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = 118 + -1*C >= 118 + -1*C = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = 118 + -1*C >= 118 + -1*C = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = 118 + -1*C >= 118 + -1*C = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = 118 + -1*C >= 118 + -1*C = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = 118 + -1*C >= 118 + -1*C = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = 118 + -1*C >= 118 + -1*C = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = 118 + -1*C >= 118 + -1*C = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = 118 + -1*C >= 118 + -1*C = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = 118 + -1*C >= 118 + -1*C = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = 118 + -1*C >= 118 + -1*C = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = 118 + -1*C >= 118 + -1*C = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = 118 + -1*C >= 118 + -1*C = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = 118 + -1*C >= 118 + -1*C = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = 118 + -1*C >= 118 + -1*C = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = 118 + -1*C >= 118 + -1*C = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = 118 + -1*C >= 118 + -1*C = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = 118 + -1*C >= 118 + -1*C = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = 118 + -1*C >= 118 + -1*C = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = 118 + -1*C >= 118 + -1*C = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = 118 + -1*C >= 118 + -1*C = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = 118 + -1*C >= 118 + -1*C = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = 118 + -1*C >= 118 + -1*C = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = 118 + -1*C >= 118 + -1*C = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = 118 + -1*C >= 117 + -1*C = f555(A,B,C) True ==> f0(A,B,C) = 118 >= 118 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 118 >= 118 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 118 >= 118 = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = 118 + -1*C >= 118 + -1*C = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = 117 + -1*C >= 117 + -1*C = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = 117 + -1*C >= -2 = f315(A,B,120) [C = 118] ==> f553(A,B,C) = 118 + -1*C >= -1 = f315(A,B,119) [C = 99] ==> f515(A,B,C) = 118 + -1*C >= 18 = f315(A,B,100) [C = 64] ==> f445(A,B,C) = 118 + -1*C >= 53 = f315(A,B,65) [C = 62] ==> f441(A,B,C) = 118 + -1*C >= 55 = f315(A,B,63) [C = 61] ==> f439(A,B,C) = 118 + -1*C >= 56 = f315(A,B,62) [C = 60] ==> f437(A,B,C) = 118 + -1*C >= 57 = f315(A,B,61) [C = 59] ==> f435(A,B,C) = 118 + -1*C >= 58 = f315(A,B,60) [C = 58] ==> f433(A,B,C) = 118 + -1*C >= 59 = f315(A,B,59) [C = 57] ==> f431(A,B,C) = 118 + -1*C >= 60 = f315(A,B,58) [C = 56] ==> f429(A,B,C) = 118 + -1*C >= 61 = f315(A,B,57) [C = 55] ==> f427(A,B,C) = 118 + -1*C >= 62 = f315(A,B,56) [C = 54] ==> f425(A,B,C) = 118 + -1*C >= 63 = f315(A,B,55) [C = 53] ==> f423(A,B,C) = 118 + -1*C >= 64 = f315(A,B,54) [C = 52] ==> f421(A,B,C) = 118 + -1*C >= 65 = f315(A,B,53) [C = 51] ==> f419(A,B,C) = 118 + -1*C >= 66 = f315(A,B,52) [C = 50] ==> f417(A,B,C) = 118 + -1*C >= 67 = f315(A,B,51) [C = 49] ==> f415(A,B,C) = 118 + -1*C >= 68 = f315(A,B,50) [C = 48] ==> f413(A,B,C) = 118 + -1*C >= 69 = f315(A,B,49) [C = 47] ==> f411(A,B,C) = 118 + -1*C >= 70 = f315(A,B,48) [C = 46] ==> f409(A,B,C) = 118 + -1*C >= 71 = f315(A,B,47) [C = 45] ==> f407(A,B,C) = 118 + -1*C >= 72 = f315(A,B,46) [C = 44] ==> f405(A,B,C) = 118 + -1*C >= 73 = f315(A,B,45) [C = 43] ==> f403(A,B,C) = 118 + -1*C >= 74 = f315(A,B,44) [C = 42] ==> f401(A,B,C) = 118 + -1*C >= 75 = f315(A,B,43) [C = 41] ==> f399(A,B,C) = 118 + -1*C >= 76 = f315(A,B,42) [C = 40] ==> f397(A,B,C) = 118 + -1*C >= 77 = f315(A,B,41) [C = 39] ==> f395(A,B,C) = 118 + -1*C >= 78 = f315(A,B,40) [C = 38] ==> f393(A,B,C) = 118 + -1*C >= 79 = f315(A,B,39) [C = 37] ==> f391(A,B,C) = 118 + -1*C >= 80 = f315(A,B,38) [C = 36] ==> f389(A,B,C) = 118 + -1*C >= 81 = f315(A,B,37) [C = 35] ==> f387(A,B,C) = 118 + -1*C >= 82 = f315(A,B,36) [C = 34] ==> f385(A,B,C) = 118 + -1*C >= 83 = f315(A,B,35) [C = 33] ==> f383(A,B,C) = 118 + -1*C >= 84 = f315(A,B,34) [C = 32] ==> f381(A,B,C) = 118 + -1*C >= 85 = f315(A,B,33) [C = 31] ==> f379(A,B,C) = 118 + -1*C >= 86 = f315(A,B,32) [C = 30] ==> f377(A,B,C) = 118 + -1*C >= 87 = f315(A,B,31) [C = 29] ==> f375(A,B,C) = 118 + -1*C >= 88 = f315(A,B,30) [C = 28] ==> f373(A,B,C) = 118 + -1*C >= 89 = f315(A,B,29) [C = 27] ==> f371(A,B,C) = 118 + -1*C >= 90 = f315(A,B,28) [C = 26] ==> f369(A,B,C) = 118 + -1*C >= 91 = f315(A,B,27) [C = 25] ==> f367(A,B,C) = 118 + -1*C >= 92 = f315(A,B,26) [C = 24] ==> f365(A,B,C) = 118 + -1*C >= 93 = f315(A,B,25) [C = 23] ==> f363(A,B,C) = 118 + -1*C >= 94 = f315(A,B,24) [C = 22] ==> f361(A,B,C) = 118 + -1*C >= 95 = f315(A,B,23) [C = 21] ==> f359(A,B,C) = 118 + -1*C >= 96 = f315(A,B,22) [C = 20] ==> f357(A,B,C) = 118 + -1*C >= 97 = f315(A,B,21) [C = 19] ==> f355(A,B,C) = 118 + -1*C >= 98 = f315(A,B,20) [C = 18] ==> f353(A,B,C) = 118 + -1*C >= 99 = f315(A,B,19) [C = 17] ==> f351(A,B,C) = 118 + -1*C >= 100 = f315(A,B,18) [C = 16] ==> f349(A,B,C) = 118 + -1*C >= 101 = f315(A,B,17) [C = 15] ==> f347(A,B,C) = 118 + -1*C >= 102 = f315(A,B,16) [C = 14] ==> f345(A,B,C) = 118 + -1*C >= 103 = f315(A,B,15) [C = 13] ==> f343(A,B,C) = 118 + -1*C >= 104 = f315(A,B,14) [C = 12] ==> f341(A,B,C) = 118 + -1*C >= 105 = f315(A,B,13) [C = 11] ==> f339(A,B,C) = 118 + -1*C >= 106 = f315(A,B,12) [C = 10] ==> f337(A,B,C) = 118 + -1*C >= 107 = f315(A,B,11) [C = 9] ==> f335(A,B,C) = 118 + -1*C >= 108 = f315(A,B,10) [C = 8] ==> f333(A,B,C) = 118 + -1*C >= 109 = f315(A,B,9) [C = 7] ==> f331(A,B,C) = 118 + -1*C >= 110 = f315(A,B,8) [C = 6] ==> f329(A,B,C) = 118 + -1*C >= 111 = f315(A,B,7) [C = 5] ==> f327(A,B,C) = 118 + -1*C >= 112 = f315(A,B,6) [C = 4] ==> f325(A,B,C) = 118 + -1*C >= 113 = f315(A,B,5) [C = 3] ==> f323(A,B,C) = 118 + -1*C >= 114 = f315(A,B,4) [C = 2] ==> f321(A,B,C) = 118 + -1*C >= 115 = f315(A,B,3) [C >= 120] ==> f315(A,B,C) = 118 + -1*C >= 118 + -1*C = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 118 >= 118 = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 118 >= 118 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 118 >= 118 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 118 >= 118 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 118 >= 118 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 118 >= 118 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 118 >= 118 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 118 >= 118 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 118 >= 118 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 118 >= 118 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 118 >= 118 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 118 >= 118 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 118 >= 118 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 118 >= 118 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 118 >= 118 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 118 >= 118 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 118 >= 118 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 118 >= 118 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 118 >= 118 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 118 >= 118 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 118 >= 118 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 118 >= 118 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 118 >= 118 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 118 >= 118 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 118 >= 118 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 118 >= 118 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 118 >= 118 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 118 >= 118 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 118 >= 118 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 118 >= 118 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 118 >= 118 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 118 >= 118 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 118 >= 118 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 118 >= 118 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 118 >= 118 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 118 >= 118 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 118 >= 118 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 118 >= 118 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 118 >= 118 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 118 >= 118 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 118 >= 118 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 118 >= 118 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 118 >= 118 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 118 >= 118 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 118 >= 118 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 118 >= 118 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 118 >= 118 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 118 >= 118 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 118 >= 118 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 118 >= 118 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 118 >= 118 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 118 >= 118 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 118 >= 118 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 118 >= 118 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 118 >= 118 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 118 >= 118 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 118 >= 118 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 118 >= 118 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 118 >= 118 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 118 >= 118 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 118 >= 118 = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = 118 >= 118 = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 118 >= 118 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 118 >= 118 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 118 >= 118 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 118 >= 118 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 118 >= 118 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 118 >= 118 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 118 >= 118 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 118 >= 118 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 118 >= 118 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 118 >= 118 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 118 >= 118 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 118 >= 118 = f61(A,0,C) * Step 8: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (?,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 4*x13 p(f101) = -1*x1 p(f103) = -1*x1 p(f105) = -1*x1 p(f107) = -1*x1 p(f109) = -1*x1 p(f11) = -1*x1 + 4*x13 p(f111) = -1*x1 p(f113) = -1*x1 p(f115) = -1*x1 p(f117) = -1*x1 p(f119) = -1*x1 p(f121) = -1*x1 p(f123) = -1*x1 p(f125) = -1*x1 p(f127) = -1*x1 p(f129) = -1*x1 p(f13) = -1*x1 + 4*x13 p(f131) = -1*x1 p(f133) = -1*x1 p(f135) = -1*x1 p(f137) = -1*x1 p(f139) = -1*x1 p(f141) = -1*x1 p(f143) = -1*x1 p(f145) = -1*x1 p(f147) = -1*x1 p(f149) = -1*x1 p(f15) = -1*x1 + 4*x13 p(f151) = -1*x1 p(f153) = -1*x1 p(f155) = -1*x1 p(f157) = -1*x1 p(f159) = -1*x1 p(f161) = -1*x1 p(f163) = -1*x1 p(f165) = -1*x1 p(f167) = -1*x1 p(f169) = -1*x1 p(f17) = -1*x1 + 3*x13 p(f171) = -1*x1 p(f173) = -1*x1 p(f175) = -1*x1 p(f177) = -1*x1 p(f179) = -1*x1 p(f181) = -1*x1 p(f19) = -1*x1 + 3*x13 p(f21) = -1*x1 + 3*x13 p(f23) = -1*x1 + 3*x13 p(f25) = -1*x1 + 3*x13 p(f27) = -1*x1 + 3*x13 p(f315) = -1*x1 p(f319) = -1*x1 p(f321) = -1*x1 p(f323) = -1*x1 p(f325) = -1*x1 p(f327) = -1*x1 p(f329) = -1*x1 p(f331) = -1*x1 p(f333) = -1*x1 p(f335) = -1*x1 p(f337) = -1*x1 p(f339) = -1*x1 p(f341) = -1*x1 p(f343) = -1*x1 p(f345) = -1*x1 p(f347) = -1*x1 p(f349) = -1*x1 p(f351) = -1*x1 p(f353) = -1*x1 p(f355) = -1*x1 p(f357) = -1*x1 p(f359) = -1*x1 p(f361) = -1*x1 p(f363) = -1*x1 p(f365) = -1*x1 p(f367) = -1*x1 p(f369) = -1*x1 p(f371) = -1*x1 p(f373) = -1*x1 p(f375) = -1*x1 p(f377) = -1*x1 p(f379) = -1*x1 p(f381) = -1*x1 p(f383) = -1*x1 p(f385) = -1*x1 p(f387) = -1*x1 p(f389) = -1*x1 p(f391) = -1*x1 p(f393) = -1*x1 p(f395) = -1*x1 p(f397) = -1*x1 p(f399) = -1*x1 p(f401) = -1*x1 p(f403) = -1*x1 p(f405) = -1*x1 p(f407) = -1*x1 p(f409) = -1*x1 p(f411) = -1*x1 p(f413) = -1*x1 p(f415) = -1*x1 p(f417) = -1*x1 p(f419) = -1*x1 p(f421) = -1*x1 p(f423) = -1*x1 p(f425) = -1*x1 p(f427) = -1*x1 p(f429) = -1*x1 p(f431) = -1*x1 p(f433) = -1*x1 p(f435) = -1*x1 p(f437) = -1*x1 p(f439) = -1*x1 p(f441) = -1*x1 p(f443) = -1*x1 p(f445) = -1*x1 p(f447) = -1*x1 p(f449) = -1*x1 p(f451) = -1*x1 p(f453) = -1*x1 p(f455) = -1*x1 p(f457) = -1*x1 p(f459) = -1*x1 p(f461) = -1*x1 p(f463) = -1*x1 p(f465) = -1*x1 p(f467) = -1*x1 p(f469) = -1*x1 p(f471) = -1*x1 p(f473) = -1*x1 p(f475) = -1*x1 p(f477) = -1*x1 p(f479) = -1*x1 p(f481) = -1*x1 p(f483) = -1*x1 p(f485) = -1*x1 p(f487) = -1*x1 p(f489) = -1*x1 p(f491) = -1*x1 p(f493) = -1*x1 p(f495) = -1*x1 p(f497) = -1*x1 p(f499) = -1*x1 p(f501) = -1*x1 p(f503) = -1*x1 p(f505) = -1*x1 p(f507) = -1*x1 p(f509) = -1*x1 p(f511) = -1*x1 p(f513) = -1*x1 p(f515) = -1*x1 p(f517) = -1*x1 p(f519) = -1*x1 p(f521) = -1*x1 p(f523) = -1*x1 p(f525) = -1*x1 p(f527) = -1*x1 p(f529) = -1*x1 p(f531) = -1*x1 p(f533) = -1*x1 p(f535) = -1*x1 p(f537) = -1*x1 p(f539) = -1*x1 p(f541) = -1*x1 p(f543) = -1*x1 p(f545) = -1*x1 p(f547) = -1*x1 p(f549) = -1*x1 p(f551) = -1*x1 p(f553) = -1*x1 p(f555) = -1*x1 p(f61) = -1*x1 p(f65) = -1*x1 p(f67) = -1*x1 p(f69) = -1*x1 p(f7) = -1*x1 + 4*x13 p(f71) = -1*x1 p(f73) = -1*x1 p(f75) = -1*x1 p(f77) = -1*x1 p(f79) = -1*x1 p(f808) = -1*x1 p(f81) = -1*x1 p(f83) = -1*x1 p(f85) = -1*x1 p(f87) = -1*x1 p(f89) = -1*x1 p(f91) = -1*x1 p(f93) = -1*x1 p(f95) = -1*x1 p(f97) = -1*x1 p(f99) = -1*x1 Following rules are strictly oriented: [A = 3] ==> f15(A,B,C) = 4 + -1*A > 0 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 4 + -1*A > 1 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 4 + -1*A > 2 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 4 + -1*A > 3 = f7(1,B,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 4 + -1*A >= 4 + -1*A = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 4 + -1*A >= 4 + -1*A = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 4 + -1*A >= 3 + -1*A = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 3 + -1*A >= 3 + -1*A = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 3 + -1*A >= 3 + -1*A = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 3 + -1*A >= 3 + -1*A = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 3 + -1*A >= 3 + -1*A = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 3 + -1*A >= 3 + -1*A = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = -1*A >= -1*A = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = -1*A >= -1*A = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = -1*A >= -1*A = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = -1*A >= -1*A = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = -1*A >= -1*A = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = -1*A >= -1*A = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = -1*A >= -1*A = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = -1*A >= -1*A = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = -1*A >= -1*A = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = -1*A >= -1*A = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = -1*A >= -1*A = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = -1*A >= -1*A = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = -1*A >= -1*A = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = -1*A >= -1*A = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = -1*A >= -1*A = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = -1*A >= -1*A = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = -1*A >= -1*A = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = -1*A >= -1*A = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = -1*A >= -1*A = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = -1*A >= -1*A = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = -1*A >= -1*A = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = -1*A >= -1*A = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = -1*A >= -1*A = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = -1*A >= -1*A = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = -1*A >= -1*A = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = -1*A >= -1*A = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = -1*A >= -1*A = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = -1*A >= -1*A = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = -1*A >= -1*A = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = -1*A >= -1*A = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = -1*A >= -1*A = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = -1*A >= -1*A = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = -1*A >= -1*A = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = -1*A >= -1*A = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = -1*A >= -1*A = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = -1*A >= -1*A = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = -1*A >= -1*A = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = -1*A >= -1*A = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = -1*A >= -1*A = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = -1*A >= -1*A = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = -1*A >= -1*A = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = -1*A >= -1*A = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = -1*A >= -1*A = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = -1*A >= -1*A = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = -1*A >= -1*A = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = -1*A >= -1*A = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = -1*A >= -1*A = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = -1*A >= -1*A = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = -1*A >= -1*A = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = -1*A >= -1*A = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = -1*A >= -1*A = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = -1*A >= -1*A = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = -1*A >= -1*A = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = -1*A >= -1*A = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = -1*A >= -1*A = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = -1*A >= -1*A = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = -1*A >= -1*A = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = -1*A >= -1*A = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*A >= -1*A = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*A >= -1*A = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*A >= -1*A = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*A >= -1*A = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*A >= -1*A = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*A >= -1*A = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*A >= -1*A = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*A >= -1*A = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*A >= -1*A = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*A >= -1*A = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*A >= -1*A = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*A >= -1*A = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*A >= -1*A = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*A >= -1*A = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*A >= -1*A = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*A >= -1*A = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*A >= -1*A = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*A >= -1*A = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*A >= -1*A = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*A >= -1*A = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*A >= -1*A = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*A >= -1*A = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*A >= -1*A = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*A >= -1*A = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*A >= -1*A = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*A >= -1*A = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*A >= -1*A = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*A >= -1*A = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*A >= -1*A = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*A >= -1*A = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*A >= -1*A = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*A >= -1*A = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*A >= -1*A = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*A >= -1*A = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*A >= -1*A = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*A >= -1*A = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*A >= -1*A = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*A >= -1*A = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*A >= -1*A = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*A >= -1*A = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*A >= -1*A = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*A >= -1*A = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*A >= -1*A = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*A >= -1*A = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*A >= -1*A = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*A >= -1*A = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*A >= -1*A = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*A >= -1*A = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*A >= -1*A = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*A >= -1*A = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*A >= -1*A = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*A >= -1*A = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*A >= -1*A = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*A >= -1*A = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*A >= -1*A = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*A >= -1*A = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*A >= -1*A = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*A >= -1*A = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*A >= -1*A = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*A >= -1*A = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*A >= -1*A = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*A >= -1*A = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*A >= -1*A = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*A >= -1*A = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*A >= -1*A = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*A >= -1*A = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*A >= -1*A = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*A >= -1*A = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*A >= -1*A = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*A >= -1*A = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*A >= -1*A = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*A >= -1*A = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*A >= -1*A = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*A >= -1*A = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*A >= -1*A = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*A >= -1*A = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*A >= -1*A = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*A >= -1*A = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*A >= -1*A = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*A >= -1*A = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*A >= -1*A = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*A >= -1*A = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*A >= -1*A = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*A >= -1*A = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*A >= -1*A = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*A >= -1*A = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*A >= -1*A = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*A >= -1*A = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*A >= -1*A = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*A >= -1*A = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*A >= -1*A = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*A >= -1*A = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*A >= -1*A = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*A >= -1*A = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*A >= -1*A = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*A >= -1*A = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*A >= -1*A = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*A >= -1*A = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*A >= -1*A = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*A >= -1*A = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*A >= -1*A = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*A >= -1*A = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*A >= -1*A = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*A >= -1*A = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*A >= -1*A = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*A >= -1*A = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*A >= -1*A = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*A >= -1*A = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*A >= -1*A = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*A >= -1*A = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*A >= -1*A = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*A >= -1*A = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*A >= -1*A = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*A >= -1*A = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*A >= -1*A = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*A >= -1*A = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*A >= -1*A = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*A >= -1*A = f555(A,B,C) True ==> f0(A,B,C) = 4 >= 4 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 4 + -1*A >= 4 + -1*A = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = -1*A >= -1*A = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*A >= -1*A = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*A >= -1*A = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*A >= -1*A = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*A >= -1*A = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*A >= -1*A = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*A >= -1*A = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*A >= -1*A = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*A >= -1*A = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*A >= -1*A = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*A >= -1*A = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*A >= -1*A = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*A >= -1*A = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*A >= -1*A = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*A >= -1*A = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*A >= -1*A = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*A >= -1*A = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*A >= -1*A = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*A >= -1*A = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*A >= -1*A = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*A >= -1*A = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*A >= -1*A = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*A >= -1*A = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*A >= -1*A = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*A >= -1*A = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*A >= -1*A = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*A >= -1*A = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*A >= -1*A = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*A >= -1*A = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*A >= -1*A = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*A >= -1*A = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*A >= -1*A = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*A >= -1*A = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*A >= -1*A = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*A >= -1*A = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*A >= -1*A = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*A >= -1*A = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*A >= -1*A = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*A >= -1*A = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*A >= -1*A = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*A >= -1*A = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*A >= -1*A = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*A >= -1*A = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*A >= -1*A = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*A >= -1*A = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*A >= -1*A = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*A >= -1*A = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*A >= -1*A = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*A >= -1*A = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*A >= -1*A = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*A >= -1*A = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*A >= -1*A = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*A >= -1*A = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*A >= -1*A = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*A >= -1*A = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*A >= -1*A = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*A >= -1*A = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*A >= -1*A = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*A >= -1*A = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*A >= -1*A = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*A >= -1*A = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*A >= -1*A = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*A >= -1*A = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*A >= -1*A = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*A >= -1*A = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*A >= -1*A = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*A >= -1*A = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*A >= -1*A = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*A >= -1*A = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*A >= -1*A = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*A >= -1*A = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*A >= -1*A = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*A >= -1*A = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*A >= -1*A = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*A >= -1*A = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*A >= -1*A = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*A >= -1*A = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*A >= -1*A = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*A >= -1*A = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*A >= -1*A = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*A >= -1*A = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*A >= -1*A = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*A >= -1*A = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*A >= -1*A = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*A >= -1*A = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*A >= -1*A = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*A >= -1*A = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*A >= -1*A = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*A >= -1*A = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*A >= -1*A = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*A >= -1*A = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*A >= -1*A = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*A >= -1*A = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*A >= -1*A = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*A >= -1*A = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*A >= -1*A = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*A >= -1*A = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*A >= -1*A = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*A >= -1*A = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*A >= -1*A = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*A >= -1*A = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*A >= -1*A = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*A >= -1*A = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*A >= -1*A = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*A >= -1*A = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*A >= -1*A = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*A >= -1*A = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*A >= -1*A = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*A >= -1*A = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*A >= -1*A = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*A >= -1*A = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*A >= -1*A = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*A >= -1*A = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*A >= -1*A = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*A >= -1*A = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*A >= -1*A = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*A >= -1*A = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*A >= -1*A = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*A >= -1*A = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*A >= -1*A = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*A >= -1*A = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*A >= -1*A = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*A >= -1*A = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*A >= -1*A = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = -1*A >= -1*A = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = -1*A >= -1*A = f61(A,60,C) [B = 58] ==> f179(A,B,C) = -1*A >= -1*A = f61(A,59,C) [B = 57] ==> f177(A,B,C) = -1*A >= -1*A = f61(A,58,C) [B = 56] ==> f175(A,B,C) = -1*A >= -1*A = f61(A,57,C) [B = 55] ==> f173(A,B,C) = -1*A >= -1*A = f61(A,56,C) [B = 54] ==> f171(A,B,C) = -1*A >= -1*A = f61(A,55,C) [B = 53] ==> f169(A,B,C) = -1*A >= -1*A = f61(A,54,C) [B = 52] ==> f167(A,B,C) = -1*A >= -1*A = f61(A,53,C) [B = 51] ==> f165(A,B,C) = -1*A >= -1*A = f61(A,52,C) [B = 50] ==> f163(A,B,C) = -1*A >= -1*A = f61(A,51,C) [B = 49] ==> f161(A,B,C) = -1*A >= -1*A = f61(A,50,C) [B = 48] ==> f159(A,B,C) = -1*A >= -1*A = f61(A,49,C) [B = 47] ==> f157(A,B,C) = -1*A >= -1*A = f61(A,48,C) [B = 46] ==> f155(A,B,C) = -1*A >= -1*A = f61(A,47,C) [B = 45] ==> f153(A,B,C) = -1*A >= -1*A = f61(A,46,C) [B = 44] ==> f151(A,B,C) = -1*A >= -1*A = f61(A,45,C) [B = 43] ==> f149(A,B,C) = -1*A >= -1*A = f61(A,44,C) [B = 42] ==> f147(A,B,C) = -1*A >= -1*A = f61(A,43,C) [B = 41] ==> f145(A,B,C) = -1*A >= -1*A = f61(A,42,C) [B = 40] ==> f143(A,B,C) = -1*A >= -1*A = f61(A,41,C) [B = 39] ==> f141(A,B,C) = -1*A >= -1*A = f61(A,40,C) [B = 38] ==> f139(A,B,C) = -1*A >= -1*A = f61(A,39,C) [B = 37] ==> f137(A,B,C) = -1*A >= -1*A = f61(A,38,C) [B = 36] ==> f135(A,B,C) = -1*A >= -1*A = f61(A,37,C) [B = 35] ==> f133(A,B,C) = -1*A >= -1*A = f61(A,36,C) [B = 34] ==> f131(A,B,C) = -1*A >= -1*A = f61(A,35,C) [B = 33] ==> f129(A,B,C) = -1*A >= -1*A = f61(A,34,C) [B = 32] ==> f127(A,B,C) = -1*A >= -1*A = f61(A,33,C) [B = 31] ==> f125(A,B,C) = -1*A >= -1*A = f61(A,32,C) [B = 30] ==> f123(A,B,C) = -1*A >= -1*A = f61(A,31,C) [B = 29] ==> f121(A,B,C) = -1*A >= -1*A = f61(A,30,C) [B = 28] ==> f119(A,B,C) = -1*A >= -1*A = f61(A,29,C) [B = 27] ==> f117(A,B,C) = -1*A >= -1*A = f61(A,28,C) [B = 26] ==> f115(A,B,C) = -1*A >= -1*A = f61(A,27,C) [B = 25] ==> f113(A,B,C) = -1*A >= -1*A = f61(A,26,C) [B = 24] ==> f111(A,B,C) = -1*A >= -1*A = f61(A,25,C) [B = 23] ==> f109(A,B,C) = -1*A >= -1*A = f61(A,24,C) [B = 22] ==> f107(A,B,C) = -1*A >= -1*A = f61(A,23,C) [B = 21] ==> f105(A,B,C) = -1*A >= -1*A = f61(A,22,C) [B = 20] ==> f103(A,B,C) = -1*A >= -1*A = f61(A,21,C) [B = 19] ==> f101(A,B,C) = -1*A >= -1*A = f61(A,20,C) [B = 18] ==> f99(A,B,C) = -1*A >= -1*A = f61(A,19,C) [B = 17] ==> f97(A,B,C) = -1*A >= -1*A = f61(A,18,C) [B = 16] ==> f95(A,B,C) = -1*A >= -1*A = f61(A,17,C) [B = 15] ==> f93(A,B,C) = -1*A >= -1*A = f61(A,16,C) [B = 14] ==> f91(A,B,C) = -1*A >= -1*A = f61(A,15,C) [B = 13] ==> f89(A,B,C) = -1*A >= -1*A = f61(A,14,C) [B = 12] ==> f87(A,B,C) = -1*A >= -1*A = f61(A,13,C) [B = 11] ==> f85(A,B,C) = -1*A >= -1*A = f61(A,12,C) [B = 10] ==> f83(A,B,C) = -1*A >= -1*A = f61(A,11,C) [B = 9] ==> f81(A,B,C) = -1*A >= -1*A = f61(A,10,C) [B = 8] ==> f79(A,B,C) = -1*A >= -1*A = f61(A,9,C) [B = 7] ==> f77(A,B,C) = -1*A >= -1*A = f61(A,8,C) [B = 6] ==> f75(A,B,C) = -1*A >= -1*A = f61(A,7,C) [B = 5] ==> f73(A,B,C) = -1*A >= -1*A = f61(A,6,C) [B = 4] ==> f71(A,B,C) = -1*A >= -1*A = f61(A,5,C) [B = 3] ==> f69(A,B,C) = -1*A >= -1*A = f61(A,4,C) [B = 2] ==> f67(A,B,C) = -1*A >= -1*A = f61(A,3,C) [B = 1] ==> f65(A,B,C) = -1*A >= -1*A = f61(A,2,C) [B = 0] ==> f61(A,B,C) = -1*A >= -1*A = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = -1*A >= -1*A = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 3 + -1*A >= 3 + -1*A = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 3 + -1*A >= -6 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 3 + -1*A >= -5 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 3 + -1*A >= -4 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 3 + -1*A >= -3 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 3 + -1*A >= -2 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 3 + -1*A >= -1 = f7(5,B,C) [A >= 10] ==> f7(A,B,C) = 4 + -1*A >= -1*A = f61(A,0,C) * Step 9: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (?,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 5*x13 p(f101) = -1*x1 p(f103) = -1*x1 p(f105) = -1*x1 p(f107) = -1*x1 p(f109) = -1*x1 p(f11) = -1*x1 + 5*x13 p(f111) = -1*x1 p(f113) = -1*x1 p(f115) = -1*x1 p(f117) = -1*x1 p(f119) = -1*x1 p(f121) = -1*x1 p(f123) = -1*x1 p(f125) = -1*x1 p(f127) = -1*x1 p(f129) = -1*x1 p(f13) = -1*x1 + 5*x13 p(f131) = -1*x1 p(f133) = -1*x1 p(f135) = -1*x1 p(f137) = -1*x1 p(f139) = -1*x1 p(f141) = -1*x1 p(f143) = -1*x1 p(f145) = -1*x1 p(f147) = -1*x1 p(f149) = -1*x1 p(f15) = -1*x1 + 5*x13 p(f151) = -1*x1 p(f153) = -1*x1 p(f155) = -1*x1 p(f157) = -1*x1 p(f159) = -1*x1 p(f161) = -1*x1 p(f163) = -1*x1 p(f165) = -1*x1 p(f167) = -1*x1 p(f169) = -1*x1 p(f17) = -1*x1 + 5*x13 p(f171) = -1*x1 p(f173) = -1*x1 p(f175) = -1*x1 p(f177) = -1*x1 p(f179) = -1*x1 p(f181) = -1*x1 p(f19) = -1*x1 + 4*x13 p(f21) = -1*x1 + 4*x13 p(f23) = -1*x1 + 4*x13 p(f25) = -1*x1 + 4*x13 p(f27) = -1*x1 + 4*x13 p(f315) = -1*x1 p(f319) = -1*x1 p(f321) = -1*x1 p(f323) = -1*x1 p(f325) = -1*x1 p(f327) = -1*x1 p(f329) = -1*x1 p(f331) = -1*x1 p(f333) = -1*x1 p(f335) = -1*x1 p(f337) = -1*x1 p(f339) = -1*x1 p(f341) = -1*x1 p(f343) = -1*x1 p(f345) = -1*x1 p(f347) = -1*x1 p(f349) = -1*x1 p(f351) = -1*x1 p(f353) = -1*x1 p(f355) = -1*x1 p(f357) = -1*x1 p(f359) = -1*x1 p(f361) = -1*x1 p(f363) = -1*x1 p(f365) = -1*x1 p(f367) = -1*x1 p(f369) = -1*x1 p(f371) = -1*x1 p(f373) = -1*x1 p(f375) = -1*x1 p(f377) = -1*x1 p(f379) = -1*x1 p(f381) = -1*x1 p(f383) = -1*x1 p(f385) = -1*x1 p(f387) = -1*x1 p(f389) = -1*x1 p(f391) = -1*x1 p(f393) = -1*x1 p(f395) = -1*x1 p(f397) = -1*x1 p(f399) = -1*x1 p(f401) = -1*x1 p(f403) = -1*x1 p(f405) = -1*x1 p(f407) = -1*x1 p(f409) = -1*x1 p(f411) = -1*x1 p(f413) = -1*x1 p(f415) = -1*x1 p(f417) = -1*x1 p(f419) = -1*x1 p(f421) = -1*x1 p(f423) = -1*x1 p(f425) = -1*x1 p(f427) = -1*x1 p(f429) = -1*x1 p(f431) = -1*x1 p(f433) = -1*x1 p(f435) = -1*x1 p(f437) = -1*x1 p(f439) = -1*x1 p(f441) = -1*x1 p(f443) = -1*x1 p(f445) = -1*x1 p(f447) = -1*x1 p(f449) = -1*x1 p(f451) = -1*x1 p(f453) = -1*x1 p(f455) = -1*x1 p(f457) = -1*x1 p(f459) = -1*x1 p(f461) = -1*x1 p(f463) = -1*x1 p(f465) = -1*x1 p(f467) = -1*x1 p(f469) = -1*x1 p(f471) = -1*x1 p(f473) = -1*x1 p(f475) = -1*x1 p(f477) = -1*x1 p(f479) = -1*x1 p(f481) = -1*x1 p(f483) = -1*x1 p(f485) = -1*x1 p(f487) = -1*x1 p(f489) = -1*x1 p(f491) = -1*x1 p(f493) = -1*x1 p(f495) = -1*x1 p(f497) = -1*x1 p(f499) = -1*x1 p(f501) = -1*x1 p(f503) = -1*x1 p(f505) = -1*x1 p(f507) = -1*x1 p(f509) = -1*x1 p(f511) = -1*x1 p(f513) = -1*x1 p(f515) = -1*x1 p(f517) = -1*x1 p(f519) = -1*x1 p(f521) = -1*x1 p(f523) = -1*x1 p(f525) = -1*x1 p(f527) = -1*x1 p(f529) = -1*x1 p(f531) = -1*x1 p(f533) = -1*x1 p(f535) = -1*x1 p(f537) = -1*x1 p(f539) = -1*x1 p(f541) = -1*x1 p(f543) = -1*x1 p(f545) = -1*x1 p(f547) = -1*x1 p(f549) = -1*x1 p(f551) = -1*x1 p(f553) = -1*x1 p(f555) = -1*x1 p(f61) = -1*x1 p(f65) = -1*x1 p(f67) = -1*x1 p(f69) = -1*x1 p(f7) = -1*x1 + 5*x13 p(f71) = -1*x1 p(f73) = -1*x1 p(f75) = -1*x1 p(f77) = -1*x1 p(f79) = -1*x1 p(f808) = -1*x1 p(f81) = -1*x1 p(f83) = -1*x1 p(f85) = -1*x1 p(f87) = -1*x1 p(f89) = -1*x1 p(f91) = -1*x1 p(f93) = -1*x1 p(f95) = -1*x1 p(f97) = -1*x1 p(f99) = -1*x1 Following rules are strictly oriented: [A = 4] ==> f17(A,B,C) = 5 + -1*A > 0 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 5 + -1*A > 1 = f7(4,B,C) [A = 1] ==> f11(A,B,C) = 5 + -1*A > 3 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 5 + -1*A > 4 = f7(1,B,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 5 + -1*A >= 5 + -1*A = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 5 + -1*A >= 5 + -1*A = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 5 + -1*A >= 5 + -1*A = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 5 + -1*A >= 4 + -1*A = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 4 + -1*A >= 4 + -1*A = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 4 + -1*A >= 4 + -1*A = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 4 + -1*A >= 4 + -1*A = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 4 + -1*A >= 4 + -1*A = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = -1*A >= -1*A = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = -1*A >= -1*A = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = -1*A >= -1*A = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = -1*A >= -1*A = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = -1*A >= -1*A = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = -1*A >= -1*A = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = -1*A >= -1*A = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = -1*A >= -1*A = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = -1*A >= -1*A = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = -1*A >= -1*A = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = -1*A >= -1*A = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = -1*A >= -1*A = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = -1*A >= -1*A = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = -1*A >= -1*A = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = -1*A >= -1*A = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = -1*A >= -1*A = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = -1*A >= -1*A = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = -1*A >= -1*A = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = -1*A >= -1*A = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = -1*A >= -1*A = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = -1*A >= -1*A = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = -1*A >= -1*A = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = -1*A >= -1*A = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = -1*A >= -1*A = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = -1*A >= -1*A = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = -1*A >= -1*A = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = -1*A >= -1*A = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = -1*A >= -1*A = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = -1*A >= -1*A = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = -1*A >= -1*A = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = -1*A >= -1*A = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = -1*A >= -1*A = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = -1*A >= -1*A = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = -1*A >= -1*A = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = -1*A >= -1*A = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = -1*A >= -1*A = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = -1*A >= -1*A = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = -1*A >= -1*A = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = -1*A >= -1*A = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = -1*A >= -1*A = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = -1*A >= -1*A = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = -1*A >= -1*A = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = -1*A >= -1*A = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = -1*A >= -1*A = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = -1*A >= -1*A = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = -1*A >= -1*A = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = -1*A >= -1*A = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = -1*A >= -1*A = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = -1*A >= -1*A = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = -1*A >= -1*A = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = -1*A >= -1*A = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = -1*A >= -1*A = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = -1*A >= -1*A = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = -1*A >= -1*A = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = -1*A >= -1*A = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = -1*A >= -1*A = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = -1*A >= -1*A = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = -1*A >= -1*A = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*A >= -1*A = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*A >= -1*A = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*A >= -1*A = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*A >= -1*A = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*A >= -1*A = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*A >= -1*A = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*A >= -1*A = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*A >= -1*A = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*A >= -1*A = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*A >= -1*A = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*A >= -1*A = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*A >= -1*A = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*A >= -1*A = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*A >= -1*A = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*A >= -1*A = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*A >= -1*A = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*A >= -1*A = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*A >= -1*A = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*A >= -1*A = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*A >= -1*A = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*A >= -1*A = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*A >= -1*A = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*A >= -1*A = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*A >= -1*A = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*A >= -1*A = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*A >= -1*A = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*A >= -1*A = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*A >= -1*A = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*A >= -1*A = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*A >= -1*A = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*A >= -1*A = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*A >= -1*A = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*A >= -1*A = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*A >= -1*A = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*A >= -1*A = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*A >= -1*A = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*A >= -1*A = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*A >= -1*A = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*A >= -1*A = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*A >= -1*A = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*A >= -1*A = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*A >= -1*A = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*A >= -1*A = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*A >= -1*A = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*A >= -1*A = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*A >= -1*A = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*A >= -1*A = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*A >= -1*A = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*A >= -1*A = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*A >= -1*A = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*A >= -1*A = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*A >= -1*A = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*A >= -1*A = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*A >= -1*A = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*A >= -1*A = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*A >= -1*A = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*A >= -1*A = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*A >= -1*A = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*A >= -1*A = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*A >= -1*A = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*A >= -1*A = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*A >= -1*A = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*A >= -1*A = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*A >= -1*A = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*A >= -1*A = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*A >= -1*A = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*A >= -1*A = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*A >= -1*A = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*A >= -1*A = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*A >= -1*A = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*A >= -1*A = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*A >= -1*A = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*A >= -1*A = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*A >= -1*A = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*A >= -1*A = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*A >= -1*A = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*A >= -1*A = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*A >= -1*A = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*A >= -1*A = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*A >= -1*A = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*A >= -1*A = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*A >= -1*A = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*A >= -1*A = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*A >= -1*A = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*A >= -1*A = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*A >= -1*A = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*A >= -1*A = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*A >= -1*A = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*A >= -1*A = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*A >= -1*A = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*A >= -1*A = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*A >= -1*A = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*A >= -1*A = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*A >= -1*A = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*A >= -1*A = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*A >= -1*A = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*A >= -1*A = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*A >= -1*A = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*A >= -1*A = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*A >= -1*A = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*A >= -1*A = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*A >= -1*A = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*A >= -1*A = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*A >= -1*A = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*A >= -1*A = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*A >= -1*A = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*A >= -1*A = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*A >= -1*A = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*A >= -1*A = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*A >= -1*A = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*A >= -1*A = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*A >= -1*A = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*A >= -1*A = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*A >= -1*A = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*A >= -1*A = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*A >= -1*A = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*A >= -1*A = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*A >= -1*A = f555(A,B,C) True ==> f0(A,B,C) = 5 >= 5 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 5 + -1*A >= 5 + -1*A = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = -1*A >= -1*A = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*A >= -1*A = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*A >= -1*A = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*A >= -1*A = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*A >= -1*A = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*A >= -1*A = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*A >= -1*A = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*A >= -1*A = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*A >= -1*A = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*A >= -1*A = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*A >= -1*A = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*A >= -1*A = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*A >= -1*A = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*A >= -1*A = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*A >= -1*A = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*A >= -1*A = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*A >= -1*A = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*A >= -1*A = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*A >= -1*A = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*A >= -1*A = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*A >= -1*A = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*A >= -1*A = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*A >= -1*A = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*A >= -1*A = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*A >= -1*A = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*A >= -1*A = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*A >= -1*A = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*A >= -1*A = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*A >= -1*A = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*A >= -1*A = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*A >= -1*A = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*A >= -1*A = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*A >= -1*A = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*A >= -1*A = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*A >= -1*A = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*A >= -1*A = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*A >= -1*A = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*A >= -1*A = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*A >= -1*A = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*A >= -1*A = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*A >= -1*A = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*A >= -1*A = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*A >= -1*A = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*A >= -1*A = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*A >= -1*A = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*A >= -1*A = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*A >= -1*A = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*A >= -1*A = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*A >= -1*A = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*A >= -1*A = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*A >= -1*A = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*A >= -1*A = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*A >= -1*A = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*A >= -1*A = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*A >= -1*A = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*A >= -1*A = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*A >= -1*A = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*A >= -1*A = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*A >= -1*A = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*A >= -1*A = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*A >= -1*A = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*A >= -1*A = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*A >= -1*A = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*A >= -1*A = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*A >= -1*A = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*A >= -1*A = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*A >= -1*A = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*A >= -1*A = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*A >= -1*A = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*A >= -1*A = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*A >= -1*A = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*A >= -1*A = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*A >= -1*A = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*A >= -1*A = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*A >= -1*A = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*A >= -1*A = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*A >= -1*A = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*A >= -1*A = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*A >= -1*A = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*A >= -1*A = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*A >= -1*A = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*A >= -1*A = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*A >= -1*A = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*A >= -1*A = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*A >= -1*A = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*A >= -1*A = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*A >= -1*A = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*A >= -1*A = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*A >= -1*A = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*A >= -1*A = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*A >= -1*A = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*A >= -1*A = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*A >= -1*A = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*A >= -1*A = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*A >= -1*A = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*A >= -1*A = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*A >= -1*A = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*A >= -1*A = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*A >= -1*A = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*A >= -1*A = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*A >= -1*A = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*A >= -1*A = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*A >= -1*A = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*A >= -1*A = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*A >= -1*A = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*A >= -1*A = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*A >= -1*A = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*A >= -1*A = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*A >= -1*A = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*A >= -1*A = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*A >= -1*A = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*A >= -1*A = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*A >= -1*A = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*A >= -1*A = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*A >= -1*A = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*A >= -1*A = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*A >= -1*A = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*A >= -1*A = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*A >= -1*A = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*A >= -1*A = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*A >= -1*A = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*A >= -1*A = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*A >= -1*A = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*A >= -1*A = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = -1*A >= -1*A = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = -1*A >= -1*A = f61(A,60,C) [B = 58] ==> f179(A,B,C) = -1*A >= -1*A = f61(A,59,C) [B = 57] ==> f177(A,B,C) = -1*A >= -1*A = f61(A,58,C) [B = 56] ==> f175(A,B,C) = -1*A >= -1*A = f61(A,57,C) [B = 55] ==> f173(A,B,C) = -1*A >= -1*A = f61(A,56,C) [B = 54] ==> f171(A,B,C) = -1*A >= -1*A = f61(A,55,C) [B = 53] ==> f169(A,B,C) = -1*A >= -1*A = f61(A,54,C) [B = 52] ==> f167(A,B,C) = -1*A >= -1*A = f61(A,53,C) [B = 51] ==> f165(A,B,C) = -1*A >= -1*A = f61(A,52,C) [B = 50] ==> f163(A,B,C) = -1*A >= -1*A = f61(A,51,C) [B = 49] ==> f161(A,B,C) = -1*A >= -1*A = f61(A,50,C) [B = 48] ==> f159(A,B,C) = -1*A >= -1*A = f61(A,49,C) [B = 47] ==> f157(A,B,C) = -1*A >= -1*A = f61(A,48,C) [B = 46] ==> f155(A,B,C) = -1*A >= -1*A = f61(A,47,C) [B = 45] ==> f153(A,B,C) = -1*A >= -1*A = f61(A,46,C) [B = 44] ==> f151(A,B,C) = -1*A >= -1*A = f61(A,45,C) [B = 43] ==> f149(A,B,C) = -1*A >= -1*A = f61(A,44,C) [B = 42] ==> f147(A,B,C) = -1*A >= -1*A = f61(A,43,C) [B = 41] ==> f145(A,B,C) = -1*A >= -1*A = f61(A,42,C) [B = 40] ==> f143(A,B,C) = -1*A >= -1*A = f61(A,41,C) [B = 39] ==> f141(A,B,C) = -1*A >= -1*A = f61(A,40,C) [B = 38] ==> f139(A,B,C) = -1*A >= -1*A = f61(A,39,C) [B = 37] ==> f137(A,B,C) = -1*A >= -1*A = f61(A,38,C) [B = 36] ==> f135(A,B,C) = -1*A >= -1*A = f61(A,37,C) [B = 35] ==> f133(A,B,C) = -1*A >= -1*A = f61(A,36,C) [B = 34] ==> f131(A,B,C) = -1*A >= -1*A = f61(A,35,C) [B = 33] ==> f129(A,B,C) = -1*A >= -1*A = f61(A,34,C) [B = 32] ==> f127(A,B,C) = -1*A >= -1*A = f61(A,33,C) [B = 31] ==> f125(A,B,C) = -1*A >= -1*A = f61(A,32,C) [B = 30] ==> f123(A,B,C) = -1*A >= -1*A = f61(A,31,C) [B = 29] ==> f121(A,B,C) = -1*A >= -1*A = f61(A,30,C) [B = 28] ==> f119(A,B,C) = -1*A >= -1*A = f61(A,29,C) [B = 27] ==> f117(A,B,C) = -1*A >= -1*A = f61(A,28,C) [B = 26] ==> f115(A,B,C) = -1*A >= -1*A = f61(A,27,C) [B = 25] ==> f113(A,B,C) = -1*A >= -1*A = f61(A,26,C) [B = 24] ==> f111(A,B,C) = -1*A >= -1*A = f61(A,25,C) [B = 23] ==> f109(A,B,C) = -1*A >= -1*A = f61(A,24,C) [B = 22] ==> f107(A,B,C) = -1*A >= -1*A = f61(A,23,C) [B = 21] ==> f105(A,B,C) = -1*A >= -1*A = f61(A,22,C) [B = 20] ==> f103(A,B,C) = -1*A >= -1*A = f61(A,21,C) [B = 19] ==> f101(A,B,C) = -1*A >= -1*A = f61(A,20,C) [B = 18] ==> f99(A,B,C) = -1*A >= -1*A = f61(A,19,C) [B = 17] ==> f97(A,B,C) = -1*A >= -1*A = f61(A,18,C) [B = 16] ==> f95(A,B,C) = -1*A >= -1*A = f61(A,17,C) [B = 15] ==> f93(A,B,C) = -1*A >= -1*A = f61(A,16,C) [B = 14] ==> f91(A,B,C) = -1*A >= -1*A = f61(A,15,C) [B = 13] ==> f89(A,B,C) = -1*A >= -1*A = f61(A,14,C) [B = 12] ==> f87(A,B,C) = -1*A >= -1*A = f61(A,13,C) [B = 11] ==> f85(A,B,C) = -1*A >= -1*A = f61(A,12,C) [B = 10] ==> f83(A,B,C) = -1*A >= -1*A = f61(A,11,C) [B = 9] ==> f81(A,B,C) = -1*A >= -1*A = f61(A,10,C) [B = 8] ==> f79(A,B,C) = -1*A >= -1*A = f61(A,9,C) [B = 7] ==> f77(A,B,C) = -1*A >= -1*A = f61(A,8,C) [B = 6] ==> f75(A,B,C) = -1*A >= -1*A = f61(A,7,C) [B = 5] ==> f73(A,B,C) = -1*A >= -1*A = f61(A,6,C) [B = 4] ==> f71(A,B,C) = -1*A >= -1*A = f61(A,5,C) [B = 3] ==> f69(A,B,C) = -1*A >= -1*A = f61(A,4,C) [B = 2] ==> f67(A,B,C) = -1*A >= -1*A = f61(A,3,C) [B = 1] ==> f65(A,B,C) = -1*A >= -1*A = f61(A,2,C) [B = 0] ==> f61(A,B,C) = -1*A >= -1*A = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = -1*A >= -1*A = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 4 + -1*A >= 4 + -1*A = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 4 + -1*A >= -5 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 4 + -1*A >= -4 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 4 + -1*A >= -3 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 4 + -1*A >= -2 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 4 + -1*A >= -1 = f7(6,B,C) [A = 2] ==> f13(A,B,C) = 5 + -1*A >= 2 = f7(3,B,C) [A >= 10] ==> f7(A,B,C) = 5 + -1*A >= -1*A = f61(A,0,C) * Step 10: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (?,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 11*x13 p(f101) = -1*x1 + -49*x13 p(f103) = -1*x1 + -49*x13 p(f105) = -1*x1 + -49*x13 p(f107) = -1*x1 + -49*x13 p(f109) = -1*x1 + -49*x13 p(f11) = -1*x1 + 10*x13 p(f111) = -1*x1 + -49*x13 p(f113) = -1*x1 + -49*x13 p(f115) = -1*x1 + -49*x13 p(f117) = -1*x1 + -49*x13 p(f119) = -1*x1 + -49*x13 p(f121) = -1*x1 + -49*x13 p(f123) = -1*x1 + -49*x13 p(f125) = -1*x1 + -49*x13 p(f127) = -1*x1 + -49*x13 p(f129) = -1*x1 + -49*x13 p(f13) = -1*x1 + 10*x13 p(f131) = -1*x1 + -49*x13 p(f133) = -1*x1 + -49*x13 p(f135) = -1*x1 + -49*x13 p(f137) = -1*x1 + -49*x13 p(f139) = -1*x1 + -49*x13 p(f141) = -1*x1 + -49*x13 p(f143) = -1*x1 + -49*x13 p(f145) = -1*x1 + -49*x13 p(f147) = -1*x1 + -49*x13 p(f149) = -1*x1 + -49*x13 p(f15) = -1*x1 + 10*x13 p(f151) = -1*x1 + -49*x13 p(f153) = -1*x1 + -49*x13 p(f155) = -1*x1 + -49*x13 p(f157) = -1*x1 + -49*x13 p(f159) = -1*x1 + -49*x13 p(f161) = -1*x1 + -49*x13 p(f163) = -1*x1 + -49*x13 p(f165) = -1*x1 + -49*x13 p(f167) = -1*x1 + -49*x13 p(f169) = -1*x1 + -49*x13 p(f17) = -1*x1 + 10*x13 p(f171) = -1*x1 + -49*x13 p(f173) = -1*x1 + -49*x13 p(f175) = -1*x1 + -49*x13 p(f177) = -1*x1 + -49*x13 p(f179) = -1*x1 + -49*x13 p(f181) = -1*x1 + -49*x13 p(f19) = -1*x1 + 10*x13 p(f21) = -1*x1 + 10*x13 p(f23) = -1*x1 + 10*x13 p(f25) = -1*x1 + 10*x13 p(f27) = -1*x1 + 10*x13 p(f315) = -1*x1 + -1*x2 + x13 p(f319) = -1*x1 + -1*x2 + x13 p(f321) = -1*x1 + -1*x2 + x13 p(f323) = -1*x1 + -1*x2 + x13 p(f325) = -1*x1 + -1*x2 + x13 p(f327) = -1*x1 + -1*x2 + x13 p(f329) = -1*x1 + -1*x2 + x13 p(f331) = -1*x1 + -1*x2 + x13 p(f333) = -1*x1 + -1*x2 + x13 p(f335) = -1*x1 + -1*x2 + x13 p(f337) = -1*x1 + -1*x2 + x13 p(f339) = -1*x1 + -1*x2 + x13 p(f341) = -1*x1 + -1*x2 + x13 p(f343) = -1*x1 + -1*x2 + x13 p(f345) = -1*x1 + -1*x2 + x13 p(f347) = -1*x1 + -1*x2 + x13 p(f349) = -1*x1 + -1*x2 + x13 p(f351) = -1*x1 + -1*x2 + x13 p(f353) = -1*x1 + -1*x2 + x13 p(f355) = -1*x1 + -1*x2 + x13 p(f357) = -1*x1 + -1*x2 + x13 p(f359) = -1*x1 + -1*x2 + x13 p(f361) = -1*x1 + -1*x2 + x13 p(f363) = -1*x1 + -1*x2 + x13 p(f365) = -1*x1 + -1*x2 + x13 p(f367) = -1*x1 + -1*x2 + x13 p(f369) = -1*x1 + -1*x2 + x13 p(f371) = -1*x1 + -1*x2 + x13 p(f373) = -1*x1 + -1*x2 + x13 p(f375) = -1*x1 + -1*x2 + x13 p(f377) = -1*x1 + -1*x2 + x13 p(f379) = -1*x1 + -1*x2 + x13 p(f381) = -1*x1 + -1*x2 + x13 p(f383) = -1*x1 + -1*x2 + x13 p(f385) = -1*x1 + -1*x2 + x13 p(f387) = -1*x1 + -1*x2 + x13 p(f389) = -1*x1 + -1*x2 + x13 p(f391) = -1*x1 + -1*x2 + x13 p(f393) = -1*x1 + -1*x2 + x13 p(f395) = -1*x1 + -1*x2 + x13 p(f397) = -1*x1 + -1*x2 + x13 p(f399) = -1*x1 + -1*x2 + x13 p(f401) = -1*x1 + -1*x2 + x13 p(f403) = -1*x1 + -1*x2 + x13 p(f405) = -1*x1 + -1*x2 + x13 p(f407) = -1*x1 + -1*x2 + x13 p(f409) = -1*x1 + -1*x2 + x13 p(f411) = -1*x1 + -1*x2 + x13 p(f413) = -1*x1 + -1*x2 + x13 p(f415) = -1*x1 + -1*x2 + x13 p(f417) = -1*x1 + -1*x2 + x13 p(f419) = -1*x1 + -1*x2 + x13 p(f421) = -1*x1 + -1*x2 + x13 p(f423) = -1*x1 + -1*x2 + x13 p(f425) = -1*x1 + -1*x2 + x13 p(f427) = -1*x1 + -1*x2 + x13 p(f429) = -1*x1 + -1*x2 + x13 p(f431) = -1*x1 + -1*x2 + x13 p(f433) = -1*x1 + -1*x2 + x13 p(f435) = -1*x1 + -1*x2 + x13 p(f437) = -1*x1 + -1*x2 + x13 p(f439) = -1*x1 + -1*x2 + x13 p(f441) = -1*x1 + -1*x2 + x13 p(f443) = -1*x1 + -1*x2 + x13 p(f445) = -1*x1 + -1*x2 + x13 p(f447) = -1*x1 + -1*x2 + x13 p(f449) = -1*x1 + -1*x2 + x13 p(f451) = -1*x1 + -1*x2 + x13 p(f453) = -1*x1 + -1*x2 + x13 p(f455) = -1*x1 + -1*x2 + x13 p(f457) = -1*x1 + -1*x2 + x13 p(f459) = -1*x1 + -1*x2 + x13 p(f461) = -1*x1 + -1*x2 + x13 p(f463) = -1*x1 + -1*x2 + x13 p(f465) = -1*x1 + -1*x2 + x13 p(f467) = -1*x1 + -1*x2 + x13 p(f469) = -1*x1 + -1*x2 + x13 p(f471) = -1*x1 + -1*x2 + x13 p(f473) = -1*x1 + -1*x2 + x13 p(f475) = -1*x1 + -1*x2 + x13 p(f477) = -1*x1 + -1*x2 + x13 p(f479) = -1*x1 + -1*x2 + x13 p(f481) = -1*x1 + -1*x2 + x13 p(f483) = -1*x1 + -1*x2 + x13 p(f485) = -1*x1 + -1*x2 + x13 p(f487) = -1*x1 + -1*x2 + x13 p(f489) = -1*x1 + -1*x2 + x13 p(f491) = -1*x1 + -1*x2 + x13 p(f493) = -1*x1 + -1*x2 + x13 p(f495) = -1*x1 + -1*x2 + x13 p(f497) = -1*x1 + -1*x2 + x13 p(f499) = -1*x1 + -1*x2 + x13 p(f501) = -1*x1 + -1*x2 + x13 p(f503) = -1*x1 + -1*x2 + x13 p(f505) = -1*x1 + -1*x2 + x13 p(f507) = -1*x1 + -1*x2 + x13 p(f509) = -1*x1 + -1*x2 + x13 p(f511) = -1*x1 + -1*x2 + x13 p(f513) = -1*x1 + -1*x2 + x13 p(f515) = -1*x1 + -1*x2 + x13 p(f517) = -1*x1 + -1*x2 + x13 p(f519) = -1*x1 + -1*x2 + x13 p(f521) = -1*x1 + -1*x2 + x13 p(f523) = -1*x1 + -1*x2 + x13 p(f525) = -1*x1 + -1*x2 + x13 p(f527) = -1*x1 + -1*x2 + x13 p(f529) = -1*x1 + -1*x2 + x13 p(f531) = -1*x1 + -1*x2 + x13 p(f533) = -1*x1 + -1*x2 + x13 p(f535) = -1*x1 + -1*x2 + x13 p(f537) = -1*x1 + -1*x2 + x13 p(f539) = -1*x1 + -1*x2 + x13 p(f541) = -1*x1 + -1*x2 + x13 p(f543) = -1*x1 + -1*x2 + x13 p(f545) = -1*x1 + -1*x2 + x13 p(f547) = -1*x1 + -1*x2 + x13 p(f549) = -1*x1 + -1*x2 + x13 p(f551) = -1*x1 + -1*x2 + x13 p(f553) = -1*x1 + -1*x2 + x13 p(f555) = -1*x1 + -1*x2 + x13 p(f61) = -1*x1 + -49*x13 p(f65) = -1*x1 + -49*x13 p(f67) = -1*x1 + -49*x13 p(f69) = -1*x1 + -49*x13 p(f7) = -1*x1 + 11*x13 p(f71) = -1*x1 + -49*x13 p(f73) = -1*x1 + -49*x13 p(f75) = -1*x1 + -49*x13 p(f77) = -1*x1 + -49*x13 p(f79) = -1*x1 + -49*x13 p(f808) = -1*x1 + -1*x2 + x13 p(f81) = -1*x1 + -49*x13 p(f83) = -1*x1 + -49*x13 p(f85) = -1*x1 + -49*x13 p(f87) = -1*x1 + -49*x13 p(f89) = -1*x1 + -49*x13 p(f91) = -1*x1 + -49*x13 p(f93) = -1*x1 + -49*x13 p(f95) = -1*x1 + -49*x13 p(f97) = -1*x1 + -49*x13 p(f99) = -1*x1 + -49*x13 Following rules are strictly oriented: [9 >= A && A >= 1] ==> f7(A,B,C) = 11 + -1*A > 10 + -1*A = f11(A,B,C) [A = 0] ==> f7(A,B,C) = 11 + -1*A > 10 = f7(1,B,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 10 + -1*A >= 10 + -1*A = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 10 + -1*A >= 10 + -1*A = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 10 + -1*A >= 10 + -1*A = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 10 + -1*A >= 10 + -1*A = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 10 + -1*A >= 10 + -1*A = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 10 + -1*A >= 10 + -1*A = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 10 + -1*A >= 10 + -1*A = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 10 + -1*A >= 10 + -1*A = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = -49 + -1*A >= -49 + -1*A = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = -49 + -1*A >= -49 + -1*A = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = -49 + -1*A >= -49 + -1*A = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = -49 + -1*A >= -49 + -1*A = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = -49 + -1*A >= -49 + -1*A = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = -49 + -1*A >= -49 + -1*A = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = -49 + -1*A >= -49 + -1*A = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = -49 + -1*A >= -49 + -1*A = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = -49 + -1*A >= -49 + -1*A = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = -49 + -1*A >= -49 + -1*A = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = -49 + -1*A >= -49 + -1*A = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = -49 + -1*A >= -49 + -1*A = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = -49 + -1*A >= -49 + -1*A = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = -49 + -1*A >= -49 + -1*A = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = -49 + -1*A >= -49 + -1*A = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = -49 + -1*A >= -49 + -1*A = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = -49 + -1*A >= -49 + -1*A = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = -49 + -1*A >= -49 + -1*A = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = -49 + -1*A >= -49 + -1*A = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = -49 + -1*A >= -49 + -1*A = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = -49 + -1*A >= -49 + -1*A = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = -49 + -1*A >= -49 + -1*A = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = -49 + -1*A >= -49 + -1*A = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = -49 + -1*A >= -49 + -1*A = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = -49 + -1*A >= -49 + -1*A = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = -49 + -1*A >= -49 + -1*A = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = -49 + -1*A >= -49 + -1*A = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = -49 + -1*A >= -49 + -1*A = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = -49 + -1*A >= -49 + -1*A = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = -49 + -1*A >= -49 + -1*A = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = -49 + -1*A >= -49 + -1*A = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = -49 + -1*A >= -49 + -1*A = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = -49 + -1*A >= -49 + -1*A = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = -49 + -1*A >= -49 + -1*A = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = -49 + -1*A >= -49 + -1*A = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = -49 + -1*A >= -49 + -1*A = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = -49 + -1*A >= -49 + -1*A = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = -49 + -1*A >= -49 + -1*A = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = -49 + -1*A >= -49 + -1*A = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = -49 + -1*A >= -49 + -1*A = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = -49 + -1*A >= -49 + -1*A = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = -49 + -1*A >= -49 + -1*A = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = -49 + -1*A >= -49 + -1*A = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = -49 + -1*A >= -49 + -1*A = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = -49 + -1*A >= -49 + -1*A = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = -49 + -1*A >= -49 + -1*A = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = -49 + -1*A >= -49 + -1*A = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = -49 + -1*A >= -49 + -1*A = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = -49 + -1*A >= -49 + -1*A = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = -49 + -1*A >= -49 + -1*A = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = -49 + -1*A >= -49 + -1*A = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = -49 + -1*A >= -49 + -1*A = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = -49 + -1*A >= -49 + -1*A = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = -49 + -1*A >= -49 + -1*A = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = -49 + -1*A >= -49 + -1*A = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = -49 + -1*A >= -49 + -1*A = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = -49 + -1*A >= -49 + -1*A = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = -49 + -1*A >= -49 + -1*A = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f555(A,B,C) True ==> f0(A,B,C) = 11 >= 11 = f7(0,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = -49 + -1*A >= -49 + -1*A = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = 1 + -1*A + -1*B >= 1 + -1*A + -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,60,C) [B = 58] ==> f179(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,59,C) [B = 57] ==> f177(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,58,C) [B = 56] ==> f175(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,57,C) [B = 55] ==> f173(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,56,C) [B = 54] ==> f171(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,55,C) [B = 53] ==> f169(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,54,C) [B = 52] ==> f167(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,53,C) [B = 51] ==> f165(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,52,C) [B = 50] ==> f163(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,51,C) [B = 49] ==> f161(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,50,C) [B = 48] ==> f159(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,49,C) [B = 47] ==> f157(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,48,C) [B = 46] ==> f155(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,47,C) [B = 45] ==> f153(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,46,C) [B = 44] ==> f151(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,45,C) [B = 43] ==> f149(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,44,C) [B = 42] ==> f147(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,43,C) [B = 41] ==> f145(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,42,C) [B = 40] ==> f143(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,41,C) [B = 39] ==> f141(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,40,C) [B = 38] ==> f139(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,39,C) [B = 37] ==> f137(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,38,C) [B = 36] ==> f135(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,37,C) [B = 35] ==> f133(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,36,C) [B = 34] ==> f131(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,35,C) [B = 33] ==> f129(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,34,C) [B = 32] ==> f127(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,33,C) [B = 31] ==> f125(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,32,C) [B = 30] ==> f123(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,31,C) [B = 29] ==> f121(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,30,C) [B = 28] ==> f119(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,29,C) [B = 27] ==> f117(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,28,C) [B = 26] ==> f115(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,27,C) [B = 25] ==> f113(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,26,C) [B = 24] ==> f111(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,25,C) [B = 23] ==> f109(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,24,C) [B = 22] ==> f107(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,23,C) [B = 21] ==> f105(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,22,C) [B = 20] ==> f103(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,21,C) [B = 19] ==> f101(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,20,C) [B = 18] ==> f99(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,19,C) [B = 17] ==> f97(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,18,C) [B = 16] ==> f95(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,17,C) [B = 15] ==> f93(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,16,C) [B = 14] ==> f91(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,15,C) [B = 13] ==> f89(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,14,C) [B = 12] ==> f87(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,13,C) [B = 11] ==> f85(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,12,C) [B = 10] ==> f83(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,11,C) [B = 9] ==> f81(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,10,C) [B = 8] ==> f79(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,9,C) [B = 7] ==> f77(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,8,C) [B = 6] ==> f75(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,7,C) [B = 5] ==> f73(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,6,C) [B = 4] ==> f71(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,5,C) [B = 3] ==> f69(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,4,C) [B = 2] ==> f67(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,3,C) [B = 1] ==> f65(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,2,C) [B = 0] ==> f61(A,B,C) = -49 + -1*A >= -49 + -1*A = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = -49 + -1*A >= 1 + -1*A + -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 10 + -1*A >= 10 + -1*A = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 10 + -1*A >= 1 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 10 + -1*A >= 2 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 10 + -1*A >= 3 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 10 + -1*A >= 4 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 10 + -1*A >= 5 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 10 + -1*A >= 6 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 10 + -1*A >= 7 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 10 + -1*A >= 8 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 10 + -1*A >= 9 = f7(2,B,C) [A >= 10] ==> f7(A,B,C) = 11 + -1*A >= -49 + -1*A = f61(A,0,C) * Step 11: KnowledgePropagation WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (?,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (?,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (?,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (?,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (?,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (?,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (?,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (?,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (?,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (?,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (?,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: KnowledgePropagation + Details: We propagate bounds from predecessors. * Step 12: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (?,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (?,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (?,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (?,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (?,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (?,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (?,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (?,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (?,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (?,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (?,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (?,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (?,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (?,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (?,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (?,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (?,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (?,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (?,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (?,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (?,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (?,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (?,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (?,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (?,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (?,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (?,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (?,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (?,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (?,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (?,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (?,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (?,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (?,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (?,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (?,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (?,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (?,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (?,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (?,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (?,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (?,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (?,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (?,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (?,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (?,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (?,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (?,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (?,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (?,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (?,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (?,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (?,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (?,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 118*x13 p(f101) = 117*x13 p(f103) = 117*x13 p(f105) = 117*x13 p(f107) = 117*x13 p(f109) = 117*x13 p(f11) = 118*x13 p(f111) = 117*x13 p(f113) = 117*x13 p(f115) = 117*x13 p(f117) = 117*x13 p(f119) = 117*x13 p(f121) = 117*x13 p(f123) = 117*x13 p(f125) = 117*x13 p(f127) = 117*x13 p(f129) = 117*x13 p(f13) = 118*x13 p(f131) = 117*x13 p(f133) = 117*x13 p(f135) = 117*x13 p(f137) = 117*x13 p(f139) = 117*x13 p(f141) = 117*x13 p(f143) = 117*x13 p(f145) = 117*x13 p(f147) = 117*x13 p(f149) = 117*x13 p(f15) = 118*x13 p(f151) = 117*x13 p(f153) = 117*x13 p(f155) = 117*x13 p(f157) = 117*x13 p(f159) = 117*x13 p(f161) = 117*x13 p(f163) = 117*x13 p(f165) = 117*x13 p(f167) = 117*x13 p(f169) = 117*x13 p(f17) = 118*x13 p(f171) = 117*x13 p(f173) = 117*x13 p(f175) = 117*x13 p(f177) = 117*x13 p(f179) = 117*x13 p(f181) = 117*x13 p(f19) = 118*x13 p(f21) = 118*x13 p(f23) = 118*x13 p(f25) = 118*x13 p(f27) = 118*x13 p(f315) = -1*x3 + 117*x13 p(f319) = -1*x3 + 117*x13 p(f321) = -1*x3 + 117*x13 p(f323) = -1*x3 + 117*x13 p(f325) = -1*x3 + 117*x13 p(f327) = -1*x3 + 117*x13 p(f329) = -1*x3 + 117*x13 p(f331) = -1*x3 + 117*x13 p(f333) = -1*x3 + 117*x13 p(f335) = -1*x3 + 117*x13 p(f337) = -1*x3 + 117*x13 p(f339) = -1*x3 + 117*x13 p(f341) = -1*x3 + 117*x13 p(f343) = -1*x3 + 117*x13 p(f345) = -1*x3 + 117*x13 p(f347) = -1*x3 + 117*x13 p(f349) = -1*x3 + 117*x13 p(f351) = -1*x3 + 117*x13 p(f353) = -1*x3 + 117*x13 p(f355) = -1*x3 + 117*x13 p(f357) = -1*x3 + 117*x13 p(f359) = -1*x3 + 117*x13 p(f361) = -1*x3 + 117*x13 p(f363) = -1*x3 + 117*x13 p(f365) = -1*x3 + 117*x13 p(f367) = -1*x3 + 117*x13 p(f369) = -1*x3 + 117*x13 p(f371) = -1*x3 + 117*x13 p(f373) = -1*x3 + 117*x13 p(f375) = -1*x3 + 117*x13 p(f377) = -1*x3 + 117*x13 p(f379) = -1*x3 + 117*x13 p(f381) = -1*x3 + 117*x13 p(f383) = -1*x3 + 117*x13 p(f385) = -1*x3 + 117*x13 p(f387) = -1*x3 + 117*x13 p(f389) = -1*x3 + 117*x13 p(f391) = -1*x3 + 117*x13 p(f393) = -1*x3 + 117*x13 p(f395) = -1*x3 + 117*x13 p(f397) = -1*x3 + 117*x13 p(f399) = -1*x3 + 117*x13 p(f401) = -1*x3 + 117*x13 p(f403) = -1*x3 + 117*x13 p(f405) = -1*x3 + 117*x13 p(f407) = -1*x3 + 117*x13 p(f409) = -1*x3 + 117*x13 p(f411) = -1*x3 + 117*x13 p(f413) = -1*x3 + 117*x13 p(f415) = -1*x3 + 117*x13 p(f417) = -1*x3 + 117*x13 p(f419) = -1*x3 + 117*x13 p(f421) = -1*x3 + 117*x13 p(f423) = -1*x3 + 117*x13 p(f425) = -1*x3 + 117*x13 p(f427) = -1*x3 + 117*x13 p(f429) = -1*x3 + 117*x13 p(f431) = -1*x3 + 117*x13 p(f433) = -1*x3 + 117*x13 p(f435) = -1*x3 + 117*x13 p(f437) = -1*x3 + 117*x13 p(f439) = -1*x3 + 117*x13 p(f441) = -1*x3 + 117*x13 p(f443) = -1*x3 + 117*x13 p(f445) = -1*x3 + 117*x13 p(f447) = -1*x3 + 117*x13 p(f449) = -1*x3 + 117*x13 p(f451) = -1*x3 + 117*x13 p(f453) = -1*x3 + 117*x13 p(f455) = -1*x3 + 117*x13 p(f457) = -1*x3 + 117*x13 p(f459) = -1*x3 + 117*x13 p(f461) = -1*x3 + 117*x13 p(f463) = -1*x3 + 117*x13 p(f465) = -1*x3 + 117*x13 p(f467) = -1*x3 + 117*x13 p(f469) = -1*x3 + 117*x13 p(f471) = -1*x3 + 117*x13 p(f473) = -1*x3 + 117*x13 p(f475) = -1*x3 + 117*x13 p(f477) = -1*x3 + 117*x13 p(f479) = -1*x3 + 117*x13 p(f481) = -1*x3 + 117*x13 p(f483) = -1*x3 + 117*x13 p(f485) = -1*x3 + 117*x13 p(f487) = -1*x3 + 117*x13 p(f489) = -1*x3 + 117*x13 p(f491) = -1*x3 + 117*x13 p(f493) = -1*x3 + 117*x13 p(f495) = -1*x3 + 117*x13 p(f497) = -1*x3 + 117*x13 p(f499) = -1*x3 + 117*x13 p(f501) = -1*x3 + 117*x13 p(f503) = -1*x3 + 117*x13 p(f505) = -1*x3 + 117*x13 p(f507) = -1*x3 + 117*x13 p(f509) = -1*x3 + 117*x13 p(f511) = -1*x3 + 117*x13 p(f513) = -1*x3 + 117*x13 p(f515) = -1*x3 + 117*x13 p(f517) = -1*x3 + 117*x13 p(f519) = -1*x3 + 117*x13 p(f521) = -1*x3 + 117*x13 p(f523) = -1*x3 + 117*x13 p(f525) = -1*x3 + 117*x13 p(f527) = -1*x3 + 117*x13 p(f529) = -1*x3 + 117*x13 p(f531) = -1*x3 + 117*x13 p(f533) = -1*x3 + 117*x13 p(f535) = -1*x3 + 117*x13 p(f537) = -1*x3 + 117*x13 p(f539) = -1*x3 + 117*x13 p(f541) = -1*x3 + 117*x13 p(f543) = -1*x3 + 117*x13 p(f545) = -1*x3 + 117*x13 p(f547) = -1*x3 + 117*x13 p(f549) = -1*x3 + 117*x13 p(f551) = -1*x3 + 117*x13 p(f553) = -1*x3 + 117*x13 p(f555) = -1*x3 + 117*x13 p(f61) = 117*x13 p(f65) = 117*x13 p(f67) = 117*x13 p(f69) = 117*x13 p(f7) = 118*x13 p(f71) = 117*x13 p(f73) = 117*x13 p(f75) = 117*x13 p(f77) = 117*x13 p(f79) = 117*x13 p(f808) = -1*x3 + 117*x13 p(f81) = 117*x13 p(f83) = 117*x13 p(f85) = 117*x13 p(f87) = 117*x13 p(f89) = 117*x13 p(f91) = 117*x13 p(f93) = 117*x13 p(f95) = 117*x13 p(f97) = 117*x13 p(f99) = 117*x13 Following rules are strictly oriented: [C = 116] ==> f549(A,B,C) = 117 + -1*C > 0 = f315(A,B,117) [C = 115] ==> f547(A,B,C) = 117 + -1*C > 1 = f315(A,B,116) [C = 114] ==> f545(A,B,C) = 117 + -1*C > 2 = f315(A,B,115) [C = 113] ==> f543(A,B,C) = 117 + -1*C > 3 = f315(A,B,114) [C = 112] ==> f541(A,B,C) = 117 + -1*C > 4 = f315(A,B,113) [C = 111] ==> f539(A,B,C) = 117 + -1*C > 5 = f315(A,B,112) [C = 110] ==> f537(A,B,C) = 117 + -1*C > 6 = f315(A,B,111) [C = 109] ==> f535(A,B,C) = 117 + -1*C > 7 = f315(A,B,110) [C = 108] ==> f533(A,B,C) = 117 + -1*C > 8 = f315(A,B,109) [C = 107] ==> f531(A,B,C) = 117 + -1*C > 9 = f315(A,B,108) [C = 106] ==> f529(A,B,C) = 117 + -1*C > 10 = f315(A,B,107) [C = 105] ==> f527(A,B,C) = 117 + -1*C > 11 = f315(A,B,106) [C = 104] ==> f525(A,B,C) = 117 + -1*C > 12 = f315(A,B,105) [C = 103] ==> f523(A,B,C) = 117 + -1*C > 13 = f315(A,B,104) [C = 102] ==> f521(A,B,C) = 117 + -1*C > 14 = f315(A,B,103) [C = 101] ==> f519(A,B,C) = 117 + -1*C > 15 = f315(A,B,102) [C = 100] ==> f517(A,B,C) = 117 + -1*C > 16 = f315(A,B,101) [C = 99] ==> f515(A,B,C) = 117 + -1*C > 17 = f315(A,B,100) [C = 98] ==> f513(A,B,C) = 117 + -1*C > 18 = f315(A,B,99) [C = 96] ==> f509(A,B,C) = 117 + -1*C > 20 = f315(A,B,97) [C = 95] ==> f507(A,B,C) = 117 + -1*C > 21 = f315(A,B,96) [C = 94] ==> f505(A,B,C) = 117 + -1*C > 22 = f315(A,B,95) [C = 93] ==> f503(A,B,C) = 117 + -1*C > 23 = f315(A,B,94) [C = 92] ==> f501(A,B,C) = 117 + -1*C > 24 = f315(A,B,93) [C = 91] ==> f499(A,B,C) = 117 + -1*C > 25 = f315(A,B,92) [C = 90] ==> f497(A,B,C) = 117 + -1*C > 26 = f315(A,B,91) [C = 89] ==> f495(A,B,C) = 117 + -1*C > 27 = f315(A,B,90) [C = 88] ==> f493(A,B,C) = 117 + -1*C > 28 = f315(A,B,89) [C = 86] ==> f489(A,B,C) = 117 + -1*C > 30 = f315(A,B,87) [C = 85] ==> f487(A,B,C) = 117 + -1*C > 31 = f315(A,B,86) [C = 84] ==> f485(A,B,C) = 117 + -1*C > 32 = f315(A,B,85) [C = 83] ==> f483(A,B,C) = 117 + -1*C > 33 = f315(A,B,84) [C = 82] ==> f481(A,B,C) = 117 + -1*C > 34 = f315(A,B,83) [C = 81] ==> f479(A,B,C) = 117 + -1*C > 35 = f315(A,B,82) [C = 80] ==> f477(A,B,C) = 117 + -1*C > 36 = f315(A,B,81) [C = 79] ==> f475(A,B,C) = 117 + -1*C > 37 = f315(A,B,80) [C = 78] ==> f473(A,B,C) = 117 + -1*C > 38 = f315(A,B,79) [C = 77] ==> f471(A,B,C) = 117 + -1*C > 39 = f315(A,B,78) [C = 76] ==> f469(A,B,C) = 117 + -1*C > 40 = f315(A,B,77) [C = 75] ==> f467(A,B,C) = 117 + -1*C > 41 = f315(A,B,76) [C = 74] ==> f465(A,B,C) = 117 + -1*C > 42 = f315(A,B,75) [C = 72] ==> f461(A,B,C) = 117 + -1*C > 44 = f315(A,B,73) [C = 71] ==> f459(A,B,C) = 117 + -1*C > 45 = f315(A,B,72) [C = 70] ==> f457(A,B,C) = 117 + -1*C > 46 = f315(A,B,71) [C = 69] ==> f455(A,B,C) = 117 + -1*C > 47 = f315(A,B,70) [C = 68] ==> f453(A,B,C) = 117 + -1*C > 48 = f315(A,B,69) [C = 67] ==> f451(A,B,C) = 117 + -1*C > 49 = f315(A,B,68) [C = 66] ==> f449(A,B,C) = 117 + -1*C > 50 = f315(A,B,67) [C = 65] ==> f447(A,B,C) = 117 + -1*C > 51 = f315(A,B,66) [C = 64] ==> f445(A,B,C) = 117 + -1*C > 52 = f315(A,B,65) [C = 63] ==> f443(A,B,C) = 117 + -1*C > 53 = f315(A,B,64) [C = 62] ==> f441(A,B,C) = 117 + -1*C > 54 = f315(A,B,63) [C = 61] ==> f439(A,B,C) = 117 + -1*C > 55 = f315(A,B,62) [C = 60] ==> f437(A,B,C) = 117 + -1*C > 56 = f315(A,B,61) [C = 59] ==> f435(A,B,C) = 117 + -1*C > 57 = f315(A,B,60) [C = 58] ==> f433(A,B,C) = 117 + -1*C > 58 = f315(A,B,59) [C = 57] ==> f431(A,B,C) = 117 + -1*C > 59 = f315(A,B,58) [C = 55] ==> f427(A,B,C) = 117 + -1*C > 61 = f315(A,B,56) [C = 54] ==> f425(A,B,C) = 117 + -1*C > 62 = f315(A,B,55) [C = 53] ==> f423(A,B,C) = 117 + -1*C > 63 = f315(A,B,54) [C = 52] ==> f421(A,B,C) = 117 + -1*C > 64 = f315(A,B,53) [C = 51] ==> f419(A,B,C) = 117 + -1*C > 65 = f315(A,B,52) [C = 50] ==> f417(A,B,C) = 117 + -1*C > 66 = f315(A,B,51) [C = 47] ==> f411(A,B,C) = 117 + -1*C > 69 = f315(A,B,48) [C = 46] ==> f409(A,B,C) = 117 + -1*C > 70 = f315(A,B,47) [C = 44] ==> f405(A,B,C) = 117 + -1*C > 72 = f315(A,B,45) [C = 43] ==> f403(A,B,C) = 117 + -1*C > 73 = f315(A,B,44) [C = 42] ==> f401(A,B,C) = 117 + -1*C > 74 = f315(A,B,43) [C = 41] ==> f399(A,B,C) = 117 + -1*C > 75 = f315(A,B,42) [C = 38] ==> f393(A,B,C) = 117 + -1*C > 78 = f315(A,B,39) [C = 37] ==> f391(A,B,C) = 117 + -1*C > 79 = f315(A,B,38) [C = 36] ==> f389(A,B,C) = 117 + -1*C > 80 = f315(A,B,37) [C = 35] ==> f387(A,B,C) = 117 + -1*C > 81 = f315(A,B,36) [C = 34] ==> f385(A,B,C) = 117 + -1*C > 82 = f315(A,B,35) [C = 33] ==> f383(A,B,C) = 117 + -1*C > 83 = f315(A,B,34) [C = 32] ==> f381(A,B,C) = 117 + -1*C > 84 = f315(A,B,33) [C = 31] ==> f379(A,B,C) = 117 + -1*C > 85 = f315(A,B,32) [C = 30] ==> f377(A,B,C) = 117 + -1*C > 86 = f315(A,B,31) [C = 28] ==> f373(A,B,C) = 117 + -1*C > 88 = f315(A,B,29) [C = 27] ==> f371(A,B,C) = 117 + -1*C > 89 = f315(A,B,28) [C = 26] ==> f369(A,B,C) = 117 + -1*C > 90 = f315(A,B,27) [C = 25] ==> f367(A,B,C) = 117 + -1*C > 91 = f315(A,B,26) [C = 24] ==> f365(A,B,C) = 117 + -1*C > 92 = f315(A,B,25) [C = 23] ==> f363(A,B,C) = 117 + -1*C > 93 = f315(A,B,24) [C = 22] ==> f361(A,B,C) = 117 + -1*C > 94 = f315(A,B,23) [C = 21] ==> f359(A,B,C) = 117 + -1*C > 95 = f315(A,B,22) [C = 20] ==> f357(A,B,C) = 117 + -1*C > 96 = f315(A,B,21) [C = 19] ==> f355(A,B,C) = 117 + -1*C > 97 = f315(A,B,20) [C = 18] ==> f353(A,B,C) = 117 + -1*C > 98 = f315(A,B,19) [C = 17] ==> f351(A,B,C) = 117 + -1*C > 99 = f315(A,B,18) [C = 16] ==> f349(A,B,C) = 117 + -1*C > 100 = f315(A,B,17) [C = 15] ==> f347(A,B,C) = 117 + -1*C > 101 = f315(A,B,16) [C = 14] ==> f345(A,B,C) = 117 + -1*C > 102 = f315(A,B,15) [C = 13] ==> f343(A,B,C) = 117 + -1*C > 103 = f315(A,B,14) [C = 12] ==> f341(A,B,C) = 117 + -1*C > 104 = f315(A,B,13) [C = 11] ==> f339(A,B,C) = 117 + -1*C > 105 = f315(A,B,12) [C = 10] ==> f337(A,B,C) = 117 + -1*C > 106 = f315(A,B,11) [C = 9] ==> f335(A,B,C) = 117 + -1*C > 107 = f315(A,B,10) [C = 7] ==> f331(A,B,C) = 117 + -1*C > 109 = f315(A,B,8) [C = 6] ==> f329(A,B,C) = 117 + -1*C > 110 = f315(A,B,7) [C = 5] ==> f327(A,B,C) = 117 + -1*C > 111 = f315(A,B,6) [C = 4] ==> f325(A,B,C) = 117 + -1*C > 112 = f315(A,B,5) [C = 2] ==> f321(A,B,C) = 117 + -1*C > 114 = f315(A,B,3) [C = 0] ==> f315(A,B,C) = 117 + -1*C > 116 = f315(A,B,1) [A >= 10] ==> f7(A,B,C) = 118 > 117 = f61(A,0,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 118 >= 118 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 118 >= 118 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 118 >= 118 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 118 >= 118 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 118 >= 118 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 118 >= 118 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 118 >= 118 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 118 >= 118 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 117 >= 117 = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 117 >= 117 = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 117 >= 117 = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 117 >= 117 = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 117 >= 117 = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 117 >= 117 = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 117 >= 117 = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 117 >= 117 = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 117 >= 117 = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 117 >= 117 = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 117 >= 117 = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 117 >= 117 = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 117 >= 117 = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 117 >= 117 = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 117 >= 117 = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 117 >= 117 = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 117 >= 117 = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 117 >= 117 = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 117 >= 117 = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 117 >= 117 = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 117 >= 117 = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 117 >= 117 = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 117 >= 117 = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 117 >= 117 = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 117 >= 117 = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 117 >= 117 = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 117 >= 117 = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 117 >= 117 = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 117 >= 117 = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 117 >= 117 = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 117 >= 117 = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 117 >= 117 = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 117 >= 117 = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 117 >= 117 = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 117 >= 117 = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 117 >= 117 = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 117 >= 117 = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 117 >= 117 = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 117 >= 117 = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 117 >= 117 = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 117 >= 117 = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 117 >= 117 = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 117 >= 117 = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 117 >= 117 = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 117 >= 117 = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 117 >= 117 = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 117 >= 117 = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 117 >= 117 = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 117 >= 117 = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 117 >= 117 = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 117 >= 117 = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 117 >= 117 = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 117 >= 117 = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 117 >= 117 = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 117 >= 117 = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 117 >= 117 = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 117 >= 117 = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 117 >= 117 = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = 117 + -1*C >= 117 + -1*C = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = 117 + -1*C >= 117 + -1*C = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = 117 + -1*C >= 117 + -1*C = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = 117 + -1*C >= 117 + -1*C = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = 117 + -1*C >= 117 + -1*C = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = 117 + -1*C >= 117 + -1*C = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = 117 + -1*C >= 117 + -1*C = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = 117 + -1*C >= 117 + -1*C = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = 117 + -1*C >= 117 + -1*C = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = 117 + -1*C >= 117 + -1*C = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = 117 + -1*C >= 117 + -1*C = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = 117 + -1*C >= 117 + -1*C = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = 117 + -1*C >= 117 + -1*C = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = 117 + -1*C >= 117 + -1*C = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = 117 + -1*C >= 117 + -1*C = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = 117 + -1*C >= 117 + -1*C = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = 117 + -1*C >= 117 + -1*C = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = 117 + -1*C >= 117 + -1*C = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = 117 + -1*C >= 117 + -1*C = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = 117 + -1*C >= 117 + -1*C = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = 117 + -1*C >= 117 + -1*C = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = 117 + -1*C >= 117 + -1*C = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = 117 + -1*C >= 117 + -1*C = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = 117 + -1*C >= 117 + -1*C = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = 117 + -1*C >= 117 + -1*C = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = 117 + -1*C >= 117 + -1*C = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = 117 + -1*C >= 117 + -1*C = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = 117 + -1*C >= 117 + -1*C = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = 117 + -1*C >= 117 + -1*C = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = 117 + -1*C >= 117 + -1*C = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = 117 + -1*C >= 117 + -1*C = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = 117 + -1*C >= 117 + -1*C = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = 117 + -1*C >= 117 + -1*C = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = 117 + -1*C >= 117 + -1*C = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = 117 + -1*C >= 117 + -1*C = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = 117 + -1*C >= 117 + -1*C = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = 117 + -1*C >= 117 + -1*C = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = 117 + -1*C >= 117 + -1*C = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = 117 + -1*C >= 117 + -1*C = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = 117 + -1*C >= 117 + -1*C = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = 117 + -1*C >= 117 + -1*C = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = 117 + -1*C >= 117 + -1*C = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = 117 + -1*C >= 117 + -1*C = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = 117 + -1*C >= 117 + -1*C = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = 117 + -1*C >= 117 + -1*C = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = 117 + -1*C >= 117 + -1*C = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = 117 + -1*C >= 117 + -1*C = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = 117 + -1*C >= 117 + -1*C = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = 117 + -1*C >= 117 + -1*C = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = 117 + -1*C >= 117 + -1*C = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = 117 + -1*C >= 117 + -1*C = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = 117 + -1*C >= 117 + -1*C = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = 117 + -1*C >= 117 + -1*C = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = 117 + -1*C >= 117 + -1*C = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = 117 + -1*C >= 117 + -1*C = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = 117 + -1*C >= 117 + -1*C = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = 117 + -1*C >= 117 + -1*C = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = 117 + -1*C >= 117 + -1*C = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = 117 + -1*C >= 117 + -1*C = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = 117 + -1*C >= 117 + -1*C = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = 117 + -1*C >= 117 + -1*C = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = 117 + -1*C >= 117 + -1*C = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = 117 + -1*C >= 117 + -1*C = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = 117 + -1*C >= 117 + -1*C = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = 117 + -1*C >= 117 + -1*C = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = 117 + -1*C >= 117 + -1*C = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = 117 + -1*C >= 117 + -1*C = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = 117 + -1*C >= 117 + -1*C = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = 117 + -1*C >= 117 + -1*C = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = 117 + -1*C >= 117 + -1*C = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = 117 + -1*C >= 117 + -1*C = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = 117 + -1*C >= 117 + -1*C = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = 117 + -1*C >= 117 + -1*C = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = 117 + -1*C >= 117 + -1*C = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = 117 + -1*C >= 117 + -1*C = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = 117 + -1*C >= 117 + -1*C = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = 117 + -1*C >= 117 + -1*C = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = 117 + -1*C >= 117 + -1*C = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = 117 + -1*C >= 117 + -1*C = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = 117 + -1*C >= 117 + -1*C = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = 117 + -1*C >= 117 + -1*C = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = 117 + -1*C >= 117 + -1*C = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = 117 + -1*C >= 117 + -1*C = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = 117 + -1*C >= 117 + -1*C = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = 117 + -1*C >= 117 + -1*C = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = 117 + -1*C >= 117 + -1*C = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = 117 + -1*C >= 117 + -1*C = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = 117 + -1*C >= 117 + -1*C = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = 117 + -1*C >= 117 + -1*C = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = 117 + -1*C >= 117 + -1*C = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = 117 + -1*C >= 117 + -1*C = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = 117 + -1*C >= 117 + -1*C = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = 117 + -1*C >= 117 + -1*C = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = 117 + -1*C >= 117 + -1*C = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = 117 + -1*C >= 117 + -1*C = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = 117 + -1*C >= 117 + -1*C = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = 117 + -1*C >= 117 + -1*C = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = 117 + -1*C >= 117 + -1*C = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = 117 + -1*C >= 117 + -1*C = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = 117 + -1*C >= 117 + -1*C = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = 117 + -1*C >= 117 + -1*C = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = 117 + -1*C >= 117 + -1*C = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = 117 + -1*C >= 117 + -1*C = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = 117 + -1*C >= 117 + -1*C = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = 117 + -1*C >= 117 + -1*C = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = 117 + -1*C >= 117 + -1*C = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = 117 + -1*C >= 117 + -1*C = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = 117 + -1*C >= 117 + -1*C = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = 117 + -1*C >= 117 + -1*C = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = 117 + -1*C >= 117 + -1*C = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = 117 + -1*C >= 117 + -1*C = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = 117 + -1*C >= 117 + -1*C = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = 117 + -1*C >= 117 + -1*C = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = 117 + -1*C >= 117 + -1*C = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = 117 + -1*C >= 117 + -1*C = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = 117 + -1*C >= 117 + -1*C = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = 117 + -1*C >= 117 + -1*C = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = 117 + -1*C >= 117 + -1*C = f555(A,B,C) True ==> f0(A,B,C) = 118 >= 118 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 118 >= 118 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 117 >= 117 = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = 117 + -1*C >= 117 + -1*C = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = 117 + -1*C >= 116 + -1*C = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = 117 + -1*C >= -3 = f315(A,B,120) [C = 118] ==> f553(A,B,C) = 117 + -1*C >= -2 = f315(A,B,119) [C = 117] ==> f551(A,B,C) = 117 + -1*C >= -1 = f315(A,B,118) [C = 97] ==> f511(A,B,C) = 117 + -1*C >= 19 = f315(A,B,98) [C = 87] ==> f491(A,B,C) = 117 + -1*C >= 29 = f315(A,B,88) [C = 73] ==> f463(A,B,C) = 117 + -1*C >= 43 = f315(A,B,74) [C = 56] ==> f429(A,B,C) = 117 + -1*C >= 60 = f315(A,B,57) [C = 49] ==> f415(A,B,C) = 117 + -1*C >= 67 = f315(A,B,50) [C = 48] ==> f413(A,B,C) = 117 + -1*C >= 68 = f315(A,B,49) [C = 45] ==> f407(A,B,C) = 117 + -1*C >= 71 = f315(A,B,46) [C = 40] ==> f397(A,B,C) = 117 + -1*C >= 76 = f315(A,B,41) [C = 39] ==> f395(A,B,C) = 117 + -1*C >= 77 = f315(A,B,40) [C = 29] ==> f375(A,B,C) = 117 + -1*C >= 87 = f315(A,B,30) [C = 8] ==> f333(A,B,C) = 117 + -1*C >= 108 = f315(A,B,9) [C = 3] ==> f323(A,B,C) = 117 + -1*C >= 113 = f315(A,B,4) [C = 1] ==> f319(A,B,C) = 117 + -1*C >= 115 = f315(A,B,2) [C >= 120] ==> f315(A,B,C) = 117 + -1*C >= 117 + -1*C = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 117 >= 117 = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 117 >= 117 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 117 >= 117 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 117 >= 117 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 117 >= 117 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 117 >= 117 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 117 >= 117 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 117 >= 117 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 117 >= 117 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 117 >= 117 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 117 >= 117 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 117 >= 117 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 117 >= 117 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 117 >= 117 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 117 >= 117 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 117 >= 117 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 117 >= 117 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 117 >= 117 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 117 >= 117 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 117 >= 117 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 117 >= 117 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 117 >= 117 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 117 >= 117 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 117 >= 117 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 117 >= 117 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 117 >= 117 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 117 >= 117 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 117 >= 117 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 117 >= 117 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 117 >= 117 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 117 >= 117 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 117 >= 117 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 117 >= 117 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 117 >= 117 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 117 >= 117 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 117 >= 117 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 117 >= 117 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 117 >= 117 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 117 >= 117 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 117 >= 117 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 117 >= 117 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 117 >= 117 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 117 >= 117 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 117 >= 117 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 117 >= 117 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 117 >= 117 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 117 >= 117 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 117 >= 117 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 117 >= 117 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 117 >= 117 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 117 >= 117 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 117 >= 117 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 117 >= 117 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 117 >= 117 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 117 >= 117 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 117 >= 117 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 117 >= 117 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 117 >= 117 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 117 >= 117 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 117 >= 117 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 117 >= 117 = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = 117 >= 117 = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 118 >= 118 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 118 >= 118 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 118 >= 118 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 118 >= 118 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 118 >= 118 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 118 >= 118 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 118 >= 118 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 118 >= 118 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 118 >= 118 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 118 >= 118 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 118 >= 118 = f7(1,B,C) * Step 13: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (?,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 120*x13 p(f101) = 120*x13 p(f103) = 120*x13 p(f105) = 120*x13 p(f107) = 120*x13 p(f109) = 120*x13 p(f11) = 120*x13 p(f111) = 120*x13 p(f113) = 120*x13 p(f115) = 120*x13 p(f117) = 120*x13 p(f119) = 120*x13 p(f121) = 120*x13 p(f123) = 120*x13 p(f125) = 120*x13 p(f127) = 120*x13 p(f129) = 120*x13 p(f13) = 120*x13 p(f131) = 120*x13 p(f133) = 120*x13 p(f135) = 120*x13 p(f137) = 120*x13 p(f139) = 120*x13 p(f141) = 120*x13 p(f143) = 120*x13 p(f145) = 120*x13 p(f147) = 120*x13 p(f149) = 120*x13 p(f15) = 120*x13 p(f151) = 120*x13 p(f153) = 120*x13 p(f155) = 120*x13 p(f157) = 120*x13 p(f159) = 120*x13 p(f161) = 120*x13 p(f163) = 120*x13 p(f165) = 120*x13 p(f167) = 120*x13 p(f169) = 120*x13 p(f17) = 120*x13 p(f171) = 120*x13 p(f173) = 120*x13 p(f175) = 120*x13 p(f177) = 120*x13 p(f179) = 120*x13 p(f181) = 120*x13 p(f19) = 120*x13 p(f21) = 120*x13 p(f23) = 120*x13 p(f25) = 120*x13 p(f27) = 120*x13 p(f315) = -1*x3 + 120*x13 p(f319) = -1*x3 + 119*x13 p(f321) = -1*x3 + 119*x13 p(f323) = -1*x3 + 119*x13 p(f325) = -1*x3 + 119*x13 p(f327) = -1*x3 + 119*x13 p(f329) = -1*x3 + 119*x13 p(f331) = -1*x3 + 119*x13 p(f333) = -1*x3 + 119*x13 p(f335) = -1*x3 + 119*x13 p(f337) = -1*x3 + 119*x13 p(f339) = -1*x3 + 119*x13 p(f341) = -1*x3 + 119*x13 p(f343) = -1*x3 + 119*x13 p(f345) = -1*x3 + 119*x13 p(f347) = -1*x3 + 119*x13 p(f349) = -1*x3 + 119*x13 p(f351) = -1*x3 + 119*x13 p(f353) = -1*x3 + 119*x13 p(f355) = -1*x3 + 119*x13 p(f357) = -1*x3 + 119*x13 p(f359) = -1*x3 + 119*x13 p(f361) = -1*x3 + 119*x13 p(f363) = -1*x3 + 119*x13 p(f365) = -1*x3 + 119*x13 p(f367) = -1*x3 + 119*x13 p(f369) = -1*x3 + 119*x13 p(f371) = -1*x3 + 119*x13 p(f373) = -1*x3 + 119*x13 p(f375) = -1*x3 + 119*x13 p(f377) = -1*x3 + 119*x13 p(f379) = -1*x3 + 119*x13 p(f381) = -1*x3 + 119*x13 p(f383) = -1*x3 + 119*x13 p(f385) = -1*x3 + 119*x13 p(f387) = -1*x3 + 119*x13 p(f389) = -1*x3 + 119*x13 p(f391) = -1*x3 + 119*x13 p(f393) = -1*x3 + 119*x13 p(f395) = -1*x3 + 119*x13 p(f397) = -1*x3 + 119*x13 p(f399) = -1*x3 + 119*x13 p(f401) = -1*x3 + 119*x13 p(f403) = -1*x3 + 119*x13 p(f405) = -1*x3 + 119*x13 p(f407) = -1*x3 + 119*x13 p(f409) = -1*x3 + 119*x13 p(f411) = -1*x3 + 119*x13 p(f413) = -1*x3 + 119*x13 p(f415) = -1*x3 + 119*x13 p(f417) = -1*x3 + 119*x13 p(f419) = -1*x3 + 119*x13 p(f421) = -1*x3 + 119*x13 p(f423) = -1*x3 + 119*x13 p(f425) = -1*x3 + 119*x13 p(f427) = -1*x3 + 119*x13 p(f429) = -1*x3 + 119*x13 p(f431) = -1*x3 + 119*x13 p(f433) = -1*x3 + 119*x13 p(f435) = -1*x3 + 119*x13 p(f437) = -1*x3 + 119*x13 p(f439) = -1*x3 + 119*x13 p(f441) = -1*x3 + 119*x13 p(f443) = -1*x3 + 119*x13 p(f445) = -1*x3 + 119*x13 p(f447) = -1*x3 + 119*x13 p(f449) = -1*x3 + 119*x13 p(f451) = -1*x3 + 119*x13 p(f453) = -1*x3 + 119*x13 p(f455) = -1*x3 + 119*x13 p(f457) = -1*x3 + 119*x13 p(f459) = -1*x3 + 119*x13 p(f461) = -1*x3 + 119*x13 p(f463) = -1*x3 + 119*x13 p(f465) = -1*x3 + 119*x13 p(f467) = -1*x3 + 119*x13 p(f469) = -1*x3 + 119*x13 p(f471) = -1*x3 + 119*x13 p(f473) = -1*x3 + 119*x13 p(f475) = -1*x3 + 119*x13 p(f477) = -1*x3 + 119*x13 p(f479) = -1*x3 + 119*x13 p(f481) = -1*x3 + 119*x13 p(f483) = -1*x3 + 119*x13 p(f485) = -1*x3 + 119*x13 p(f487) = -1*x3 + 119*x13 p(f489) = -1*x3 + 119*x13 p(f491) = -1*x3 + 119*x13 p(f493) = -1*x3 + 119*x13 p(f495) = -1*x3 + 119*x13 p(f497) = -1*x3 + 119*x13 p(f499) = -1*x3 + 119*x13 p(f501) = -1*x3 + 119*x13 p(f503) = -1*x3 + 119*x13 p(f505) = -1*x3 + 119*x13 p(f507) = -1*x3 + 119*x13 p(f509) = -1*x3 + 119*x13 p(f511) = -1*x3 + 119*x13 p(f513) = -1*x3 + 119*x13 p(f515) = -1*x3 + 119*x13 p(f517) = -1*x3 + 119*x13 p(f519) = -1*x3 + 119*x13 p(f521) = -1*x3 + 119*x13 p(f523) = -1*x3 + 119*x13 p(f525) = -1*x3 + 119*x13 p(f527) = -1*x3 + 119*x13 p(f529) = -1*x3 + 119*x13 p(f531) = -1*x3 + 119*x13 p(f533) = -1*x3 + 119*x13 p(f535) = -1*x3 + 119*x13 p(f537) = -1*x3 + 119*x13 p(f539) = -1*x3 + 119*x13 p(f541) = -1*x3 + 119*x13 p(f543) = -1*x3 + 119*x13 p(f545) = -1*x3 + 119*x13 p(f547) = -1*x3 + 119*x13 p(f549) = -1*x3 + 119*x13 p(f551) = -1*x3 + 119*x13 p(f553) = -1*x3 + 119*x13 p(f555) = -1*x3 + 119*x13 p(f61) = 120*x13 p(f65) = 120*x13 p(f67) = 120*x13 p(f69) = 120*x13 p(f7) = 120*x13 p(f71) = 120*x13 p(f73) = 120*x13 p(f75) = 120*x13 p(f77) = 120*x13 p(f79) = 120*x13 p(f808) = -1*x3 + 120*x13 p(f81) = 120*x13 p(f83) = 120*x13 p(f85) = 120*x13 p(f87) = 120*x13 p(f89) = 120*x13 p(f91) = 120*x13 p(f93) = 120*x13 p(f95) = 120*x13 p(f97) = 120*x13 p(f99) = 120*x13 Following rules are strictly oriented: [119 >= C && C >= 1] ==> f315(A,B,C) = 120 + -1*C > 119 + -1*C = f319(A,B,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 120 >= 120 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 120 >= 120 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 120 >= 120 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 120 >= 120 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 120 >= 120 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 120 >= 120 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 120 >= 120 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 120 >= 120 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 120 >= 120 = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 120 >= 120 = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 120 >= 120 = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 120 >= 120 = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 120 >= 120 = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 120 >= 120 = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 120 >= 120 = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 120 >= 120 = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 120 >= 120 = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 120 >= 120 = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 120 >= 120 = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 120 >= 120 = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 120 >= 120 = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 120 >= 120 = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 120 >= 120 = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 120 >= 120 = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 120 >= 120 = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 120 >= 120 = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 120 >= 120 = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 120 >= 120 = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 120 >= 120 = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 120 >= 120 = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 120 >= 120 = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 120 >= 120 = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 120 >= 120 = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 120 >= 120 = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 120 >= 120 = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 120 >= 120 = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 120 >= 120 = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 120 >= 120 = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 120 >= 120 = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 120 >= 120 = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 120 >= 120 = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 120 >= 120 = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 120 >= 120 = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 120 >= 120 = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 120 >= 120 = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 120 >= 120 = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 120 >= 120 = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 120 >= 120 = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 120 >= 120 = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 120 >= 120 = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 120 >= 120 = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 120 >= 120 = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 120 >= 120 = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 120 >= 120 = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 120 >= 120 = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 120 >= 120 = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 120 >= 120 = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 120 >= 120 = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 120 >= 120 = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 120 >= 120 = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 120 >= 120 = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 120 >= 120 = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 120 >= 120 = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 120 >= 120 = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 120 >= 120 = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 120 >= 120 = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = 119 + -1*C >= 119 + -1*C = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = 119 + -1*C >= 119 + -1*C = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = 119 + -1*C >= 119 + -1*C = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = 119 + -1*C >= 119 + -1*C = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = 119 + -1*C >= 119 + -1*C = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = 119 + -1*C >= 119 + -1*C = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = 119 + -1*C >= 119 + -1*C = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = 119 + -1*C >= 119 + -1*C = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = 119 + -1*C >= 119 + -1*C = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = 119 + -1*C >= 119 + -1*C = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = 119 + -1*C >= 119 + -1*C = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = 119 + -1*C >= 119 + -1*C = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = 119 + -1*C >= 119 + -1*C = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = 119 + -1*C >= 119 + -1*C = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = 119 + -1*C >= 119 + -1*C = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = 119 + -1*C >= 119 + -1*C = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = 119 + -1*C >= 119 + -1*C = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = 119 + -1*C >= 119 + -1*C = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = 119 + -1*C >= 119 + -1*C = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = 119 + -1*C >= 119 + -1*C = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = 119 + -1*C >= 119 + -1*C = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = 119 + -1*C >= 119 + -1*C = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = 119 + -1*C >= 119 + -1*C = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = 119 + -1*C >= 119 + -1*C = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = 119 + -1*C >= 119 + -1*C = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = 119 + -1*C >= 119 + -1*C = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = 119 + -1*C >= 119 + -1*C = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = 119 + -1*C >= 119 + -1*C = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = 119 + -1*C >= 119 + -1*C = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = 119 + -1*C >= 119 + -1*C = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = 119 + -1*C >= 119 + -1*C = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = 119 + -1*C >= 119 + -1*C = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = 119 + -1*C >= 119 + -1*C = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = 119 + -1*C >= 119 + -1*C = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = 119 + -1*C >= 119 + -1*C = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = 119 + -1*C >= 119 + -1*C = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = 119 + -1*C >= 119 + -1*C = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = 119 + -1*C >= 119 + -1*C = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = 119 + -1*C >= 119 + -1*C = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = 119 + -1*C >= 119 + -1*C = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = 119 + -1*C >= 119 + -1*C = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = 119 + -1*C >= 119 + -1*C = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = 119 + -1*C >= 119 + -1*C = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = 119 + -1*C >= 119 + -1*C = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = 119 + -1*C >= 119 + -1*C = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = 119 + -1*C >= 119 + -1*C = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = 119 + -1*C >= 119 + -1*C = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = 119 + -1*C >= 119 + -1*C = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = 119 + -1*C >= 119 + -1*C = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = 119 + -1*C >= 119 + -1*C = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = 119 + -1*C >= 119 + -1*C = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = 119 + -1*C >= 119 + -1*C = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = 119 + -1*C >= 119 + -1*C = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = 119 + -1*C >= 119 + -1*C = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = 119 + -1*C >= 119 + -1*C = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = 119 + -1*C >= 119 + -1*C = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = 119 + -1*C >= 119 + -1*C = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = 119 + -1*C >= 119 + -1*C = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = 119 + -1*C >= 119 + -1*C = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = 119 + -1*C >= 119 + -1*C = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = 119 + -1*C >= 119 + -1*C = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = 119 + -1*C >= 119 + -1*C = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = 119 + -1*C >= 119 + -1*C = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = 119 + -1*C >= 119 + -1*C = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = 119 + -1*C >= 119 + -1*C = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = 119 + -1*C >= 119 + -1*C = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = 119 + -1*C >= 119 + -1*C = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = 119 + -1*C >= 119 + -1*C = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = 119 + -1*C >= 119 + -1*C = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = 119 + -1*C >= 119 + -1*C = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = 119 + -1*C >= 119 + -1*C = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = 119 + -1*C >= 119 + -1*C = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = 119 + -1*C >= 119 + -1*C = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = 119 + -1*C >= 119 + -1*C = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = 119 + -1*C >= 119 + -1*C = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = 119 + -1*C >= 119 + -1*C = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = 119 + -1*C >= 119 + -1*C = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = 119 + -1*C >= 119 + -1*C = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = 119 + -1*C >= 119 + -1*C = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = 119 + -1*C >= 119 + -1*C = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = 119 + -1*C >= 119 + -1*C = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = 119 + -1*C >= 119 + -1*C = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = 119 + -1*C >= 119 + -1*C = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = 119 + -1*C >= 119 + -1*C = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = 119 + -1*C >= 119 + -1*C = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = 119 + -1*C >= 119 + -1*C = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = 119 + -1*C >= 119 + -1*C = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = 119 + -1*C >= 119 + -1*C = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = 119 + -1*C >= 119 + -1*C = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = 119 + -1*C >= 119 + -1*C = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = 119 + -1*C >= 119 + -1*C = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = 119 + -1*C >= 119 + -1*C = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = 119 + -1*C >= 119 + -1*C = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = 119 + -1*C >= 119 + -1*C = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = 119 + -1*C >= 119 + -1*C = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = 119 + -1*C >= 119 + -1*C = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = 119 + -1*C >= 119 + -1*C = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = 119 + -1*C >= 119 + -1*C = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = 119 + -1*C >= 119 + -1*C = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = 119 + -1*C >= 119 + -1*C = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = 119 + -1*C >= 119 + -1*C = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = 119 + -1*C >= 119 + -1*C = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = 119 + -1*C >= 119 + -1*C = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = 119 + -1*C >= 119 + -1*C = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = 119 + -1*C >= 119 + -1*C = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = 119 + -1*C >= 119 + -1*C = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = 119 + -1*C >= 119 + -1*C = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = 119 + -1*C >= 119 + -1*C = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = 119 + -1*C >= 119 + -1*C = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = 119 + -1*C >= 119 + -1*C = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = 119 + -1*C >= 119 + -1*C = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = 119 + -1*C >= 119 + -1*C = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = 119 + -1*C >= 119 + -1*C = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = 119 + -1*C >= 119 + -1*C = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = 119 + -1*C >= 119 + -1*C = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = 119 + -1*C >= 119 + -1*C = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = 119 + -1*C >= 119 + -1*C = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = 119 + -1*C >= 119 + -1*C = f555(A,B,C) True ==> f0(A,B,C) = 120 >= 120 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 120 >= 120 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 120 >= 120 = f65(A,B,C) [C >= 120] ==> f555(A,B,C) = 119 + -1*C >= 119 + -1*C = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = 119 + -1*C >= 0 = f315(A,B,120) [C = 118] ==> f553(A,B,C) = 119 + -1*C >= 1 = f315(A,B,119) [C = 117] ==> f551(A,B,C) = 119 + -1*C >= 2 = f315(A,B,118) [C = 116] ==> f549(A,B,C) = 119 + -1*C >= 3 = f315(A,B,117) [C = 115] ==> f547(A,B,C) = 119 + -1*C >= 4 = f315(A,B,116) [C = 114] ==> f545(A,B,C) = 119 + -1*C >= 5 = f315(A,B,115) [C = 113] ==> f543(A,B,C) = 119 + -1*C >= 6 = f315(A,B,114) [C = 112] ==> f541(A,B,C) = 119 + -1*C >= 7 = f315(A,B,113) [C = 111] ==> f539(A,B,C) = 119 + -1*C >= 8 = f315(A,B,112) [C = 110] ==> f537(A,B,C) = 119 + -1*C >= 9 = f315(A,B,111) [C = 109] ==> f535(A,B,C) = 119 + -1*C >= 10 = f315(A,B,110) [C = 108] ==> f533(A,B,C) = 119 + -1*C >= 11 = f315(A,B,109) [C = 107] ==> f531(A,B,C) = 119 + -1*C >= 12 = f315(A,B,108) [C = 106] ==> f529(A,B,C) = 119 + -1*C >= 13 = f315(A,B,107) [C = 105] ==> f527(A,B,C) = 119 + -1*C >= 14 = f315(A,B,106) [C = 104] ==> f525(A,B,C) = 119 + -1*C >= 15 = f315(A,B,105) [C = 103] ==> f523(A,B,C) = 119 + -1*C >= 16 = f315(A,B,104) [C = 102] ==> f521(A,B,C) = 119 + -1*C >= 17 = f315(A,B,103) [C = 101] ==> f519(A,B,C) = 119 + -1*C >= 18 = f315(A,B,102) [C = 100] ==> f517(A,B,C) = 119 + -1*C >= 19 = f315(A,B,101) [C = 99] ==> f515(A,B,C) = 119 + -1*C >= 20 = f315(A,B,100) [C = 98] ==> f513(A,B,C) = 119 + -1*C >= 21 = f315(A,B,99) [C = 97] ==> f511(A,B,C) = 119 + -1*C >= 22 = f315(A,B,98) [C = 96] ==> f509(A,B,C) = 119 + -1*C >= 23 = f315(A,B,97) [C = 95] ==> f507(A,B,C) = 119 + -1*C >= 24 = f315(A,B,96) [C = 94] ==> f505(A,B,C) = 119 + -1*C >= 25 = f315(A,B,95) [C = 93] ==> f503(A,B,C) = 119 + -1*C >= 26 = f315(A,B,94) [C = 92] ==> f501(A,B,C) = 119 + -1*C >= 27 = f315(A,B,93) [C = 91] ==> f499(A,B,C) = 119 + -1*C >= 28 = f315(A,B,92) [C = 90] ==> f497(A,B,C) = 119 + -1*C >= 29 = f315(A,B,91) [C = 89] ==> f495(A,B,C) = 119 + -1*C >= 30 = f315(A,B,90) [C = 88] ==> f493(A,B,C) = 119 + -1*C >= 31 = f315(A,B,89) [C = 87] ==> f491(A,B,C) = 119 + -1*C >= 32 = f315(A,B,88) [C = 86] ==> f489(A,B,C) = 119 + -1*C >= 33 = f315(A,B,87) [C = 85] ==> f487(A,B,C) = 119 + -1*C >= 34 = f315(A,B,86) [C = 84] ==> f485(A,B,C) = 119 + -1*C >= 35 = f315(A,B,85) [C = 83] ==> f483(A,B,C) = 119 + -1*C >= 36 = f315(A,B,84) [C = 82] ==> f481(A,B,C) = 119 + -1*C >= 37 = f315(A,B,83) [C = 81] ==> f479(A,B,C) = 119 + -1*C >= 38 = f315(A,B,82) [C = 80] ==> f477(A,B,C) = 119 + -1*C >= 39 = f315(A,B,81) [C = 79] ==> f475(A,B,C) = 119 + -1*C >= 40 = f315(A,B,80) [C = 78] ==> f473(A,B,C) = 119 + -1*C >= 41 = f315(A,B,79) [C = 77] ==> f471(A,B,C) = 119 + -1*C >= 42 = f315(A,B,78) [C = 76] ==> f469(A,B,C) = 119 + -1*C >= 43 = f315(A,B,77) [C = 75] ==> f467(A,B,C) = 119 + -1*C >= 44 = f315(A,B,76) [C = 74] ==> f465(A,B,C) = 119 + -1*C >= 45 = f315(A,B,75) [C = 73] ==> f463(A,B,C) = 119 + -1*C >= 46 = f315(A,B,74) [C = 72] ==> f461(A,B,C) = 119 + -1*C >= 47 = f315(A,B,73) [C = 71] ==> f459(A,B,C) = 119 + -1*C >= 48 = f315(A,B,72) [C = 70] ==> f457(A,B,C) = 119 + -1*C >= 49 = f315(A,B,71) [C = 69] ==> f455(A,B,C) = 119 + -1*C >= 50 = f315(A,B,70) [C = 68] ==> f453(A,B,C) = 119 + -1*C >= 51 = f315(A,B,69) [C = 67] ==> f451(A,B,C) = 119 + -1*C >= 52 = f315(A,B,68) [C = 66] ==> f449(A,B,C) = 119 + -1*C >= 53 = f315(A,B,67) [C = 65] ==> f447(A,B,C) = 119 + -1*C >= 54 = f315(A,B,66) [C = 64] ==> f445(A,B,C) = 119 + -1*C >= 55 = f315(A,B,65) [C = 63] ==> f443(A,B,C) = 119 + -1*C >= 56 = f315(A,B,64) [C = 62] ==> f441(A,B,C) = 119 + -1*C >= 57 = f315(A,B,63) [C = 61] ==> f439(A,B,C) = 119 + -1*C >= 58 = f315(A,B,62) [C = 60] ==> f437(A,B,C) = 119 + -1*C >= 59 = f315(A,B,61) [C = 59] ==> f435(A,B,C) = 119 + -1*C >= 60 = f315(A,B,60) [C = 58] ==> f433(A,B,C) = 119 + -1*C >= 61 = f315(A,B,59) [C = 57] ==> f431(A,B,C) = 119 + -1*C >= 62 = f315(A,B,58) [C = 56] ==> f429(A,B,C) = 119 + -1*C >= 63 = f315(A,B,57) [C = 55] ==> f427(A,B,C) = 119 + -1*C >= 64 = f315(A,B,56) [C = 54] ==> f425(A,B,C) = 119 + -1*C >= 65 = f315(A,B,55) [C = 53] ==> f423(A,B,C) = 119 + -1*C >= 66 = f315(A,B,54) [C = 52] ==> f421(A,B,C) = 119 + -1*C >= 67 = f315(A,B,53) [C = 51] ==> f419(A,B,C) = 119 + -1*C >= 68 = f315(A,B,52) [C = 50] ==> f417(A,B,C) = 119 + -1*C >= 69 = f315(A,B,51) [C = 49] ==> f415(A,B,C) = 119 + -1*C >= 70 = f315(A,B,50) [C = 48] ==> f413(A,B,C) = 119 + -1*C >= 71 = f315(A,B,49) [C = 47] ==> f411(A,B,C) = 119 + -1*C >= 72 = f315(A,B,48) [C = 46] ==> f409(A,B,C) = 119 + -1*C >= 73 = f315(A,B,47) [C = 45] ==> f407(A,B,C) = 119 + -1*C >= 74 = f315(A,B,46) [C = 44] ==> f405(A,B,C) = 119 + -1*C >= 75 = f315(A,B,45) [C = 43] ==> f403(A,B,C) = 119 + -1*C >= 76 = f315(A,B,44) [C = 42] ==> f401(A,B,C) = 119 + -1*C >= 77 = f315(A,B,43) [C = 41] ==> f399(A,B,C) = 119 + -1*C >= 78 = f315(A,B,42) [C = 40] ==> f397(A,B,C) = 119 + -1*C >= 79 = f315(A,B,41) [C = 39] ==> f395(A,B,C) = 119 + -1*C >= 80 = f315(A,B,40) [C = 38] ==> f393(A,B,C) = 119 + -1*C >= 81 = f315(A,B,39) [C = 37] ==> f391(A,B,C) = 119 + -1*C >= 82 = f315(A,B,38) [C = 36] ==> f389(A,B,C) = 119 + -1*C >= 83 = f315(A,B,37) [C = 35] ==> f387(A,B,C) = 119 + -1*C >= 84 = f315(A,B,36) [C = 34] ==> f385(A,B,C) = 119 + -1*C >= 85 = f315(A,B,35) [C = 33] ==> f383(A,B,C) = 119 + -1*C >= 86 = f315(A,B,34) [C = 32] ==> f381(A,B,C) = 119 + -1*C >= 87 = f315(A,B,33) [C = 31] ==> f379(A,B,C) = 119 + -1*C >= 88 = f315(A,B,32) [C = 30] ==> f377(A,B,C) = 119 + -1*C >= 89 = f315(A,B,31) [C = 29] ==> f375(A,B,C) = 119 + -1*C >= 90 = f315(A,B,30) [C = 28] ==> f373(A,B,C) = 119 + -1*C >= 91 = f315(A,B,29) [C = 27] ==> f371(A,B,C) = 119 + -1*C >= 92 = f315(A,B,28) [C = 26] ==> f369(A,B,C) = 119 + -1*C >= 93 = f315(A,B,27) [C = 25] ==> f367(A,B,C) = 119 + -1*C >= 94 = f315(A,B,26) [C = 24] ==> f365(A,B,C) = 119 + -1*C >= 95 = f315(A,B,25) [C = 23] ==> f363(A,B,C) = 119 + -1*C >= 96 = f315(A,B,24) [C = 22] ==> f361(A,B,C) = 119 + -1*C >= 97 = f315(A,B,23) [C = 21] ==> f359(A,B,C) = 119 + -1*C >= 98 = f315(A,B,22) [C = 20] ==> f357(A,B,C) = 119 + -1*C >= 99 = f315(A,B,21) [C = 19] ==> f355(A,B,C) = 119 + -1*C >= 100 = f315(A,B,20) [C = 18] ==> f353(A,B,C) = 119 + -1*C >= 101 = f315(A,B,19) [C = 17] ==> f351(A,B,C) = 119 + -1*C >= 102 = f315(A,B,18) [C = 16] ==> f349(A,B,C) = 119 + -1*C >= 103 = f315(A,B,17) [C = 15] ==> f347(A,B,C) = 119 + -1*C >= 104 = f315(A,B,16) [C = 14] ==> f345(A,B,C) = 119 + -1*C >= 105 = f315(A,B,15) [C = 13] ==> f343(A,B,C) = 119 + -1*C >= 106 = f315(A,B,14) [C = 12] ==> f341(A,B,C) = 119 + -1*C >= 107 = f315(A,B,13) [C = 11] ==> f339(A,B,C) = 119 + -1*C >= 108 = f315(A,B,12) [C = 10] ==> f337(A,B,C) = 119 + -1*C >= 109 = f315(A,B,11) [C = 9] ==> f335(A,B,C) = 119 + -1*C >= 110 = f315(A,B,10) [C = 8] ==> f333(A,B,C) = 119 + -1*C >= 111 = f315(A,B,9) [C = 7] ==> f331(A,B,C) = 119 + -1*C >= 112 = f315(A,B,8) [C = 6] ==> f329(A,B,C) = 119 + -1*C >= 113 = f315(A,B,7) [C = 5] ==> f327(A,B,C) = 119 + -1*C >= 114 = f315(A,B,6) [C = 4] ==> f325(A,B,C) = 119 + -1*C >= 115 = f315(A,B,5) [C = 3] ==> f323(A,B,C) = 119 + -1*C >= 116 = f315(A,B,4) [C = 2] ==> f321(A,B,C) = 119 + -1*C >= 117 = f315(A,B,3) [C = 1] ==> f319(A,B,C) = 119 + -1*C >= 118 = f315(A,B,2) [C = 0] ==> f315(A,B,C) = 120 + -1*C >= 119 = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = 120 + -1*C >= 120 + -1*C = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 120 >= 120 = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 120 >= 120 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 120 >= 120 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 120 >= 120 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 120 >= 120 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 120 >= 120 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 120 >= 120 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 120 >= 120 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 120 >= 120 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 120 >= 120 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 120 >= 120 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 120 >= 120 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 120 >= 120 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 120 >= 120 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 120 >= 120 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 120 >= 120 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 120 >= 120 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 120 >= 120 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 120 >= 120 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 120 >= 120 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 120 >= 120 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 120 >= 120 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 120 >= 120 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 120 >= 120 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 120 >= 120 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 120 >= 120 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 120 >= 120 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 120 >= 120 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 120 >= 120 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 120 >= 120 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 120 >= 120 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 120 >= 120 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 120 >= 120 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 120 >= 120 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 120 >= 120 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 120 >= 120 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 120 >= 120 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 120 >= 120 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 120 >= 120 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 120 >= 120 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 120 >= 120 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 120 >= 120 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 120 >= 120 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 120 >= 120 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 120 >= 120 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 120 >= 120 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 120 >= 120 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 120 >= 120 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 120 >= 120 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 120 >= 120 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 120 >= 120 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 120 >= 120 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 120 >= 120 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 120 >= 120 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 120 >= 120 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 120 >= 120 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 120 >= 120 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 120 >= 120 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 120 >= 120 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 120 >= 120 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 120 >= 120 = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = 120 >= 120 = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 120 >= 120 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 120 >= 120 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 120 >= 120 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 120 >= 120 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 120 >= 120 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 120 >= 120 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 120 >= 120 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 120 >= 120 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 120 >= 120 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 120 >= 120 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 120 >= 120 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 120 >= 120 = f61(A,0,C) * Step 14: KnowledgePropagation WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (?,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (?,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (?,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (?,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (?,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (?,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (?,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (?,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (?,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (?,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (?,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (?,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (?,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (?,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (?,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (?,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (?,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (?,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (?,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (?,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (?,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (?,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (?,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (?,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (?,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (?,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (?,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (?,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (?,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (?,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (?,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (?,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (?,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (?,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (?,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (?,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (?,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (?,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (?,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (?,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (?,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (?,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (?,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (?,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (?,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (?,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (?,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (?,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (?,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (?,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (?,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (?,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (?,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (?,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (?,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (?,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (?,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (?,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (?,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (?,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (?,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (?,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (?,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (?,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (?,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (?,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (?,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (?,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (?,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (?,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (?,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (?,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (?,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (?,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (?,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (?,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (?,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (?,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (?,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (?,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (?,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (?,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (?,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (?,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (?,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (?,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (?,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (?,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (?,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (?,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (?,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (?,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (?,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (?,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (?,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (?,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (?,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (?,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (?,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (?,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (?,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (?,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (?,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (?,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (?,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (?,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (?,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (?,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (?,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (?,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (?,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (?,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (?,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (?,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (?,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (?,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (?,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (?,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (?,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (?,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (?,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (?,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (?,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (?,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (?,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (?,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (?,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: KnowledgePropagation + Details: We propagate bounds from predecessors. * Step 15: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (?,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 55*x13 p(f101) = -1*x2 + 55*x13 p(f103) = -1*x2 + 55*x13 p(f105) = -1*x2 + 55*x13 p(f107) = -1*x2 + 55*x13 p(f109) = -1*x2 + 55*x13 p(f11) = 55*x13 p(f111) = -1*x2 + 55*x13 p(f113) = -1*x2 + 55*x13 p(f115) = -1*x2 + 55*x13 p(f117) = -1*x2 + 55*x13 p(f119) = -1*x2 + 55*x13 p(f121) = -1*x2 + 55*x13 p(f123) = -1*x2 + 55*x13 p(f125) = -1*x2 + 55*x13 p(f127) = -1*x2 + 55*x13 p(f129) = -1*x2 + 55*x13 p(f13) = 55*x13 p(f131) = -1*x2 + 55*x13 p(f133) = -1*x2 + 55*x13 p(f135) = -1*x2 + 55*x13 p(f137) = -1*x2 + 55*x13 p(f139) = -1*x2 + 55*x13 p(f141) = -1*x2 + 55*x13 p(f143) = -1*x2 + 55*x13 p(f145) = -1*x2 + 55*x13 p(f147) = -1*x2 + 55*x13 p(f149) = -1*x2 + 55*x13 p(f15) = 55*x13 p(f151) = -1*x2 + 55*x13 p(f153) = -1*x2 + 55*x13 p(f155) = -1*x2 + 55*x13 p(f157) = -1*x2 + 55*x13 p(f159) = -1*x2 + 55*x13 p(f161) = -1*x2 + 55*x13 p(f163) = -1*x2 + 55*x13 p(f165) = -1*x2 + 55*x13 p(f167) = -1*x2 + 55*x13 p(f169) = -1*x2 + 55*x13 p(f17) = 55*x13 p(f171) = -1*x2 + 55*x13 p(f173) = -1*x2 + 54*x13 p(f175) = -1*x2 + 54*x13 p(f177) = -1*x2 + 54*x13 p(f179) = -1*x2 + 54*x13 p(f181) = -1*x2 + 54*x13 p(f19) = 55*x13 p(f21) = 55*x13 p(f23) = 55*x13 p(f25) = 55*x13 p(f27) = 55*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 55*x13 p(f65) = -1*x2 + 55*x13 p(f67) = -1*x2 + 55*x13 p(f69) = -1*x2 + 55*x13 p(f7) = 55*x13 p(f71) = -1*x2 + 55*x13 p(f73) = -1*x2 + 55*x13 p(f75) = -1*x2 + 55*x13 p(f77) = -1*x2 + 55*x13 p(f79) = -1*x2 + 55*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 55*x13 p(f83) = -1*x2 + 55*x13 p(f85) = -1*x2 + 55*x13 p(f87) = -1*x2 + 55*x13 p(f89) = -1*x2 + 55*x13 p(f91) = -1*x2 + 55*x13 p(f93) = -1*x2 + 55*x13 p(f95) = -1*x2 + 55*x13 p(f97) = -1*x2 + 55*x13 p(f99) = -1*x2 + 55*x13 Following rules are strictly oriented: [B = 54] ==> f171(A,B,C) = 55 + -1*B > 0 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 55 + -1*B > 1 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 55 + -1*B > 2 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 55 + -1*B > 3 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 55 + -1*B > 4 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 55 + -1*B > 5 = f61(A,50,C) [B = 1] ==> f65(A,B,C) = 55 + -1*B > 53 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 55 + -1*B > 54 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 55 >= 55 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 55 >= 55 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 55 >= 55 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 55 >= 55 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 55 >= 55 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 55 >= 55 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 55 >= 55 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 55 >= 55 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 55 + -1*B >= 55 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 55 + -1*B >= 55 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 55 + -1*B >= 55 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 55 + -1*B >= 55 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 55 + -1*B >= 55 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 55 + -1*B >= 55 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 55 + -1*B >= 55 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 55 + -1*B >= 55 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 55 + -1*B >= 55 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 55 + -1*B >= 55 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 55 + -1*B >= 55 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 55 + -1*B >= 55 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 55 + -1*B >= 55 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 55 + -1*B >= 55 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 55 + -1*B >= 55 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 55 + -1*B >= 55 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 55 + -1*B >= 55 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 55 + -1*B >= 55 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 55 + -1*B >= 55 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 55 + -1*B >= 55 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 55 + -1*B >= 55 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 55 + -1*B >= 55 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 55 + -1*B >= 55 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 55 + -1*B >= 55 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 55 + -1*B >= 55 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 55 + -1*B >= 55 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 55 + -1*B >= 55 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 55 + -1*B >= 55 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 55 + -1*B >= 55 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 55 + -1*B >= 55 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 55 + -1*B >= 55 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 55 + -1*B >= 55 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 55 + -1*B >= 55 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 55 + -1*B >= 55 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 55 + -1*B >= 55 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 55 + -1*B >= 55 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 55 + -1*B >= 55 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 55 + -1*B >= 55 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 55 + -1*B >= 55 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 55 + -1*B >= 55 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 55 + -1*B >= 55 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 55 + -1*B >= 55 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 55 + -1*B >= 55 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 55 + -1*B >= 55 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 55 + -1*B >= 55 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 55 + -1*B >= 55 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 55 + -1*B >= 55 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 55 + -1*B >= 55 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 55 + -1*B >= 55 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 55 + -1*B >= 55 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 55 + -1*B >= 55 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 55 + -1*B >= 55 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 55 + -1*B >= 55 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 55 + -1*B >= 54 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 54 + -1*B >= 54 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 54 + -1*B >= 54 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 54 + -1*B >= 54 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 54 + -1*B >= 54 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 55 >= 55 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 55 >= 55 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 55 + -1*B >= 55 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 54 + -1*B >= 54 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 54 + -1*B >= -5 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 54 + -1*B >= -4 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 54 + -1*B >= -3 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 54 + -1*B >= -2 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 54 + -1*B >= -1 = f61(A,56,C) [B = 48] ==> f159(A,B,C) = 55 + -1*B >= 6 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 55 + -1*B >= 7 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 55 + -1*B >= 8 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 55 + -1*B >= 9 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 55 + -1*B >= 10 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 55 + -1*B >= 11 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 55 + -1*B >= 12 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 55 + -1*B >= 13 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 55 + -1*B >= 14 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 55 + -1*B >= 15 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 55 + -1*B >= 16 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 55 + -1*B >= 17 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 55 + -1*B >= 18 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 55 + -1*B >= 19 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 55 + -1*B >= 20 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 55 + -1*B >= 21 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 55 + -1*B >= 22 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 55 + -1*B >= 23 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 55 + -1*B >= 24 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 55 + -1*B >= 25 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 55 + -1*B >= 26 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 55 + -1*B >= 27 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 55 + -1*B >= 28 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 55 + -1*B >= 29 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 55 + -1*B >= 30 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 55 + -1*B >= 31 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 55 + -1*B >= 32 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 55 + -1*B >= 33 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 55 + -1*B >= 34 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 55 + -1*B >= 35 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 55 + -1*B >= 36 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 55 + -1*B >= 37 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 55 + -1*B >= 38 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 55 + -1*B >= 39 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 55 + -1*B >= 40 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 55 + -1*B >= 41 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 55 + -1*B >= 42 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 55 + -1*B >= 43 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 55 + -1*B >= 44 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 55 + -1*B >= 45 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 55 + -1*B >= 46 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 55 + -1*B >= 47 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 55 + -1*B >= 48 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 55 + -1*B >= 49 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 55 + -1*B >= 50 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 55 + -1*B >= 51 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 55 + -1*B >= 52 = f61(A,3,C) [B >= 50] ==> f61(A,B,C) = 55 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 55 >= 55 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 55 >= 55 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 55 >= 55 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 55 >= 55 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 55 >= 55 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 55 >= 55 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 55 >= 55 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 55 >= 55 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 55 >= 55 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 55 >= 55 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 55 >= 55 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 55 >= 55 = f61(A,0,C) * Step 16: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (?,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 59*x13 p(f101) = -1*x2 + 59*x13 p(f103) = -1*x2 + 59*x13 p(f105) = -1*x2 + 59*x13 p(f107) = -1*x2 + 59*x13 p(f109) = -1*x2 + 59*x13 p(f11) = 59*x13 p(f111) = -1*x2 + 59*x13 p(f113) = -1*x2 + 59*x13 p(f115) = -1*x2 + 59*x13 p(f117) = -1*x2 + 59*x13 p(f119) = -1*x2 + 59*x13 p(f121) = -1*x2 + 59*x13 p(f123) = -1*x2 + 59*x13 p(f125) = -1*x2 + 59*x13 p(f127) = -1*x2 + 59*x13 p(f129) = -1*x2 + 59*x13 p(f13) = 59*x13 p(f131) = -1*x2 + 59*x13 p(f133) = -1*x2 + 59*x13 p(f135) = -1*x2 + 59*x13 p(f137) = -1*x2 + 59*x13 p(f139) = -1*x2 + 59*x13 p(f141) = -1*x2 + 59*x13 p(f143) = -1*x2 + 59*x13 p(f145) = -1*x2 + 59*x13 p(f147) = -1*x2 + 59*x13 p(f149) = -1*x2 + 59*x13 p(f15) = 59*x13 p(f151) = -1*x2 + 59*x13 p(f153) = -1*x2 + 59*x13 p(f155) = -1*x2 + 59*x13 p(f157) = -1*x2 + 59*x13 p(f159) = -1*x2 + 59*x13 p(f161) = -1*x2 + 59*x13 p(f163) = -1*x2 + 59*x13 p(f165) = -1*x2 + 59*x13 p(f167) = -1*x2 + 59*x13 p(f169) = -1*x2 + 59*x13 p(f17) = 59*x13 p(f171) = -1*x2 + 59*x13 p(f173) = -1*x2 + 59*x13 p(f175) = -1*x2 + 59*x13 p(f177) = -1*x2 + 59*x13 p(f179) = -1*x2 + 59*x13 p(f181) = -1*x2 + 58*x13 p(f19) = 59*x13 p(f21) = 59*x13 p(f23) = 59*x13 p(f25) = 59*x13 p(f27) = 59*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 59*x13 p(f65) = -1*x2 + 59*x13 p(f67) = -1*x2 + 59*x13 p(f69) = -1*x2 + 59*x13 p(f7) = 59*x13 p(f71) = -1*x2 + 59*x13 p(f73) = -1*x2 + 59*x13 p(f75) = -1*x2 + 59*x13 p(f77) = -1*x2 + 59*x13 p(f79) = -1*x2 + 59*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 59*x13 p(f83) = -1*x2 + 59*x13 p(f85) = -1*x2 + 59*x13 p(f87) = -1*x2 + 59*x13 p(f89) = -1*x2 + 59*x13 p(f91) = -1*x2 + 59*x13 p(f93) = -1*x2 + 59*x13 p(f95) = -1*x2 + 59*x13 p(f97) = -1*x2 + 59*x13 p(f99) = -1*x2 + 59*x13 Following rules are strictly oriented: [B = 58] ==> f179(A,B,C) = 59 + -1*B > 0 = f61(A,59,C) [B = 55] ==> f173(A,B,C) = 59 + -1*B > 3 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 59 + -1*B > 4 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 59 + -1*B > 5 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 59 + -1*B > 6 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 59 + -1*B > 7 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 59 + -1*B > 8 = f61(A,51,C) [B = 2] ==> f67(A,B,C) = 59 + -1*B > 56 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 59 + -1*B > 57 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 59 + -1*B > 58 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 59 >= 59 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 59 >= 59 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 59 >= 59 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 59 >= 59 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 59 >= 59 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 59 >= 59 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 59 >= 59 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 59 >= 59 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 59 + -1*B >= 59 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 59 + -1*B >= 59 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 59 + -1*B >= 59 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 59 + -1*B >= 59 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 59 + -1*B >= 59 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 59 + -1*B >= 59 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 59 + -1*B >= 59 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 59 + -1*B >= 59 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 59 + -1*B >= 59 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 59 + -1*B >= 59 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 59 + -1*B >= 59 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 59 + -1*B >= 59 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 59 + -1*B >= 59 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 59 + -1*B >= 59 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 59 + -1*B >= 59 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 59 + -1*B >= 59 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 59 + -1*B >= 59 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 59 + -1*B >= 59 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 59 + -1*B >= 59 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 59 + -1*B >= 59 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 59 + -1*B >= 59 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 59 + -1*B >= 59 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 59 + -1*B >= 59 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 59 + -1*B >= 59 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 59 + -1*B >= 59 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 59 + -1*B >= 59 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 59 + -1*B >= 59 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 59 + -1*B >= 59 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 59 + -1*B >= 59 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 59 + -1*B >= 59 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 59 + -1*B >= 59 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 59 + -1*B >= 59 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 59 + -1*B >= 59 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 59 + -1*B >= 59 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 59 + -1*B >= 59 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 59 + -1*B >= 59 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 59 + -1*B >= 59 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 59 + -1*B >= 59 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 59 + -1*B >= 59 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 59 + -1*B >= 59 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 59 + -1*B >= 59 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 59 + -1*B >= 59 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 59 + -1*B >= 59 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 59 + -1*B >= 59 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 59 + -1*B >= 59 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 59 + -1*B >= 59 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 59 + -1*B >= 59 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 59 + -1*B >= 59 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 59 + -1*B >= 59 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 59 + -1*B >= 59 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 59 + -1*B >= 59 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 59 + -1*B >= 59 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 59 + -1*B >= 59 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 59 + -1*B >= 59 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 59 + -1*B >= 59 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 59 + -1*B >= 59 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 59 + -1*B >= 59 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 59 + -1*B >= 58 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 59 >= 59 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 59 >= 59 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 59 + -1*B >= 59 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 58 + -1*B >= 58 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 58 + -1*B >= -1 = f61(A,60,C) [B = 57] ==> f177(A,B,C) = 59 + -1*B >= 1 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 59 + -1*B >= 2 = f61(A,57,C) [B = 49] ==> f161(A,B,C) = 59 + -1*B >= 9 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 59 + -1*B >= 10 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 59 + -1*B >= 11 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 59 + -1*B >= 12 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 59 + -1*B >= 13 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 59 + -1*B >= 14 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 59 + -1*B >= 15 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 59 + -1*B >= 16 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 59 + -1*B >= 17 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 59 + -1*B >= 18 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 59 + -1*B >= 19 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 59 + -1*B >= 20 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 59 + -1*B >= 21 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 59 + -1*B >= 22 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 59 + -1*B >= 23 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 59 + -1*B >= 24 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 59 + -1*B >= 25 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 59 + -1*B >= 26 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 59 + -1*B >= 27 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 59 + -1*B >= 28 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 59 + -1*B >= 29 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 59 + -1*B >= 30 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 59 + -1*B >= 31 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 59 + -1*B >= 32 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 59 + -1*B >= 33 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 59 + -1*B >= 34 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 59 + -1*B >= 35 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 59 + -1*B >= 36 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 59 + -1*B >= 37 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 59 + -1*B >= 38 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 59 + -1*B >= 39 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 59 + -1*B >= 40 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 59 + -1*B >= 41 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 59 + -1*B >= 42 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 59 + -1*B >= 43 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 59 + -1*B >= 44 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 59 + -1*B >= 45 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 59 + -1*B >= 46 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 59 + -1*B >= 47 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 59 + -1*B >= 48 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 59 + -1*B >= 49 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 59 + -1*B >= 50 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 59 + -1*B >= 51 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 59 + -1*B >= 52 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 59 + -1*B >= 53 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 59 + -1*B >= 54 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 59 + -1*B >= 55 = f61(A,4,C) [B >= 50] ==> f61(A,B,C) = 59 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 59 >= 59 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 59 >= 59 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 59 >= 59 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 59 >= 59 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 59 >= 59 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 59 >= 59 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 59 >= 59 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 59 >= 59 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 59 >= 59 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 59 >= 59 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 59 >= 59 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 59 >= 59 = f61(A,0,C) * Step 17: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (?,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (?,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 15*x13 p(f101) = -1*x2 + 14*x13 p(f103) = -1*x2 + 14*x13 p(f105) = -1*x2 + 14*x13 p(f107) = -1*x2 + 14*x13 p(f109) = -1*x2 + 14*x13 p(f11) = 15*x13 p(f111) = -1*x2 + 14*x13 p(f113) = -1*x2 + 14*x13 p(f115) = -1*x2 + 14*x13 p(f117) = -1*x2 + 14*x13 p(f119) = -1*x2 + 14*x13 p(f121) = -1*x2 + 14*x13 p(f123) = -1*x2 + 14*x13 p(f125) = -1*x2 + 14*x13 p(f127) = -1*x2 + 14*x13 p(f129) = -1*x2 + 14*x13 p(f13) = 15*x13 p(f131) = -1*x2 + 14*x13 p(f133) = -1*x2 + 14*x13 p(f135) = -1*x2 + 14*x13 p(f137) = -1*x2 + 14*x13 p(f139) = -1*x2 + 14*x13 p(f141) = -1*x2 + 14*x13 p(f143) = -1*x2 + 14*x13 p(f145) = -1*x2 + 14*x13 p(f147) = -1*x2 + 14*x13 p(f149) = -1*x2 + 14*x13 p(f15) = 15*x13 p(f151) = -1*x2 + 14*x13 p(f153) = -1*x2 + 14*x13 p(f155) = -1*x2 + 14*x13 p(f157) = -1*x2 + 14*x13 p(f159) = -1*x2 + 14*x13 p(f161) = -1*x2 + 14*x13 p(f163) = -1*x2 + 14*x13 p(f165) = -1*x2 + 14*x13 p(f167) = -1*x2 + 14*x13 p(f169) = -1*x2 + 14*x13 p(f17) = 15*x13 p(f171) = -1*x2 + 14*x13 p(f173) = -1*x2 + 14*x13 p(f175) = -1*x2 + 14*x13 p(f177) = -1*x2 + 14*x13 p(f179) = -1*x2 + 14*x13 p(f181) = -1*x2 + 14*x13 p(f19) = 15*x13 p(f21) = 15*x13 p(f23) = 15*x13 p(f25) = 15*x13 p(f27) = 15*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 15*x13 p(f65) = -1*x2 + 15*x13 p(f67) = -1*x2 + 15*x13 p(f69) = -1*x2 + 15*x13 p(f7) = 15*x13 p(f71) = -1*x2 + 15*x13 p(f73) = -1*x2 + 15*x13 p(f75) = -1*x2 + 15*x13 p(f77) = -1*x2 + 15*x13 p(f79) = -1*x2 + 15*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 15*x13 p(f83) = -1*x2 + 14*x13 p(f85) = -1*x2 + 14*x13 p(f87) = -1*x2 + 14*x13 p(f89) = -1*x2 + 14*x13 p(f91) = -1*x2 + 14*x13 p(f93) = -1*x2 + 14*x13 p(f95) = -1*x2 + 14*x13 p(f97) = -1*x2 + 14*x13 p(f99) = -1*x2 + 14*x13 Following rules are strictly oriented: [B = 9] ==> f81(A,B,C) = 15 + -1*B > 5 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 15 + -1*B > 6 = f61(A,9,C) [B = 2] ==> f67(A,B,C) = 15 + -1*B > 12 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 15 + -1*B > 13 = f61(A,2,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 15 >= 15 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 15 >= 15 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 15 >= 15 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 15 >= 15 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 15 >= 15 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 15 >= 15 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 15 >= 15 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 15 >= 15 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 15 + -1*B >= 15 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 15 + -1*B >= 15 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 15 + -1*B >= 15 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 15 + -1*B >= 15 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 15 + -1*B >= 15 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 15 + -1*B >= 15 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 15 + -1*B >= 15 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 15 + -1*B >= 15 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 15 + -1*B >= 14 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 14 + -1*B >= 14 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 14 + -1*B >= 14 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 14 + -1*B >= 14 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 14 + -1*B >= 14 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 14 + -1*B >= 14 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 14 + -1*B >= 14 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 14 + -1*B >= 14 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 14 + -1*B >= 14 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 14 + -1*B >= 14 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 14 + -1*B >= 14 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 14 + -1*B >= 14 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 14 + -1*B >= 14 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 14 + -1*B >= 14 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 14 + -1*B >= 14 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 14 + -1*B >= 14 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 14 + -1*B >= 14 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 14 + -1*B >= 14 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 14 + -1*B >= 14 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 14 + -1*B >= 14 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 14 + -1*B >= 14 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 14 + -1*B >= 14 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 14 + -1*B >= 14 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 14 + -1*B >= 14 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 14 + -1*B >= 14 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 14 + -1*B >= 14 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 14 + -1*B >= 14 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 14 + -1*B >= 14 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 14 + -1*B >= 14 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 14 + -1*B >= 14 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 14 + -1*B >= 14 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 14 + -1*B >= 14 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 14 + -1*B >= 14 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 14 + -1*B >= 14 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 14 + -1*B >= 14 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 14 + -1*B >= 14 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 14 + -1*B >= 14 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 14 + -1*B >= 14 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 14 + -1*B >= 14 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 14 + -1*B >= 14 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 14 + -1*B >= 14 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 14 + -1*B >= 14 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 14 + -1*B >= 14 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 14 + -1*B >= 14 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 14 + -1*B >= 14 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 14 + -1*B >= 14 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 14 + -1*B >= 14 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 14 + -1*B >= 14 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 14 + -1*B >= 14 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 14 + -1*B >= 14 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 15 >= 15 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 15 >= 15 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 15 + -1*B >= 15 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 14 + -1*B >= 14 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 14 + -1*B >= -45 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 14 + -1*B >= -44 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 14 + -1*B >= -43 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 14 + -1*B >= -42 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 14 + -1*B >= -41 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 14 + -1*B >= -40 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 14 + -1*B >= -39 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 14 + -1*B >= -38 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 14 + -1*B >= -37 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 14 + -1*B >= -36 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 14 + -1*B >= -35 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 14 + -1*B >= -34 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 14 + -1*B >= -33 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 14 + -1*B >= -32 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 14 + -1*B >= -31 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 14 + -1*B >= -30 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 14 + -1*B >= -29 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 14 + -1*B >= -28 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 14 + -1*B >= -27 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 14 + -1*B >= -26 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 14 + -1*B >= -25 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 14 + -1*B >= -24 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 14 + -1*B >= -23 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 14 + -1*B >= -22 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 14 + -1*B >= -21 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 14 + -1*B >= -20 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 14 + -1*B >= -19 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 14 + -1*B >= -18 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 14 + -1*B >= -17 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 14 + -1*B >= -16 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 14 + -1*B >= -15 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 14 + -1*B >= -14 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 14 + -1*B >= -13 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 14 + -1*B >= -12 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 14 + -1*B >= -11 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 14 + -1*B >= -10 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 14 + -1*B >= -9 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 14 + -1*B >= -8 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 14 + -1*B >= -7 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 14 + -1*B >= -6 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 14 + -1*B >= -5 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 14 + -1*B >= -4 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 14 + -1*B >= -3 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 14 + -1*B >= -2 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 14 + -1*B >= -1 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 14 + -1*B >= 0 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 14 + -1*B >= 1 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 14 + -1*B >= 2 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 14 + -1*B >= 3 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 14 + -1*B >= 4 = f61(A,11,C) [B = 7] ==> f77(A,B,C) = 15 + -1*B >= 7 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 15 + -1*B >= 8 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 15 + -1*B >= 9 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 15 + -1*B >= 10 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 15 + -1*B >= 11 = f61(A,4,C) [B = 0] ==> f61(A,B,C) = 15 + -1*B >= 14 = f61(A,1,C) [B >= 50] ==> f61(A,B,C) = 15 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 15 >= 15 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 15 >= 15 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 15 >= 15 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 15 >= 15 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 15 >= 15 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 15 >= 15 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 15 >= 15 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 15 >= 15 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 15 >= 15 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 15 >= 15 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 15 >= 15 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 15 >= 15 = f61(A,0,C) * Step 18: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (?,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 48*x13 p(f101) = -1*x2 + 47*x13 p(f103) = -1*x2 + 47*x13 p(f105) = -1*x2 + 47*x13 p(f107) = -1*x2 + 47*x13 p(f109) = -1*x2 + 47*x13 p(f11) = 48*x13 p(f111) = -1*x2 + 47*x13 p(f113) = -1*x2 + 47*x13 p(f115) = -1*x2 + 47*x13 p(f117) = -1*x2 + 47*x13 p(f119) = -1*x2 + 47*x13 p(f121) = -1*x2 + 47*x13 p(f123) = -1*x2 + 47*x13 p(f125) = -1*x2 + 47*x13 p(f127) = -1*x2 + 47*x13 p(f129) = -1*x2 + 47*x13 p(f13) = 48*x13 p(f131) = -1*x2 + 47*x13 p(f133) = -1*x2 + 47*x13 p(f135) = -1*x2 + 47*x13 p(f137) = -1*x2 + 47*x13 p(f139) = -1*x2 + 47*x13 p(f141) = -1*x2 + 47*x13 p(f143) = -1*x2 + 47*x13 p(f145) = -1*x2 + 47*x13 p(f147) = -1*x2 + 47*x13 p(f149) = -1*x2 + 47*x13 p(f15) = 48*x13 p(f151) = -1*x2 + 47*x13 p(f153) = -1*x2 + 47*x13 p(f155) = -1*x2 + 47*x13 p(f157) = -1*x2 + 47*x13 p(f159) = -1*x2 + 47*x13 p(f161) = -1*x2 + 47*x13 p(f163) = -1*x2 + 47*x13 p(f165) = -1*x2 + 47*x13 p(f167) = -1*x2 + 47*x13 p(f169) = -1*x2 + 47*x13 p(f17) = 48*x13 p(f171) = -1*x2 + 47*x13 p(f173) = -1*x2 + 47*x13 p(f175) = -1*x2 + 47*x13 p(f177) = -1*x2 + 47*x13 p(f179) = -1*x2 + 47*x13 p(f181) = -1*x2 + 47*x13 p(f19) = 48*x13 p(f21) = 48*x13 p(f23) = 48*x13 p(f25) = 48*x13 p(f27) = 48*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 48*x13 p(f65) = -1*x2 + 48*x13 p(f67) = -1*x2 + 48*x13 p(f69) = -1*x2 + 48*x13 p(f7) = 48*x13 p(f71) = -1*x2 + 47*x13 p(f73) = -1*x2 + 47*x13 p(f75) = -1*x2 + 47*x13 p(f77) = -1*x2 + 47*x13 p(f79) = -1*x2 + 47*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 47*x13 p(f83) = -1*x2 + 47*x13 p(f85) = -1*x2 + 47*x13 p(f87) = -1*x2 + 47*x13 p(f89) = -1*x2 + 47*x13 p(f91) = -1*x2 + 47*x13 p(f93) = -1*x2 + 47*x13 p(f95) = -1*x2 + 47*x13 p(f97) = -1*x2 + 47*x13 p(f99) = -1*x2 + 47*x13 Following rules are strictly oriented: [B = 3] ==> f69(A,B,C) = 48 + -1*B > 44 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 48 + -1*B > 45 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 48 + -1*B > 46 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 48 + -1*B > 47 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 48 >= 48 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 48 >= 48 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 48 >= 48 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 48 >= 48 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 48 >= 48 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 48 >= 48 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 48 >= 48 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 48 >= 48 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 48 + -1*B >= 48 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 48 + -1*B >= 48 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 48 + -1*B >= 47 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 47 + -1*B >= 47 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 47 + -1*B >= 47 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 47 + -1*B >= 47 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 47 + -1*B >= 47 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 47 + -1*B >= 47 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 47 + -1*B >= 47 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 47 + -1*B >= 47 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 47 + -1*B >= 47 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 47 + -1*B >= 47 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 47 + -1*B >= 47 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 47 + -1*B >= 47 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 47 + -1*B >= 47 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 47 + -1*B >= 47 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 47 + -1*B >= 47 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 47 + -1*B >= 47 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 47 + -1*B >= 47 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 47 + -1*B >= 47 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 47 + -1*B >= 47 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 47 + -1*B >= 47 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 47 + -1*B >= 47 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 47 + -1*B >= 47 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 47 + -1*B >= 47 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 47 + -1*B >= 47 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 47 + -1*B >= 47 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 47 + -1*B >= 47 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 47 + -1*B >= 47 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 47 + -1*B >= 47 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 47 + -1*B >= 47 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 47 + -1*B >= 47 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 47 + -1*B >= 47 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 47 + -1*B >= 47 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 47 + -1*B >= 47 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 47 + -1*B >= 47 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 47 + -1*B >= 47 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 47 + -1*B >= 47 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 47 + -1*B >= 47 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 47 + -1*B >= 47 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 47 + -1*B >= 47 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 47 + -1*B >= 47 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 47 + -1*B >= 47 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 47 + -1*B >= 47 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 47 + -1*B >= 47 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 47 + -1*B >= 47 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 47 + -1*B >= 47 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 47 + -1*B >= 47 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 47 + -1*B >= 47 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 47 + -1*B >= 47 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 47 + -1*B >= 47 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 47 + -1*B >= 47 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 47 + -1*B >= 47 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 47 + -1*B >= 47 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 47 + -1*B >= 47 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 47 + -1*B >= 47 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 47 + -1*B >= 47 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 47 + -1*B >= 47 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 48 >= 48 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 48 >= 48 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 48 + -1*B >= 48 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 47 + -1*B >= 47 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 47 + -1*B >= -12 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 47 + -1*B >= -11 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 47 + -1*B >= -10 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 47 + -1*B >= -9 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 47 + -1*B >= -8 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 47 + -1*B >= -7 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 47 + -1*B >= -6 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 47 + -1*B >= -5 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 47 + -1*B >= -4 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 47 + -1*B >= -3 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 47 + -1*B >= -2 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 47 + -1*B >= -1 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 47 + -1*B >= 0 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 47 + -1*B >= 1 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 47 + -1*B >= 2 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 47 + -1*B >= 3 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 47 + -1*B >= 4 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 47 + -1*B >= 5 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 47 + -1*B >= 6 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 47 + -1*B >= 7 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 47 + -1*B >= 8 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 47 + -1*B >= 9 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 47 + -1*B >= 10 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 47 + -1*B >= 11 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 47 + -1*B >= 12 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 47 + -1*B >= 13 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 47 + -1*B >= 14 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 47 + -1*B >= 15 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 47 + -1*B >= 16 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 47 + -1*B >= 17 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 47 + -1*B >= 18 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 47 + -1*B >= 19 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 47 + -1*B >= 20 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 47 + -1*B >= 21 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 47 + -1*B >= 22 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 47 + -1*B >= 23 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 47 + -1*B >= 24 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 47 + -1*B >= 25 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 47 + -1*B >= 26 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 47 + -1*B >= 27 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 47 + -1*B >= 28 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 47 + -1*B >= 29 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 47 + -1*B >= 30 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 47 + -1*B >= 31 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 47 + -1*B >= 32 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 47 + -1*B >= 33 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 47 + -1*B >= 34 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 47 + -1*B >= 35 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 47 + -1*B >= 36 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 47 + -1*B >= 37 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 47 + -1*B >= 38 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 47 + -1*B >= 39 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 47 + -1*B >= 40 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 47 + -1*B >= 41 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 47 + -1*B >= 42 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 47 + -1*B >= 43 = f61(A,5,C) [B >= 50] ==> f61(A,B,C) = 48 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 48 >= 48 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 48 >= 48 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 48 >= 48 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 48 >= 48 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 48 >= 48 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 48 >= 48 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 48 >= 48 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 48 >= 48 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 48 >= 48 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 48 >= 48 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 48 >= 48 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 48 >= 48 = f61(A,0,C) * Step 19: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (?,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 50*x13 p(f101) = -1*x2 + 50*x13 p(f103) = -1*x2 + 50*x13 p(f105) = -1*x2 + 50*x13 p(f107) = -1*x2 + 49*x13 p(f109) = -1*x2 + 49*x13 p(f11) = 50*x13 p(f111) = -1*x2 + 49*x13 p(f113) = -1*x2 + 49*x13 p(f115) = -1*x2 + 49*x13 p(f117) = -1*x2 + 49*x13 p(f119) = -1*x2 + 49*x13 p(f121) = -1*x2 + 49*x13 p(f123) = -1*x2 + 49*x13 p(f125) = -1*x2 + 49*x13 p(f127) = -1*x2 + 49*x13 p(f129) = -1*x2 + 49*x13 p(f13) = 50*x13 p(f131) = -1*x2 + 49*x13 p(f133) = -1*x2 + 49*x13 p(f135) = -1*x2 + 49*x13 p(f137) = -1*x2 + 49*x13 p(f139) = -1*x2 + 49*x13 p(f141) = -1*x2 + 49*x13 p(f143) = -1*x2 + 49*x13 p(f145) = -1*x2 + 49*x13 p(f147) = -1*x2 + 49*x13 p(f149) = -1*x2 + 49*x13 p(f15) = 50*x13 p(f151) = -1*x2 + 49*x13 p(f153) = -1*x2 + 49*x13 p(f155) = -1*x2 + 49*x13 p(f157) = -1*x2 + 49*x13 p(f159) = -1*x2 + 49*x13 p(f161) = -1*x2 + 49*x13 p(f163) = -1*x2 + 49*x13 p(f165) = -1*x2 + 49*x13 p(f167) = -1*x2 + 49*x13 p(f169) = -1*x2 + 49*x13 p(f17) = 50*x13 p(f171) = -1*x2 + 49*x13 p(f173) = -1*x2 + 49*x13 p(f175) = -1*x2 + 49*x13 p(f177) = -1*x2 + 49*x13 p(f179) = -1*x2 + 49*x13 p(f181) = -1*x2 + 49*x13 p(f19) = 50*x13 p(f21) = 50*x13 p(f23) = 50*x13 p(f25) = 50*x13 p(f27) = 50*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 50*x13 p(f65) = -1*x2 + 50*x13 p(f67) = -1*x2 + 50*x13 p(f69) = -1*x2 + 50*x13 p(f7) = 50*x13 p(f71) = -1*x2 + 50*x13 p(f73) = -1*x2 + 50*x13 p(f75) = -1*x2 + 50*x13 p(f77) = -1*x2 + 50*x13 p(f79) = -1*x2 + 50*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 50*x13 p(f83) = -1*x2 + 50*x13 p(f85) = -1*x2 + 50*x13 p(f87) = -1*x2 + 50*x13 p(f89) = -1*x2 + 50*x13 p(f91) = -1*x2 + 50*x13 p(f93) = -1*x2 + 50*x13 p(f95) = -1*x2 + 50*x13 p(f97) = -1*x2 + 50*x13 p(f99) = -1*x2 + 50*x13 Following rules are strictly oriented: [B = 9] ==> f81(A,B,C) = 50 + -1*B > 40 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 50 + -1*B > 41 = f61(A,9,C) [B = 4] ==> f71(A,B,C) = 50 + -1*B > 45 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 50 + -1*B > 46 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 50 + -1*B > 47 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 50 + -1*B > 48 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 50 + -1*B > 49 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 50 >= 50 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 50 >= 50 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 50 >= 50 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 50 >= 50 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 50 >= 50 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 50 >= 50 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 50 >= 50 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 50 >= 50 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 50 + -1*B >= 50 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 50 + -1*B >= 50 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 50 + -1*B >= 50 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 50 + -1*B >= 50 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 50 + -1*B >= 50 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 50 + -1*B >= 50 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 50 + -1*B >= 50 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 50 + -1*B >= 50 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 50 + -1*B >= 50 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 50 + -1*B >= 50 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 50 + -1*B >= 50 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 50 + -1*B >= 50 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 50 + -1*B >= 50 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 50 + -1*B >= 50 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 50 + -1*B >= 50 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 50 + -1*B >= 50 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 50 + -1*B >= 50 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 50 + -1*B >= 50 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 50 + -1*B >= 50 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 50 + -1*B >= 50 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 50 + -1*B >= 49 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 49 + -1*B >= 49 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 49 + -1*B >= 49 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 49 + -1*B >= 49 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 49 + -1*B >= 49 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 49 + -1*B >= 49 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 49 + -1*B >= 49 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 49 + -1*B >= 49 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 49 + -1*B >= 49 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 49 + -1*B >= 49 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 49 + -1*B >= 49 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 49 + -1*B >= 49 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 49 + -1*B >= 49 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 49 + -1*B >= 49 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 49 + -1*B >= 49 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 49 + -1*B >= 49 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 49 + -1*B >= 49 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 49 + -1*B >= 49 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 49 + -1*B >= 49 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 49 + -1*B >= 49 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 49 + -1*B >= 49 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 49 + -1*B >= 49 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 49 + -1*B >= 49 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 49 + -1*B >= 49 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 49 + -1*B >= 49 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 49 + -1*B >= 49 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 49 + -1*B >= 49 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 49 + -1*B >= 49 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 49 + -1*B >= 49 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 49 + -1*B >= 49 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 49 + -1*B >= 49 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 49 + -1*B >= 49 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 49 + -1*B >= 49 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 49 + -1*B >= 49 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 49 + -1*B >= 49 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 49 + -1*B >= 49 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 49 + -1*B >= 49 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 49 + -1*B >= 49 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 50 >= 50 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 50 >= 50 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 50 + -1*B >= 50 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 49 + -1*B >= 49 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 49 + -1*B >= -10 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 49 + -1*B >= -9 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 49 + -1*B >= -8 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 49 + -1*B >= -7 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 49 + -1*B >= -6 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 49 + -1*B >= -5 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 49 + -1*B >= -4 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 49 + -1*B >= -3 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 49 + -1*B >= -2 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 49 + -1*B >= -1 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 49 + -1*B >= 0 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 49 + -1*B >= 1 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 49 + -1*B >= 2 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 49 + -1*B >= 3 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 49 + -1*B >= 4 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 49 + -1*B >= 5 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 49 + -1*B >= 6 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 49 + -1*B >= 7 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 49 + -1*B >= 8 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 49 + -1*B >= 9 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 49 + -1*B >= 10 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 49 + -1*B >= 11 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 49 + -1*B >= 12 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 49 + -1*B >= 13 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 49 + -1*B >= 14 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 49 + -1*B >= 15 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 49 + -1*B >= 16 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 49 + -1*B >= 17 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 49 + -1*B >= 18 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 49 + -1*B >= 19 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 49 + -1*B >= 20 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 49 + -1*B >= 21 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 49 + -1*B >= 22 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 49 + -1*B >= 23 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 49 + -1*B >= 24 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 49 + -1*B >= 25 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 49 + -1*B >= 26 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 49 + -1*B >= 27 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 50 + -1*B >= 28 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 50 + -1*B >= 29 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 50 + -1*B >= 30 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 50 + -1*B >= 31 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 50 + -1*B >= 32 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 50 + -1*B >= 33 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 50 + -1*B >= 34 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 50 + -1*B >= 35 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 50 + -1*B >= 36 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 50 + -1*B >= 37 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 50 + -1*B >= 38 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 50 + -1*B >= 39 = f61(A,11,C) [B = 7] ==> f77(A,B,C) = 50 + -1*B >= 42 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 50 + -1*B >= 43 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 50 + -1*B >= 44 = f61(A,6,C) [B >= 50] ==> f61(A,B,C) = 50 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 50 >= 50 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 50 >= 50 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 50 >= 50 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 50 >= 50 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 50 >= 50 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 50 >= 50 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 50 >= 50 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 50 >= 50 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 50 >= 50 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 50 >= 50 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 50 >= 50 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 50 >= 50 = f61(A,0,C) * Step 20: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (?,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 36*x13 p(f101) = -1*x2 + 35*x13 p(f103) = -1*x2 + 35*x13 p(f105) = -1*x2 + 35*x13 p(f107) = -1*x2 + 35*x13 p(f109) = -1*x2 + 35*x13 p(f11) = 36*x13 p(f111) = -1*x2 + 35*x13 p(f113) = -1*x2 + 35*x13 p(f115) = -1*x2 + 35*x13 p(f117) = -1*x2 + 35*x13 p(f119) = -1*x2 + 35*x13 p(f121) = -1*x2 + 35*x13 p(f123) = -1*x2 + 35*x13 p(f125) = -1*x2 + 35*x13 p(f127) = -1*x2 + 35*x13 p(f129) = -1*x2 + 35*x13 p(f13) = 36*x13 p(f131) = -1*x2 + 35*x13 p(f133) = -1*x2 + 35*x13 p(f135) = -1*x2 + 35*x13 p(f137) = -1*x2 + 35*x13 p(f139) = -1*x2 + 35*x13 p(f141) = -1*x2 + 35*x13 p(f143) = -1*x2 + 35*x13 p(f145) = -1*x2 + 35*x13 p(f147) = -1*x2 + 35*x13 p(f149) = -1*x2 + 35*x13 p(f15) = 36*x13 p(f151) = -1*x2 + 35*x13 p(f153) = -1*x2 + 35*x13 p(f155) = -1*x2 + 35*x13 p(f157) = -1*x2 + 35*x13 p(f159) = -1*x2 + 35*x13 p(f161) = -1*x2 + 35*x13 p(f163) = -1*x2 + 35*x13 p(f165) = -1*x2 + 35*x13 p(f167) = -1*x2 + 35*x13 p(f169) = -1*x2 + 35*x13 p(f17) = 36*x13 p(f171) = -1*x2 + 35*x13 p(f173) = -1*x2 + 35*x13 p(f175) = -1*x2 + 35*x13 p(f177) = -1*x2 + 35*x13 p(f179) = -1*x2 + 35*x13 p(f181) = -1*x2 + 35*x13 p(f19) = 36*x13 p(f21) = 36*x13 p(f23) = 36*x13 p(f25) = 36*x13 p(f27) = 36*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 36*x13 p(f65) = -1*x2 + 36*x13 p(f67) = -1*x2 + 36*x13 p(f69) = -1*x2 + 36*x13 p(f7) = 36*x13 p(f71) = -1*x2 + 36*x13 p(f73) = -1*x2 + 36*x13 p(f75) = -1*x2 + 35*x13 p(f77) = -1*x2 + 35*x13 p(f79) = -1*x2 + 35*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 35*x13 p(f83) = -1*x2 + 35*x13 p(f85) = -1*x2 + 35*x13 p(f87) = -1*x2 + 35*x13 p(f89) = -1*x2 + 35*x13 p(f91) = -1*x2 + 35*x13 p(f93) = -1*x2 + 35*x13 p(f95) = -1*x2 + 35*x13 p(f97) = -1*x2 + 35*x13 p(f99) = -1*x2 + 35*x13 Following rules are strictly oriented: [B = 5] ==> f73(A,B,C) = 36 + -1*B > 30 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 36 + -1*B > 31 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 36 + -1*B > 32 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 36 + -1*B > 33 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 36 + -1*B > 34 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 36 + -1*B > 35 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 36 >= 36 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 36 >= 36 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 36 >= 36 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 36 >= 36 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 36 >= 36 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 36 >= 36 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 36 >= 36 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 36 >= 36 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 36 + -1*B >= 36 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 36 + -1*B >= 36 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 36 + -1*B >= 36 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 36 + -1*B >= 36 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 36 + -1*B >= 35 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 35 + -1*B >= 35 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 35 + -1*B >= 35 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 35 + -1*B >= 35 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 35 + -1*B >= 35 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 35 + -1*B >= 35 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 35 + -1*B >= 35 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 35 + -1*B >= 35 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 35 + -1*B >= 35 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 35 + -1*B >= 35 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 35 + -1*B >= 35 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 35 + -1*B >= 35 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 35 + -1*B >= 35 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 35 + -1*B >= 35 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 35 + -1*B >= 35 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 35 + -1*B >= 35 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 35 + -1*B >= 35 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 35 + -1*B >= 35 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 35 + -1*B >= 35 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 35 + -1*B >= 35 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 35 + -1*B >= 35 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 35 + -1*B >= 35 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 35 + -1*B >= 35 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 35 + -1*B >= 35 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 35 + -1*B >= 35 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 35 + -1*B >= 35 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 35 + -1*B >= 35 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 35 + -1*B >= 35 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 35 + -1*B >= 35 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 35 + -1*B >= 35 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 35 + -1*B >= 35 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 35 + -1*B >= 35 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 35 + -1*B >= 35 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 35 + -1*B >= 35 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 35 + -1*B >= 35 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 35 + -1*B >= 35 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 35 + -1*B >= 35 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 35 + -1*B >= 35 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 35 + -1*B >= 35 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 35 + -1*B >= 35 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 35 + -1*B >= 35 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 35 + -1*B >= 35 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 35 + -1*B >= 35 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 35 + -1*B >= 35 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 35 + -1*B >= 35 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 35 + -1*B >= 35 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 35 + -1*B >= 35 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 35 + -1*B >= 35 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 35 + -1*B >= 35 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 35 + -1*B >= 35 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 35 + -1*B >= 35 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 35 + -1*B >= 35 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 35 + -1*B >= 35 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 35 + -1*B >= 35 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 36 >= 36 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 36 >= 36 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 36 + -1*B >= 36 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 35 + -1*B >= 35 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 35 + -1*B >= -24 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 35 + -1*B >= -23 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 35 + -1*B >= -22 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 35 + -1*B >= -21 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 35 + -1*B >= -20 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 35 + -1*B >= -19 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 35 + -1*B >= -18 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 35 + -1*B >= -17 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 35 + -1*B >= -16 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 35 + -1*B >= -15 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 35 + -1*B >= -14 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 35 + -1*B >= -13 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 35 + -1*B >= -12 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 35 + -1*B >= -11 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 35 + -1*B >= -10 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 35 + -1*B >= -9 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 35 + -1*B >= -8 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 35 + -1*B >= -7 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 35 + -1*B >= -6 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 35 + -1*B >= -5 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 35 + -1*B >= -4 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 35 + -1*B >= -3 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 35 + -1*B >= -2 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 35 + -1*B >= -1 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 35 + -1*B >= 0 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 35 + -1*B >= 1 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 35 + -1*B >= 2 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 35 + -1*B >= 3 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 35 + -1*B >= 4 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 35 + -1*B >= 5 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 35 + -1*B >= 6 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 35 + -1*B >= 7 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 35 + -1*B >= 8 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 35 + -1*B >= 9 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 35 + -1*B >= 10 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 35 + -1*B >= 11 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 35 + -1*B >= 12 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 35 + -1*B >= 13 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 35 + -1*B >= 14 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 35 + -1*B >= 15 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 35 + -1*B >= 16 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 35 + -1*B >= 17 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 35 + -1*B >= 18 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 35 + -1*B >= 19 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 35 + -1*B >= 20 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 35 + -1*B >= 21 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 35 + -1*B >= 22 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 35 + -1*B >= 23 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 35 + -1*B >= 24 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 35 + -1*B >= 25 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 35 + -1*B >= 26 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 35 + -1*B >= 27 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 35 + -1*B >= 28 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 35 + -1*B >= 29 = f61(A,7,C) [B >= 50] ==> f61(A,B,C) = 36 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 36 >= 36 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 36 >= 36 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 36 >= 36 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 36 >= 36 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 36 >= 36 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 36 >= 36 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 36 >= 36 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 36 >= 36 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 36 >= 36 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 36 >= 36 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 36 >= 36 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 36 >= 36 = f61(A,0,C) * Step 21: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (?,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 17*x13 p(f101) = -1*x2 + 16*x13 p(f103) = -1*x2 + 16*x13 p(f105) = -1*x2 + 16*x13 p(f107) = -1*x2 + 16*x13 p(f109) = -1*x2 + 16*x13 p(f11) = 17*x13 p(f111) = -1*x2 + 16*x13 p(f113) = -1*x2 + 16*x13 p(f115) = -1*x2 + 16*x13 p(f117) = -1*x2 + 16*x13 p(f119) = -1*x2 + 16*x13 p(f121) = -1*x2 + 16*x13 p(f123) = -1*x2 + 16*x13 p(f125) = -1*x2 + 16*x13 p(f127) = -1*x2 + 16*x13 p(f129) = -1*x2 + 16*x13 p(f13) = 17*x13 p(f131) = -1*x2 + 16*x13 p(f133) = -1*x2 + 16*x13 p(f135) = -1*x2 + 16*x13 p(f137) = -1*x2 + 16*x13 p(f139) = -1*x2 + 16*x13 p(f141) = -1*x2 + 16*x13 p(f143) = -1*x2 + 16*x13 p(f145) = -1*x2 + 16*x13 p(f147) = -1*x2 + 16*x13 p(f149) = -1*x2 + 16*x13 p(f15) = 17*x13 p(f151) = -1*x2 + 16*x13 p(f153) = -1*x2 + 16*x13 p(f155) = -1*x2 + 16*x13 p(f157) = -1*x2 + 16*x13 p(f159) = -1*x2 + 16*x13 p(f161) = -1*x2 + 16*x13 p(f163) = -1*x2 + 16*x13 p(f165) = -1*x2 + 16*x13 p(f167) = -1*x2 + 16*x13 p(f169) = -1*x2 + 16*x13 p(f17) = 17*x13 p(f171) = -1*x2 + 16*x13 p(f173) = -1*x2 + 16*x13 p(f175) = -1*x2 + 16*x13 p(f177) = -1*x2 + 16*x13 p(f179) = -1*x2 + 16*x13 p(f181) = -1*x2 + 16*x13 p(f19) = 17*x13 p(f21) = 17*x13 p(f23) = 17*x13 p(f25) = 17*x13 p(f27) = 17*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 17*x13 p(f65) = -1*x2 + 17*x13 p(f67) = -1*x2 + 17*x13 p(f69) = -1*x2 + 17*x13 p(f7) = 17*x13 p(f71) = -1*x2 + 17*x13 p(f73) = -1*x2 + 17*x13 p(f75) = -1*x2 + 17*x13 p(f77) = -1*x2 + 17*x13 p(f79) = -1*x2 + 17*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 17*x13 p(f83) = -1*x2 + 17*x13 p(f85) = -1*x2 + 17*x13 p(f87) = -1*x2 + 17*x13 p(f89) = -1*x2 + 17*x13 p(f91) = -1*x2 + 17*x13 p(f93) = -1*x2 + 17*x13 p(f95) = -1*x2 + 17*x13 p(f97) = -1*x2 + 16*x13 p(f99) = -1*x2 + 16*x13 Following rules are strictly oriented: [B = 16] ==> f95(A,B,C) = 17 + -1*B > 0 = f61(A,17,C) [B = 9] ==> f81(A,B,C) = 17 + -1*B > 7 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 17 + -1*B > 8 = f61(A,9,C) [B = 5] ==> f73(A,B,C) = 17 + -1*B > 11 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 17 + -1*B > 12 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 17 + -1*B > 13 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 17 + -1*B > 14 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 17 + -1*B > 15 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 17 + -1*B > 16 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 17 >= 17 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 17 >= 17 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 17 >= 17 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 17 >= 17 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 17 >= 17 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 17 >= 17 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 17 >= 17 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 17 >= 17 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 17 + -1*B >= 17 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 17 + -1*B >= 17 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 17 + -1*B >= 17 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 17 + -1*B >= 17 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 17 + -1*B >= 17 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 17 + -1*B >= 17 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 17 + -1*B >= 17 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 17 + -1*B >= 17 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 17 + -1*B >= 17 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 17 + -1*B >= 17 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 17 + -1*B >= 17 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 17 + -1*B >= 17 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 17 + -1*B >= 17 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 17 + -1*B >= 17 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 17 + -1*B >= 17 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 17 + -1*B >= 16 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 16 + -1*B >= 16 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 16 + -1*B >= 16 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 16 + -1*B >= 16 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 16 + -1*B >= 16 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 16 + -1*B >= 16 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 16 + -1*B >= 16 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 16 + -1*B >= 16 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 16 + -1*B >= 16 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 16 + -1*B >= 16 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 16 + -1*B >= 16 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 16 + -1*B >= 16 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 16 + -1*B >= 16 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 16 + -1*B >= 16 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 16 + -1*B >= 16 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 16 + -1*B >= 16 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 16 + -1*B >= 16 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 16 + -1*B >= 16 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 16 + -1*B >= 16 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 16 + -1*B >= 16 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 16 + -1*B >= 16 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 16 + -1*B >= 16 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 16 + -1*B >= 16 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 16 + -1*B >= 16 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 16 + -1*B >= 16 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 16 + -1*B >= 16 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 16 + -1*B >= 16 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 16 + -1*B >= 16 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 16 + -1*B >= 16 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 16 + -1*B >= 16 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 16 + -1*B >= 16 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 16 + -1*B >= 16 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 16 + -1*B >= 16 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 16 + -1*B >= 16 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 16 + -1*B >= 16 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 16 + -1*B >= 16 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 16 + -1*B >= 16 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 16 + -1*B >= 16 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 16 + -1*B >= 16 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 16 + -1*B >= 16 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 16 + -1*B >= 16 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 16 + -1*B >= 16 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 16 + -1*B >= 16 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 17 >= 17 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 17 >= 17 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 17 + -1*B >= 17 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 16 + -1*B >= 16 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 16 + -1*B >= -43 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 16 + -1*B >= -42 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 16 + -1*B >= -41 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 16 + -1*B >= -40 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 16 + -1*B >= -39 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 16 + -1*B >= -38 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 16 + -1*B >= -37 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 16 + -1*B >= -36 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 16 + -1*B >= -35 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 16 + -1*B >= -34 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 16 + -1*B >= -33 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 16 + -1*B >= -32 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 16 + -1*B >= -31 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 16 + -1*B >= -30 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 16 + -1*B >= -29 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 16 + -1*B >= -28 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 16 + -1*B >= -27 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 16 + -1*B >= -26 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 16 + -1*B >= -25 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 16 + -1*B >= -24 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 16 + -1*B >= -23 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 16 + -1*B >= -22 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 16 + -1*B >= -21 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 16 + -1*B >= -20 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 16 + -1*B >= -19 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 16 + -1*B >= -18 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 16 + -1*B >= -17 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 16 + -1*B >= -16 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 16 + -1*B >= -15 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 16 + -1*B >= -14 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 16 + -1*B >= -13 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 16 + -1*B >= -12 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 16 + -1*B >= -11 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 16 + -1*B >= -10 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 16 + -1*B >= -9 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 16 + -1*B >= -8 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 16 + -1*B >= -7 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 16 + -1*B >= -6 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 16 + -1*B >= -5 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 16 + -1*B >= -4 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 16 + -1*B >= -3 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 16 + -1*B >= -2 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 16 + -1*B >= -1 = f61(A,18,C) [B = 15] ==> f93(A,B,C) = 17 + -1*B >= 1 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 17 + -1*B >= 2 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 17 + -1*B >= 3 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 17 + -1*B >= 4 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 17 + -1*B >= 5 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 17 + -1*B >= 6 = f61(A,11,C) [B = 7] ==> f77(A,B,C) = 17 + -1*B >= 9 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 17 + -1*B >= 10 = f61(A,7,C) [B >= 50] ==> f61(A,B,C) = 17 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 17 >= 17 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 17 >= 17 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 17 >= 17 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 17 >= 17 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 17 >= 17 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 17 >= 17 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 17 >= 17 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 17 >= 17 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 17 >= 17 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 17 >= 17 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 17 >= 17 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 17 >= 17 = f61(A,0,C) * Step 22: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (?,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 47*x13 p(f101) = -1*x2 + 46*x13 p(f103) = -1*x2 + 46*x13 p(f105) = -1*x2 + 46*x13 p(f107) = -1*x2 + 46*x13 p(f109) = -1*x2 + 46*x13 p(f11) = 47*x13 p(f111) = -1*x2 + 46*x13 p(f113) = -1*x2 + 46*x13 p(f115) = -1*x2 + 46*x13 p(f117) = -1*x2 + 46*x13 p(f119) = -1*x2 + 46*x13 p(f121) = -1*x2 + 46*x13 p(f123) = -1*x2 + 46*x13 p(f125) = -1*x2 + 46*x13 p(f127) = -1*x2 + 46*x13 p(f129) = -1*x2 + 46*x13 p(f13) = 47*x13 p(f131) = -1*x2 + 46*x13 p(f133) = -1*x2 + 46*x13 p(f135) = -1*x2 + 46*x13 p(f137) = -1*x2 + 46*x13 p(f139) = -1*x2 + 46*x13 p(f141) = -1*x2 + 46*x13 p(f143) = -1*x2 + 46*x13 p(f145) = -1*x2 + 46*x13 p(f147) = -1*x2 + 46*x13 p(f149) = -1*x2 + 46*x13 p(f15) = 47*x13 p(f151) = -1*x2 + 46*x13 p(f153) = -1*x2 + 46*x13 p(f155) = -1*x2 + 46*x13 p(f157) = -1*x2 + 46*x13 p(f159) = -1*x2 + 46*x13 p(f161) = -1*x2 + 46*x13 p(f163) = -1*x2 + 46*x13 p(f165) = -1*x2 + 46*x13 p(f167) = -1*x2 + 46*x13 p(f169) = -1*x2 + 46*x13 p(f17) = 47*x13 p(f171) = -1*x2 + 46*x13 p(f173) = -1*x2 + 46*x13 p(f175) = -1*x2 + 46*x13 p(f177) = -1*x2 + 46*x13 p(f179) = -1*x2 + 46*x13 p(f181) = -1*x2 + 46*x13 p(f19) = 47*x13 p(f21) = 47*x13 p(f23) = 47*x13 p(f25) = 47*x13 p(f27) = 47*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 47*x13 p(f65) = -1*x2 + 47*x13 p(f67) = -1*x2 + 47*x13 p(f69) = -1*x2 + 47*x13 p(f7) = 47*x13 p(f71) = -1*x2 + 47*x13 p(f73) = -1*x2 + 47*x13 p(f75) = -1*x2 + 47*x13 p(f77) = -1*x2 + 46*x13 p(f79) = -1*x2 + 46*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 46*x13 p(f83) = -1*x2 + 46*x13 p(f85) = -1*x2 + 46*x13 p(f87) = -1*x2 + 46*x13 p(f89) = -1*x2 + 46*x13 p(f91) = -1*x2 + 46*x13 p(f93) = -1*x2 + 46*x13 p(f95) = -1*x2 + 46*x13 p(f97) = -1*x2 + 46*x13 p(f99) = -1*x2 + 46*x13 Following rules are strictly oriented: [B = 6] ==> f75(A,B,C) = 47 + -1*B > 40 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 47 + -1*B > 41 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 47 + -1*B > 42 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 47 + -1*B > 43 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 47 + -1*B > 44 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 47 + -1*B > 45 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 47 + -1*B > 46 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 47 >= 47 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 47 >= 47 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 47 >= 47 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 47 >= 47 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 47 >= 47 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 47 >= 47 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 47 >= 47 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 47 >= 47 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 47 + -1*B >= 47 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 47 + -1*B >= 47 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 47 + -1*B >= 47 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 47 + -1*B >= 47 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 47 + -1*B >= 47 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 47 + -1*B >= 46 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 46 + -1*B >= 46 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 46 + -1*B >= 46 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 46 + -1*B >= 46 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 46 + -1*B >= 46 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 46 + -1*B >= 46 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 46 + -1*B >= 46 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 46 + -1*B >= 46 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 46 + -1*B >= 46 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 46 + -1*B >= 46 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 46 + -1*B >= 46 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 46 + -1*B >= 46 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 46 + -1*B >= 46 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 46 + -1*B >= 46 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 46 + -1*B >= 46 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 46 + -1*B >= 46 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 46 + -1*B >= 46 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 46 + -1*B >= 46 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 46 + -1*B >= 46 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 46 + -1*B >= 46 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 46 + -1*B >= 46 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 46 + -1*B >= 46 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 46 + -1*B >= 46 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 46 + -1*B >= 46 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 46 + -1*B >= 46 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 46 + -1*B >= 46 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 46 + -1*B >= 46 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 46 + -1*B >= 46 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 46 + -1*B >= 46 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 46 + -1*B >= 46 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 46 + -1*B >= 46 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 46 + -1*B >= 46 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 46 + -1*B >= 46 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 46 + -1*B >= 46 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 46 + -1*B >= 46 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 46 + -1*B >= 46 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 46 + -1*B >= 46 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 46 + -1*B >= 46 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 46 + -1*B >= 46 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 46 + -1*B >= 46 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 46 + -1*B >= 46 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 46 + -1*B >= 46 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 46 + -1*B >= 46 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 46 + -1*B >= 46 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 46 + -1*B >= 46 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 46 + -1*B >= 46 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 46 + -1*B >= 46 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 46 + -1*B >= 46 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 46 + -1*B >= 46 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 46 + -1*B >= 46 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 46 + -1*B >= 46 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 46 + -1*B >= 46 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 46 + -1*B >= 46 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 47 >= 47 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 47 >= 47 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 47 + -1*B >= 47 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 46 + -1*B >= 46 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 46 + -1*B >= -13 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 46 + -1*B >= -12 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 46 + -1*B >= -11 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 46 + -1*B >= -10 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 46 + -1*B >= -9 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 46 + -1*B >= -8 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 46 + -1*B >= -7 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 46 + -1*B >= -6 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 46 + -1*B >= -5 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 46 + -1*B >= -4 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 46 + -1*B >= -3 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 46 + -1*B >= -2 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 46 + -1*B >= -1 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 46 + -1*B >= 0 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 46 + -1*B >= 1 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 46 + -1*B >= 2 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 46 + -1*B >= 3 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 46 + -1*B >= 4 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 46 + -1*B >= 5 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 46 + -1*B >= 6 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 46 + -1*B >= 7 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 46 + -1*B >= 8 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 46 + -1*B >= 9 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 46 + -1*B >= 10 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 46 + -1*B >= 11 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 46 + -1*B >= 12 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 46 + -1*B >= 13 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 46 + -1*B >= 14 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 46 + -1*B >= 15 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 46 + -1*B >= 16 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 46 + -1*B >= 17 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 46 + -1*B >= 18 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 46 + -1*B >= 19 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 46 + -1*B >= 20 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 46 + -1*B >= 21 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 46 + -1*B >= 22 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 46 + -1*B >= 23 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 46 + -1*B >= 24 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 46 + -1*B >= 25 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 46 + -1*B >= 26 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 46 + -1*B >= 27 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 46 + -1*B >= 28 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 46 + -1*B >= 29 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 46 + -1*B >= 30 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 46 + -1*B >= 31 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 46 + -1*B >= 32 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 46 + -1*B >= 33 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 46 + -1*B >= 34 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 46 + -1*B >= 35 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 46 + -1*B >= 36 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 46 + -1*B >= 37 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 46 + -1*B >= 38 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 46 + -1*B >= 39 = f61(A,8,C) [B >= 50] ==> f61(A,B,C) = 47 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 47 >= 47 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 47 >= 47 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 47 >= 47 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 47 >= 47 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 47 >= 47 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 47 >= 47 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 47 >= 47 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 47 >= 47 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 47 >= 47 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 47 >= 47 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 47 >= 47 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 47 >= 47 = f61(A,0,C) * Step 23: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (?,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 59*x13 p(f101) = -1*x2 + 59*x13 p(f103) = -1*x2 + 59*x13 p(f105) = -1*x2 + 59*x13 p(f107) = -1*x2 + 59*x13 p(f109) = -1*x2 + 59*x13 p(f11) = 59*x13 p(f111) = -1*x2 + 59*x13 p(f113) = -1*x2 + 59*x13 p(f115) = -1*x2 + 59*x13 p(f117) = -1*x2 + 59*x13 p(f119) = -1*x2 + 59*x13 p(f121) = -1*x2 + 59*x13 p(f123) = -1*x2 + 59*x13 p(f125) = -1*x2 + 59*x13 p(f127) = -1*x2 + 59*x13 p(f129) = -1*x2 + 59*x13 p(f13) = 59*x13 p(f131) = -1*x2 + 59*x13 p(f133) = -1*x2 + 59*x13 p(f135) = -1*x2 + 59*x13 p(f137) = -1*x2 + 59*x13 p(f139) = -1*x2 + 59*x13 p(f141) = -1*x2 + 59*x13 p(f143) = -1*x2 + 59*x13 p(f145) = -1*x2 + 59*x13 p(f147) = -1*x2 + 59*x13 p(f149) = -1*x2 + 59*x13 p(f15) = 59*x13 p(f151) = -1*x2 + 59*x13 p(f153) = -1*x2 + 59*x13 p(f155) = -1*x2 + 59*x13 p(f157) = -1*x2 + 59*x13 p(f159) = -1*x2 + 59*x13 p(f161) = -1*x2 + 59*x13 p(f163) = -1*x2 + 59*x13 p(f165) = -1*x2 + 59*x13 p(f167) = -1*x2 + 59*x13 p(f169) = -1*x2 + 59*x13 p(f17) = 59*x13 p(f171) = -1*x2 + 59*x13 p(f173) = -1*x2 + 59*x13 p(f175) = -1*x2 + 59*x13 p(f177) = -1*x2 + 59*x13 p(f179) = -1*x2 + 59*x13 p(f181) = -1*x2 + 58*x13 p(f19) = 59*x13 p(f21) = 59*x13 p(f23) = 59*x13 p(f25) = 59*x13 p(f27) = 59*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 59*x13 p(f65) = -1*x2 + 59*x13 p(f67) = -1*x2 + 59*x13 p(f69) = -1*x2 + 59*x13 p(f7) = 59*x13 p(f71) = -1*x2 + 59*x13 p(f73) = -1*x2 + 59*x13 p(f75) = -1*x2 + 59*x13 p(f77) = -1*x2 + 59*x13 p(f79) = -1*x2 + 59*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 59*x13 p(f83) = -1*x2 + 59*x13 p(f85) = -1*x2 + 59*x13 p(f87) = -1*x2 + 59*x13 p(f89) = -1*x2 + 59*x13 p(f91) = -1*x2 + 59*x13 p(f93) = -1*x2 + 59*x13 p(f95) = -1*x2 + 59*x13 p(f97) = -1*x2 + 59*x13 p(f99) = -1*x2 + 59*x13 Following rules are strictly oriented: [B = 58] ==> f179(A,B,C) = 59 + -1*B > 0 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 59 + -1*B > 1 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 59 + -1*B > 2 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 59 + -1*B > 3 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 59 + -1*B > 4 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 59 + -1*B > 5 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 59 + -1*B > 6 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 59 + -1*B > 7 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 59 + -1*B > 8 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 59 + -1*B > 9 = f61(A,50,C) [B = 16] ==> f95(A,B,C) = 59 + -1*B > 42 = f61(A,17,C) [B = 9] ==> f81(A,B,C) = 59 + -1*B > 49 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 59 + -1*B > 50 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 59 + -1*B > 51 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 59 + -1*B > 52 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 59 + -1*B > 53 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 59 + -1*B > 54 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 59 + -1*B > 55 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 59 + -1*B > 56 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 59 + -1*B > 57 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 59 + -1*B > 58 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 59 >= 59 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 59 >= 59 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 59 >= 59 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 59 >= 59 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 59 >= 59 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 59 >= 59 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 59 >= 59 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 59 >= 59 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 59 + -1*B >= 59 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 59 + -1*B >= 59 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 59 + -1*B >= 59 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 59 + -1*B >= 59 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 59 + -1*B >= 59 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 59 + -1*B >= 59 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 59 + -1*B >= 59 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 59 + -1*B >= 59 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 59 + -1*B >= 59 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 59 + -1*B >= 59 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 59 + -1*B >= 59 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 59 + -1*B >= 59 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 59 + -1*B >= 59 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 59 + -1*B >= 59 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 59 + -1*B >= 59 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 59 + -1*B >= 59 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 59 + -1*B >= 59 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 59 + -1*B >= 59 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 59 + -1*B >= 59 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 59 + -1*B >= 59 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 59 + -1*B >= 59 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 59 + -1*B >= 59 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 59 + -1*B >= 59 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 59 + -1*B >= 59 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 59 + -1*B >= 59 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 59 + -1*B >= 59 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 59 + -1*B >= 59 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 59 + -1*B >= 59 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 59 + -1*B >= 59 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 59 + -1*B >= 59 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 59 + -1*B >= 59 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 59 + -1*B >= 59 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 59 + -1*B >= 59 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 59 + -1*B >= 59 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 59 + -1*B >= 59 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 59 + -1*B >= 59 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 59 + -1*B >= 59 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 59 + -1*B >= 59 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 59 + -1*B >= 59 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 59 + -1*B >= 59 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 59 + -1*B >= 59 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 59 + -1*B >= 59 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 59 + -1*B >= 59 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 59 + -1*B >= 59 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 59 + -1*B >= 59 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 59 + -1*B >= 59 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 59 + -1*B >= 59 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 59 + -1*B >= 59 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 59 + -1*B >= 59 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 59 + -1*B >= 59 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 59 + -1*B >= 59 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 59 + -1*B >= 59 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 59 + -1*B >= 59 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 59 + -1*B >= 59 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 59 + -1*B >= 59 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 59 + -1*B >= 59 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 59 + -1*B >= 59 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 59 + -1*B >= 58 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 59 >= 59 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 59 >= 59 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 59 + -1*B >= 59 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 58 + -1*B >= 58 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 58 + -1*B >= -1 = f61(A,60,C) [B = 48] ==> f159(A,B,C) = 59 + -1*B >= 10 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 59 + -1*B >= 11 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 59 + -1*B >= 12 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 59 + -1*B >= 13 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 59 + -1*B >= 14 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 59 + -1*B >= 15 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 59 + -1*B >= 16 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 59 + -1*B >= 17 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 59 + -1*B >= 18 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 59 + -1*B >= 19 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 59 + -1*B >= 20 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 59 + -1*B >= 21 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 59 + -1*B >= 22 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 59 + -1*B >= 23 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 59 + -1*B >= 24 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 59 + -1*B >= 25 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 59 + -1*B >= 26 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 59 + -1*B >= 27 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 59 + -1*B >= 28 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 59 + -1*B >= 29 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 59 + -1*B >= 30 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 59 + -1*B >= 31 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 59 + -1*B >= 32 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 59 + -1*B >= 33 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 59 + -1*B >= 34 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 59 + -1*B >= 35 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 59 + -1*B >= 36 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 59 + -1*B >= 37 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 59 + -1*B >= 38 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 59 + -1*B >= 39 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 59 + -1*B >= 40 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 59 + -1*B >= 41 = f61(A,18,C) [B = 15] ==> f93(A,B,C) = 59 + -1*B >= 43 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 59 + -1*B >= 44 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 59 + -1*B >= 45 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 59 + -1*B >= 46 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 59 + -1*B >= 47 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 59 + -1*B >= 48 = f61(A,11,C) [B >= 50] ==> f61(A,B,C) = 59 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 59 >= 59 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 59 >= 59 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 59 >= 59 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 59 >= 59 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 59 >= 59 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 59 >= 59 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 59 >= 59 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 59 >= 59 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 59 >= 59 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 59 >= 59 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 59 >= 59 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 59 >= 59 = f61(A,0,C) * Step 24: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (?,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 35*x13 p(f101) = -1*x2 + 34*x13 p(f103) = -1*x2 + 34*x13 p(f105) = -1*x2 + 34*x13 p(f107) = -1*x2 + 34*x13 p(f109) = -1*x2 + 34*x13 p(f11) = 35*x13 p(f111) = -1*x2 + 34*x13 p(f113) = -1*x2 + 34*x13 p(f115) = -1*x2 + 34*x13 p(f117) = -1*x2 + 34*x13 p(f119) = -1*x2 + 34*x13 p(f121) = -1*x2 + 34*x13 p(f123) = -1*x2 + 34*x13 p(f125) = -1*x2 + 34*x13 p(f127) = -1*x2 + 34*x13 p(f129) = -1*x2 + 34*x13 p(f13) = 35*x13 p(f131) = -1*x2 + 34*x13 p(f133) = -1*x2 + 34*x13 p(f135) = -1*x2 + 34*x13 p(f137) = -1*x2 + 34*x13 p(f139) = -1*x2 + 34*x13 p(f141) = -1*x2 + 34*x13 p(f143) = -1*x2 + 34*x13 p(f145) = -1*x2 + 34*x13 p(f147) = -1*x2 + 34*x13 p(f149) = -1*x2 + 34*x13 p(f15) = 35*x13 p(f151) = -1*x2 + 34*x13 p(f153) = -1*x2 + 34*x13 p(f155) = -1*x2 + 34*x13 p(f157) = -1*x2 + 34*x13 p(f159) = -1*x2 + 34*x13 p(f161) = -1*x2 + 34*x13 p(f163) = -1*x2 + 34*x13 p(f165) = -1*x2 + 34*x13 p(f167) = -1*x2 + 34*x13 p(f169) = -1*x2 + 34*x13 p(f17) = 35*x13 p(f171) = -1*x2 + 34*x13 p(f173) = -1*x2 + 34*x13 p(f175) = -1*x2 + 34*x13 p(f177) = -1*x2 + 34*x13 p(f179) = -1*x2 + 34*x13 p(f181) = -1*x2 + 34*x13 p(f19) = 35*x13 p(f21) = 35*x13 p(f23) = 35*x13 p(f25) = 35*x13 p(f27) = 35*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 35*x13 p(f65) = -1*x2 + 35*x13 p(f67) = -1*x2 + 35*x13 p(f69) = -1*x2 + 35*x13 p(f7) = 35*x13 p(f71) = -1*x2 + 35*x13 p(f73) = -1*x2 + 35*x13 p(f75) = -1*x2 + 35*x13 p(f77) = -1*x2 + 35*x13 p(f79) = -1*x2 + 35*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 35*x13 p(f83) = -1*x2 + 35*x13 p(f85) = -1*x2 + 34*x13 p(f87) = -1*x2 + 34*x13 p(f89) = -1*x2 + 34*x13 p(f91) = -1*x2 + 34*x13 p(f93) = -1*x2 + 34*x13 p(f95) = -1*x2 + 34*x13 p(f97) = -1*x2 + 34*x13 p(f99) = -1*x2 + 34*x13 Following rules are strictly oriented: [B = 10] ==> f83(A,B,C) = 35 + -1*B > 24 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 35 + -1*B > 25 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 35 + -1*B > 26 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 35 + -1*B > 27 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 35 + -1*B > 28 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 35 + -1*B > 29 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 35 + -1*B > 30 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 35 + -1*B > 31 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 35 + -1*B > 32 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 35 + -1*B > 33 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 35 + -1*B > 34 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 35 >= 35 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 35 >= 35 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 35 >= 35 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 35 >= 35 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 35 >= 35 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 35 >= 35 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 35 >= 35 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 35 >= 35 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 35 + -1*B >= 35 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 35 + -1*B >= 35 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 35 + -1*B >= 35 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 35 + -1*B >= 35 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 35 + -1*B >= 35 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 35 + -1*B >= 35 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 35 + -1*B >= 35 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 35 + -1*B >= 35 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 35 + -1*B >= 35 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 35 + -1*B >= 34 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 34 + -1*B >= 34 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 34 + -1*B >= 34 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 34 + -1*B >= 34 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 34 + -1*B >= 34 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 34 + -1*B >= 34 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 34 + -1*B >= 34 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 34 + -1*B >= 34 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 34 + -1*B >= 34 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 34 + -1*B >= 34 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 34 + -1*B >= 34 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 34 + -1*B >= 34 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 34 + -1*B >= 34 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 34 + -1*B >= 34 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 34 + -1*B >= 34 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 34 + -1*B >= 34 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 34 + -1*B >= 34 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 34 + -1*B >= 34 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 34 + -1*B >= 34 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 34 + -1*B >= 34 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 34 + -1*B >= 34 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 34 + -1*B >= 34 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 34 + -1*B >= 34 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 34 + -1*B >= 34 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 34 + -1*B >= 34 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 34 + -1*B >= 34 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 34 + -1*B >= 34 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 34 + -1*B >= 34 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 34 + -1*B >= 34 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 34 + -1*B >= 34 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 34 + -1*B >= 34 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 34 + -1*B >= 34 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 34 + -1*B >= 34 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 34 + -1*B >= 34 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 34 + -1*B >= 34 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 34 + -1*B >= 34 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 34 + -1*B >= 34 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 34 + -1*B >= 34 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 34 + -1*B >= 34 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 34 + -1*B >= 34 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 34 + -1*B >= 34 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 34 + -1*B >= 34 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 34 + -1*B >= 34 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 34 + -1*B >= 34 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 34 + -1*B >= 34 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 34 + -1*B >= 34 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 34 + -1*B >= 34 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 34 + -1*B >= 34 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 34 + -1*B >= 34 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 35 >= 35 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 35 >= 35 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 35 + -1*B >= 35 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 34 + -1*B >= 34 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 34 + -1*B >= -25 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 34 + -1*B >= -24 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 34 + -1*B >= -23 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 34 + -1*B >= -22 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 34 + -1*B >= -21 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 34 + -1*B >= -20 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 34 + -1*B >= -19 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 34 + -1*B >= -18 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 34 + -1*B >= -17 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 34 + -1*B >= -16 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 34 + -1*B >= -15 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 34 + -1*B >= -14 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 34 + -1*B >= -13 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 34 + -1*B >= -12 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 34 + -1*B >= -11 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 34 + -1*B >= -10 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 34 + -1*B >= -9 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 34 + -1*B >= -8 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 34 + -1*B >= -7 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 34 + -1*B >= -6 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 34 + -1*B >= -5 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 34 + -1*B >= -4 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 34 + -1*B >= -3 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 34 + -1*B >= -2 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 34 + -1*B >= -1 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 34 + -1*B >= 0 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 34 + -1*B >= 1 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 34 + -1*B >= 2 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 34 + -1*B >= 3 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 34 + -1*B >= 4 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 34 + -1*B >= 5 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 34 + -1*B >= 6 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 34 + -1*B >= 7 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 34 + -1*B >= 8 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 34 + -1*B >= 9 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 34 + -1*B >= 10 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 34 + -1*B >= 11 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 34 + -1*B >= 12 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 34 + -1*B >= 13 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 34 + -1*B >= 14 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 34 + -1*B >= 15 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 34 + -1*B >= 16 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 34 + -1*B >= 17 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 34 + -1*B >= 18 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 34 + -1*B >= 19 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 34 + -1*B >= 20 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 34 + -1*B >= 21 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 34 + -1*B >= 22 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 34 + -1*B >= 23 = f61(A,12,C) [B >= 50] ==> f61(A,B,C) = 35 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 35 >= 35 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 35 >= 35 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 35 >= 35 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 35 >= 35 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 35 >= 35 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 35 >= 35 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 35 >= 35 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 35 >= 35 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 35 >= 35 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 35 >= 35 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 35 >= 35 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 35 >= 35 = f61(A,0,C) * Step 25: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (?,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 12*x13 p(f101) = -1*x2 + 11*x13 p(f103) = -1*x2 + 11*x13 p(f105) = -1*x2 + 11*x13 p(f107) = -1*x2 + 11*x13 p(f109) = -1*x2 + 11*x13 p(f11) = 12*x13 p(f111) = -1*x2 + 11*x13 p(f113) = -1*x2 + 11*x13 p(f115) = -1*x2 + 11*x13 p(f117) = -1*x2 + 11*x13 p(f119) = -1*x2 + 11*x13 p(f121) = -1*x2 + 11*x13 p(f123) = -1*x2 + 11*x13 p(f125) = -1*x2 + 11*x13 p(f127) = -1*x2 + 11*x13 p(f129) = -1*x2 + 11*x13 p(f13) = 12*x13 p(f131) = -1*x2 + 11*x13 p(f133) = -1*x2 + 11*x13 p(f135) = -1*x2 + 11*x13 p(f137) = -1*x2 + 11*x13 p(f139) = -1*x2 + 11*x13 p(f141) = -1*x2 + 11*x13 p(f143) = -1*x2 + 11*x13 p(f145) = -1*x2 + 11*x13 p(f147) = -1*x2 + 11*x13 p(f149) = -1*x2 + 11*x13 p(f15) = 12*x13 p(f151) = -1*x2 + 11*x13 p(f153) = -1*x2 + 11*x13 p(f155) = -1*x2 + 11*x13 p(f157) = -1*x2 + 11*x13 p(f159) = -1*x2 + 11*x13 p(f161) = -1*x2 + 11*x13 p(f163) = -1*x2 + 11*x13 p(f165) = -1*x2 + 11*x13 p(f167) = -1*x2 + 11*x13 p(f169) = -1*x2 + 11*x13 p(f17) = 12*x13 p(f171) = -1*x2 + 11*x13 p(f173) = -1*x2 + 11*x13 p(f175) = -1*x2 + 11*x13 p(f177) = -1*x2 + 11*x13 p(f179) = -1*x2 + 11*x13 p(f181) = -1*x2 + 11*x13 p(f19) = 12*x13 p(f21) = 12*x13 p(f23) = 12*x13 p(f25) = 12*x13 p(f27) = 12*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 12*x13 p(f65) = -1*x2 + 12*x13 p(f67) = -1*x2 + 12*x13 p(f69) = -1*x2 + 12*x13 p(f7) = 12*x13 p(f71) = -1*x2 + 12*x13 p(f73) = -1*x2 + 12*x13 p(f75) = -1*x2 + 12*x13 p(f77) = -1*x2 + 12*x13 p(f79) = -1*x2 + 12*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 12*x13 p(f83) = -1*x2 + 12*x13 p(f85) = -1*x2 + 12*x13 p(f87) = -1*x2 + 11*x13 p(f89) = -1*x2 + 11*x13 p(f91) = -1*x2 + 11*x13 p(f93) = -1*x2 + 11*x13 p(f95) = -1*x2 + 11*x13 p(f97) = -1*x2 + 11*x13 p(f99) = -1*x2 + 11*x13 Following rules are strictly oriented: [B = 11] ==> f85(A,B,C) = 12 + -1*B > 0 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 12 + -1*B > 1 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 12 + -1*B > 2 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 12 + -1*B > 3 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 12 + -1*B > 4 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 12 + -1*B > 5 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 12 + -1*B > 6 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 12 + -1*B > 7 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 12 + -1*B > 8 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 12 + -1*B > 9 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 12 + -1*B > 10 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 12 + -1*B > 11 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 12 >= 12 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 12 >= 12 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 12 >= 12 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 12 >= 12 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 12 >= 12 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 12 >= 12 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 12 >= 12 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 12 >= 12 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 12 + -1*B >= 12 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 12 + -1*B >= 12 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 12 + -1*B >= 12 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 12 + -1*B >= 12 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 12 + -1*B >= 12 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 12 + -1*B >= 12 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 12 + -1*B >= 12 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 12 + -1*B >= 12 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 12 + -1*B >= 12 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 12 + -1*B >= 12 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 12 + -1*B >= 11 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 11 + -1*B >= 11 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 11 + -1*B >= 11 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 11 + -1*B >= 11 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 11 + -1*B >= 11 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 11 + -1*B >= 11 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 11 + -1*B >= 11 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 11 + -1*B >= 11 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 11 + -1*B >= 11 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 11 + -1*B >= 11 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 11 + -1*B >= 11 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 11 + -1*B >= 11 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 11 + -1*B >= 11 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 11 + -1*B >= 11 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 11 + -1*B >= 11 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 11 + -1*B >= 11 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 11 + -1*B >= 11 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 11 + -1*B >= 11 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 11 + -1*B >= 11 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 11 + -1*B >= 11 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 11 + -1*B >= 11 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 11 + -1*B >= 11 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 11 + -1*B >= 11 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 11 + -1*B >= 11 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 11 + -1*B >= 11 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 11 + -1*B >= 11 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 11 + -1*B >= 11 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 11 + -1*B >= 11 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 11 + -1*B >= 11 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 11 + -1*B >= 11 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 11 + -1*B >= 11 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 11 + -1*B >= 11 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 11 + -1*B >= 11 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 11 + -1*B >= 11 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 11 + -1*B >= 11 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 11 + -1*B >= 11 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 11 + -1*B >= 11 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 11 + -1*B >= 11 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 11 + -1*B >= 11 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 11 + -1*B >= 11 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 11 + -1*B >= 11 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 11 + -1*B >= 11 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 11 + -1*B >= 11 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 11 + -1*B >= 11 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 11 + -1*B >= 11 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 11 + -1*B >= 11 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 11 + -1*B >= 11 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 11 + -1*B >= 11 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 12 >= 12 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 12 >= 12 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 12 + -1*B >= 12 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 11 + -1*B >= 11 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 11 + -1*B >= -48 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 11 + -1*B >= -47 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 11 + -1*B >= -46 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 11 + -1*B >= -45 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 11 + -1*B >= -44 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 11 + -1*B >= -43 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 11 + -1*B >= -42 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 11 + -1*B >= -41 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 11 + -1*B >= -40 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 11 + -1*B >= -39 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 11 + -1*B >= -38 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 11 + -1*B >= -37 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 11 + -1*B >= -36 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 11 + -1*B >= -35 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 11 + -1*B >= -34 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 11 + -1*B >= -33 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 11 + -1*B >= -32 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 11 + -1*B >= -31 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 11 + -1*B >= -30 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 11 + -1*B >= -29 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 11 + -1*B >= -28 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 11 + -1*B >= -27 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 11 + -1*B >= -26 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 11 + -1*B >= -25 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 11 + -1*B >= -24 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 11 + -1*B >= -23 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 11 + -1*B >= -22 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 11 + -1*B >= -21 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 11 + -1*B >= -20 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 11 + -1*B >= -19 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 11 + -1*B >= -18 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 11 + -1*B >= -17 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 11 + -1*B >= -16 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 11 + -1*B >= -15 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 11 + -1*B >= -14 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 11 + -1*B >= -13 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 11 + -1*B >= -12 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 11 + -1*B >= -11 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 11 + -1*B >= -10 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 11 + -1*B >= -9 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 11 + -1*B >= -8 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 11 + -1*B >= -7 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 11 + -1*B >= -6 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 11 + -1*B >= -5 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 11 + -1*B >= -4 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 11 + -1*B >= -3 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 11 + -1*B >= -2 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 11 + -1*B >= -1 = f61(A,13,C) [B >= 50] ==> f61(A,B,C) = 12 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 12 >= 12 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 12 >= 12 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 12 >= 12 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 12 >= 12 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 12 >= 12 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 12 >= 12 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 12 >= 12 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 12 >= 12 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 12 >= 12 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 12 >= 12 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 12 >= 12 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 12 >= 12 = f61(A,0,C) * Step 26: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (?,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 87*x13 p(f101) = -1*x2 + 87*x13 p(f103) = -1*x2 + 87*x13 p(f105) = -1*x2 + 87*x13 p(f107) = -1*x2 + 87*x13 p(f109) = -1*x2 + 87*x13 p(f11) = 87*x13 p(f111) = -1*x2 + 87*x13 p(f113) = -1*x2 + 87*x13 p(f115) = -1*x2 + 87*x13 p(f117) = -1*x2 + 87*x13 p(f119) = -1*x2 + 87*x13 p(f121) = -1*x2 + 87*x13 p(f123) = -1*x2 + 87*x13 p(f125) = -1*x2 + 87*x13 p(f127) = -1*x2 + 87*x13 p(f129) = -1*x2 + 87*x13 p(f13) = 87*x13 p(f131) = -1*x2 + 87*x13 p(f133) = -1*x2 + 87*x13 p(f135) = -1*x2 + 87*x13 p(f137) = -1*x2 + 87*x13 p(f139) = -1*x2 + 87*x13 p(f141) = -1*x2 + 87*x13 p(f143) = -1*x2 + 87*x13 p(f145) = -1*x2 + 87*x13 p(f147) = -1*x2 + 87*x13 p(f149) = -1*x2 + 87*x13 p(f15) = 87*x13 p(f151) = -1*x2 + 87*x13 p(f153) = -1*x2 + 86*x13 p(f155) = -1*x2 + 86*x13 p(f157) = -1*x2 + 86*x13 p(f159) = -1*x2 + 86*x13 p(f161) = -1*x2 + 86*x13 p(f163) = -1*x2 + 86*x13 p(f165) = -1*x2 + 86*x13 p(f167) = -1*x2 + 86*x13 p(f169) = -1*x2 + 86*x13 p(f17) = 87*x13 p(f171) = -1*x2 + 86*x13 p(f173) = -1*x2 + 86*x13 p(f175) = -1*x2 + 86*x13 p(f177) = -1*x2 + 86*x13 p(f179) = -1*x2 + 86*x13 p(f181) = -1*x2 + 86*x13 p(f19) = 87*x13 p(f21) = 87*x13 p(f23) = 87*x13 p(f25) = 87*x13 p(f27) = 87*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 87*x13 p(f65) = -1*x2 + 87*x13 p(f67) = -1*x2 + 87*x13 p(f69) = -1*x2 + 87*x13 p(f7) = 87*x13 p(f71) = -1*x2 + 87*x13 p(f73) = -1*x2 + 87*x13 p(f75) = -1*x2 + 87*x13 p(f77) = -1*x2 + 87*x13 p(f79) = -1*x2 + 87*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 87*x13 p(f83) = -1*x2 + 87*x13 p(f85) = -1*x2 + 87*x13 p(f87) = -1*x2 + 87*x13 p(f89) = -1*x2 + 87*x13 p(f91) = -1*x2 + 87*x13 p(f93) = -1*x2 + 87*x13 p(f95) = -1*x2 + 87*x13 p(f97) = -1*x2 + 87*x13 p(f99) = -1*x2 + 87*x13 Following rules are strictly oriented: [B = 44] ==> f151(A,B,C) = 87 + -1*B > 42 = f61(A,45,C) [B = 11] ==> f85(A,B,C) = 87 + -1*B > 75 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 87 + -1*B > 76 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 87 + -1*B > 77 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 87 + -1*B > 78 = f61(A,9,C) [B = 6] ==> f75(A,B,C) = 87 + -1*B > 80 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 87 + -1*B > 81 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 87 + -1*B > 82 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 87 + -1*B > 83 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 87 + -1*B > 84 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 87 + -1*B > 85 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 87 + -1*B > 86 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 87 >= 87 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 87 >= 87 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 87 >= 87 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 87 >= 87 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 87 >= 87 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 87 >= 87 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 87 >= 87 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 87 >= 87 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 87 + -1*B >= 87 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 87 + -1*B >= 87 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 87 + -1*B >= 87 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 87 + -1*B >= 87 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 87 + -1*B >= 87 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 87 + -1*B >= 87 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 87 + -1*B >= 87 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 87 + -1*B >= 87 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 87 + -1*B >= 87 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 87 + -1*B >= 87 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 87 + -1*B >= 87 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 87 + -1*B >= 87 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 87 + -1*B >= 87 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 87 + -1*B >= 87 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 87 + -1*B >= 87 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 87 + -1*B >= 87 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 87 + -1*B >= 87 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 87 + -1*B >= 87 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 87 + -1*B >= 87 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 87 + -1*B >= 87 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 87 + -1*B >= 87 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 87 + -1*B >= 87 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 87 + -1*B >= 87 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 87 + -1*B >= 87 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 87 + -1*B >= 87 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 87 + -1*B >= 87 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 87 + -1*B >= 87 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 87 + -1*B >= 87 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 87 + -1*B >= 87 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 87 + -1*B >= 87 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 87 + -1*B >= 87 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 87 + -1*B >= 87 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 87 + -1*B >= 87 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 87 + -1*B >= 87 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 87 + -1*B >= 87 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 87 + -1*B >= 87 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 87 + -1*B >= 87 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 87 + -1*B >= 87 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 87 + -1*B >= 87 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 87 + -1*B >= 87 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 87 + -1*B >= 87 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 87 + -1*B >= 87 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 87 + -1*B >= 87 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 87 + -1*B >= 86 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 86 + -1*B >= 86 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 86 + -1*B >= 86 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 86 + -1*B >= 86 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 86 + -1*B >= 86 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 86 + -1*B >= 86 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 86 + -1*B >= 86 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 86 + -1*B >= 86 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 86 + -1*B >= 86 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 86 + -1*B >= 86 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 86 + -1*B >= 86 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 86 + -1*B >= 86 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 86 + -1*B >= 86 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 86 + -1*B >= 86 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 86 + -1*B >= 86 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 87 >= 87 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 87 >= 87 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 87 + -1*B >= 87 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 86 + -1*B >= 86 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 86 + -1*B >= 27 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 86 + -1*B >= 28 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 86 + -1*B >= 29 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 86 + -1*B >= 30 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 86 + -1*B >= 31 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 86 + -1*B >= 32 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 86 + -1*B >= 33 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 86 + -1*B >= 34 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 86 + -1*B >= 35 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 86 + -1*B >= 36 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 86 + -1*B >= 37 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 86 + -1*B >= 38 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 86 + -1*B >= 39 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 86 + -1*B >= 40 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 86 + -1*B >= 41 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 87 + -1*B >= 43 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 87 + -1*B >= 44 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 87 + -1*B >= 45 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 87 + -1*B >= 46 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 87 + -1*B >= 47 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 87 + -1*B >= 48 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 87 + -1*B >= 49 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 87 + -1*B >= 50 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 87 + -1*B >= 51 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 87 + -1*B >= 52 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 87 + -1*B >= 53 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 87 + -1*B >= 54 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 87 + -1*B >= 55 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 87 + -1*B >= 56 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 87 + -1*B >= 57 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 87 + -1*B >= 58 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 87 + -1*B >= 59 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 87 + -1*B >= 60 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 87 + -1*B >= 61 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 87 + -1*B >= 62 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 87 + -1*B >= 63 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 87 + -1*B >= 64 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 87 + -1*B >= 65 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 87 + -1*B >= 66 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 87 + -1*B >= 67 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 87 + -1*B >= 68 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 87 + -1*B >= 69 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 87 + -1*B >= 70 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 87 + -1*B >= 71 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 87 + -1*B >= 72 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 87 + -1*B >= 73 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 87 + -1*B >= 74 = f61(A,13,C) [B = 7] ==> f77(A,B,C) = 87 + -1*B >= 79 = f61(A,8,C) [B >= 50] ==> f61(A,B,C) = 87 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 87 >= 87 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 87 >= 87 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 87 >= 87 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 87 >= 87 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 87 >= 87 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 87 >= 87 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 87 >= 87 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 87 >= 87 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 87 >= 87 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 87 >= 87 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 87 >= 87 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 87 >= 87 = f61(A,0,C) * Step 27: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (?,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 59*x13 p(f101) = -1*x2 + 59*x13 p(f103) = -1*x2 + 59*x13 p(f105) = -1*x2 + 59*x13 p(f107) = -1*x2 + 59*x13 p(f109) = -1*x2 + 59*x13 p(f11) = 59*x13 p(f111) = -1*x2 + 59*x13 p(f113) = -1*x2 + 59*x13 p(f115) = -1*x2 + 59*x13 p(f117) = -1*x2 + 59*x13 p(f119) = -1*x2 + 59*x13 p(f121) = -1*x2 + 59*x13 p(f123) = -1*x2 + 59*x13 p(f125) = -1*x2 + 59*x13 p(f127) = -1*x2 + 59*x13 p(f129) = -1*x2 + 59*x13 p(f13) = 59*x13 p(f131) = -1*x2 + 59*x13 p(f133) = -1*x2 + 59*x13 p(f135) = -1*x2 + 59*x13 p(f137) = -1*x2 + 59*x13 p(f139) = -1*x2 + 59*x13 p(f141) = -1*x2 + 59*x13 p(f143) = -1*x2 + 59*x13 p(f145) = -1*x2 + 59*x13 p(f147) = -1*x2 + 59*x13 p(f149) = -1*x2 + 59*x13 p(f15) = 59*x13 p(f151) = -1*x2 + 59*x13 p(f153) = -1*x2 + 59*x13 p(f155) = -1*x2 + 59*x13 p(f157) = -1*x2 + 59*x13 p(f159) = -1*x2 + 59*x13 p(f161) = -1*x2 + 59*x13 p(f163) = -1*x2 + 59*x13 p(f165) = -1*x2 + 59*x13 p(f167) = -1*x2 + 59*x13 p(f169) = -1*x2 + 59*x13 p(f17) = 59*x13 p(f171) = -1*x2 + 59*x13 p(f173) = -1*x2 + 59*x13 p(f175) = -1*x2 + 59*x13 p(f177) = -1*x2 + 59*x13 p(f179) = -1*x2 + 59*x13 p(f181) = -1*x2 + 58*x13 p(f19) = 59*x13 p(f21) = 59*x13 p(f23) = 59*x13 p(f25) = 59*x13 p(f27) = 59*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 59*x13 p(f65) = -1*x2 + 59*x13 p(f67) = -1*x2 + 59*x13 p(f69) = -1*x2 + 59*x13 p(f7) = 59*x13 p(f71) = -1*x2 + 59*x13 p(f73) = -1*x2 + 59*x13 p(f75) = -1*x2 + 59*x13 p(f77) = -1*x2 + 59*x13 p(f79) = -1*x2 + 59*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 59*x13 p(f83) = -1*x2 + 59*x13 p(f85) = -1*x2 + 59*x13 p(f87) = -1*x2 + 59*x13 p(f89) = -1*x2 + 59*x13 p(f91) = -1*x2 + 59*x13 p(f93) = -1*x2 + 59*x13 p(f95) = -1*x2 + 59*x13 p(f97) = -1*x2 + 59*x13 p(f99) = -1*x2 + 59*x13 Following rules are strictly oriented: [B = 58] ==> f179(A,B,C) = 59 + -1*B > 0 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 59 + -1*B > 1 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 59 + -1*B > 2 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 59 + -1*B > 3 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 59 + -1*B > 4 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 59 + -1*B > 5 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 59 + -1*B > 6 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 59 + -1*B > 7 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 59 + -1*B > 8 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 59 + -1*B > 9 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 59 + -1*B > 14 = f61(A,45,C) [B = 16] ==> f95(A,B,C) = 59 + -1*B > 42 = f61(A,17,C) [B = 12] ==> f87(A,B,C) = 59 + -1*B > 46 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 59 + -1*B > 47 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 59 + -1*B > 48 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 59 + -1*B > 49 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 59 + -1*B > 50 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 59 + -1*B > 51 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 59 + -1*B > 52 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 59 + -1*B > 53 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 59 + -1*B > 54 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 59 + -1*B > 55 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 59 + -1*B > 56 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 59 + -1*B > 57 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 59 + -1*B > 58 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 59 >= 59 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 59 >= 59 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 59 >= 59 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 59 >= 59 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 59 >= 59 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 59 >= 59 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 59 >= 59 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 59 >= 59 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 59 + -1*B >= 59 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 59 + -1*B >= 59 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 59 + -1*B >= 59 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 59 + -1*B >= 59 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 59 + -1*B >= 59 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 59 + -1*B >= 59 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 59 + -1*B >= 59 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 59 + -1*B >= 59 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 59 + -1*B >= 59 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 59 + -1*B >= 59 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 59 + -1*B >= 59 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 59 + -1*B >= 59 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 59 + -1*B >= 59 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 59 + -1*B >= 59 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 59 + -1*B >= 59 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 59 + -1*B >= 59 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 59 + -1*B >= 59 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 59 + -1*B >= 59 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 59 + -1*B >= 59 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 59 + -1*B >= 59 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 59 + -1*B >= 59 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 59 + -1*B >= 59 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 59 + -1*B >= 59 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 59 + -1*B >= 59 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 59 + -1*B >= 59 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 59 + -1*B >= 59 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 59 + -1*B >= 59 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 59 + -1*B >= 59 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 59 + -1*B >= 59 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 59 + -1*B >= 59 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 59 + -1*B >= 59 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 59 + -1*B >= 59 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 59 + -1*B >= 59 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 59 + -1*B >= 59 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 59 + -1*B >= 59 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 59 + -1*B >= 59 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 59 + -1*B >= 59 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 59 + -1*B >= 59 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 59 + -1*B >= 59 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 59 + -1*B >= 59 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 59 + -1*B >= 59 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 59 + -1*B >= 59 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 59 + -1*B >= 59 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 59 + -1*B >= 59 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 59 + -1*B >= 59 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 59 + -1*B >= 59 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 59 + -1*B >= 59 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 59 + -1*B >= 59 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 59 + -1*B >= 59 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 59 + -1*B >= 59 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 59 + -1*B >= 59 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 59 + -1*B >= 59 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 59 + -1*B >= 59 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 59 + -1*B >= 59 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 59 + -1*B >= 59 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 59 + -1*B >= 59 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 59 + -1*B >= 59 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 59 + -1*B >= 58 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 59 >= 59 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 59 >= 59 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 59 + -1*B >= 59 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 58 + -1*B >= 58 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 58 + -1*B >= -1 = f61(A,60,C) [B = 48] ==> f159(A,B,C) = 59 + -1*B >= 10 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 59 + -1*B >= 11 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 59 + -1*B >= 12 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 59 + -1*B >= 13 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 59 + -1*B >= 15 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 59 + -1*B >= 16 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 59 + -1*B >= 17 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 59 + -1*B >= 18 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 59 + -1*B >= 19 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 59 + -1*B >= 20 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 59 + -1*B >= 21 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 59 + -1*B >= 22 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 59 + -1*B >= 23 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 59 + -1*B >= 24 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 59 + -1*B >= 25 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 59 + -1*B >= 26 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 59 + -1*B >= 27 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 59 + -1*B >= 28 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 59 + -1*B >= 29 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 59 + -1*B >= 30 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 59 + -1*B >= 31 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 59 + -1*B >= 32 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 59 + -1*B >= 33 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 59 + -1*B >= 34 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 59 + -1*B >= 35 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 59 + -1*B >= 36 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 59 + -1*B >= 37 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 59 + -1*B >= 38 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 59 + -1*B >= 39 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 59 + -1*B >= 40 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 59 + -1*B >= 41 = f61(A,18,C) [B = 15] ==> f93(A,B,C) = 59 + -1*B >= 43 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 59 + -1*B >= 44 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 59 + -1*B >= 45 = f61(A,14,C) [B >= 50] ==> f61(A,B,C) = 59 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 59 >= 59 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 59 >= 59 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 59 >= 59 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 59 >= 59 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 59 >= 59 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 59 >= 59 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 59 >= 59 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 59 >= 59 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 59 >= 59 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 59 >= 59 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 59 >= 59 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 59 >= 59 = f61(A,0,C) * Step 28: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (?,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 59*x13 p(f101) = -1*x2 + 59*x13 p(f103) = -1*x2 + 59*x13 p(f105) = -1*x2 + 59*x13 p(f107) = -1*x2 + 59*x13 p(f109) = -1*x2 + 59*x13 p(f11) = 59*x13 p(f111) = -1*x2 + 59*x13 p(f113) = -1*x2 + 59*x13 p(f115) = -1*x2 + 59*x13 p(f117) = -1*x2 + 59*x13 p(f119) = -1*x2 + 59*x13 p(f121) = -1*x2 + 59*x13 p(f123) = -1*x2 + 59*x13 p(f125) = -1*x2 + 59*x13 p(f127) = -1*x2 + 59*x13 p(f129) = -1*x2 + 59*x13 p(f13) = 59*x13 p(f131) = -1*x2 + 59*x13 p(f133) = -1*x2 + 59*x13 p(f135) = -1*x2 + 59*x13 p(f137) = -1*x2 + 59*x13 p(f139) = -1*x2 + 59*x13 p(f141) = -1*x2 + 59*x13 p(f143) = -1*x2 + 59*x13 p(f145) = -1*x2 + 59*x13 p(f147) = -1*x2 + 59*x13 p(f149) = -1*x2 + 59*x13 p(f15) = 59*x13 p(f151) = -1*x2 + 59*x13 p(f153) = -1*x2 + 59*x13 p(f155) = -1*x2 + 59*x13 p(f157) = -1*x2 + 59*x13 p(f159) = -1*x2 + 59*x13 p(f161) = -1*x2 + 59*x13 p(f163) = -1*x2 + 59*x13 p(f165) = -1*x2 + 59*x13 p(f167) = -1*x2 + 59*x13 p(f169) = -1*x2 + 59*x13 p(f17) = 59*x13 p(f171) = -1*x2 + 59*x13 p(f173) = -1*x2 + 59*x13 p(f175) = -1*x2 + 59*x13 p(f177) = -1*x2 + 59*x13 p(f179) = -1*x2 + 59*x13 p(f181) = -1*x2 + 58*x13 p(f19) = 59*x13 p(f21) = 59*x13 p(f23) = 59*x13 p(f25) = 59*x13 p(f27) = 59*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 59*x13 p(f65) = -1*x2 + 59*x13 p(f67) = -1*x2 + 59*x13 p(f69) = -1*x2 + 59*x13 p(f7) = 59*x13 p(f71) = -1*x2 + 59*x13 p(f73) = -1*x2 + 59*x13 p(f75) = -1*x2 + 59*x13 p(f77) = -1*x2 + 59*x13 p(f79) = -1*x2 + 59*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 59*x13 p(f83) = -1*x2 + 59*x13 p(f85) = -1*x2 + 59*x13 p(f87) = -1*x2 + 59*x13 p(f89) = -1*x2 + 59*x13 p(f91) = -1*x2 + 59*x13 p(f93) = -1*x2 + 59*x13 p(f95) = -1*x2 + 59*x13 p(f97) = -1*x2 + 59*x13 p(f99) = -1*x2 + 59*x13 Following rules are strictly oriented: [B = 58] ==> f179(A,B,C) = 59 + -1*B > 0 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 59 + -1*B > 1 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 59 + -1*B > 2 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 59 + -1*B > 3 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 59 + -1*B > 4 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 59 + -1*B > 5 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 59 + -1*B > 6 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 59 + -1*B > 7 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 59 + -1*B > 8 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 59 + -1*B > 9 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 59 + -1*B > 14 = f61(A,45,C) [B = 16] ==> f95(A,B,C) = 59 + -1*B > 42 = f61(A,17,C) [B = 13] ==> f89(A,B,C) = 59 + -1*B > 45 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 59 + -1*B > 46 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 59 + -1*B > 47 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 59 + -1*B > 48 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 59 + -1*B > 49 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 59 + -1*B > 50 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 59 + -1*B > 51 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 59 + -1*B > 52 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 59 + -1*B > 53 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 59 + -1*B > 54 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 59 + -1*B > 55 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 59 + -1*B > 56 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 59 + -1*B > 57 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 59 + -1*B > 58 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 59 >= 59 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 59 >= 59 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 59 >= 59 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 59 >= 59 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 59 >= 59 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 59 >= 59 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 59 >= 59 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 59 >= 59 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 59 + -1*B >= 59 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 59 + -1*B >= 59 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 59 + -1*B >= 59 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 59 + -1*B >= 59 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 59 + -1*B >= 59 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 59 + -1*B >= 59 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 59 + -1*B >= 59 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 59 + -1*B >= 59 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 59 + -1*B >= 59 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 59 + -1*B >= 59 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 59 + -1*B >= 59 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 59 + -1*B >= 59 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 59 + -1*B >= 59 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 59 + -1*B >= 59 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 59 + -1*B >= 59 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 59 + -1*B >= 59 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 59 + -1*B >= 59 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 59 + -1*B >= 59 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 59 + -1*B >= 59 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 59 + -1*B >= 59 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 59 + -1*B >= 59 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 59 + -1*B >= 59 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 59 + -1*B >= 59 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 59 + -1*B >= 59 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 59 + -1*B >= 59 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 59 + -1*B >= 59 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 59 + -1*B >= 59 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 59 + -1*B >= 59 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 59 + -1*B >= 59 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 59 + -1*B >= 59 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 59 + -1*B >= 59 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 59 + -1*B >= 59 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 59 + -1*B >= 59 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 59 + -1*B >= 59 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 59 + -1*B >= 59 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 59 + -1*B >= 59 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 59 + -1*B >= 59 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 59 + -1*B >= 59 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 59 + -1*B >= 59 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 59 + -1*B >= 59 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 59 + -1*B >= 59 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 59 + -1*B >= 59 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 59 + -1*B >= 59 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 59 + -1*B >= 59 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 59 + -1*B >= 59 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 59 + -1*B >= 59 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 59 + -1*B >= 59 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 59 + -1*B >= 59 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 59 + -1*B >= 59 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 59 + -1*B >= 59 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 59 + -1*B >= 59 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 59 + -1*B >= 59 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 59 + -1*B >= 59 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 59 + -1*B >= 59 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 59 + -1*B >= 59 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 59 + -1*B >= 59 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 59 + -1*B >= 59 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 59 + -1*B >= 58 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 59 >= 59 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 59 >= 59 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 59 + -1*B >= 59 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 58 + -1*B >= 58 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 58 + -1*B >= -1 = f61(A,60,C) [B = 48] ==> f159(A,B,C) = 59 + -1*B >= 10 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 59 + -1*B >= 11 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 59 + -1*B >= 12 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 59 + -1*B >= 13 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 59 + -1*B >= 15 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 59 + -1*B >= 16 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 59 + -1*B >= 17 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 59 + -1*B >= 18 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 59 + -1*B >= 19 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 59 + -1*B >= 20 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 59 + -1*B >= 21 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 59 + -1*B >= 22 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 59 + -1*B >= 23 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 59 + -1*B >= 24 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 59 + -1*B >= 25 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 59 + -1*B >= 26 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 59 + -1*B >= 27 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 59 + -1*B >= 28 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 59 + -1*B >= 29 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 59 + -1*B >= 30 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 59 + -1*B >= 31 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 59 + -1*B >= 32 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 59 + -1*B >= 33 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 59 + -1*B >= 34 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 59 + -1*B >= 35 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 59 + -1*B >= 36 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 59 + -1*B >= 37 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 59 + -1*B >= 38 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 59 + -1*B >= 39 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 59 + -1*B >= 40 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 59 + -1*B >= 41 = f61(A,18,C) [B = 15] ==> f93(A,B,C) = 59 + -1*B >= 43 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 59 + -1*B >= 44 = f61(A,15,C) [B >= 50] ==> f61(A,B,C) = 59 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 59 >= 59 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 59 >= 59 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 59 >= 59 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 59 >= 59 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 59 >= 59 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 59 >= 59 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 59 >= 59 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 59 >= 59 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 59 >= 59 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 59 >= 59 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 59 >= 59 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 59 >= 59 = f61(A,0,C) * Step 29: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (?,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 34*x13 p(f101) = -1*x2 + 33*x13 p(f103) = -1*x2 + 33*x13 p(f105) = -1*x2 + 33*x13 p(f107) = -1*x2 + 33*x13 p(f109) = -1*x2 + 33*x13 p(f11) = 34*x13 p(f111) = -1*x2 + 33*x13 p(f113) = -1*x2 + 33*x13 p(f115) = -1*x2 + 33*x13 p(f117) = -1*x2 + 33*x13 p(f119) = -1*x2 + 33*x13 p(f121) = -1*x2 + 33*x13 p(f123) = -1*x2 + 33*x13 p(f125) = -1*x2 + 33*x13 p(f127) = -1*x2 + 33*x13 p(f129) = -1*x2 + 33*x13 p(f13) = 34*x13 p(f131) = -1*x2 + 33*x13 p(f133) = -1*x2 + 33*x13 p(f135) = -1*x2 + 33*x13 p(f137) = -1*x2 + 33*x13 p(f139) = -1*x2 + 33*x13 p(f141) = -1*x2 + 33*x13 p(f143) = -1*x2 + 33*x13 p(f145) = -1*x2 + 33*x13 p(f147) = -1*x2 + 33*x13 p(f149) = -1*x2 + 33*x13 p(f15) = 34*x13 p(f151) = -1*x2 + 33*x13 p(f153) = -1*x2 + 33*x13 p(f155) = -1*x2 + 33*x13 p(f157) = -1*x2 + 33*x13 p(f159) = -1*x2 + 33*x13 p(f161) = -1*x2 + 33*x13 p(f163) = -1*x2 + 33*x13 p(f165) = -1*x2 + 33*x13 p(f167) = -1*x2 + 33*x13 p(f169) = -1*x2 + 33*x13 p(f17) = 34*x13 p(f171) = -1*x2 + 33*x13 p(f173) = -1*x2 + 33*x13 p(f175) = -1*x2 + 33*x13 p(f177) = -1*x2 + 33*x13 p(f179) = -1*x2 + 33*x13 p(f181) = -1*x2 + 33*x13 p(f19) = 34*x13 p(f21) = 34*x13 p(f23) = 34*x13 p(f25) = 34*x13 p(f27) = 34*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 34*x13 p(f65) = -1*x2 + 34*x13 p(f67) = -1*x2 + 34*x13 p(f69) = -1*x2 + 34*x13 p(f7) = 34*x13 p(f71) = -1*x2 + 34*x13 p(f73) = -1*x2 + 34*x13 p(f75) = -1*x2 + 34*x13 p(f77) = -1*x2 + 34*x13 p(f79) = -1*x2 + 34*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 34*x13 p(f83) = -1*x2 + 34*x13 p(f85) = -1*x2 + 34*x13 p(f87) = -1*x2 + 34*x13 p(f89) = -1*x2 + 34*x13 p(f91) = -1*x2 + 34*x13 p(f93) = -1*x2 + 33*x13 p(f95) = -1*x2 + 33*x13 p(f97) = -1*x2 + 33*x13 p(f99) = -1*x2 + 33*x13 Following rules are strictly oriented: [B = 14] ==> f91(A,B,C) = 34 + -1*B > 19 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 34 + -1*B > 20 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 34 + -1*B > 21 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 34 + -1*B > 22 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 34 + -1*B > 23 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 34 + -1*B > 24 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 34 + -1*B > 25 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 34 + -1*B > 26 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 34 + -1*B > 27 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 34 + -1*B > 28 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 34 + -1*B > 29 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 34 + -1*B > 30 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 34 + -1*B > 31 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 34 + -1*B > 32 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 34 + -1*B > 33 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 34 >= 34 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 34 >= 34 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 34 >= 34 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 34 >= 34 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 34 >= 34 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 34 >= 34 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 34 >= 34 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 34 >= 34 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 34 + -1*B >= 34 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 34 + -1*B >= 34 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 34 + -1*B >= 34 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 34 + -1*B >= 34 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 34 + -1*B >= 34 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 34 + -1*B >= 34 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 34 + -1*B >= 34 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 34 + -1*B >= 34 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 34 + -1*B >= 34 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 34 + -1*B >= 34 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 34 + -1*B >= 34 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 34 + -1*B >= 34 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 34 + -1*B >= 34 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 34 + -1*B >= 33 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 33 + -1*B >= 33 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 33 + -1*B >= 33 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 33 + -1*B >= 33 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 33 + -1*B >= 33 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 33 + -1*B >= 33 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 33 + -1*B >= 33 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 33 + -1*B >= 33 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 33 + -1*B >= 33 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 33 + -1*B >= 33 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 33 + -1*B >= 33 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 33 + -1*B >= 33 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 33 + -1*B >= 33 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 33 + -1*B >= 33 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 33 + -1*B >= 33 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 33 + -1*B >= 33 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 33 + -1*B >= 33 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 33 + -1*B >= 33 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 33 + -1*B >= 33 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 33 + -1*B >= 33 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 33 + -1*B >= 33 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 33 + -1*B >= 33 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 33 + -1*B >= 33 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 33 + -1*B >= 33 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 33 + -1*B >= 33 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 33 + -1*B >= 33 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 33 + -1*B >= 33 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 33 + -1*B >= 33 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 33 + -1*B >= 33 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 33 + -1*B >= 33 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 33 + -1*B >= 33 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 33 + -1*B >= 33 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 33 + -1*B >= 33 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 33 + -1*B >= 33 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 33 + -1*B >= 33 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 33 + -1*B >= 33 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 33 + -1*B >= 33 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 33 + -1*B >= 33 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 33 + -1*B >= 33 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 33 + -1*B >= 33 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 33 + -1*B >= 33 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 33 + -1*B >= 33 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 33 + -1*B >= 33 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 33 + -1*B >= 33 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 33 + -1*B >= 33 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 34 >= 34 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 34 >= 34 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 34 + -1*B >= 34 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 33 + -1*B >= 33 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 33 + -1*B >= -26 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 33 + -1*B >= -25 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 33 + -1*B >= -24 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 33 + -1*B >= -23 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 33 + -1*B >= -22 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 33 + -1*B >= -21 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 33 + -1*B >= -20 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 33 + -1*B >= -19 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 33 + -1*B >= -18 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 33 + -1*B >= -17 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 33 + -1*B >= -16 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 33 + -1*B >= -15 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 33 + -1*B >= -14 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 33 + -1*B >= -13 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 33 + -1*B >= -12 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 33 + -1*B >= -11 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 33 + -1*B >= -10 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 33 + -1*B >= -9 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 33 + -1*B >= -8 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 33 + -1*B >= -7 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 33 + -1*B >= -6 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 33 + -1*B >= -5 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 33 + -1*B >= -4 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 33 + -1*B >= -3 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 33 + -1*B >= -2 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 33 + -1*B >= -1 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 33 + -1*B >= 0 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 33 + -1*B >= 1 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 33 + -1*B >= 2 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 33 + -1*B >= 3 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 33 + -1*B >= 4 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 33 + -1*B >= 5 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 33 + -1*B >= 6 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 33 + -1*B >= 7 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 33 + -1*B >= 8 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 33 + -1*B >= 9 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 33 + -1*B >= 10 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 33 + -1*B >= 11 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 33 + -1*B >= 12 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 33 + -1*B >= 13 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 33 + -1*B >= 14 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 33 + -1*B >= 15 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 33 + -1*B >= 16 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 33 + -1*B >= 17 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 33 + -1*B >= 18 = f61(A,16,C) [B >= 50] ==> f61(A,B,C) = 34 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 34 >= 34 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 34 >= 34 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 34 >= 34 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 34 >= 34 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 34 >= 34 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 34 >= 34 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 34 >= 34 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 34 >= 34 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 34 >= 34 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 34 >= 34 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 34 >= 34 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 34 >= 34 = f61(A,0,C) * Step 30: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (?,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 16*x13 p(f101) = -1*x2 + 15*x13 p(f103) = -1*x2 + 15*x13 p(f105) = -1*x2 + 15*x13 p(f107) = -1*x2 + 15*x13 p(f109) = -1*x2 + 15*x13 p(f11) = 16*x13 p(f111) = -1*x2 + 15*x13 p(f113) = -1*x2 + 15*x13 p(f115) = -1*x2 + 15*x13 p(f117) = -1*x2 + 15*x13 p(f119) = -1*x2 + 15*x13 p(f121) = -1*x2 + 15*x13 p(f123) = -1*x2 + 15*x13 p(f125) = -1*x2 + 15*x13 p(f127) = -1*x2 + 15*x13 p(f129) = -1*x2 + 15*x13 p(f13) = 16*x13 p(f131) = -1*x2 + 15*x13 p(f133) = -1*x2 + 15*x13 p(f135) = -1*x2 + 15*x13 p(f137) = -1*x2 + 15*x13 p(f139) = -1*x2 + 15*x13 p(f141) = -1*x2 + 15*x13 p(f143) = -1*x2 + 15*x13 p(f145) = -1*x2 + 15*x13 p(f147) = -1*x2 + 15*x13 p(f149) = -1*x2 + 15*x13 p(f15) = 16*x13 p(f151) = -1*x2 + 15*x13 p(f153) = -1*x2 + 15*x13 p(f155) = -1*x2 + 15*x13 p(f157) = -1*x2 + 15*x13 p(f159) = -1*x2 + 15*x13 p(f161) = -1*x2 + 15*x13 p(f163) = -1*x2 + 15*x13 p(f165) = -1*x2 + 15*x13 p(f167) = -1*x2 + 15*x13 p(f169) = -1*x2 + 15*x13 p(f17) = 16*x13 p(f171) = -1*x2 + 15*x13 p(f173) = -1*x2 + 15*x13 p(f175) = -1*x2 + 15*x13 p(f177) = -1*x2 + 15*x13 p(f179) = -1*x2 + 15*x13 p(f181) = -1*x2 + 15*x13 p(f19) = 16*x13 p(f21) = 16*x13 p(f23) = 16*x13 p(f25) = 16*x13 p(f27) = 16*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 16*x13 p(f65) = -1*x2 + 16*x13 p(f67) = -1*x2 + 16*x13 p(f69) = -1*x2 + 16*x13 p(f7) = 16*x13 p(f71) = -1*x2 + 16*x13 p(f73) = -1*x2 + 16*x13 p(f75) = -1*x2 + 16*x13 p(f77) = -1*x2 + 16*x13 p(f79) = -1*x2 + 16*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 16*x13 p(f83) = -1*x2 + 16*x13 p(f85) = -1*x2 + 16*x13 p(f87) = -1*x2 + 16*x13 p(f89) = -1*x2 + 16*x13 p(f91) = -1*x2 + 16*x13 p(f93) = -1*x2 + 16*x13 p(f95) = -1*x2 + 15*x13 p(f97) = -1*x2 + 15*x13 p(f99) = -1*x2 + 15*x13 Following rules are strictly oriented: [B = 15] ==> f93(A,B,C) = 16 + -1*B > 0 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 16 + -1*B > 1 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 16 + -1*B > 2 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 16 + -1*B > 3 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 16 + -1*B > 4 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 16 + -1*B > 5 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 16 + -1*B > 6 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 16 + -1*B > 7 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 16 + -1*B > 8 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 16 + -1*B > 9 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 16 + -1*B > 10 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 16 + -1*B > 11 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 16 + -1*B > 12 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 16 + -1*B > 13 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 16 + -1*B > 14 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 16 + -1*B > 15 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 16 >= 16 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 16 >= 16 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 16 >= 16 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 16 >= 16 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 16 >= 16 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 16 >= 16 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 16 >= 16 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 16 >= 16 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 16 + -1*B >= 16 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 16 + -1*B >= 16 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 16 + -1*B >= 16 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 16 + -1*B >= 16 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 16 + -1*B >= 16 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 16 + -1*B >= 16 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 16 + -1*B >= 16 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 16 + -1*B >= 16 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 16 + -1*B >= 16 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 16 + -1*B >= 16 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 16 + -1*B >= 16 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 16 + -1*B >= 16 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 16 + -1*B >= 16 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 16 + -1*B >= 16 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 16 + -1*B >= 15 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 15 + -1*B >= 15 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 15 + -1*B >= 15 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 15 + -1*B >= 15 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 15 + -1*B >= 15 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 15 + -1*B >= 15 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 15 + -1*B >= 15 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 15 + -1*B >= 15 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 15 + -1*B >= 15 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 15 + -1*B >= 15 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 15 + -1*B >= 15 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 15 + -1*B >= 15 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 15 + -1*B >= 15 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 15 + -1*B >= 15 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 15 + -1*B >= 15 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 15 + -1*B >= 15 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 15 + -1*B >= 15 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 15 + -1*B >= 15 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 15 + -1*B >= 15 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 15 + -1*B >= 15 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 15 + -1*B >= 15 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 15 + -1*B >= 15 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 15 + -1*B >= 15 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 15 + -1*B >= 15 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 15 + -1*B >= 15 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 15 + -1*B >= 15 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 15 + -1*B >= 15 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 15 + -1*B >= 15 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 15 + -1*B >= 15 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 15 + -1*B >= 15 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 15 + -1*B >= 15 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 15 + -1*B >= 15 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 15 + -1*B >= 15 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 15 + -1*B >= 15 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 15 + -1*B >= 15 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 15 + -1*B >= 15 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 15 + -1*B >= 15 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 15 + -1*B >= 15 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 15 + -1*B >= 15 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 15 + -1*B >= 15 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 15 + -1*B >= 15 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 15 + -1*B >= 15 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 15 + -1*B >= 15 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 15 + -1*B >= 15 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 16 >= 16 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 16 >= 16 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 16 + -1*B >= 16 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 15 + -1*B >= 15 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 15 + -1*B >= -44 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 15 + -1*B >= -43 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 15 + -1*B >= -42 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 15 + -1*B >= -41 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 15 + -1*B >= -40 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 15 + -1*B >= -39 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 15 + -1*B >= -38 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 15 + -1*B >= -37 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 15 + -1*B >= -36 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 15 + -1*B >= -35 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 15 + -1*B >= -34 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 15 + -1*B >= -33 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 15 + -1*B >= -32 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 15 + -1*B >= -31 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 15 + -1*B >= -30 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 15 + -1*B >= -29 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 15 + -1*B >= -28 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 15 + -1*B >= -27 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 15 + -1*B >= -26 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 15 + -1*B >= -25 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 15 + -1*B >= -24 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 15 + -1*B >= -23 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 15 + -1*B >= -22 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 15 + -1*B >= -21 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 15 + -1*B >= -20 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 15 + -1*B >= -19 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 15 + -1*B >= -18 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 15 + -1*B >= -17 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 15 + -1*B >= -16 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 15 + -1*B >= -15 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 15 + -1*B >= -14 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 15 + -1*B >= -13 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 15 + -1*B >= -12 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 15 + -1*B >= -11 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 15 + -1*B >= -10 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 15 + -1*B >= -9 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 15 + -1*B >= -8 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 15 + -1*B >= -7 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 15 + -1*B >= -6 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 15 + -1*B >= -5 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 15 + -1*B >= -4 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 15 + -1*B >= -3 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 15 + -1*B >= -2 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 15 + -1*B >= -1 = f61(A,17,C) [B >= 50] ==> f61(A,B,C) = 16 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 16 >= 16 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 16 >= 16 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 16 >= 16 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 16 >= 16 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 16 >= 16 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 16 >= 16 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 16 >= 16 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 16 >= 16 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 16 >= 16 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 16 >= 16 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 16 >= 16 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 16 >= 16 = f61(A,0,C) * Step 31: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (?,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 59*x13 p(f101) = -1*x2 + 59*x13 p(f103) = -1*x2 + 59*x13 p(f105) = -1*x2 + 59*x13 p(f107) = -1*x2 + 59*x13 p(f109) = -1*x2 + 59*x13 p(f11) = 59*x13 p(f111) = -1*x2 + 59*x13 p(f113) = -1*x2 + 59*x13 p(f115) = -1*x2 + 59*x13 p(f117) = -1*x2 + 59*x13 p(f119) = -1*x2 + 59*x13 p(f121) = -1*x2 + 59*x13 p(f123) = -1*x2 + 59*x13 p(f125) = -1*x2 + 59*x13 p(f127) = -1*x2 + 59*x13 p(f129) = -1*x2 + 59*x13 p(f13) = 59*x13 p(f131) = -1*x2 + 59*x13 p(f133) = -1*x2 + 59*x13 p(f135) = -1*x2 + 59*x13 p(f137) = -1*x2 + 59*x13 p(f139) = -1*x2 + 59*x13 p(f141) = -1*x2 + 59*x13 p(f143) = -1*x2 + 59*x13 p(f145) = -1*x2 + 59*x13 p(f147) = -1*x2 + 59*x13 p(f149) = -1*x2 + 59*x13 p(f15) = 59*x13 p(f151) = -1*x2 + 59*x13 p(f153) = -1*x2 + 59*x13 p(f155) = -1*x2 + 59*x13 p(f157) = -1*x2 + 59*x13 p(f159) = -1*x2 + 59*x13 p(f161) = -1*x2 + 59*x13 p(f163) = -1*x2 + 59*x13 p(f165) = -1*x2 + 59*x13 p(f167) = -1*x2 + 59*x13 p(f169) = -1*x2 + 59*x13 p(f17) = 59*x13 p(f171) = -1*x2 + 59*x13 p(f173) = -1*x2 + 59*x13 p(f175) = -1*x2 + 59*x13 p(f177) = -1*x2 + 59*x13 p(f179) = -1*x2 + 59*x13 p(f181) = -1*x2 + 59*x13 p(f19) = 59*x13 p(f21) = 59*x13 p(f23) = 59*x13 p(f25) = 59*x13 p(f27) = 59*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 59*x13 p(f65) = -1*x2 + 59*x13 p(f67) = -1*x2 + 59*x13 p(f69) = -1*x2 + 59*x13 p(f7) = 59*x13 p(f71) = -1*x2 + 59*x13 p(f73) = -1*x2 + 59*x13 p(f75) = -1*x2 + 59*x13 p(f77) = -1*x2 + 59*x13 p(f79) = -1*x2 + 59*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 59*x13 p(f83) = -1*x2 + 59*x13 p(f85) = -1*x2 + 59*x13 p(f87) = -1*x2 + 59*x13 p(f89) = -1*x2 + 59*x13 p(f91) = -1*x2 + 59*x13 p(f93) = -1*x2 + 59*x13 p(f95) = -1*x2 + 59*x13 p(f97) = -1*x2 + 59*x13 p(f99) = -1*x2 + 59*x13 Following rules are strictly oriented: [B = 58] ==> f179(A,B,C) = 59 + -1*B > 0 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 59 + -1*B > 1 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 59 + -1*B > 2 = f61(A,57,C) [B = 54] ==> f171(A,B,C) = 59 + -1*B > 4 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 59 + -1*B > 5 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 59 + -1*B > 6 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 59 + -1*B > 7 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 59 + -1*B > 8 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 59 + -1*B > 9 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 59 + -1*B > 14 = f61(A,45,C) [B = 17] ==> f97(A,B,C) = 59 + -1*B > 41 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 59 + -1*B > 42 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 59 + -1*B > 43 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 59 + -1*B > 44 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 59 + -1*B > 45 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 59 + -1*B > 46 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 59 + -1*B > 47 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 59 + -1*B > 48 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 59 + -1*B > 49 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 59 + -1*B > 50 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 59 + -1*B > 51 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 59 + -1*B > 52 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 59 + -1*B > 53 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 59 + -1*B > 54 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 59 + -1*B > 55 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 59 + -1*B > 56 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 59 + -1*B > 57 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 59 + -1*B > 58 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 59 >= 59 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 59 >= 59 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 59 >= 59 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 59 >= 59 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 59 >= 59 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 59 >= 59 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 59 >= 59 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 59 >= 59 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 59 + -1*B >= 59 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 59 + -1*B >= 59 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 59 + -1*B >= 59 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 59 + -1*B >= 59 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 59 + -1*B >= 59 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 59 + -1*B >= 59 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 59 + -1*B >= 59 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 59 + -1*B >= 59 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 59 + -1*B >= 59 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 59 + -1*B >= 59 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 59 + -1*B >= 59 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 59 + -1*B >= 59 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 59 + -1*B >= 59 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 59 + -1*B >= 59 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 59 + -1*B >= 59 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 59 + -1*B >= 59 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 59 + -1*B >= 59 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 59 + -1*B >= 59 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 59 + -1*B >= 59 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 59 + -1*B >= 59 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 59 + -1*B >= 59 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 59 + -1*B >= 59 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 59 + -1*B >= 59 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 59 + -1*B >= 59 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 59 + -1*B >= 59 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 59 + -1*B >= 59 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 59 + -1*B >= 59 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 59 + -1*B >= 59 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 59 + -1*B >= 59 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 59 + -1*B >= 59 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 59 + -1*B >= 59 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 59 + -1*B >= 59 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 59 + -1*B >= 59 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 59 + -1*B >= 59 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 59 + -1*B >= 59 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 59 + -1*B >= 59 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 59 + -1*B >= 59 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 59 + -1*B >= 59 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 59 + -1*B >= 59 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 59 + -1*B >= 59 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 59 + -1*B >= 59 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 59 + -1*B >= 59 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 59 + -1*B >= 59 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 59 + -1*B >= 59 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 59 + -1*B >= 59 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 59 + -1*B >= 59 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 59 + -1*B >= 59 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 59 + -1*B >= 59 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 59 + -1*B >= 59 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 59 + -1*B >= 59 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 59 + -1*B >= 59 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 59 + -1*B >= 59 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 59 + -1*B >= 59 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 59 + -1*B >= 59 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 59 + -1*B >= 59 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 59 + -1*B >= 59 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 59 + -1*B >= 59 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 59 + -1*B >= 59 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 59 >= 59 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 59 >= 59 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 59 + -1*B >= 59 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 59 + -1*B >= 58 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 59 + -1*B >= -1 = f61(A,60,C) [B = 55] ==> f173(A,B,C) = 59 + -1*B >= 3 = f61(A,56,C) [B = 48] ==> f159(A,B,C) = 59 + -1*B >= 10 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 59 + -1*B >= 11 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 59 + -1*B >= 12 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 59 + -1*B >= 13 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 59 + -1*B >= 15 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 59 + -1*B >= 16 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 59 + -1*B >= 17 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 59 + -1*B >= 18 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 59 + -1*B >= 19 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 59 + -1*B >= 20 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 59 + -1*B >= 21 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 59 + -1*B >= 22 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 59 + -1*B >= 23 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 59 + -1*B >= 24 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 59 + -1*B >= 25 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 59 + -1*B >= 26 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 59 + -1*B >= 27 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 59 + -1*B >= 28 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 59 + -1*B >= 29 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 59 + -1*B >= 30 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 59 + -1*B >= 31 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 59 + -1*B >= 32 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 59 + -1*B >= 33 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 59 + -1*B >= 34 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 59 + -1*B >= 35 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 59 + -1*B >= 36 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 59 + -1*B >= 37 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 59 + -1*B >= 38 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 59 + -1*B >= 39 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 59 + -1*B >= 40 = f61(A,19,C) [B >= 50] ==> f61(A,B,C) = 59 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 59 >= 59 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 59 >= 59 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 59 >= 59 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 59 >= 59 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 59 >= 59 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 59 >= 59 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 59 >= 59 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 59 >= 59 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 59 >= 59 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 59 >= 59 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 59 >= 59 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 59 >= 59 = f61(A,0,C) * Step 32: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (?,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 52*x13 p(f101) = -1*x2 + 52*x13 p(f103) = -1*x2 + 52*x13 p(f105) = -1*x2 + 52*x13 p(f107) = -1*x2 + 52*x13 p(f109) = -1*x2 + 52*x13 p(f11) = 52*x13 p(f111) = -1*x2 + 52*x13 p(f113) = -1*x2 + 52*x13 p(f115) = -1*x2 + 52*x13 p(f117) = -1*x2 + 52*x13 p(f119) = -1*x2 + 52*x13 p(f121) = -1*x2 + 52*x13 p(f123) = -1*x2 + 52*x13 p(f125) = -1*x2 + 52*x13 p(f127) = -1*x2 + 52*x13 p(f129) = -1*x2 + 52*x13 p(f13) = 52*x13 p(f131) = -1*x2 + 52*x13 p(f133) = -1*x2 + 52*x13 p(f135) = -1*x2 + 52*x13 p(f137) = -1*x2 + 52*x13 p(f139) = -1*x2 + 52*x13 p(f141) = -1*x2 + 52*x13 p(f143) = -1*x2 + 52*x13 p(f145) = -1*x2 + 52*x13 p(f147) = -1*x2 + 52*x13 p(f149) = -1*x2 + 52*x13 p(f15) = 52*x13 p(f151) = -1*x2 + 52*x13 p(f153) = -1*x2 + 52*x13 p(f155) = -1*x2 + 52*x13 p(f157) = -1*x2 + 52*x13 p(f159) = -1*x2 + 52*x13 p(f161) = -1*x2 + 52*x13 p(f163) = -1*x2 + 52*x13 p(f165) = -1*x2 + 52*x13 p(f167) = -1*x2 + 51*x13 p(f169) = -1*x2 + 51*x13 p(f17) = 52*x13 p(f171) = -1*x2 + 51*x13 p(f173) = -1*x2 + 51*x13 p(f175) = -1*x2 + 51*x13 p(f177) = -1*x2 + 51*x13 p(f179) = -1*x2 + 51*x13 p(f181) = -1*x2 + 51*x13 p(f19) = 52*x13 p(f21) = 52*x13 p(f23) = 52*x13 p(f25) = 52*x13 p(f27) = 52*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 52*x13 p(f65) = -1*x2 + 52*x13 p(f67) = -1*x2 + 52*x13 p(f69) = -1*x2 + 52*x13 p(f7) = 52*x13 p(f71) = -1*x2 + 52*x13 p(f73) = -1*x2 + 52*x13 p(f75) = -1*x2 + 52*x13 p(f77) = -1*x2 + 52*x13 p(f79) = -1*x2 + 52*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 52*x13 p(f83) = -1*x2 + 52*x13 p(f85) = -1*x2 + 52*x13 p(f87) = -1*x2 + 52*x13 p(f89) = -1*x2 + 52*x13 p(f91) = -1*x2 + 52*x13 p(f93) = -1*x2 + 52*x13 p(f95) = -1*x2 + 52*x13 p(f97) = -1*x2 + 52*x13 p(f99) = -1*x2 + 52*x13 Following rules are strictly oriented: [B = 51] ==> f165(A,B,C) = 52 + -1*B > 0 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 52 + -1*B > 1 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 52 + -1*B > 2 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 52 + -1*B > 7 = f61(A,45,C) [B = 18] ==> f99(A,B,C) = 52 + -1*B > 33 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 52 + -1*B > 34 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 52 + -1*B > 35 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 52 + -1*B > 36 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 52 + -1*B > 37 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 52 + -1*B > 38 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 52 + -1*B > 39 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 52 + -1*B > 40 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 52 + -1*B > 41 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 52 + -1*B > 42 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 52 + -1*B > 43 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 52 + -1*B > 44 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 52 + -1*B > 45 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 52 + -1*B > 46 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 52 + -1*B > 47 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 52 + -1*B > 48 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 52 + -1*B > 49 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 52 + -1*B > 50 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 52 + -1*B > 51 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 52 >= 52 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 52 >= 52 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 52 >= 52 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 52 >= 52 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 52 >= 52 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 52 >= 52 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 52 >= 52 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 52 >= 52 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 52 + -1*B >= 52 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 52 + -1*B >= 52 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 52 + -1*B >= 52 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 52 + -1*B >= 52 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 52 + -1*B >= 52 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 52 + -1*B >= 52 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 52 + -1*B >= 52 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 52 + -1*B >= 52 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 52 + -1*B >= 52 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 52 + -1*B >= 52 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 52 + -1*B >= 52 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 52 + -1*B >= 52 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 52 + -1*B >= 52 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 52 + -1*B >= 52 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 52 + -1*B >= 52 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 52 + -1*B >= 52 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 52 + -1*B >= 52 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 52 + -1*B >= 52 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 52 + -1*B >= 52 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 52 + -1*B >= 52 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 52 + -1*B >= 52 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 52 + -1*B >= 52 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 52 + -1*B >= 52 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 52 + -1*B >= 52 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 52 + -1*B >= 52 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 52 + -1*B >= 52 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 52 + -1*B >= 52 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 52 + -1*B >= 52 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 52 + -1*B >= 52 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 52 + -1*B >= 52 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 52 + -1*B >= 52 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 52 + -1*B >= 52 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 52 + -1*B >= 52 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 52 + -1*B >= 52 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 52 + -1*B >= 52 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 52 + -1*B >= 52 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 52 + -1*B >= 52 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 52 + -1*B >= 52 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 52 + -1*B >= 52 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 52 + -1*B >= 52 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 52 + -1*B >= 52 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 52 + -1*B >= 52 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 52 + -1*B >= 52 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 52 + -1*B >= 52 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 52 + -1*B >= 52 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 52 + -1*B >= 52 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 52 + -1*B >= 52 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 52 + -1*B >= 52 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 52 + -1*B >= 52 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 52 + -1*B >= 52 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 52 + -1*B >= 51 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 51 + -1*B >= 51 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 51 + -1*B >= 51 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 51 + -1*B >= 51 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 51 + -1*B >= 51 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 51 + -1*B >= 51 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 51 + -1*B >= 51 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 51 + -1*B >= 51 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 52 >= 52 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 52 >= 52 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 52 + -1*B >= 52 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 51 + -1*B >= 51 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 51 + -1*B >= -8 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 51 + -1*B >= -7 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 51 + -1*B >= -6 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 51 + -1*B >= -5 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 51 + -1*B >= -4 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 51 + -1*B >= -3 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 51 + -1*B >= -2 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 51 + -1*B >= -1 = f61(A,53,C) [B = 48] ==> f159(A,B,C) = 52 + -1*B >= 3 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 52 + -1*B >= 4 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 52 + -1*B >= 5 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 52 + -1*B >= 6 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 52 + -1*B >= 8 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 52 + -1*B >= 9 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 52 + -1*B >= 10 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 52 + -1*B >= 11 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 52 + -1*B >= 12 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 52 + -1*B >= 13 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 52 + -1*B >= 14 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 52 + -1*B >= 15 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 52 + -1*B >= 16 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 52 + -1*B >= 17 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 52 + -1*B >= 18 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 52 + -1*B >= 19 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 52 + -1*B >= 20 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 52 + -1*B >= 21 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 52 + -1*B >= 22 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 52 + -1*B >= 23 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 52 + -1*B >= 24 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 52 + -1*B >= 25 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 52 + -1*B >= 26 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 52 + -1*B >= 27 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 52 + -1*B >= 28 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 52 + -1*B >= 29 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 52 + -1*B >= 30 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 52 + -1*B >= 31 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 52 + -1*B >= 32 = f61(A,20,C) [B >= 50] ==> f61(A,B,C) = 52 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 52 >= 52 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 52 >= 52 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 52 >= 52 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 52 >= 52 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 52 >= 52 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 52 >= 52 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 52 >= 52 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 52 >= 52 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 52 >= 52 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 52 >= 52 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 52 >= 52 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 52 >= 52 = f61(A,0,C) * Step 33: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (?,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 21*x13 p(f101) = -1*x2 + 20*x13 p(f103) = -1*x2 + 20*x13 p(f105) = -1*x2 + 20*x13 p(f107) = -1*x2 + 20*x13 p(f109) = -1*x2 + 20*x13 p(f11) = 20*x13 p(f111) = -1*x2 + 20*x13 p(f113) = -1*x2 + 20*x13 p(f115) = -1*x2 + 20*x13 p(f117) = -1*x2 + 20*x13 p(f119) = -1*x2 + 20*x13 p(f121) = -1*x2 + 20*x13 p(f123) = -1*x2 + 20*x13 p(f125) = -1*x2 + 20*x13 p(f127) = -1*x2 + 19*x13 p(f129) = -1*x2 + 19*x13 p(f13) = 20*x13 p(f131) = -1*x2 + 19*x13 p(f133) = -1*x2 + 19*x13 p(f135) = -1*x2 + 19*x13 p(f137) = -1*x2 + 19*x13 p(f139) = -1*x2 + 19*x13 p(f141) = -1*x2 + 19*x13 p(f143) = -1*x2 + 19*x13 p(f145) = -1*x2 + 19*x13 p(f147) = -1*x2 + 19*x13 p(f149) = -1*x2 + 19*x13 p(f15) = 20*x13 p(f151) = -1*x2 + 19*x13 p(f153) = -1*x2 + 19*x13 p(f155) = -1*x2 + 19*x13 p(f157) = -1*x2 + 19*x13 p(f159) = -1*x2 + 19*x13 p(f161) = -1*x2 + 19*x13 p(f163) = -1*x2 + 19*x13 p(f165) = -1*x2 + 19*x13 p(f167) = -1*x2 + 19*x13 p(f169) = -1*x2 + 19*x13 p(f17) = 20*x13 p(f171) = -1*x2 + 19*x13 p(f173) = -1*x2 + 19*x13 p(f175) = -1*x2 + 19*x13 p(f177) = -1*x2 + 19*x13 p(f179) = -1*x2 + 19*x13 p(f181) = -1*x2 + 19*x13 p(f19) = 20*x13 p(f21) = 20*x13 p(f23) = 20*x13 p(f25) = 20*x13 p(f27) = 20*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 20*x13 p(f65) = -1*x2 + 20*x13 p(f67) = -1*x2 + 20*x13 p(f69) = -1*x2 + 20*x13 p(f7) = 20*x13 p(f71) = -1*x2 + 20*x13 p(f73) = -1*x2 + 20*x13 p(f75) = -1*x2 + 20*x13 p(f77) = -1*x2 + 20*x13 p(f79) = -1*x2 + 20*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 20*x13 p(f83) = -1*x2 + 20*x13 p(f85) = -1*x2 + 20*x13 p(f87) = -1*x2 + 20*x13 p(f89) = -1*x2 + 20*x13 p(f91) = -1*x2 + 20*x13 p(f93) = -1*x2 + 20*x13 p(f95) = -1*x2 + 20*x13 p(f97) = -1*x2 + 20*x13 p(f99) = -1*x2 + 20*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 21 > 20 = f7(0,B,C) [B = 19] ==> f101(A,B,C) = 20 + -1*B > 0 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 20 + -1*B > 1 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 20 + -1*B > 2 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 20 + -1*B > 3 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 20 + -1*B > 4 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 20 + -1*B > 5 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 20 + -1*B > 6 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 20 + -1*B > 7 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 20 + -1*B > 8 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 20 + -1*B > 9 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 20 + -1*B > 10 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 20 + -1*B > 11 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 20 + -1*B > 12 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 20 + -1*B > 13 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 20 + -1*B > 14 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 20 + -1*B > 15 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 20 + -1*B > 16 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 20 + -1*B > 17 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 20 + -1*B > 18 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 20 + -1*B > 19 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 20 >= 20 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 20 >= 20 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 20 >= 20 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 20 >= 20 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 20 >= 20 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 20 >= 20 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 20 >= 20 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 20 >= 20 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 20 + -1*B >= 20 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 20 + -1*B >= 20 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 20 + -1*B >= 20 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 20 + -1*B >= 20 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 20 + -1*B >= 20 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 20 + -1*B >= 20 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 20 + -1*B >= 20 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 20 + -1*B >= 20 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 20 + -1*B >= 20 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 20 + -1*B >= 20 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 20 + -1*B >= 20 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 20 + -1*B >= 20 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 20 + -1*B >= 20 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 20 + -1*B >= 20 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 20 + -1*B >= 20 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 20 + -1*B >= 20 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 20 + -1*B >= 20 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 20 + -1*B >= 20 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 20 + -1*B >= 20 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 20 + -1*B >= 20 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 20 + -1*B >= 20 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 20 + -1*B >= 20 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 20 + -1*B >= 20 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 20 + -1*B >= 20 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 20 + -1*B >= 20 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 20 + -1*B >= 20 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 20 + -1*B >= 20 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 20 + -1*B >= 20 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 20 + -1*B >= 20 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 20 + -1*B >= 20 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 20 + -1*B >= 19 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 19 + -1*B >= 19 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 19 + -1*B >= 19 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 19 + -1*B >= 19 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 19 + -1*B >= 19 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 19 + -1*B >= 19 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 19 + -1*B >= 19 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 19 + -1*B >= 19 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 19 + -1*B >= 19 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 19 + -1*B >= 19 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 19 + -1*B >= 19 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 19 + -1*B >= 19 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 19 + -1*B >= 19 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 19 + -1*B >= 19 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 19 + -1*B >= 19 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 19 + -1*B >= 19 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 19 + -1*B >= 19 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 19 + -1*B >= 19 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 19 + -1*B >= 19 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 19 + -1*B >= 19 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 19 + -1*B >= 19 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 19 + -1*B >= 19 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 19 + -1*B >= 19 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 19 + -1*B >= 19 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 19 + -1*B >= 19 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 19 + -1*B >= 19 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 19 + -1*B >= 19 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 19 + -1*B >= 19 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 20 >= 20 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 20 + -1*B >= 20 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 19 + -1*B >= 19 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 19 + -1*B >= -40 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 19 + -1*B >= -39 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 19 + -1*B >= -38 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 19 + -1*B >= -37 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 19 + -1*B >= -36 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 19 + -1*B >= -35 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 19 + -1*B >= -34 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 19 + -1*B >= -33 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 19 + -1*B >= -32 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 19 + -1*B >= -31 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 19 + -1*B >= -30 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 19 + -1*B >= -29 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 19 + -1*B >= -28 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 19 + -1*B >= -27 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 19 + -1*B >= -26 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 19 + -1*B >= -25 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 19 + -1*B >= -24 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 19 + -1*B >= -23 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 19 + -1*B >= -22 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 19 + -1*B >= -21 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 19 + -1*B >= -20 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 19 + -1*B >= -19 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 19 + -1*B >= -18 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 19 + -1*B >= -17 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 19 + -1*B >= -16 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 19 + -1*B >= -15 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 19 + -1*B >= -14 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 19 + -1*B >= -13 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 20 + -1*B >= -12 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 20 + -1*B >= -11 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 20 + -1*B >= -10 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 20 + -1*B >= -9 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 20 + -1*B >= -8 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 20 + -1*B >= -7 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 20 + -1*B >= -6 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 20 + -1*B >= -5 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 20 + -1*B >= -4 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 20 + -1*B >= -3 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 20 + -1*B >= -2 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 20 + -1*B >= -1 = f61(A,21,C) [B >= 50] ==> f61(A,B,C) = 20 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 20 >= 20 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 20 >= 20 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 20 >= 20 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 20 >= 20 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 20 >= 20 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 20 >= 20 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 20 >= 20 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 20 >= 20 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 20 >= 20 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 20 >= 20 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 20 >= 20 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 20 >= 20 = f61(A,0,C) * Step 34: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (?,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 22*x13 p(f101) = -1*x2 + 21*x13 p(f103) = -1*x2 + 21*x13 p(f105) = -1*x2 + 20*x13 p(f107) = -1*x2 + 20*x13 p(f109) = -1*x2 + 20*x13 p(f11) = 21*x13 p(f111) = -1*x2 + 20*x13 p(f113) = -1*x2 + 20*x13 p(f115) = -1*x2 + 20*x13 p(f117) = -1*x2 + 20*x13 p(f119) = -1*x2 + 20*x13 p(f121) = -1*x2 + 20*x13 p(f123) = -1*x2 + 20*x13 p(f125) = -1*x2 + 20*x13 p(f127) = -1*x2 + 20*x13 p(f129) = -1*x2 + 20*x13 p(f13) = 21*x13 p(f131) = -1*x2 + 20*x13 p(f133) = -1*x2 + 20*x13 p(f135) = -1*x2 + 20*x13 p(f137) = -1*x2 + 20*x13 p(f139) = -1*x2 + 20*x13 p(f141) = -1*x2 + 20*x13 p(f143) = -1*x2 + 20*x13 p(f145) = -1*x2 + 20*x13 p(f147) = -1*x2 + 20*x13 p(f149) = -1*x2 + 20*x13 p(f15) = 21*x13 p(f151) = -1*x2 + 20*x13 p(f153) = -1*x2 + 20*x13 p(f155) = -1*x2 + 20*x13 p(f157) = -1*x2 + 20*x13 p(f159) = -1*x2 + 20*x13 p(f161) = -1*x2 + 20*x13 p(f163) = -1*x2 + 20*x13 p(f165) = -1*x2 + 20*x13 p(f167) = -1*x2 + 20*x13 p(f169) = -1*x2 + 20*x13 p(f17) = 21*x13 p(f171) = -1*x2 + 20*x13 p(f173) = -1*x2 + 20*x13 p(f175) = -1*x2 + 20*x13 p(f177) = -1*x2 + 20*x13 p(f179) = -1*x2 + 20*x13 p(f181) = -1*x2 + 20*x13 p(f19) = 21*x13 p(f21) = 21*x13 p(f23) = 21*x13 p(f25) = 21*x13 p(f27) = 21*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 21*x13 p(f65) = -1*x2 + 21*x13 p(f67) = -1*x2 + 21*x13 p(f69) = -1*x2 + 21*x13 p(f7) = 21*x13 p(f71) = -1*x2 + 21*x13 p(f73) = -1*x2 + 21*x13 p(f75) = -1*x2 + 21*x13 p(f77) = -1*x2 + 21*x13 p(f79) = -1*x2 + 21*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 21*x13 p(f83) = -1*x2 + 21*x13 p(f85) = -1*x2 + 21*x13 p(f87) = -1*x2 + 21*x13 p(f89) = -1*x2 + 21*x13 p(f91) = -1*x2 + 21*x13 p(f93) = -1*x2 + 21*x13 p(f95) = -1*x2 + 21*x13 p(f97) = -1*x2 + 21*x13 p(f99) = -1*x2 + 21*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 22 > 21 = f7(0,B,C) [B = 20] ==> f103(A,B,C) = 21 + -1*B > 0 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 21 + -1*B > 1 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 21 + -1*B > 2 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 21 + -1*B > 3 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 21 + -1*B > 4 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 21 + -1*B > 5 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 21 + -1*B > 6 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 21 + -1*B > 7 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 21 + -1*B > 8 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 21 + -1*B > 9 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 21 + -1*B > 10 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 21 + -1*B > 11 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 21 + -1*B > 12 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 21 + -1*B > 13 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 21 + -1*B > 14 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 21 + -1*B > 15 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 21 + -1*B > 16 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 21 + -1*B > 17 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 21 + -1*B > 18 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 21 + -1*B > 19 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 21 + -1*B > 20 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 21 >= 21 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 21 >= 21 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 21 >= 21 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 21 >= 21 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 21 >= 21 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 21 >= 21 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 21 >= 21 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 21 >= 21 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 21 + -1*B >= 21 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 21 + -1*B >= 21 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 21 + -1*B >= 21 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 21 + -1*B >= 21 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 21 + -1*B >= 21 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 21 + -1*B >= 21 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 21 + -1*B >= 21 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 21 + -1*B >= 21 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 21 + -1*B >= 21 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 21 + -1*B >= 21 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 21 + -1*B >= 21 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 21 + -1*B >= 21 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 21 + -1*B >= 21 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 21 + -1*B >= 21 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 21 + -1*B >= 21 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 21 + -1*B >= 21 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 21 + -1*B >= 21 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 21 + -1*B >= 21 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 21 + -1*B >= 21 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 21 + -1*B >= 20 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 20 + -1*B >= 20 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 20 + -1*B >= 20 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 20 + -1*B >= 20 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 20 + -1*B >= 20 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 20 + -1*B >= 20 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 20 + -1*B >= 20 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 20 + -1*B >= 20 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 20 + -1*B >= 20 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 20 + -1*B >= 20 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 20 + -1*B >= 20 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 20 + -1*B >= 20 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 20 + -1*B >= 20 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 20 + -1*B >= 20 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 20 + -1*B >= 20 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 20 + -1*B >= 20 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 20 + -1*B >= 20 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 20 + -1*B >= 20 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 20 + -1*B >= 20 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 20 + -1*B >= 20 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 20 + -1*B >= 20 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 20 + -1*B >= 20 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 20 + -1*B >= 20 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 20 + -1*B >= 20 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 20 + -1*B >= 20 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 20 + -1*B >= 20 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 20 + -1*B >= 20 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 20 + -1*B >= 20 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 20 + -1*B >= 20 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 20 + -1*B >= 20 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 20 + -1*B >= 20 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 20 + -1*B >= 20 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 20 + -1*B >= 20 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 20 + -1*B >= 20 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 20 + -1*B >= 20 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 20 + -1*B >= 20 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 20 + -1*B >= 20 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 20 + -1*B >= 20 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 20 + -1*B >= 20 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 21 >= 21 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 21 + -1*B >= 21 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 20 + -1*B >= 20 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 20 + -1*B >= -39 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 20 + -1*B >= -38 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 20 + -1*B >= -37 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 20 + -1*B >= -36 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 20 + -1*B >= -35 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 20 + -1*B >= -34 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 20 + -1*B >= -33 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 20 + -1*B >= -32 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 20 + -1*B >= -31 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 20 + -1*B >= -30 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 20 + -1*B >= -29 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 20 + -1*B >= -28 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 20 + -1*B >= -27 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 20 + -1*B >= -26 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 20 + -1*B >= -25 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 20 + -1*B >= -24 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 20 + -1*B >= -23 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 20 + -1*B >= -22 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 20 + -1*B >= -21 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 20 + -1*B >= -20 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 20 + -1*B >= -19 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 20 + -1*B >= -18 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 20 + -1*B >= -17 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 20 + -1*B >= -16 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 20 + -1*B >= -15 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 20 + -1*B >= -14 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 20 + -1*B >= -13 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 20 + -1*B >= -12 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 20 + -1*B >= -11 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 20 + -1*B >= -10 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 20 + -1*B >= -9 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 20 + -1*B >= -8 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 20 + -1*B >= -7 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 20 + -1*B >= -6 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 20 + -1*B >= -5 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 20 + -1*B >= -4 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 20 + -1*B >= -3 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 20 + -1*B >= -2 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 20 + -1*B >= -1 = f61(A,22,C) [B >= 50] ==> f61(A,B,C) = 21 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 21 >= 21 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 21 >= 21 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 21 >= 21 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 21 >= 21 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 21 >= 21 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 21 >= 21 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 21 >= 21 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 21 >= 21 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 21 >= 21 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 21 >= 21 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 21 >= 21 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 21 >= 21 = f61(A,0,C) * Step 35: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (?,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 22*x13 p(f101) = -1*x2 + 22*x13 p(f103) = -1*x2 + 22*x13 p(f105) = -1*x2 + 22*x13 p(f107) = -1*x2 + 22*x13 p(f109) = -1*x2 + 22*x13 p(f11) = 22*x13 p(f111) = -1*x2 + 22*x13 p(f113) = -1*x2 + 22*x13 p(f115) = -1*x2 + 22*x13 p(f117) = -1*x2 + 22*x13 p(f119) = -1*x2 + 22*x13 p(f121) = -1*x2 + 22*x13 p(f123) = -1*x2 + 22*x13 p(f125) = -1*x2 + 22*x13 p(f127) = -1*x2 + 22*x13 p(f129) = -1*x2 + 22*x13 p(f13) = 22*x13 p(f131) = -1*x2 + 22*x13 p(f133) = -1*x2 + 22*x13 p(f135) = -1*x2 + 22*x13 p(f137) = -1*x2 + 22*x13 p(f139) = -1*x2 + 22*x13 p(f141) = -1*x2 + 22*x13 p(f143) = -1*x2 + 22*x13 p(f145) = -1*x2 + 22*x13 p(f147) = -1*x2 + 22*x13 p(f149) = -1*x2 + 21*x13 p(f15) = 22*x13 p(f151) = -1*x2 + 21*x13 p(f153) = -1*x2 + 21*x13 p(f155) = -1*x2 + 21*x13 p(f157) = -1*x2 + 21*x13 p(f159) = -1*x2 + 21*x13 p(f161) = -1*x2 + 21*x13 p(f163) = -1*x2 + 21*x13 p(f165) = -1*x2 + 21*x13 p(f167) = -1*x2 + 21*x13 p(f169) = -1*x2 + 21*x13 p(f17) = 22*x13 p(f171) = -1*x2 + 21*x13 p(f173) = -1*x2 + 21*x13 p(f175) = -1*x2 + 21*x13 p(f177) = -1*x2 + 21*x13 p(f179) = -1*x2 + 21*x13 p(f181) = -1*x2 + 21*x13 p(f19) = 22*x13 p(f21) = 22*x13 p(f23) = 22*x13 p(f25) = 22*x13 p(f27) = 22*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 22*x13 p(f65) = -1*x2 + 22*x13 p(f67) = -1*x2 + 22*x13 p(f69) = -1*x2 + 22*x13 p(f7) = 22*x13 p(f71) = -1*x2 + 22*x13 p(f73) = -1*x2 + 22*x13 p(f75) = -1*x2 + 22*x13 p(f77) = -1*x2 + 22*x13 p(f79) = -1*x2 + 22*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 22*x13 p(f83) = -1*x2 + 22*x13 p(f85) = -1*x2 + 22*x13 p(f87) = -1*x2 + 22*x13 p(f89) = -1*x2 + 22*x13 p(f91) = -1*x2 + 22*x13 p(f93) = -1*x2 + 22*x13 p(f95) = -1*x2 + 22*x13 p(f97) = -1*x2 + 22*x13 p(f99) = -1*x2 + 22*x13 Following rules are strictly oriented: [B = 21] ==> f105(A,B,C) = 22 + -1*B > 0 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 22 + -1*B > 1 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 22 + -1*B > 2 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 22 + -1*B > 3 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 22 + -1*B > 4 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 22 + -1*B > 5 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 22 + -1*B > 6 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 22 + -1*B > 7 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 22 + -1*B > 8 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 22 + -1*B > 9 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 22 + -1*B > 10 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 22 + -1*B > 11 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 22 + -1*B > 12 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 22 + -1*B > 13 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 22 + -1*B > 14 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 22 + -1*B > 15 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 22 + -1*B > 16 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 22 + -1*B > 17 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 22 + -1*B > 18 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 22 + -1*B > 19 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 22 + -1*B > 20 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 22 + -1*B > 21 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 22 >= 22 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 22 >= 22 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 22 >= 22 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 22 >= 22 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 22 >= 22 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 22 >= 22 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 22 >= 22 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 22 >= 22 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 22 + -1*B >= 22 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 22 + -1*B >= 22 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 22 + -1*B >= 22 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 22 + -1*B >= 22 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 22 + -1*B >= 22 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 22 + -1*B >= 22 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 22 + -1*B >= 22 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 22 + -1*B >= 22 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 22 + -1*B >= 22 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 22 + -1*B >= 22 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 22 + -1*B >= 22 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 22 + -1*B >= 22 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 22 + -1*B >= 22 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 22 + -1*B >= 22 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 22 + -1*B >= 22 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 22 + -1*B >= 22 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 22 + -1*B >= 22 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 22 + -1*B >= 22 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 22 + -1*B >= 22 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 22 + -1*B >= 22 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 22 + -1*B >= 22 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 22 + -1*B >= 22 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 22 + -1*B >= 22 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 22 + -1*B >= 22 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 22 + -1*B >= 22 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 22 + -1*B >= 22 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 22 + -1*B >= 22 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 22 + -1*B >= 22 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 22 + -1*B >= 22 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 22 + -1*B >= 22 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 22 + -1*B >= 22 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 22 + -1*B >= 22 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 22 + -1*B >= 22 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 22 + -1*B >= 22 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 22 + -1*B >= 22 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 22 + -1*B >= 22 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 22 + -1*B >= 22 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 22 + -1*B >= 22 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 22 + -1*B >= 22 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 22 + -1*B >= 22 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 22 + -1*B >= 22 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 22 + -1*B >= 21 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 21 + -1*B >= 21 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 21 + -1*B >= 21 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 21 + -1*B >= 21 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 21 + -1*B >= 21 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 21 + -1*B >= 21 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 21 + -1*B >= 21 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 21 + -1*B >= 21 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 21 + -1*B >= 21 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 21 + -1*B >= 21 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 21 + -1*B >= 21 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 21 + -1*B >= 21 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 21 + -1*B >= 21 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 21 + -1*B >= 21 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 21 + -1*B >= 21 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 21 + -1*B >= 21 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 21 + -1*B >= 21 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 22 >= 22 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 22 >= 22 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 22 + -1*B >= 22 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 21 + -1*B >= 21 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 21 + -1*B >= -38 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 21 + -1*B >= -37 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 21 + -1*B >= -36 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 21 + -1*B >= -35 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 21 + -1*B >= -34 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 21 + -1*B >= -33 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 21 + -1*B >= -32 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 21 + -1*B >= -31 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 21 + -1*B >= -30 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 21 + -1*B >= -29 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 21 + -1*B >= -28 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 21 + -1*B >= -27 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 21 + -1*B >= -26 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 21 + -1*B >= -25 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 21 + -1*B >= -24 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 21 + -1*B >= -23 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 21 + -1*B >= -22 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 22 + -1*B >= -21 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 22 + -1*B >= -20 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 22 + -1*B >= -19 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 22 + -1*B >= -18 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 22 + -1*B >= -17 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 22 + -1*B >= -16 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 22 + -1*B >= -15 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 22 + -1*B >= -14 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 22 + -1*B >= -13 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 22 + -1*B >= -12 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 22 + -1*B >= -11 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 22 + -1*B >= -10 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 22 + -1*B >= -9 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 22 + -1*B >= -8 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 22 + -1*B >= -7 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 22 + -1*B >= -6 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 22 + -1*B >= -5 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 22 + -1*B >= -4 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 22 + -1*B >= -3 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 22 + -1*B >= -2 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 22 + -1*B >= -1 = f61(A,23,C) [B >= 50] ==> f61(A,B,C) = 22 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 22 >= 22 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 22 >= 22 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 22 >= 22 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 22 >= 22 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 22 >= 22 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 22 >= 22 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 22 >= 22 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 22 >= 22 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 22 >= 22 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 22 >= 22 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 22 >= 22 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 22 >= 22 = f61(A,0,C) * Step 36: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (?,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 23*x13 p(f101) = -1*x2 + 23*x13 p(f103) = -1*x2 + 23*x13 p(f105) = -1*x2 + 23*x13 p(f107) = -1*x2 + 23*x13 p(f109) = -1*x2 + 23*x13 p(f11) = 23*x13 p(f111) = -1*x2 + 23*x13 p(f113) = -1*x2 + 23*x13 p(f115) = -1*x2 + 23*x13 p(f117) = -1*x2 + 23*x13 p(f119) = -1*x2 + 23*x13 p(f121) = -1*x2 + 23*x13 p(f123) = -1*x2 + 23*x13 p(f125) = -1*x2 + 23*x13 p(f127) = -1*x2 + 23*x13 p(f129) = -1*x2 + 23*x13 p(f13) = 23*x13 p(f131) = -1*x2 + 23*x13 p(f133) = -1*x2 + 23*x13 p(f135) = -1*x2 + 23*x13 p(f137) = -1*x2 + 23*x13 p(f139) = -1*x2 + 23*x13 p(f141) = -1*x2 + 23*x13 p(f143) = -1*x2 + 23*x13 p(f145) = -1*x2 + 23*x13 p(f147) = -1*x2 + 23*x13 p(f149) = -1*x2 + 23*x13 p(f15) = 23*x13 p(f151) = -1*x2 + 23*x13 p(f153) = -1*x2 + 22*x13 p(f155) = -1*x2 + 22*x13 p(f157) = -1*x2 + 22*x13 p(f159) = -1*x2 + 22*x13 p(f161) = -1*x2 + 22*x13 p(f163) = -1*x2 + 22*x13 p(f165) = -1*x2 + 22*x13 p(f167) = -1*x2 + 22*x13 p(f169) = -1*x2 + 22*x13 p(f17) = 23*x13 p(f171) = -1*x2 + 22*x13 p(f173) = -1*x2 + 22*x13 p(f175) = -1*x2 + 22*x13 p(f177) = -1*x2 + 22*x13 p(f179) = -1*x2 + 22*x13 p(f181) = -1*x2 + 22*x13 p(f19) = 23*x13 p(f21) = 23*x13 p(f23) = 23*x13 p(f25) = 23*x13 p(f27) = 23*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 23*x13 p(f65) = -1*x2 + 23*x13 p(f67) = -1*x2 + 23*x13 p(f69) = -1*x2 + 23*x13 p(f7) = 23*x13 p(f71) = -1*x2 + 23*x13 p(f73) = -1*x2 + 23*x13 p(f75) = -1*x2 + 23*x13 p(f77) = -1*x2 + 23*x13 p(f79) = -1*x2 + 23*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 23*x13 p(f83) = -1*x2 + 23*x13 p(f85) = -1*x2 + 23*x13 p(f87) = -1*x2 + 23*x13 p(f89) = -1*x2 + 23*x13 p(f91) = -1*x2 + 23*x13 p(f93) = -1*x2 + 23*x13 p(f95) = -1*x2 + 23*x13 p(f97) = -1*x2 + 23*x13 p(f99) = -1*x2 + 23*x13 Following rules are strictly oriented: [B = 22] ==> f107(A,B,C) = 23 + -1*B > 0 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 23 + -1*B > 1 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 23 + -1*B > 2 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 23 + -1*B > 3 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 23 + -1*B > 4 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 23 + -1*B > 5 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 23 + -1*B > 6 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 23 + -1*B > 7 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 23 + -1*B > 8 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 23 + -1*B > 9 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 23 + -1*B > 10 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 23 + -1*B > 11 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 23 + -1*B > 12 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 23 + -1*B > 13 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 23 + -1*B > 14 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 23 + -1*B > 15 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 23 + -1*B > 16 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 23 + -1*B > 17 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 23 + -1*B > 18 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 23 + -1*B > 19 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 23 + -1*B > 20 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 23 + -1*B > 21 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 23 + -1*B > 22 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 23 >= 23 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 23 >= 23 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 23 >= 23 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 23 >= 23 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 23 >= 23 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 23 >= 23 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 23 >= 23 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 23 >= 23 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 23 + -1*B >= 23 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 23 + -1*B >= 23 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 23 + -1*B >= 23 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 23 + -1*B >= 23 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 23 + -1*B >= 23 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 23 + -1*B >= 23 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 23 + -1*B >= 23 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 23 + -1*B >= 23 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 23 + -1*B >= 23 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 23 + -1*B >= 23 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 23 + -1*B >= 23 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 23 + -1*B >= 23 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 23 + -1*B >= 23 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 23 + -1*B >= 23 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 23 + -1*B >= 23 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 23 + -1*B >= 23 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 23 + -1*B >= 23 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 23 + -1*B >= 23 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 23 + -1*B >= 23 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 23 + -1*B >= 23 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 23 + -1*B >= 23 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 23 + -1*B >= 23 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 23 + -1*B >= 23 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 23 + -1*B >= 23 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 23 + -1*B >= 23 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 23 + -1*B >= 23 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 23 + -1*B >= 23 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 23 + -1*B >= 23 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 23 + -1*B >= 23 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 23 + -1*B >= 23 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 23 + -1*B >= 23 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 23 + -1*B >= 23 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 23 + -1*B >= 23 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 23 + -1*B >= 23 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 23 + -1*B >= 23 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 23 + -1*B >= 23 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 23 + -1*B >= 23 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 23 + -1*B >= 23 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 23 + -1*B >= 23 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 23 + -1*B >= 23 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 23 + -1*B >= 23 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 23 + -1*B >= 23 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 23 + -1*B >= 23 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 23 + -1*B >= 22 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 22 + -1*B >= 22 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 22 + -1*B >= 22 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 22 + -1*B >= 22 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 22 + -1*B >= 22 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 22 + -1*B >= 22 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 22 + -1*B >= 22 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 22 + -1*B >= 22 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 22 + -1*B >= 22 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 22 + -1*B >= 22 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 22 + -1*B >= 22 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 22 + -1*B >= 22 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 22 + -1*B >= 22 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 22 + -1*B >= 22 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 22 + -1*B >= 22 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 23 >= 23 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 23 >= 23 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 23 + -1*B >= 23 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 22 + -1*B >= 22 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 22 + -1*B >= -37 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 22 + -1*B >= -36 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 22 + -1*B >= -35 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 22 + -1*B >= -34 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 22 + -1*B >= -33 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 22 + -1*B >= -32 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 22 + -1*B >= -31 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 22 + -1*B >= -30 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 22 + -1*B >= -29 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 22 + -1*B >= -28 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 22 + -1*B >= -27 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 22 + -1*B >= -26 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 22 + -1*B >= -25 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 22 + -1*B >= -24 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 22 + -1*B >= -23 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 23 + -1*B >= -22 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 23 + -1*B >= -21 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 23 + -1*B >= -20 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 23 + -1*B >= -19 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 23 + -1*B >= -18 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 23 + -1*B >= -17 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 23 + -1*B >= -16 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 23 + -1*B >= -15 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 23 + -1*B >= -14 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 23 + -1*B >= -13 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 23 + -1*B >= -12 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 23 + -1*B >= -11 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 23 + -1*B >= -10 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 23 + -1*B >= -9 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 23 + -1*B >= -8 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 23 + -1*B >= -7 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 23 + -1*B >= -6 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 23 + -1*B >= -5 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 23 + -1*B >= -4 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 23 + -1*B >= -3 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 23 + -1*B >= -2 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 23 + -1*B >= -1 = f61(A,24,C) [B >= 50] ==> f61(A,B,C) = 23 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 23 >= 23 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 23 >= 23 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 23 >= 23 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 23 >= 23 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 23 >= 23 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 23 >= 23 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 23 >= 23 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 23 >= 23 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 23 >= 23 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 23 >= 23 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 23 >= 23 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 23 >= 23 = f61(A,0,C) * Step 37: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (?,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 24*x13 p(f101) = -1*x2 + 24*x13 p(f103) = -1*x2 + 24*x13 p(f105) = -1*x2 + 24*x13 p(f107) = -1*x2 + 24*x13 p(f109) = -1*x2 + 24*x13 p(f11) = 24*x13 p(f111) = -1*x2 + 24*x13 p(f113) = -1*x2 + 24*x13 p(f115) = -1*x2 + 24*x13 p(f117) = -1*x2 + 24*x13 p(f119) = -1*x2 + 24*x13 p(f121) = -1*x2 + 24*x13 p(f123) = -1*x2 + 24*x13 p(f125) = -1*x2 + 23*x13 p(f127) = -1*x2 + 23*x13 p(f129) = -1*x2 + 23*x13 p(f13) = 24*x13 p(f131) = -1*x2 + 23*x13 p(f133) = -1*x2 + 23*x13 p(f135) = -1*x2 + 23*x13 p(f137) = -1*x2 + 23*x13 p(f139) = -1*x2 + 23*x13 p(f141) = -1*x2 + 23*x13 p(f143) = -1*x2 + 23*x13 p(f145) = -1*x2 + 23*x13 p(f147) = -1*x2 + 23*x13 p(f149) = -1*x2 + 23*x13 p(f15) = 24*x13 p(f151) = -1*x2 + 23*x13 p(f153) = -1*x2 + 23*x13 p(f155) = -1*x2 + 23*x13 p(f157) = -1*x2 + 23*x13 p(f159) = -1*x2 + 23*x13 p(f161) = -1*x2 + 23*x13 p(f163) = -1*x2 + 23*x13 p(f165) = -1*x2 + 23*x13 p(f167) = -1*x2 + 23*x13 p(f169) = -1*x2 + 23*x13 p(f17) = 24*x13 p(f171) = -1*x2 + 23*x13 p(f173) = -1*x2 + 23*x13 p(f175) = -1*x2 + 23*x13 p(f177) = -1*x2 + 23*x13 p(f179) = -1*x2 + 23*x13 p(f181) = -1*x2 + 23*x13 p(f19) = 24*x13 p(f21) = 24*x13 p(f23) = 24*x13 p(f25) = 24*x13 p(f27) = 24*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 24*x13 p(f65) = -1*x2 + 24*x13 p(f67) = -1*x2 + 24*x13 p(f69) = -1*x2 + 24*x13 p(f7) = 24*x13 p(f71) = -1*x2 + 24*x13 p(f73) = -1*x2 + 24*x13 p(f75) = -1*x2 + 24*x13 p(f77) = -1*x2 + 24*x13 p(f79) = -1*x2 + 24*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 24*x13 p(f83) = -1*x2 + 24*x13 p(f85) = -1*x2 + 24*x13 p(f87) = -1*x2 + 24*x13 p(f89) = -1*x2 + 24*x13 p(f91) = -1*x2 + 24*x13 p(f93) = -1*x2 + 24*x13 p(f95) = -1*x2 + 24*x13 p(f97) = -1*x2 + 24*x13 p(f99) = -1*x2 + 24*x13 Following rules are strictly oriented: [B = 23] ==> f109(A,B,C) = 24 + -1*B > 0 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 24 + -1*B > 1 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 24 + -1*B > 2 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 24 + -1*B > 3 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 24 + -1*B > 4 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 24 + -1*B > 5 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 24 + -1*B > 6 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 24 + -1*B > 7 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 24 + -1*B > 8 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 24 + -1*B > 9 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 24 + -1*B > 10 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 24 + -1*B > 11 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 24 + -1*B > 12 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 24 + -1*B > 13 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 24 + -1*B > 14 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 24 + -1*B > 15 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 24 + -1*B > 16 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 24 + -1*B > 17 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 24 + -1*B > 18 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 24 + -1*B > 19 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 24 + -1*B > 20 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 24 + -1*B > 21 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 24 + -1*B > 22 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 24 + -1*B > 23 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 24 >= 24 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 24 >= 24 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 24 >= 24 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 24 >= 24 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 24 >= 24 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 24 >= 24 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 24 >= 24 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 24 >= 24 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 24 + -1*B >= 24 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 24 + -1*B >= 24 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 24 + -1*B >= 24 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 24 + -1*B >= 24 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 24 + -1*B >= 24 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 24 + -1*B >= 24 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 24 + -1*B >= 24 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 24 + -1*B >= 24 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 24 + -1*B >= 24 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 24 + -1*B >= 24 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 24 + -1*B >= 24 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 24 + -1*B >= 24 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 24 + -1*B >= 24 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 24 + -1*B >= 24 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 24 + -1*B >= 24 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 24 + -1*B >= 24 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 24 + -1*B >= 24 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 24 + -1*B >= 24 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 24 + -1*B >= 24 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 24 + -1*B >= 24 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 24 + -1*B >= 24 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 24 + -1*B >= 24 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 24 + -1*B >= 24 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 24 + -1*B >= 24 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 24 + -1*B >= 24 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 24 + -1*B >= 24 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 24 + -1*B >= 24 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 24 + -1*B >= 24 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 24 + -1*B >= 24 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 24 + -1*B >= 23 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 23 + -1*B >= 23 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 23 + -1*B >= 23 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 23 + -1*B >= 23 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 23 + -1*B >= 23 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 23 + -1*B >= 23 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 23 + -1*B >= 23 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 23 + -1*B >= 23 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 23 + -1*B >= 23 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 23 + -1*B >= 23 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 23 + -1*B >= 23 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 23 + -1*B >= 23 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 23 + -1*B >= 23 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 23 + -1*B >= 23 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 23 + -1*B >= 23 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 23 + -1*B >= 23 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 23 + -1*B >= 23 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 23 + -1*B >= 23 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 23 + -1*B >= 23 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 23 + -1*B >= 23 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 23 + -1*B >= 23 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 23 + -1*B >= 23 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 23 + -1*B >= 23 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 23 + -1*B >= 23 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 23 + -1*B >= 23 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 23 + -1*B >= 23 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 23 + -1*B >= 23 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 23 + -1*B >= 23 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 23 + -1*B >= 23 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 24 >= 24 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 24 >= 24 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 24 + -1*B >= 24 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 23 + -1*B >= 23 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 23 + -1*B >= -36 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 23 + -1*B >= -35 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 23 + -1*B >= -34 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 23 + -1*B >= -33 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 23 + -1*B >= -32 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 23 + -1*B >= -31 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 23 + -1*B >= -30 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 23 + -1*B >= -29 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 23 + -1*B >= -28 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 23 + -1*B >= -27 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 23 + -1*B >= -26 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 23 + -1*B >= -25 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 23 + -1*B >= -24 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 23 + -1*B >= -23 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 23 + -1*B >= -22 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 23 + -1*B >= -21 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 23 + -1*B >= -20 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 23 + -1*B >= -19 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 23 + -1*B >= -18 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 23 + -1*B >= -17 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 23 + -1*B >= -16 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 23 + -1*B >= -15 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 23 + -1*B >= -14 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 23 + -1*B >= -13 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 23 + -1*B >= -12 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 23 + -1*B >= -11 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 23 + -1*B >= -10 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 23 + -1*B >= -9 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 23 + -1*B >= -8 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 24 + -1*B >= -7 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 24 + -1*B >= -6 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 24 + -1*B >= -5 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 24 + -1*B >= -4 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 24 + -1*B >= -3 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 24 + -1*B >= -2 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 24 + -1*B >= -1 = f61(A,25,C) [B >= 50] ==> f61(A,B,C) = 24 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 24 >= 24 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 24 >= 24 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 24 >= 24 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 24 >= 24 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 24 >= 24 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 24 >= 24 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 24 >= 24 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 24 >= 24 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 24 >= 24 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 24 >= 24 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 24 >= 24 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 24 >= 24 = f61(A,0,C) * Step 38: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (?,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 25*x13 p(f101) = -1*x2 + 25*x13 p(f103) = -1*x2 + 25*x13 p(f105) = -1*x2 + 25*x13 p(f107) = -1*x2 + 25*x13 p(f109) = -1*x2 + 25*x13 p(f11) = 25*x13 p(f111) = -1*x2 + 25*x13 p(f113) = -1*x2 + 24*x13 p(f115) = -1*x2 + 24*x13 p(f117) = -1*x2 + 24*x13 p(f119) = -1*x2 + 24*x13 p(f121) = -1*x2 + 24*x13 p(f123) = -1*x2 + 24*x13 p(f125) = -1*x2 + 24*x13 p(f127) = -1*x2 + 24*x13 p(f129) = -1*x2 + 24*x13 p(f13) = 25*x13 p(f131) = -1*x2 + 24*x13 p(f133) = -1*x2 + 24*x13 p(f135) = -1*x2 + 24*x13 p(f137) = -1*x2 + 24*x13 p(f139) = -1*x2 + 24*x13 p(f141) = -1*x2 + 24*x13 p(f143) = -1*x2 + 24*x13 p(f145) = -1*x2 + 24*x13 p(f147) = -1*x2 + 24*x13 p(f149) = -1*x2 + 24*x13 p(f15) = 25*x13 p(f151) = -1*x2 + 24*x13 p(f153) = -1*x2 + 24*x13 p(f155) = -1*x2 + 24*x13 p(f157) = -1*x2 + 24*x13 p(f159) = -1*x2 + 24*x13 p(f161) = -1*x2 + 24*x13 p(f163) = -1*x2 + 24*x13 p(f165) = -1*x2 + 24*x13 p(f167) = -1*x2 + 24*x13 p(f169) = -1*x2 + 24*x13 p(f17) = 25*x13 p(f171) = -1*x2 + 24*x13 p(f173) = -1*x2 + 24*x13 p(f175) = -1*x2 + 24*x13 p(f177) = -1*x2 + 24*x13 p(f179) = -1*x2 + 24*x13 p(f181) = -1*x2 + 24*x13 p(f19) = 25*x13 p(f21) = 25*x13 p(f23) = 25*x13 p(f25) = 25*x13 p(f27) = 25*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 25*x13 p(f65) = -1*x2 + 25*x13 p(f67) = -1*x2 + 25*x13 p(f69) = -1*x2 + 25*x13 p(f7) = 25*x13 p(f71) = -1*x2 + 25*x13 p(f73) = -1*x2 + 25*x13 p(f75) = -1*x2 + 25*x13 p(f77) = -1*x2 + 25*x13 p(f79) = -1*x2 + 25*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 25*x13 p(f83) = -1*x2 + 25*x13 p(f85) = -1*x2 + 25*x13 p(f87) = -1*x2 + 25*x13 p(f89) = -1*x2 + 25*x13 p(f91) = -1*x2 + 25*x13 p(f93) = -1*x2 + 25*x13 p(f95) = -1*x2 + 25*x13 p(f97) = -1*x2 + 25*x13 p(f99) = -1*x2 + 25*x13 Following rules are strictly oriented: [B = 24] ==> f111(A,B,C) = 25 + -1*B > 0 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 25 + -1*B > 1 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 25 + -1*B > 2 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 25 + -1*B > 3 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 25 + -1*B > 4 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 25 + -1*B > 5 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 25 + -1*B > 6 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 25 + -1*B > 7 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 25 + -1*B > 8 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 25 + -1*B > 9 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 25 + -1*B > 10 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 25 + -1*B > 11 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 25 + -1*B > 12 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 25 + -1*B > 13 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 25 + -1*B > 14 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 25 + -1*B > 15 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 25 + -1*B > 16 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 25 + -1*B > 17 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 25 + -1*B > 18 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 25 + -1*B > 19 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 25 + -1*B > 20 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 25 + -1*B > 21 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 25 + -1*B > 22 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 25 + -1*B > 23 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 25 + -1*B > 24 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 25 >= 25 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 25 >= 25 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 25 >= 25 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 25 >= 25 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 25 >= 25 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 25 >= 25 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 25 >= 25 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 25 >= 25 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 25 + -1*B >= 25 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 25 + -1*B >= 25 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 25 + -1*B >= 25 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 25 + -1*B >= 25 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 25 + -1*B >= 25 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 25 + -1*B >= 25 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 25 + -1*B >= 25 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 25 + -1*B >= 25 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 25 + -1*B >= 25 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 25 + -1*B >= 25 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 25 + -1*B >= 25 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 25 + -1*B >= 25 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 25 + -1*B >= 25 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 25 + -1*B >= 25 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 25 + -1*B >= 25 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 25 + -1*B >= 25 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 25 + -1*B >= 25 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 25 + -1*B >= 25 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 25 + -1*B >= 25 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 25 + -1*B >= 25 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 25 + -1*B >= 25 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 25 + -1*B >= 25 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 25 + -1*B >= 25 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 25 + -1*B >= 24 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 24 + -1*B >= 24 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 24 + -1*B >= 24 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 24 + -1*B >= 24 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 24 + -1*B >= 24 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 24 + -1*B >= 24 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 24 + -1*B >= 24 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 24 + -1*B >= 24 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 24 + -1*B >= 24 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 24 + -1*B >= 24 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 24 + -1*B >= 24 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 24 + -1*B >= 24 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 24 + -1*B >= 24 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 24 + -1*B >= 24 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 24 + -1*B >= 24 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 24 + -1*B >= 24 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 24 + -1*B >= 24 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 24 + -1*B >= 24 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 24 + -1*B >= 24 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 24 + -1*B >= 24 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 24 + -1*B >= 24 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 24 + -1*B >= 24 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 24 + -1*B >= 24 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 24 + -1*B >= 24 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 24 + -1*B >= 24 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 24 + -1*B >= 24 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 24 + -1*B >= 24 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 24 + -1*B >= 24 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 24 + -1*B >= 24 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 24 + -1*B >= 24 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 24 + -1*B >= 24 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 24 + -1*B >= 24 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 24 + -1*B >= 24 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 24 + -1*B >= 24 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 24 + -1*B >= 24 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 25 >= 25 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 25 >= 25 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 25 + -1*B >= 25 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 24 + -1*B >= 24 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 24 + -1*B >= -35 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 24 + -1*B >= -34 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 24 + -1*B >= -33 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 24 + -1*B >= -32 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 24 + -1*B >= -31 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 24 + -1*B >= -30 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 24 + -1*B >= -29 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 24 + -1*B >= -28 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 24 + -1*B >= -27 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 24 + -1*B >= -26 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 24 + -1*B >= -25 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 24 + -1*B >= -24 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 24 + -1*B >= -23 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 24 + -1*B >= -22 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 24 + -1*B >= -21 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 24 + -1*B >= -20 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 24 + -1*B >= -19 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 24 + -1*B >= -18 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 24 + -1*B >= -17 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 24 + -1*B >= -16 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 24 + -1*B >= -15 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 24 + -1*B >= -14 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 24 + -1*B >= -13 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 24 + -1*B >= -12 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 24 + -1*B >= -11 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 24 + -1*B >= -10 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 24 + -1*B >= -9 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 24 + -1*B >= -8 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 24 + -1*B >= -7 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 24 + -1*B >= -6 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 24 + -1*B >= -5 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 24 + -1*B >= -4 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 24 + -1*B >= -3 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 24 + -1*B >= -2 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 24 + -1*B >= -1 = f61(A,26,C) [B >= 50] ==> f61(A,B,C) = 25 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 25 >= 25 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 25 >= 25 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 25 >= 25 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 25 >= 25 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 25 >= 25 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 25 >= 25 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 25 >= 25 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 25 >= 25 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 25 >= 25 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 25 >= 25 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 25 >= 25 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 25 >= 25 = f61(A,0,C) * Step 39: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (?,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 26*x13 p(f101) = -1*x2 + 26*x13 p(f103) = -1*x2 + 26*x13 p(f105) = -1*x2 + 26*x13 p(f107) = -1*x2 + 26*x13 p(f109) = -1*x2 + 26*x13 p(f11) = 26*x13 p(f111) = -1*x2 + 26*x13 p(f113) = -1*x2 + 26*x13 p(f115) = -1*x2 + 26*x13 p(f117) = -1*x2 + 26*x13 p(f119) = -1*x2 + 26*x13 p(f121) = -1*x2 + 26*x13 p(f123) = -1*x2 + 26*x13 p(f125) = -1*x2 + 26*x13 p(f127) = -1*x2 + 26*x13 p(f129) = -1*x2 + 26*x13 p(f13) = 26*x13 p(f131) = -1*x2 + 26*x13 p(f133) = -1*x2 + 26*x13 p(f135) = -1*x2 + 26*x13 p(f137) = -1*x2 + 26*x13 p(f139) = -1*x2 + 26*x13 p(f141) = -1*x2 + 26*x13 p(f143) = -1*x2 + 26*x13 p(f145) = -1*x2 + 26*x13 p(f147) = -1*x2 + 25*x13 p(f149) = -1*x2 + 25*x13 p(f15) = 26*x13 p(f151) = -1*x2 + 25*x13 p(f153) = -1*x2 + 25*x13 p(f155) = -1*x2 + 25*x13 p(f157) = -1*x2 + 25*x13 p(f159) = -1*x2 + 25*x13 p(f161) = -1*x2 + 25*x13 p(f163) = -1*x2 + 25*x13 p(f165) = -1*x2 + 25*x13 p(f167) = -1*x2 + 25*x13 p(f169) = -1*x2 + 25*x13 p(f17) = 26*x13 p(f171) = -1*x2 + 25*x13 p(f173) = -1*x2 + 25*x13 p(f175) = -1*x2 + 25*x13 p(f177) = -1*x2 + 25*x13 p(f179) = -1*x2 + 25*x13 p(f181) = -1*x2 + 25*x13 p(f19) = 26*x13 p(f21) = 26*x13 p(f23) = 26*x13 p(f25) = 26*x13 p(f27) = 26*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 26*x13 p(f65) = -1*x2 + 26*x13 p(f67) = -1*x2 + 26*x13 p(f69) = -1*x2 + 26*x13 p(f7) = 26*x13 p(f71) = -1*x2 + 26*x13 p(f73) = -1*x2 + 26*x13 p(f75) = -1*x2 + 26*x13 p(f77) = -1*x2 + 26*x13 p(f79) = -1*x2 + 26*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 26*x13 p(f83) = -1*x2 + 26*x13 p(f85) = -1*x2 + 26*x13 p(f87) = -1*x2 + 26*x13 p(f89) = -1*x2 + 26*x13 p(f91) = -1*x2 + 26*x13 p(f93) = -1*x2 + 26*x13 p(f95) = -1*x2 + 26*x13 p(f97) = -1*x2 + 26*x13 p(f99) = -1*x2 + 26*x13 Following rules are strictly oriented: [B = 25] ==> f113(A,B,C) = 26 + -1*B > 0 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 26 + -1*B > 1 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 26 + -1*B > 2 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 26 + -1*B > 3 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 26 + -1*B > 4 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 26 + -1*B > 5 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 26 + -1*B > 6 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 26 + -1*B > 7 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 26 + -1*B > 8 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 26 + -1*B > 9 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 26 + -1*B > 10 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 26 + -1*B > 11 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 26 + -1*B > 12 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 26 + -1*B > 13 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 26 + -1*B > 14 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 26 + -1*B > 15 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 26 + -1*B > 16 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 26 + -1*B > 17 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 26 + -1*B > 18 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 26 + -1*B > 19 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 26 + -1*B > 20 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 26 + -1*B > 21 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 26 + -1*B > 22 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 26 + -1*B > 23 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 26 + -1*B > 24 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 26 + -1*B > 25 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 26 >= 26 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 26 >= 26 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 26 >= 26 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 26 >= 26 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 26 >= 26 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 26 >= 26 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 26 >= 26 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 26 >= 26 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 26 + -1*B >= 26 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 26 + -1*B >= 26 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 26 + -1*B >= 26 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 26 + -1*B >= 26 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 26 + -1*B >= 26 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 26 + -1*B >= 26 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 26 + -1*B >= 26 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 26 + -1*B >= 26 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 26 + -1*B >= 26 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 26 + -1*B >= 26 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 26 + -1*B >= 26 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 26 + -1*B >= 26 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 26 + -1*B >= 26 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 26 + -1*B >= 26 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 26 + -1*B >= 26 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 26 + -1*B >= 26 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 26 + -1*B >= 26 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 26 + -1*B >= 26 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 26 + -1*B >= 26 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 26 + -1*B >= 26 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 26 + -1*B >= 26 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 26 + -1*B >= 26 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 26 + -1*B >= 26 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 26 + -1*B >= 26 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 26 + -1*B >= 26 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 26 + -1*B >= 26 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 26 + -1*B >= 26 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 26 + -1*B >= 26 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 26 + -1*B >= 26 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 26 + -1*B >= 26 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 26 + -1*B >= 26 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 26 + -1*B >= 26 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 26 + -1*B >= 26 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 26 + -1*B >= 26 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 26 + -1*B >= 26 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 26 + -1*B >= 26 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 26 + -1*B >= 26 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 26 + -1*B >= 26 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 26 + -1*B >= 26 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 26 + -1*B >= 26 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 26 + -1*B >= 25 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 25 + -1*B >= 25 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 25 + -1*B >= 25 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 25 + -1*B >= 25 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 25 + -1*B >= 25 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 25 + -1*B >= 25 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 25 + -1*B >= 25 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 25 + -1*B >= 25 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 25 + -1*B >= 25 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 25 + -1*B >= 25 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 25 + -1*B >= 25 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 25 + -1*B >= 25 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 25 + -1*B >= 25 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 25 + -1*B >= 25 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 25 + -1*B >= 25 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 25 + -1*B >= 25 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 25 + -1*B >= 25 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 25 + -1*B >= 25 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 26 >= 26 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 26 >= 26 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 26 + -1*B >= 26 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 25 + -1*B >= 25 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 25 + -1*B >= -34 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 25 + -1*B >= -33 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 25 + -1*B >= -32 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 25 + -1*B >= -31 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 25 + -1*B >= -30 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 25 + -1*B >= -29 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 25 + -1*B >= -28 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 25 + -1*B >= -27 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 25 + -1*B >= -26 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 25 + -1*B >= -25 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 25 + -1*B >= -24 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 25 + -1*B >= -23 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 25 + -1*B >= -22 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 25 + -1*B >= -21 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 25 + -1*B >= -20 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 25 + -1*B >= -19 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 25 + -1*B >= -18 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 25 + -1*B >= -17 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 26 + -1*B >= -16 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 26 + -1*B >= -15 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 26 + -1*B >= -14 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 26 + -1*B >= -13 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 26 + -1*B >= -12 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 26 + -1*B >= -11 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 26 + -1*B >= -10 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 26 + -1*B >= -9 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 26 + -1*B >= -8 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 26 + -1*B >= -7 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 26 + -1*B >= -6 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 26 + -1*B >= -5 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 26 + -1*B >= -4 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 26 + -1*B >= -3 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 26 + -1*B >= -2 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 26 + -1*B >= -1 = f61(A,27,C) [B >= 50] ==> f61(A,B,C) = 26 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 26 >= 26 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 26 >= 26 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 26 >= 26 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 26 >= 26 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 26 >= 26 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 26 >= 26 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 26 >= 26 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 26 >= 26 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 26 >= 26 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 26 >= 26 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 26 >= 26 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 26 >= 26 = f61(A,0,C) * Step 40: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (?,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 50*x13 p(f101) = -1*x2 + 50*x13 p(f103) = -1*x2 + 50*x13 p(f105) = -1*x2 + 50*x13 p(f107) = -1*x2 + 50*x13 p(f109) = -1*x2 + 50*x13 p(f11) = 50*x13 p(f111) = -1*x2 + 50*x13 p(f113) = -1*x2 + 50*x13 p(f115) = -1*x2 + 50*x13 p(f117) = -1*x2 + 50*x13 p(f119) = -1*x2 + 50*x13 p(f121) = -1*x2 + 50*x13 p(f123) = -1*x2 + 50*x13 p(f125) = -1*x2 + 50*x13 p(f127) = -1*x2 + 50*x13 p(f129) = -1*x2 + 50*x13 p(f13) = 50*x13 p(f131) = -1*x2 + 50*x13 p(f133) = -1*x2 + 50*x13 p(f135) = -1*x2 + 50*x13 p(f137) = -1*x2 + 50*x13 p(f139) = -1*x2 + 50*x13 p(f141) = -1*x2 + 50*x13 p(f143) = -1*x2 + 50*x13 p(f145) = -1*x2 + 50*x13 p(f147) = -1*x2 + 50*x13 p(f149) = -1*x2 + 50*x13 p(f15) = 50*x13 p(f151) = -1*x2 + 50*x13 p(f153) = -1*x2 + 50*x13 p(f155) = -1*x2 + 50*x13 p(f157) = -1*x2 + 50*x13 p(f159) = -1*x2 + 50*x13 p(f161) = -1*x2 + 50*x13 p(f163) = -1*x2 + 49*x13 p(f165) = -1*x2 + 49*x13 p(f167) = -1*x2 + 49*x13 p(f169) = -1*x2 + 49*x13 p(f17) = 50*x13 p(f171) = -1*x2 + 49*x13 p(f173) = -1*x2 + 49*x13 p(f175) = -1*x2 + 49*x13 p(f177) = -1*x2 + 49*x13 p(f179) = -1*x2 + 49*x13 p(f181) = -1*x2 + 49*x13 p(f19) = 50*x13 p(f21) = 50*x13 p(f23) = 50*x13 p(f25) = 50*x13 p(f27) = 50*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 50*x13 p(f65) = -1*x2 + 50*x13 p(f67) = -1*x2 + 50*x13 p(f69) = -1*x2 + 50*x13 p(f7) = 50*x13 p(f71) = -1*x2 + 50*x13 p(f73) = -1*x2 + 50*x13 p(f75) = -1*x2 + 50*x13 p(f77) = -1*x2 + 50*x13 p(f79) = -1*x2 + 50*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 50*x13 p(f83) = -1*x2 + 50*x13 p(f85) = -1*x2 + 50*x13 p(f87) = -1*x2 + 50*x13 p(f89) = -1*x2 + 50*x13 p(f91) = -1*x2 + 50*x13 p(f93) = -1*x2 + 50*x13 p(f95) = -1*x2 + 50*x13 p(f97) = -1*x2 + 50*x13 p(f99) = -1*x2 + 50*x13 Following rules are strictly oriented: [B = 49] ==> f161(A,B,C) = 50 + -1*B > 0 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 50 + -1*B > 5 = f61(A,45,C) [B = 26] ==> f115(A,B,C) = 50 + -1*B > 23 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 50 + -1*B > 24 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 50 + -1*B > 25 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 50 + -1*B > 26 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 50 + -1*B > 27 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 50 + -1*B > 28 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 50 + -1*B > 29 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 50 + -1*B > 30 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 50 + -1*B > 31 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 50 + -1*B > 32 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 50 + -1*B > 33 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 50 + -1*B > 34 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 50 + -1*B > 35 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 50 + -1*B > 36 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 50 + -1*B > 37 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 50 + -1*B > 38 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 50 + -1*B > 39 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 50 + -1*B > 40 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 50 + -1*B > 41 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 50 + -1*B > 42 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 50 + -1*B > 43 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 50 + -1*B > 44 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 50 + -1*B > 45 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 50 + -1*B > 46 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 50 + -1*B > 47 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 50 + -1*B > 48 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 50 + -1*B > 49 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 50 >= 50 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 50 >= 50 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 50 >= 50 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 50 >= 50 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 50 >= 50 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 50 >= 50 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 50 >= 50 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 50 >= 50 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 50 + -1*B >= 50 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 50 + -1*B >= 50 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 50 + -1*B >= 50 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 50 + -1*B >= 50 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 50 + -1*B >= 50 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 50 + -1*B >= 50 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 50 + -1*B >= 50 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 50 + -1*B >= 50 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 50 + -1*B >= 50 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 50 + -1*B >= 50 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 50 + -1*B >= 50 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 50 + -1*B >= 50 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 50 + -1*B >= 50 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 50 + -1*B >= 50 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 50 + -1*B >= 50 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 50 + -1*B >= 50 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 50 + -1*B >= 50 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 50 + -1*B >= 50 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 50 + -1*B >= 50 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 50 + -1*B >= 50 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 50 + -1*B >= 50 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 50 + -1*B >= 50 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 50 + -1*B >= 50 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 50 + -1*B >= 50 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 50 + -1*B >= 50 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 50 + -1*B >= 50 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 50 + -1*B >= 50 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 50 + -1*B >= 50 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 50 + -1*B >= 50 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 50 + -1*B >= 50 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 50 + -1*B >= 50 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 50 + -1*B >= 50 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 50 + -1*B >= 50 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 50 + -1*B >= 50 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 50 + -1*B >= 50 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 50 + -1*B >= 50 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 50 + -1*B >= 50 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 50 + -1*B >= 50 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 50 + -1*B >= 50 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 50 + -1*B >= 50 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 50 + -1*B >= 50 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 50 + -1*B >= 50 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 50 + -1*B >= 50 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 50 + -1*B >= 50 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 50 + -1*B >= 50 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 50 + -1*B >= 50 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 50 + -1*B >= 50 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 50 + -1*B >= 50 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 50 + -1*B >= 49 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 49 + -1*B >= 49 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 49 + -1*B >= 49 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 49 + -1*B >= 49 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 49 + -1*B >= 49 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 49 + -1*B >= 49 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 49 + -1*B >= 49 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 49 + -1*B >= 49 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 49 + -1*B >= 49 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 49 + -1*B >= 49 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 50 >= 50 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 50 >= 50 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 50 + -1*B >= 50 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 49 + -1*B >= 49 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 49 + -1*B >= -10 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 49 + -1*B >= -9 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 49 + -1*B >= -8 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 49 + -1*B >= -7 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 49 + -1*B >= -6 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 49 + -1*B >= -5 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 49 + -1*B >= -4 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 49 + -1*B >= -3 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 49 + -1*B >= -2 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 49 + -1*B >= -1 = f61(A,51,C) [B = 48] ==> f159(A,B,C) = 50 + -1*B >= 1 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 50 + -1*B >= 2 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 50 + -1*B >= 3 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 50 + -1*B >= 4 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 50 + -1*B >= 6 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 50 + -1*B >= 7 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 50 + -1*B >= 8 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 50 + -1*B >= 9 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 50 + -1*B >= 10 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 50 + -1*B >= 11 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 50 + -1*B >= 12 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 50 + -1*B >= 13 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 50 + -1*B >= 14 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 50 + -1*B >= 15 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 50 + -1*B >= 16 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 50 + -1*B >= 17 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 50 + -1*B >= 18 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 50 + -1*B >= 19 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 50 + -1*B >= 20 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 50 + -1*B >= 21 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 50 + -1*B >= 22 = f61(A,28,C) [B >= 50] ==> f61(A,B,C) = 50 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 50 >= 50 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 50 >= 50 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 50 >= 50 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 50 >= 50 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 50 >= 50 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 50 >= 50 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 50 >= 50 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 50 >= 50 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 50 >= 50 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 50 >= 50 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 50 >= 50 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 50 >= 50 = f61(A,0,C) * Step 41: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (?,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 28*x13 p(f101) = -1*x2 + 28*x13 p(f103) = -1*x2 + 28*x13 p(f105) = -1*x2 + 28*x13 p(f107) = -1*x2 + 28*x13 p(f109) = -1*x2 + 28*x13 p(f11) = 28*x13 p(f111) = -1*x2 + 28*x13 p(f113) = -1*x2 + 28*x13 p(f115) = -1*x2 + 28*x13 p(f117) = -1*x2 + 28*x13 p(f119) = -1*x2 + 28*x13 p(f121) = -1*x2 + 28*x13 p(f123) = -1*x2 + 27*x13 p(f125) = -1*x2 + 27*x13 p(f127) = -1*x2 + 27*x13 p(f129) = -1*x2 + 27*x13 p(f13) = 28*x13 p(f131) = -1*x2 + 27*x13 p(f133) = -1*x2 + 27*x13 p(f135) = -1*x2 + 27*x13 p(f137) = -1*x2 + 27*x13 p(f139) = -1*x2 + 27*x13 p(f141) = -1*x2 + 27*x13 p(f143) = -1*x2 + 27*x13 p(f145) = -1*x2 + 27*x13 p(f147) = -1*x2 + 27*x13 p(f149) = -1*x2 + 27*x13 p(f15) = 28*x13 p(f151) = -1*x2 + 27*x13 p(f153) = -1*x2 + 27*x13 p(f155) = -1*x2 + 27*x13 p(f157) = -1*x2 + 27*x13 p(f159) = -1*x2 + 27*x13 p(f161) = -1*x2 + 27*x13 p(f163) = -1*x2 + 27*x13 p(f165) = -1*x2 + 27*x13 p(f167) = -1*x2 + 27*x13 p(f169) = -1*x2 + 27*x13 p(f17) = 28*x13 p(f171) = -1*x2 + 27*x13 p(f173) = -1*x2 + 27*x13 p(f175) = -1*x2 + 27*x13 p(f177) = -1*x2 + 27*x13 p(f179) = -1*x2 + 27*x13 p(f181) = -1*x2 + 27*x13 p(f19) = 28*x13 p(f21) = 28*x13 p(f23) = 28*x13 p(f25) = 28*x13 p(f27) = 28*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 28*x13 p(f65) = -1*x2 + 28*x13 p(f67) = -1*x2 + 28*x13 p(f69) = -1*x2 + 28*x13 p(f7) = 28*x13 p(f71) = -1*x2 + 28*x13 p(f73) = -1*x2 + 28*x13 p(f75) = -1*x2 + 28*x13 p(f77) = -1*x2 + 28*x13 p(f79) = -1*x2 + 28*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 28*x13 p(f83) = -1*x2 + 28*x13 p(f85) = -1*x2 + 28*x13 p(f87) = -1*x2 + 28*x13 p(f89) = -1*x2 + 28*x13 p(f91) = -1*x2 + 28*x13 p(f93) = -1*x2 + 28*x13 p(f95) = -1*x2 + 28*x13 p(f97) = -1*x2 + 28*x13 p(f99) = -1*x2 + 28*x13 Following rules are strictly oriented: [B = 27] ==> f117(A,B,C) = 28 + -1*B > 0 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 28 + -1*B > 1 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 28 + -1*B > 2 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 28 + -1*B > 3 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 28 + -1*B > 4 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 28 + -1*B > 5 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 28 + -1*B > 6 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 28 + -1*B > 7 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 28 + -1*B > 8 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 28 + -1*B > 9 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 28 + -1*B > 10 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 28 + -1*B > 11 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 28 + -1*B > 12 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 28 + -1*B > 13 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 28 + -1*B > 14 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 28 + -1*B > 15 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 28 + -1*B > 16 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 28 + -1*B > 17 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 28 + -1*B > 18 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 28 + -1*B > 19 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 28 + -1*B > 20 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 28 + -1*B > 21 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 28 + -1*B > 22 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 28 + -1*B > 23 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 28 + -1*B > 24 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 28 + -1*B > 25 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 28 + -1*B > 26 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 28 + -1*B > 27 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 28 >= 28 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 28 >= 28 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 28 >= 28 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 28 >= 28 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 28 >= 28 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 28 >= 28 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 28 >= 28 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 28 >= 28 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 28 + -1*B >= 28 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 28 + -1*B >= 28 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 28 + -1*B >= 28 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 28 + -1*B >= 28 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 28 + -1*B >= 28 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 28 + -1*B >= 28 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 28 + -1*B >= 28 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 28 + -1*B >= 28 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 28 + -1*B >= 28 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 28 + -1*B >= 28 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 28 + -1*B >= 28 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 28 + -1*B >= 28 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 28 + -1*B >= 28 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 28 + -1*B >= 28 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 28 + -1*B >= 28 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 28 + -1*B >= 28 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 28 + -1*B >= 28 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 28 + -1*B >= 28 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 28 + -1*B >= 28 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 28 + -1*B >= 28 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 28 + -1*B >= 28 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 28 + -1*B >= 28 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 28 + -1*B >= 28 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 28 + -1*B >= 28 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 28 + -1*B >= 28 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 28 + -1*B >= 28 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 28 + -1*B >= 28 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 28 + -1*B >= 28 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 28 + -1*B >= 27 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 27 + -1*B >= 27 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 27 + -1*B >= 27 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 27 + -1*B >= 27 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 27 + -1*B >= 27 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 27 + -1*B >= 27 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 27 + -1*B >= 27 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 27 + -1*B >= 27 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 27 + -1*B >= 27 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 27 + -1*B >= 27 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 27 + -1*B >= 27 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 27 + -1*B >= 27 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 27 + -1*B >= 27 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 27 + -1*B >= 27 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 27 + -1*B >= 27 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 27 + -1*B >= 27 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 27 + -1*B >= 27 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 27 + -1*B >= 27 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 27 + -1*B >= 27 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 27 + -1*B >= 27 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 27 + -1*B >= 27 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 27 + -1*B >= 27 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 27 + -1*B >= 27 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 27 + -1*B >= 27 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 27 + -1*B >= 27 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 27 + -1*B >= 27 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 27 + -1*B >= 27 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 27 + -1*B >= 27 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 27 + -1*B >= 27 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 27 + -1*B >= 27 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 28 >= 28 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 28 >= 28 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 28 + -1*B >= 28 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 27 + -1*B >= 27 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 27 + -1*B >= -32 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 27 + -1*B >= -31 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 27 + -1*B >= -30 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 27 + -1*B >= -29 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 27 + -1*B >= -28 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 27 + -1*B >= -27 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 27 + -1*B >= -26 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 27 + -1*B >= -25 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 27 + -1*B >= -24 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 27 + -1*B >= -23 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 27 + -1*B >= -22 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 27 + -1*B >= -21 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 27 + -1*B >= -20 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 27 + -1*B >= -19 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 27 + -1*B >= -18 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 27 + -1*B >= -17 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 27 + -1*B >= -16 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 27 + -1*B >= -15 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 27 + -1*B >= -14 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 27 + -1*B >= -13 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 27 + -1*B >= -12 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 27 + -1*B >= -11 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 27 + -1*B >= -10 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 27 + -1*B >= -9 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 27 + -1*B >= -8 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 27 + -1*B >= -7 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 27 + -1*B >= -6 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 27 + -1*B >= -5 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 27 + -1*B >= -4 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 27 + -1*B >= -3 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 28 + -1*B >= -2 = f61(A,30,C) [B = 28] ==> f119(A,B,C) = 28 + -1*B >= -1 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 28 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 28 >= 28 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 28 >= 28 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 28 >= 28 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 28 >= 28 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 28 >= 28 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 28 >= 28 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 28 >= 28 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 28 >= 28 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 28 >= 28 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 28 >= 28 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 28 >= 28 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 28 >= 28 = f61(A,0,C) * Step 42: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (?,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 53*x13 p(f101) = -1*x2 + 52*x13 p(f103) = -1*x2 + 52*x13 p(f105) = -1*x2 + 52*x13 p(f107) = -1*x2 + 52*x13 p(f109) = -1*x2 + 52*x13 p(f11) = 52*x13 p(f111) = -1*x2 + 52*x13 p(f113) = -1*x2 + 52*x13 p(f115) = -1*x2 + 52*x13 p(f117) = -1*x2 + 52*x13 p(f119) = -1*x2 + 52*x13 p(f121) = -1*x2 + 52*x13 p(f123) = -1*x2 + 52*x13 p(f125) = -1*x2 + 52*x13 p(f127) = -1*x2 + 52*x13 p(f129) = -1*x2 + 52*x13 p(f13) = 52*x13 p(f131) = -1*x2 + 52*x13 p(f133) = -1*x2 + 52*x13 p(f135) = -1*x2 + 52*x13 p(f137) = -1*x2 + 52*x13 p(f139) = -1*x2 + 52*x13 p(f141) = -1*x2 + 52*x13 p(f143) = -1*x2 + 52*x13 p(f145) = -1*x2 + 52*x13 p(f147) = -1*x2 + 52*x13 p(f149) = -1*x2 + 52*x13 p(f15) = 52*x13 p(f151) = -1*x2 + 52*x13 p(f153) = -1*x2 + 52*x13 p(f155) = -1*x2 + 52*x13 p(f157) = -1*x2 + 52*x13 p(f159) = -1*x2 + 52*x13 p(f161) = -1*x2 + 52*x13 p(f163) = -1*x2 + 52*x13 p(f165) = -1*x2 + 52*x13 p(f167) = -1*x2 + 52*x13 p(f169) = -1*x2 + 51*x13 p(f17) = 52*x13 p(f171) = -1*x2 + 51*x13 p(f173) = -1*x2 + 51*x13 p(f175) = -1*x2 + 51*x13 p(f177) = -1*x2 + 51*x13 p(f179) = -1*x2 + 51*x13 p(f181) = -1*x2 + 51*x13 p(f19) = 52*x13 p(f21) = 52*x13 p(f23) = 52*x13 p(f25) = 52*x13 p(f27) = 52*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 52*x13 p(f65) = -1*x2 + 52*x13 p(f67) = -1*x2 + 52*x13 p(f69) = -1*x2 + 52*x13 p(f7) = 52*x13 p(f71) = -1*x2 + 52*x13 p(f73) = -1*x2 + 52*x13 p(f75) = -1*x2 + 52*x13 p(f77) = -1*x2 + 52*x13 p(f79) = -1*x2 + 52*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 52*x13 p(f83) = -1*x2 + 52*x13 p(f85) = -1*x2 + 52*x13 p(f87) = -1*x2 + 52*x13 p(f89) = -1*x2 + 52*x13 p(f91) = -1*x2 + 52*x13 p(f93) = -1*x2 + 52*x13 p(f95) = -1*x2 + 52*x13 p(f97) = -1*x2 + 52*x13 p(f99) = -1*x2 + 52*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 53 > 52 = f7(0,B,C) [B = 51] ==> f165(A,B,C) = 52 + -1*B > 0 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 52 + -1*B > 1 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 52 + -1*B > 2 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 52 + -1*B > 7 = f61(A,45,C) [B = 28] ==> f119(A,B,C) = 52 + -1*B > 23 = f61(A,29,C) [B = 27] ==> f117(A,B,C) = 52 + -1*B > 24 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 52 + -1*B > 25 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 52 + -1*B > 26 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 52 + -1*B > 27 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 52 + -1*B > 28 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 52 + -1*B > 29 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 52 + -1*B > 30 = f61(A,22,C) [B = 19] ==> f101(A,B,C) = 52 + -1*B > 32 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 52 + -1*B > 33 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 52 + -1*B > 34 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 52 + -1*B > 35 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 52 + -1*B > 36 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 52 + -1*B > 37 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 52 + -1*B > 38 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 52 + -1*B > 39 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 52 + -1*B > 40 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 52 + -1*B > 41 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 52 + -1*B > 42 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 52 + -1*B > 43 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 52 + -1*B > 44 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 52 + -1*B > 45 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 52 + -1*B > 46 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 52 + -1*B > 47 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 52 + -1*B > 48 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 52 + -1*B > 49 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 52 + -1*B > 50 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 52 + -1*B > 51 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 52 >= 52 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 52 >= 52 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 52 >= 52 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 52 >= 52 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 52 >= 52 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 52 >= 52 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 52 >= 52 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 52 >= 52 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 52 + -1*B >= 52 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 52 + -1*B >= 52 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 52 + -1*B >= 52 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 52 + -1*B >= 52 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 52 + -1*B >= 52 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 52 + -1*B >= 52 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 52 + -1*B >= 52 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 52 + -1*B >= 52 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 52 + -1*B >= 52 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 52 + -1*B >= 52 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 52 + -1*B >= 52 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 52 + -1*B >= 52 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 52 + -1*B >= 52 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 52 + -1*B >= 52 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 52 + -1*B >= 52 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 52 + -1*B >= 52 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 52 + -1*B >= 52 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 52 + -1*B >= 52 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 52 + -1*B >= 52 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 52 + -1*B >= 52 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 52 + -1*B >= 52 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 52 + -1*B >= 52 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 52 + -1*B >= 52 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 52 + -1*B >= 52 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 52 + -1*B >= 52 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 52 + -1*B >= 52 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 52 + -1*B >= 52 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 52 + -1*B >= 52 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 52 + -1*B >= 52 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 52 + -1*B >= 52 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 52 + -1*B >= 52 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 52 + -1*B >= 52 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 52 + -1*B >= 52 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 52 + -1*B >= 52 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 52 + -1*B >= 52 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 52 + -1*B >= 52 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 52 + -1*B >= 52 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 52 + -1*B >= 52 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 52 + -1*B >= 52 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 52 + -1*B >= 52 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 52 + -1*B >= 52 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 52 + -1*B >= 52 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 52 + -1*B >= 52 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 52 + -1*B >= 52 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 52 + -1*B >= 52 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 52 + -1*B >= 52 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 52 + -1*B >= 52 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 52 + -1*B >= 52 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 52 + -1*B >= 52 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 52 + -1*B >= 52 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 52 + -1*B >= 52 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 52 + -1*B >= 51 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 51 + -1*B >= 51 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 51 + -1*B >= 51 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 51 + -1*B >= 51 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 51 + -1*B >= 51 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 51 + -1*B >= 51 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 51 + -1*B >= 51 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 52 >= 52 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 52 + -1*B >= 52 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 51 + -1*B >= 51 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 51 + -1*B >= -8 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 51 + -1*B >= -7 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 51 + -1*B >= -6 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 51 + -1*B >= -5 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 51 + -1*B >= -4 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 51 + -1*B >= -3 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 51 + -1*B >= -2 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 52 + -1*B >= -1 = f61(A,53,C) [B = 48] ==> f159(A,B,C) = 52 + -1*B >= 3 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 52 + -1*B >= 4 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 52 + -1*B >= 5 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 52 + -1*B >= 6 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 52 + -1*B >= 8 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 52 + -1*B >= 9 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 52 + -1*B >= 10 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 52 + -1*B >= 11 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 52 + -1*B >= 12 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 52 + -1*B >= 13 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 52 + -1*B >= 14 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 52 + -1*B >= 15 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 52 + -1*B >= 16 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 52 + -1*B >= 17 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 52 + -1*B >= 18 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 52 + -1*B >= 19 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 52 + -1*B >= 20 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 52 + -1*B >= 21 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 52 + -1*B >= 22 = f61(A,30,C) [B = 20] ==> f103(A,B,C) = 52 + -1*B >= 31 = f61(A,21,C) [B >= 50] ==> f61(A,B,C) = 52 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 52 >= 52 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 52 >= 52 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 52 >= 52 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 52 >= 52 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 52 >= 52 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 52 >= 52 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 52 >= 52 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 52 >= 52 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 52 >= 52 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 52 >= 52 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 52 >= 52 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 52 >= 52 = f61(A,0,C) * Step 43: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (?,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 52*x13 p(f101) = -1*x2 + 51*x13 p(f103) = -1*x2 + 51*x13 p(f105) = -1*x2 + 51*x13 p(f107) = -1*x2 + 51*x13 p(f109) = -1*x2 + 51*x13 p(f11) = 51*x13 p(f111) = -1*x2 + 51*x13 p(f113) = -1*x2 + 51*x13 p(f115) = -1*x2 + 51*x13 p(f117) = -1*x2 + 51*x13 p(f119) = -1*x2 + 51*x13 p(f121) = -1*x2 + 51*x13 p(f123) = -1*x2 + 51*x13 p(f125) = -1*x2 + 51*x13 p(f127) = -1*x2 + 51*x13 p(f129) = -1*x2 + 51*x13 p(f13) = 51*x13 p(f131) = -1*x2 + 51*x13 p(f133) = -1*x2 + 51*x13 p(f135) = -1*x2 + 51*x13 p(f137) = -1*x2 + 51*x13 p(f139) = -1*x2 + 51*x13 p(f141) = -1*x2 + 51*x13 p(f143) = -1*x2 + 51*x13 p(f145) = -1*x2 + 51*x13 p(f147) = -1*x2 + 51*x13 p(f149) = -1*x2 + 51*x13 p(f15) = 51*x13 p(f151) = -1*x2 + 51*x13 p(f153) = -1*x2 + 51*x13 p(f155) = -1*x2 + 51*x13 p(f157) = -1*x2 + 51*x13 p(f159) = -1*x2 + 51*x13 p(f161) = -1*x2 + 51*x13 p(f163) = -1*x2 + 51*x13 p(f165) = -1*x2 + 51*x13 p(f167) = -1*x2 + 50*x13 p(f169) = -1*x2 + 50*x13 p(f17) = 51*x13 p(f171) = -1*x2 + 50*x13 p(f173) = -1*x2 + 50*x13 p(f175) = -1*x2 + 50*x13 p(f177) = -1*x2 + 50*x13 p(f179) = -1*x2 + 50*x13 p(f181) = -1*x2 + 50*x13 p(f19) = 51*x13 p(f21) = 51*x13 p(f23) = 51*x13 p(f25) = 51*x13 p(f27) = 51*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 51*x13 p(f65) = -1*x2 + 51*x13 p(f67) = -1*x2 + 51*x13 p(f69) = -1*x2 + 51*x13 p(f7) = 51*x13 p(f71) = -1*x2 + 51*x13 p(f73) = -1*x2 + 51*x13 p(f75) = -1*x2 + 51*x13 p(f77) = -1*x2 + 51*x13 p(f79) = -1*x2 + 51*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 51*x13 p(f83) = -1*x2 + 51*x13 p(f85) = -1*x2 + 51*x13 p(f87) = -1*x2 + 51*x13 p(f89) = -1*x2 + 51*x13 p(f91) = -1*x2 + 51*x13 p(f93) = -1*x2 + 51*x13 p(f95) = -1*x2 + 51*x13 p(f97) = -1*x2 + 51*x13 p(f99) = -1*x2 + 51*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 52 > 51 = f7(0,B,C) [B = 50] ==> f163(A,B,C) = 51 + -1*B > 0 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 51 + -1*B > 1 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 51 + -1*B > 6 = f61(A,45,C) [B = 29] ==> f121(A,B,C) = 51 + -1*B > 21 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 51 + -1*B > 23 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 51 + -1*B > 24 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 51 + -1*B > 25 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 51 + -1*B > 26 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 51 + -1*B > 27 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 51 + -1*B > 28 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 51 + -1*B > 29 = f61(A,22,C) [B = 19] ==> f101(A,B,C) = 51 + -1*B > 31 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 51 + -1*B > 32 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 51 + -1*B > 33 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 51 + -1*B > 34 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 51 + -1*B > 35 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 51 + -1*B > 36 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 51 + -1*B > 37 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 51 + -1*B > 38 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 51 + -1*B > 39 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 51 + -1*B > 40 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 51 + -1*B > 41 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 51 + -1*B > 42 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 51 + -1*B > 43 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 51 + -1*B > 44 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 51 + -1*B > 45 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 51 + -1*B > 46 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 51 + -1*B > 47 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 51 + -1*B > 48 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 51 + -1*B > 49 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 51 + -1*B > 50 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 51 >= 51 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 51 >= 51 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 51 >= 51 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 51 >= 51 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 51 >= 51 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 51 >= 51 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 51 >= 51 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 51 >= 51 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 51 + -1*B >= 51 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 51 + -1*B >= 51 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 51 + -1*B >= 51 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 51 + -1*B >= 51 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 51 + -1*B >= 51 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 51 + -1*B >= 51 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 51 + -1*B >= 51 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 51 + -1*B >= 51 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 51 + -1*B >= 51 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 51 + -1*B >= 51 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 51 + -1*B >= 51 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 51 + -1*B >= 51 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 51 + -1*B >= 51 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 51 + -1*B >= 51 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 51 + -1*B >= 51 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 51 + -1*B >= 51 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 51 + -1*B >= 51 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 51 + -1*B >= 51 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 51 + -1*B >= 51 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 51 + -1*B >= 51 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 51 + -1*B >= 51 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 51 + -1*B >= 51 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 51 + -1*B >= 51 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 51 + -1*B >= 51 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 51 + -1*B >= 51 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 51 + -1*B >= 51 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 51 + -1*B >= 51 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 51 + -1*B >= 51 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 51 + -1*B >= 51 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 51 + -1*B >= 51 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 51 + -1*B >= 51 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 51 + -1*B >= 51 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 51 + -1*B >= 51 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 51 + -1*B >= 51 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 51 + -1*B >= 51 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 51 + -1*B >= 51 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 51 + -1*B >= 51 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 51 + -1*B >= 51 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 51 + -1*B >= 51 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 51 + -1*B >= 51 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 51 + -1*B >= 51 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 51 + -1*B >= 51 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 51 + -1*B >= 51 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 51 + -1*B >= 51 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 51 + -1*B >= 51 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 51 + -1*B >= 51 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 51 + -1*B >= 51 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 51 + -1*B >= 51 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 51 + -1*B >= 51 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 51 + -1*B >= 51 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 51 + -1*B >= 50 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 50 + -1*B >= 50 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 50 + -1*B >= 50 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 50 + -1*B >= 50 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 50 + -1*B >= 50 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 50 + -1*B >= 50 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 50 + -1*B >= 50 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 50 + -1*B >= 50 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 51 >= 51 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 51 + -1*B >= 51 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 50 + -1*B >= 50 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 50 + -1*B >= -9 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 50 + -1*B >= -8 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 50 + -1*B >= -7 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 50 + -1*B >= -6 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 50 + -1*B >= -5 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 50 + -1*B >= -4 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 50 + -1*B >= -3 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 50 + -1*B >= -2 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 51 + -1*B >= -1 = f61(A,52,C) [B = 48] ==> f159(A,B,C) = 51 + -1*B >= 2 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 51 + -1*B >= 3 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 51 + -1*B >= 4 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 51 + -1*B >= 5 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 51 + -1*B >= 7 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 51 + -1*B >= 8 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 51 + -1*B >= 9 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 51 + -1*B >= 10 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 51 + -1*B >= 11 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 51 + -1*B >= 12 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 51 + -1*B >= 13 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 51 + -1*B >= 14 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 51 + -1*B >= 15 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 51 + -1*B >= 16 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 51 + -1*B >= 17 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 51 + -1*B >= 18 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 51 + -1*B >= 19 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 51 + -1*B >= 20 = f61(A,31,C) [B = 28] ==> f119(A,B,C) = 51 + -1*B >= 22 = f61(A,29,C) [B = 20] ==> f103(A,B,C) = 51 + -1*B >= 30 = f61(A,21,C) [B >= 50] ==> f61(A,B,C) = 51 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 51 >= 51 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 51 >= 51 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 51 >= 51 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 51 >= 51 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 51 >= 51 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 51 >= 51 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 51 >= 51 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 51 >= 51 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 51 >= 51 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 51 >= 51 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 51 >= 51 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 51 >= 51 = f61(A,0,C) * Step 44: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (?,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 31*x13 p(f101) = -1*x2 + 31*x13 p(f103) = -1*x2 + 31*x13 p(f105) = -1*x2 + 31*x13 p(f107) = -1*x2 + 31*x13 p(f109) = -1*x2 + 31*x13 p(f11) = 31*x13 p(f111) = -1*x2 + 31*x13 p(f113) = -1*x2 + 31*x13 p(f115) = -1*x2 + 31*x13 p(f117) = -1*x2 + 31*x13 p(f119) = -1*x2 + 31*x13 p(f121) = -1*x2 + 31*x13 p(f123) = -1*x2 + 31*x13 p(f125) = -1*x2 + 31*x13 p(f127) = -1*x2 + 31*x13 p(f129) = -1*x2 + 31*x13 p(f13) = 31*x13 p(f131) = -1*x2 + 31*x13 p(f133) = -1*x2 + 31*x13 p(f135) = -1*x2 + 31*x13 p(f137) = -1*x2 + 31*x13 p(f139) = -1*x2 + 31*x13 p(f141) = -1*x2 + 31*x13 p(f143) = -1*x2 + 31*x13 p(f145) = -1*x2 + 31*x13 p(f147) = -1*x2 + 31*x13 p(f149) = -1*x2 + 30*x13 p(f15) = 31*x13 p(f151) = -1*x2 + 30*x13 p(f153) = -1*x2 + 30*x13 p(f155) = -1*x2 + 30*x13 p(f157) = -1*x2 + 30*x13 p(f159) = -1*x2 + 30*x13 p(f161) = -1*x2 + 30*x13 p(f163) = -1*x2 + 30*x13 p(f165) = -1*x2 + 30*x13 p(f167) = -1*x2 + 30*x13 p(f169) = -1*x2 + 30*x13 p(f17) = 31*x13 p(f171) = -1*x2 + 30*x13 p(f173) = -1*x2 + 30*x13 p(f175) = -1*x2 + 30*x13 p(f177) = -1*x2 + 30*x13 p(f179) = -1*x2 + 30*x13 p(f181) = -1*x2 + 30*x13 p(f19) = 31*x13 p(f21) = 31*x13 p(f23) = 31*x13 p(f25) = 31*x13 p(f27) = 31*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 31*x13 p(f65) = -1*x2 + 31*x13 p(f67) = -1*x2 + 31*x13 p(f69) = -1*x2 + 31*x13 p(f7) = 31*x13 p(f71) = -1*x2 + 31*x13 p(f73) = -1*x2 + 31*x13 p(f75) = -1*x2 + 31*x13 p(f77) = -1*x2 + 31*x13 p(f79) = -1*x2 + 31*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 31*x13 p(f83) = -1*x2 + 31*x13 p(f85) = -1*x2 + 31*x13 p(f87) = -1*x2 + 31*x13 p(f89) = -1*x2 + 31*x13 p(f91) = -1*x2 + 31*x13 p(f93) = -1*x2 + 31*x13 p(f95) = -1*x2 + 31*x13 p(f97) = -1*x2 + 31*x13 p(f99) = -1*x2 + 31*x13 Following rules are strictly oriented: [B = 30] ==> f123(A,B,C) = 31 + -1*B > 0 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 31 + -1*B > 1 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 31 + -1*B > 3 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 31 + -1*B > 4 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 31 + -1*B > 5 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 31 + -1*B > 6 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 31 + -1*B > 7 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 31 + -1*B > 8 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 31 + -1*B > 9 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 31 + -1*B > 10 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 31 + -1*B > 11 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 31 + -1*B > 12 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 31 + -1*B > 13 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 31 + -1*B > 14 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 31 + -1*B > 15 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 31 + -1*B > 16 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 31 + -1*B > 17 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 31 + -1*B > 18 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 31 + -1*B > 19 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 31 + -1*B > 20 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 31 + -1*B > 21 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 31 + -1*B > 22 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 31 + -1*B > 23 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 31 + -1*B > 24 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 31 + -1*B > 25 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 31 + -1*B > 26 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 31 + -1*B > 27 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 31 + -1*B > 28 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 31 + -1*B > 29 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 31 + -1*B > 30 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 31 >= 31 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 31 >= 31 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 31 >= 31 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 31 >= 31 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 31 >= 31 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 31 >= 31 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 31 >= 31 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 31 >= 31 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 31 + -1*B >= 31 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 31 + -1*B >= 31 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 31 + -1*B >= 31 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 31 + -1*B >= 31 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 31 + -1*B >= 31 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 31 + -1*B >= 31 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 31 + -1*B >= 31 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 31 + -1*B >= 31 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 31 + -1*B >= 31 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 31 + -1*B >= 31 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 31 + -1*B >= 31 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 31 + -1*B >= 31 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 31 + -1*B >= 31 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 31 + -1*B >= 31 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 31 + -1*B >= 31 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 31 + -1*B >= 31 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 31 + -1*B >= 31 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 31 + -1*B >= 31 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 31 + -1*B >= 31 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 31 + -1*B >= 31 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 31 + -1*B >= 31 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 31 + -1*B >= 31 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 31 + -1*B >= 31 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 31 + -1*B >= 31 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 31 + -1*B >= 31 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 31 + -1*B >= 31 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 31 + -1*B >= 31 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 31 + -1*B >= 31 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 31 + -1*B >= 31 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 31 + -1*B >= 31 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 31 + -1*B >= 31 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 31 + -1*B >= 31 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 31 + -1*B >= 31 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 31 + -1*B >= 31 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 31 + -1*B >= 31 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 31 + -1*B >= 31 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 31 + -1*B >= 31 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 31 + -1*B >= 31 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 31 + -1*B >= 31 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 31 + -1*B >= 31 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 31 + -1*B >= 31 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 31 + -1*B >= 30 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 30 + -1*B >= 30 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 30 + -1*B >= 30 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 30 + -1*B >= 30 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 30 + -1*B >= 30 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 30 + -1*B >= 30 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 30 + -1*B >= 30 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 30 + -1*B >= 30 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 30 + -1*B >= 30 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 30 + -1*B >= 30 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 30 + -1*B >= 30 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 30 + -1*B >= 30 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 30 + -1*B >= 30 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 30 + -1*B >= 30 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 30 + -1*B >= 30 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 30 + -1*B >= 30 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 30 + -1*B >= 30 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 31 >= 31 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 31 >= 31 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 31 + -1*B >= 31 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 30 + -1*B >= 30 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 30 + -1*B >= -29 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 30 + -1*B >= -28 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 30 + -1*B >= -27 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 30 + -1*B >= -26 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 30 + -1*B >= -25 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 30 + -1*B >= -24 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 30 + -1*B >= -23 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 30 + -1*B >= -22 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 30 + -1*B >= -21 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 30 + -1*B >= -20 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 30 + -1*B >= -19 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 30 + -1*B >= -18 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 30 + -1*B >= -17 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 30 + -1*B >= -16 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 30 + -1*B >= -15 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 30 + -1*B >= -14 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 30 + -1*B >= -13 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 31 + -1*B >= -12 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 31 + -1*B >= -11 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 31 + -1*B >= -10 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 31 + -1*B >= -9 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 31 + -1*B >= -8 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 31 + -1*B >= -7 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 31 + -1*B >= -6 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 31 + -1*B >= -5 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 31 + -1*B >= -4 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 31 + -1*B >= -3 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 31 + -1*B >= -2 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 31 + -1*B >= -1 = f61(A,32,C) [B = 28] ==> f119(A,B,C) = 31 + -1*B >= 2 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 31 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 31 >= 31 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 31 >= 31 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 31 >= 31 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 31 >= 31 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 31 >= 31 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 31 >= 31 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 31 >= 31 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 31 >= 31 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 31 >= 31 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 31 >= 31 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 31 >= 31 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 31 >= 31 = f61(A,0,C) * Step 45: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (?,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 32*x13 p(f101) = -1*x2 + 32*x13 p(f103) = -1*x2 + 32*x13 p(f105) = -1*x2 + 32*x13 p(f107) = -1*x2 + 32*x13 p(f109) = -1*x2 + 32*x13 p(f11) = 32*x13 p(f111) = -1*x2 + 32*x13 p(f113) = -1*x2 + 32*x13 p(f115) = -1*x2 + 32*x13 p(f117) = -1*x2 + 32*x13 p(f119) = -1*x2 + 32*x13 p(f121) = -1*x2 + 32*x13 p(f123) = -1*x2 + 32*x13 p(f125) = -1*x2 + 32*x13 p(f127) = -1*x2 + 31*x13 p(f129) = -1*x2 + 31*x13 p(f13) = 32*x13 p(f131) = -1*x2 + 31*x13 p(f133) = -1*x2 + 31*x13 p(f135) = -1*x2 + 31*x13 p(f137) = -1*x2 + 31*x13 p(f139) = -1*x2 + 31*x13 p(f141) = -1*x2 + 31*x13 p(f143) = -1*x2 + 31*x13 p(f145) = -1*x2 + 31*x13 p(f147) = -1*x2 + 31*x13 p(f149) = -1*x2 + 31*x13 p(f15) = 32*x13 p(f151) = -1*x2 + 31*x13 p(f153) = -1*x2 + 31*x13 p(f155) = -1*x2 + 31*x13 p(f157) = -1*x2 + 31*x13 p(f159) = -1*x2 + 31*x13 p(f161) = -1*x2 + 31*x13 p(f163) = -1*x2 + 31*x13 p(f165) = -1*x2 + 31*x13 p(f167) = -1*x2 + 31*x13 p(f169) = -1*x2 + 31*x13 p(f17) = 32*x13 p(f171) = -1*x2 + 31*x13 p(f173) = -1*x2 + 31*x13 p(f175) = -1*x2 + 31*x13 p(f177) = -1*x2 + 31*x13 p(f179) = -1*x2 + 31*x13 p(f181) = -1*x2 + 31*x13 p(f19) = 32*x13 p(f21) = 32*x13 p(f23) = 32*x13 p(f25) = 32*x13 p(f27) = 32*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 32*x13 p(f65) = -1*x2 + 32*x13 p(f67) = -1*x2 + 32*x13 p(f69) = -1*x2 + 32*x13 p(f7) = 32*x13 p(f71) = -1*x2 + 32*x13 p(f73) = -1*x2 + 32*x13 p(f75) = -1*x2 + 32*x13 p(f77) = -1*x2 + 32*x13 p(f79) = -1*x2 + 32*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 32*x13 p(f83) = -1*x2 + 32*x13 p(f85) = -1*x2 + 32*x13 p(f87) = -1*x2 + 32*x13 p(f89) = -1*x2 + 32*x13 p(f91) = -1*x2 + 32*x13 p(f93) = -1*x2 + 32*x13 p(f95) = -1*x2 + 32*x13 p(f97) = -1*x2 + 32*x13 p(f99) = -1*x2 + 32*x13 Following rules are strictly oriented: [B = 31] ==> f125(A,B,C) = 32 + -1*B > 0 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 32 + -1*B > 1 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 32 + -1*B > 2 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 32 + -1*B > 4 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 32 + -1*B > 5 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 32 + -1*B > 6 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 32 + -1*B > 7 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 32 + -1*B > 8 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 32 + -1*B > 9 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 32 + -1*B > 10 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 32 + -1*B > 11 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 32 + -1*B > 12 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 32 + -1*B > 13 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 32 + -1*B > 14 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 32 + -1*B > 15 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 32 + -1*B > 16 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 32 + -1*B > 17 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 32 + -1*B > 18 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 32 + -1*B > 19 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 32 + -1*B > 20 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 32 + -1*B > 21 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 32 + -1*B > 22 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 32 + -1*B > 23 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 32 + -1*B > 24 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 32 + -1*B > 25 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 32 + -1*B > 26 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 32 + -1*B > 27 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 32 + -1*B > 28 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 32 + -1*B > 29 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 32 + -1*B > 30 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 32 + -1*B > 31 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 32 >= 32 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 32 >= 32 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 32 >= 32 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 32 >= 32 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 32 >= 32 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 32 >= 32 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 32 >= 32 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 32 >= 32 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 32 + -1*B >= 32 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 32 + -1*B >= 32 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 32 + -1*B >= 32 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 32 + -1*B >= 32 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 32 + -1*B >= 32 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 32 + -1*B >= 32 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 32 + -1*B >= 32 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 32 + -1*B >= 32 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 32 + -1*B >= 32 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 32 + -1*B >= 32 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 32 + -1*B >= 32 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 32 + -1*B >= 32 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 32 + -1*B >= 32 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 32 + -1*B >= 32 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 32 + -1*B >= 32 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 32 + -1*B >= 32 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 32 + -1*B >= 32 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 32 + -1*B >= 32 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 32 + -1*B >= 32 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 32 + -1*B >= 32 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 32 + -1*B >= 32 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 32 + -1*B >= 32 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 32 + -1*B >= 32 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 32 + -1*B >= 32 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 32 + -1*B >= 32 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 32 + -1*B >= 32 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 32 + -1*B >= 32 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 32 + -1*B >= 32 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 32 + -1*B >= 32 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 32 + -1*B >= 32 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 32 + -1*B >= 31 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 31 + -1*B >= 31 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 31 + -1*B >= 31 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 31 + -1*B >= 31 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 31 + -1*B >= 31 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 31 + -1*B >= 31 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 31 + -1*B >= 31 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 31 + -1*B >= 31 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 31 + -1*B >= 31 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 31 + -1*B >= 31 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 31 + -1*B >= 31 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 31 + -1*B >= 31 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 31 + -1*B >= 31 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 31 + -1*B >= 31 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 31 + -1*B >= 31 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 31 + -1*B >= 31 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 31 + -1*B >= 31 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 31 + -1*B >= 31 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 31 + -1*B >= 31 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 31 + -1*B >= 31 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 31 + -1*B >= 31 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 31 + -1*B >= 31 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 31 + -1*B >= 31 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 31 + -1*B >= 31 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 31 + -1*B >= 31 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 31 + -1*B >= 31 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 31 + -1*B >= 31 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 31 + -1*B >= 31 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 32 >= 32 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 32 >= 32 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 32 + -1*B >= 32 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 31 + -1*B >= 31 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 31 + -1*B >= -28 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 31 + -1*B >= -27 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 31 + -1*B >= -26 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 31 + -1*B >= -25 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 31 + -1*B >= -24 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 31 + -1*B >= -23 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 31 + -1*B >= -22 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 31 + -1*B >= -21 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 31 + -1*B >= -20 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 31 + -1*B >= -19 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 31 + -1*B >= -18 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 31 + -1*B >= -17 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 31 + -1*B >= -16 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 31 + -1*B >= -15 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 31 + -1*B >= -14 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 31 + -1*B >= -13 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 31 + -1*B >= -12 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 31 + -1*B >= -11 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 31 + -1*B >= -10 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 31 + -1*B >= -9 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 31 + -1*B >= -8 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 31 + -1*B >= -7 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 31 + -1*B >= -6 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 31 + -1*B >= -5 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 31 + -1*B >= -4 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 31 + -1*B >= -3 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 31 + -1*B >= -2 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 31 + -1*B >= -1 = f61(A,33,C) [B = 28] ==> f119(A,B,C) = 32 + -1*B >= 3 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 32 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 32 >= 32 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 32 >= 32 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 32 >= 32 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 32 >= 32 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 32 >= 32 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 32 >= 32 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 32 >= 32 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 32 >= 32 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 32 >= 32 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 32 >= 32 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 32 >= 32 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 32 >= 32 = f61(A,0,C) * Step 46: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (?,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 34*x13 p(f101) = -1*x2 + 33*x13 p(f103) = -1*x2 + 33*x13 p(f105) = -1*x2 + 33*x13 p(f107) = -1*x2 + 33*x13 p(f109) = -1*x2 + 33*x13 p(f11) = 33*x13 p(f111) = -1*x2 + 33*x13 p(f113) = -1*x2 + 33*x13 p(f115) = -1*x2 + 33*x13 p(f117) = -1*x2 + 33*x13 p(f119) = -1*x2 + 33*x13 p(f121) = -1*x2 + 33*x13 p(f123) = -1*x2 + 33*x13 p(f125) = -1*x2 + 33*x13 p(f127) = -1*x2 + 33*x13 p(f129) = -1*x2 + 32*x13 p(f13) = 33*x13 p(f131) = -1*x2 + 32*x13 p(f133) = -1*x2 + 32*x13 p(f135) = -1*x2 + 32*x13 p(f137) = -1*x2 + 32*x13 p(f139) = -1*x2 + 32*x13 p(f141) = -1*x2 + 32*x13 p(f143) = -1*x2 + 32*x13 p(f145) = -1*x2 + 32*x13 p(f147) = -1*x2 + 32*x13 p(f149) = -1*x2 + 32*x13 p(f15) = 33*x13 p(f151) = -1*x2 + 32*x13 p(f153) = -1*x2 + 32*x13 p(f155) = -1*x2 + 32*x13 p(f157) = -1*x2 + 32*x13 p(f159) = -1*x2 + 32*x13 p(f161) = -1*x2 + 32*x13 p(f163) = -1*x2 + 32*x13 p(f165) = -1*x2 + 32*x13 p(f167) = -1*x2 + 32*x13 p(f169) = -1*x2 + 32*x13 p(f17) = 33*x13 p(f171) = -1*x2 + 32*x13 p(f173) = -1*x2 + 32*x13 p(f175) = -1*x2 + 32*x13 p(f177) = -1*x2 + 32*x13 p(f179) = -1*x2 + 32*x13 p(f181) = -1*x2 + 32*x13 p(f19) = 33*x13 p(f21) = 33*x13 p(f23) = 33*x13 p(f25) = 33*x13 p(f27) = 33*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 33*x13 p(f65) = -1*x2 + 33*x13 p(f67) = -1*x2 + 33*x13 p(f69) = -1*x2 + 33*x13 p(f7) = 33*x13 p(f71) = -1*x2 + 33*x13 p(f73) = -1*x2 + 33*x13 p(f75) = -1*x2 + 33*x13 p(f77) = -1*x2 + 33*x13 p(f79) = -1*x2 + 33*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 33*x13 p(f83) = -1*x2 + 33*x13 p(f85) = -1*x2 + 33*x13 p(f87) = -1*x2 + 33*x13 p(f89) = -1*x2 + 33*x13 p(f91) = -1*x2 + 33*x13 p(f93) = -1*x2 + 33*x13 p(f95) = -1*x2 + 33*x13 p(f97) = -1*x2 + 33*x13 p(f99) = -1*x2 + 33*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 34 > 33 = f7(0,B,C) [B = 32] ==> f127(A,B,C) = 33 + -1*B > 0 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 33 + -1*B > 1 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 33 + -1*B > 2 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 33 + -1*B > 3 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 33 + -1*B > 5 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 33 + -1*B > 6 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 33 + -1*B > 7 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 33 + -1*B > 8 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 33 + -1*B > 9 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 33 + -1*B > 10 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 33 + -1*B > 11 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 33 + -1*B > 12 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 33 + -1*B > 13 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 33 + -1*B > 14 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 33 + -1*B > 15 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 33 + -1*B > 16 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 33 + -1*B > 17 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 33 + -1*B > 18 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 33 + -1*B > 19 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 33 + -1*B > 20 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 33 + -1*B > 21 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 33 + -1*B > 22 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 33 + -1*B > 23 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 33 + -1*B > 24 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 33 + -1*B > 25 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 33 + -1*B > 26 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 33 + -1*B > 27 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 33 + -1*B > 28 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 33 + -1*B > 29 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 33 + -1*B > 30 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 33 + -1*B > 31 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 33 + -1*B > 32 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 33 >= 33 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 33 >= 33 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 33 >= 33 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 33 >= 33 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 33 >= 33 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 33 >= 33 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 33 >= 33 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 33 >= 33 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 33 + -1*B >= 33 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 33 + -1*B >= 33 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 33 + -1*B >= 33 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 33 + -1*B >= 33 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 33 + -1*B >= 33 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 33 + -1*B >= 33 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 33 + -1*B >= 33 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 33 + -1*B >= 33 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 33 + -1*B >= 33 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 33 + -1*B >= 33 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 33 + -1*B >= 33 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 33 + -1*B >= 33 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 33 + -1*B >= 33 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 33 + -1*B >= 33 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 33 + -1*B >= 33 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 33 + -1*B >= 33 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 33 + -1*B >= 33 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 33 + -1*B >= 33 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 33 + -1*B >= 33 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 33 + -1*B >= 33 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 33 + -1*B >= 33 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 33 + -1*B >= 33 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 33 + -1*B >= 33 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 33 + -1*B >= 33 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 33 + -1*B >= 33 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 33 + -1*B >= 33 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 33 + -1*B >= 33 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 33 + -1*B >= 33 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 33 + -1*B >= 33 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 33 + -1*B >= 33 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 33 + -1*B >= 33 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 33 + -1*B >= 32 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 32 + -1*B >= 32 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 32 + -1*B >= 32 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 32 + -1*B >= 32 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 32 + -1*B >= 32 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 32 + -1*B >= 32 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 32 + -1*B >= 32 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 32 + -1*B >= 32 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 32 + -1*B >= 32 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 32 + -1*B >= 32 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 32 + -1*B >= 32 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 32 + -1*B >= 32 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 32 + -1*B >= 32 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 32 + -1*B >= 32 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 32 + -1*B >= 32 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 32 + -1*B >= 32 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 32 + -1*B >= 32 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 32 + -1*B >= 32 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 32 + -1*B >= 32 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 32 + -1*B >= 32 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 32 + -1*B >= 32 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 32 + -1*B >= 32 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 32 + -1*B >= 32 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 32 + -1*B >= 32 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 32 + -1*B >= 32 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 32 + -1*B >= 32 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 32 + -1*B >= 32 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 33 >= 33 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 33 + -1*B >= 33 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 32 + -1*B >= 32 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 32 + -1*B >= -27 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 32 + -1*B >= -26 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 32 + -1*B >= -25 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 32 + -1*B >= -24 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 32 + -1*B >= -23 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 32 + -1*B >= -22 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 32 + -1*B >= -21 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 32 + -1*B >= -20 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 32 + -1*B >= -19 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 32 + -1*B >= -18 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 32 + -1*B >= -17 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 32 + -1*B >= -16 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 32 + -1*B >= -15 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 32 + -1*B >= -14 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 32 + -1*B >= -13 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 32 + -1*B >= -12 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 32 + -1*B >= -11 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 32 + -1*B >= -10 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 32 + -1*B >= -9 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 32 + -1*B >= -8 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 32 + -1*B >= -7 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 32 + -1*B >= -6 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 32 + -1*B >= -5 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 32 + -1*B >= -4 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 32 + -1*B >= -3 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 32 + -1*B >= -2 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 32 + -1*B >= -1 = f61(A,34,C) [B = 28] ==> f119(A,B,C) = 33 + -1*B >= 4 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 33 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 33 >= 33 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 33 >= 33 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 33 >= 33 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 33 >= 33 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 33 >= 33 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 33 >= 33 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 33 >= 33 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 33 >= 33 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 33 >= 33 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 33 >= 33 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 33 >= 33 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 33 >= 33 = f61(A,0,C) * Step 47: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (?,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 34*x13 p(f101) = -1*x2 + 34*x13 p(f103) = -1*x2 + 34*x13 p(f105) = -1*x2 + 34*x13 p(f107) = -1*x2 + 34*x13 p(f109) = -1*x2 + 34*x13 p(f11) = 34*x13 p(f111) = -1*x2 + 34*x13 p(f113) = -1*x2 + 34*x13 p(f115) = -1*x2 + 34*x13 p(f117) = -1*x2 + 34*x13 p(f119) = -1*x2 + 34*x13 p(f121) = -1*x2 + 34*x13 p(f123) = -1*x2 + 34*x13 p(f125) = -1*x2 + 34*x13 p(f127) = -1*x2 + 34*x13 p(f129) = -1*x2 + 34*x13 p(f13) = 34*x13 p(f131) = -1*x2 + 34*x13 p(f133) = -1*x2 + 34*x13 p(f135) = -1*x2 + 34*x13 p(f137) = -1*x2 + 34*x13 p(f139) = -1*x2 + 34*x13 p(f141) = -1*x2 + 34*x13 p(f143) = -1*x2 + 33*x13 p(f145) = -1*x2 + 33*x13 p(f147) = -1*x2 + 33*x13 p(f149) = -1*x2 + 33*x13 p(f15) = 34*x13 p(f151) = -1*x2 + 33*x13 p(f153) = -1*x2 + 33*x13 p(f155) = -1*x2 + 33*x13 p(f157) = -1*x2 + 33*x13 p(f159) = -1*x2 + 33*x13 p(f161) = -1*x2 + 33*x13 p(f163) = -1*x2 + 33*x13 p(f165) = -1*x2 + 33*x13 p(f167) = -1*x2 + 33*x13 p(f169) = -1*x2 + 33*x13 p(f17) = 34*x13 p(f171) = -1*x2 + 33*x13 p(f173) = -1*x2 + 33*x13 p(f175) = -1*x2 + 33*x13 p(f177) = -1*x2 + 33*x13 p(f179) = -1*x2 + 33*x13 p(f181) = -1*x2 + 33*x13 p(f19) = 34*x13 p(f21) = 34*x13 p(f23) = 34*x13 p(f25) = 34*x13 p(f27) = 34*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 34*x13 p(f65) = -1*x2 + 34*x13 p(f67) = -1*x2 + 34*x13 p(f69) = -1*x2 + 34*x13 p(f7) = 34*x13 p(f71) = -1*x2 + 34*x13 p(f73) = -1*x2 + 34*x13 p(f75) = -1*x2 + 34*x13 p(f77) = -1*x2 + 34*x13 p(f79) = -1*x2 + 34*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 34*x13 p(f83) = -1*x2 + 34*x13 p(f85) = -1*x2 + 34*x13 p(f87) = -1*x2 + 34*x13 p(f89) = -1*x2 + 34*x13 p(f91) = -1*x2 + 34*x13 p(f93) = -1*x2 + 34*x13 p(f95) = -1*x2 + 34*x13 p(f97) = -1*x2 + 34*x13 p(f99) = -1*x2 + 34*x13 Following rules are strictly oriented: [B = 33] ==> f129(A,B,C) = 34 + -1*B > 0 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 34 + -1*B > 1 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 34 + -1*B > 2 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 34 + -1*B > 3 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 34 + -1*B > 4 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 34 + -1*B > 6 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 34 + -1*B > 7 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 34 + -1*B > 8 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 34 + -1*B > 9 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 34 + -1*B > 10 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 34 + -1*B > 11 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 34 + -1*B > 12 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 34 + -1*B > 13 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 34 + -1*B > 14 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 34 + -1*B > 15 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 34 + -1*B > 16 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 34 + -1*B > 17 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 34 + -1*B > 18 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 34 + -1*B > 19 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 34 + -1*B > 20 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 34 + -1*B > 21 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 34 + -1*B > 22 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 34 + -1*B > 23 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 34 + -1*B > 24 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 34 + -1*B > 25 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 34 + -1*B > 26 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 34 + -1*B > 27 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 34 + -1*B > 28 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 34 + -1*B > 29 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 34 + -1*B > 30 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 34 + -1*B > 31 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 34 + -1*B > 32 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 34 + -1*B > 33 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 34 >= 34 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 34 >= 34 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 34 >= 34 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 34 >= 34 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 34 >= 34 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 34 >= 34 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 34 >= 34 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 34 >= 34 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 34 + -1*B >= 34 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 34 + -1*B >= 34 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 34 + -1*B >= 34 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 34 + -1*B >= 34 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 34 + -1*B >= 34 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 34 + -1*B >= 34 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 34 + -1*B >= 34 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 34 + -1*B >= 34 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 34 + -1*B >= 34 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 34 + -1*B >= 34 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 34 + -1*B >= 34 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 34 + -1*B >= 34 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 34 + -1*B >= 34 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 34 + -1*B >= 34 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 34 + -1*B >= 34 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 34 + -1*B >= 34 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 34 + -1*B >= 34 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 34 + -1*B >= 34 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 34 + -1*B >= 34 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 34 + -1*B >= 34 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 34 + -1*B >= 34 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 34 + -1*B >= 34 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 34 + -1*B >= 34 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 34 + -1*B >= 34 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 34 + -1*B >= 34 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 34 + -1*B >= 34 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 34 + -1*B >= 34 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 34 + -1*B >= 34 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 34 + -1*B >= 34 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 34 + -1*B >= 34 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 34 + -1*B >= 34 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 34 + -1*B >= 34 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 34 + -1*B >= 34 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 34 + -1*B >= 34 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 34 + -1*B >= 34 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 34 + -1*B >= 34 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 34 + -1*B >= 34 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 34 + -1*B >= 34 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 34 + -1*B >= 33 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 33 + -1*B >= 33 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 33 + -1*B >= 33 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 33 + -1*B >= 33 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 33 + -1*B >= 33 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 33 + -1*B >= 33 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 33 + -1*B >= 33 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 33 + -1*B >= 33 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 33 + -1*B >= 33 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 33 + -1*B >= 33 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 33 + -1*B >= 33 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 33 + -1*B >= 33 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 33 + -1*B >= 33 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 33 + -1*B >= 33 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 33 + -1*B >= 33 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 33 + -1*B >= 33 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 33 + -1*B >= 33 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 33 + -1*B >= 33 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 33 + -1*B >= 33 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 33 + -1*B >= 33 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 34 >= 34 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 34 >= 34 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 34 + -1*B >= 34 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 33 + -1*B >= 33 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 33 + -1*B >= -26 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 33 + -1*B >= -25 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 33 + -1*B >= -24 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 33 + -1*B >= -23 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 33 + -1*B >= -22 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 33 + -1*B >= -21 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 33 + -1*B >= -20 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 33 + -1*B >= -19 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 33 + -1*B >= -18 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 33 + -1*B >= -17 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 33 + -1*B >= -16 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 33 + -1*B >= -15 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 33 + -1*B >= -14 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 33 + -1*B >= -13 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 33 + -1*B >= -12 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 33 + -1*B >= -11 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 33 + -1*B >= -10 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 33 + -1*B >= -9 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 33 + -1*B >= -8 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 33 + -1*B >= -7 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 34 + -1*B >= -6 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 34 + -1*B >= -5 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 34 + -1*B >= -4 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 34 + -1*B >= -3 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 34 + -1*B >= -2 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 34 + -1*B >= -1 = f61(A,35,C) [B = 28] ==> f119(A,B,C) = 34 + -1*B >= 5 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 34 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 34 >= 34 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 34 >= 34 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 34 >= 34 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 34 >= 34 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 34 >= 34 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 34 >= 34 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 34 >= 34 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 34 >= 34 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 34 >= 34 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 34 >= 34 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 34 >= 34 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 34 >= 34 = f61(A,0,C) * Step 48: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (?,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 58*x13 p(f101) = -1*x2 + 58*x13 p(f103) = -1*x2 + 58*x13 p(f105) = -1*x2 + 58*x13 p(f107) = -1*x2 + 58*x13 p(f109) = -1*x2 + 58*x13 p(f11) = 58*x13 p(f111) = -1*x2 + 58*x13 p(f113) = -1*x2 + 58*x13 p(f115) = -1*x2 + 58*x13 p(f117) = -1*x2 + 58*x13 p(f119) = -1*x2 + 58*x13 p(f121) = -1*x2 + 58*x13 p(f123) = -1*x2 + 58*x13 p(f125) = -1*x2 + 58*x13 p(f127) = -1*x2 + 58*x13 p(f129) = -1*x2 + 58*x13 p(f13) = 58*x13 p(f131) = -1*x2 + 58*x13 p(f133) = -1*x2 + 58*x13 p(f135) = -1*x2 + 58*x13 p(f137) = -1*x2 + 58*x13 p(f139) = -1*x2 + 58*x13 p(f141) = -1*x2 + 58*x13 p(f143) = -1*x2 + 58*x13 p(f145) = -1*x2 + 58*x13 p(f147) = -1*x2 + 58*x13 p(f149) = -1*x2 + 58*x13 p(f15) = 58*x13 p(f151) = -1*x2 + 58*x13 p(f153) = -1*x2 + 58*x13 p(f155) = -1*x2 + 58*x13 p(f157) = -1*x2 + 58*x13 p(f159) = -1*x2 + 58*x13 p(f161) = -1*x2 + 58*x13 p(f163) = -1*x2 + 58*x13 p(f165) = -1*x2 + 58*x13 p(f167) = -1*x2 + 58*x13 p(f169) = -1*x2 + 58*x13 p(f17) = 58*x13 p(f171) = -1*x2 + 58*x13 p(f173) = -1*x2 + 58*x13 p(f175) = -1*x2 + 58*x13 p(f177) = -1*x2 + 58*x13 p(f179) = -1*x2 + 57*x13 p(f181) = -1*x2 + 57*x13 p(f19) = 58*x13 p(f21) = 58*x13 p(f23) = 58*x13 p(f25) = 58*x13 p(f27) = 58*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 58*x13 p(f65) = -1*x2 + 58*x13 p(f67) = -1*x2 + 58*x13 p(f69) = -1*x2 + 58*x13 p(f7) = 58*x13 p(f71) = -1*x2 + 58*x13 p(f73) = -1*x2 + 58*x13 p(f75) = -1*x2 + 58*x13 p(f77) = -1*x2 + 58*x13 p(f79) = -1*x2 + 58*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 58*x13 p(f83) = -1*x2 + 58*x13 p(f85) = -1*x2 + 58*x13 p(f87) = -1*x2 + 58*x13 p(f89) = -1*x2 + 58*x13 p(f91) = -1*x2 + 58*x13 p(f93) = -1*x2 + 58*x13 p(f95) = -1*x2 + 58*x13 p(f97) = -1*x2 + 58*x13 p(f99) = -1*x2 + 58*x13 Following rules are strictly oriented: [B = 57] ==> f177(A,B,C) = 58 + -1*B > 0 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 58 + -1*B > 1 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 58 + -1*B > 2 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 58 + -1*B > 3 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 58 + -1*B > 4 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 58 + -1*B > 5 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 58 + -1*B > 6 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 58 + -1*B > 7 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 58 + -1*B > 8 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 58 + -1*B > 13 = f61(A,45,C) [B = 34] ==> f131(A,B,C) = 58 + -1*B > 23 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 58 + -1*B > 24 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 58 + -1*B > 25 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 58 + -1*B > 26 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 58 + -1*B > 27 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 58 + -1*B > 28 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 58 + -1*B > 30 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 58 + -1*B > 31 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 58 + -1*B > 32 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 58 + -1*B > 33 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 58 + -1*B > 34 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 58 + -1*B > 35 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 58 + -1*B > 36 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 58 + -1*B > 37 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 58 + -1*B > 38 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 58 + -1*B > 39 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 58 + -1*B > 40 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 58 + -1*B > 41 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 58 + -1*B > 42 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 58 + -1*B > 43 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 58 + -1*B > 44 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 58 + -1*B > 45 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 58 + -1*B > 46 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 58 + -1*B > 47 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 58 + -1*B > 48 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 58 + -1*B > 49 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 58 + -1*B > 50 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 58 + -1*B > 51 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 58 + -1*B > 52 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 58 + -1*B > 53 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 58 + -1*B > 54 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 58 + -1*B > 55 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 58 + -1*B > 56 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 58 + -1*B > 57 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 58 >= 58 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 58 >= 58 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 58 >= 58 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 58 >= 58 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 58 >= 58 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 58 >= 58 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 58 >= 58 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 58 >= 58 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 58 + -1*B >= 58 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 58 + -1*B >= 58 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 58 + -1*B >= 58 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 58 + -1*B >= 58 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 58 + -1*B >= 58 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 58 + -1*B >= 58 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 58 + -1*B >= 58 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 58 + -1*B >= 58 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 58 + -1*B >= 58 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 58 + -1*B >= 58 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 58 + -1*B >= 58 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 58 + -1*B >= 58 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 58 + -1*B >= 58 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 58 + -1*B >= 58 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 58 + -1*B >= 58 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 58 + -1*B >= 58 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 58 + -1*B >= 58 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 58 + -1*B >= 58 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 58 + -1*B >= 58 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 58 + -1*B >= 58 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 58 + -1*B >= 58 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 58 + -1*B >= 58 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 58 + -1*B >= 58 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 58 + -1*B >= 58 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 58 + -1*B >= 58 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 58 + -1*B >= 58 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 58 + -1*B >= 58 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 58 + -1*B >= 58 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 58 + -1*B >= 58 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 58 + -1*B >= 58 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 58 + -1*B >= 58 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 58 + -1*B >= 58 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 58 + -1*B >= 58 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 58 + -1*B >= 58 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 58 + -1*B >= 58 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 58 + -1*B >= 58 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 58 + -1*B >= 58 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 58 + -1*B >= 58 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 58 + -1*B >= 58 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 58 + -1*B >= 58 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 58 + -1*B >= 58 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 58 + -1*B >= 58 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 58 + -1*B >= 58 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 58 + -1*B >= 58 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 58 + -1*B >= 58 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 58 + -1*B >= 58 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 58 + -1*B >= 58 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 58 + -1*B >= 58 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 58 + -1*B >= 58 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 58 + -1*B >= 58 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 58 + -1*B >= 58 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 58 + -1*B >= 58 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 58 + -1*B >= 58 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 58 + -1*B >= 58 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 58 + -1*B >= 58 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 58 + -1*B >= 58 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 58 + -1*B >= 57 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 57 + -1*B >= 57 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 58 >= 58 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 58 >= 58 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 58 + -1*B >= 58 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 57 + -1*B >= 57 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 57 + -1*B >= -2 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 57 + -1*B >= -1 = f61(A,59,C) [B = 48] ==> f159(A,B,C) = 58 + -1*B >= 9 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 58 + -1*B >= 10 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 58 + -1*B >= 11 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 58 + -1*B >= 12 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 58 + -1*B >= 14 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 58 + -1*B >= 15 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 58 + -1*B >= 16 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 58 + -1*B >= 17 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 58 + -1*B >= 18 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 58 + -1*B >= 19 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 58 + -1*B >= 20 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 58 + -1*B >= 21 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 58 + -1*B >= 22 = f61(A,36,C) [B = 28] ==> f119(A,B,C) = 58 + -1*B >= 29 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 58 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 58 >= 58 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 58 >= 58 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 58 >= 58 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 58 >= 58 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 58 >= 58 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 58 >= 58 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 58 >= 58 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 58 >= 58 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 58 >= 58 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 58 >= 58 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 58 >= 58 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 58 >= 58 = f61(A,0,C) * Step 49: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (?,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 36*x13 p(f101) = -1*x2 + 36*x13 p(f103) = -1*x2 + 36*x13 p(f105) = -1*x2 + 36*x13 p(f107) = -1*x2 + 36*x13 p(f109) = -1*x2 + 36*x13 p(f11) = 36*x13 p(f111) = -1*x2 + 36*x13 p(f113) = -1*x2 + 36*x13 p(f115) = -1*x2 + 36*x13 p(f117) = -1*x2 + 36*x13 p(f119) = -1*x2 + 36*x13 p(f121) = -1*x2 + 36*x13 p(f123) = -1*x2 + 36*x13 p(f125) = -1*x2 + 36*x13 p(f127) = -1*x2 + 36*x13 p(f129) = -1*x2 + 36*x13 p(f13) = 36*x13 p(f131) = -1*x2 + 36*x13 p(f133) = -1*x2 + 36*x13 p(f135) = -1*x2 + 35*x13 p(f137) = -1*x2 + 35*x13 p(f139) = -1*x2 + 35*x13 p(f141) = -1*x2 + 35*x13 p(f143) = -1*x2 + 35*x13 p(f145) = -1*x2 + 35*x13 p(f147) = -1*x2 + 35*x13 p(f149) = -1*x2 + 35*x13 p(f15) = 36*x13 p(f151) = -1*x2 + 35*x13 p(f153) = -1*x2 + 35*x13 p(f155) = -1*x2 + 35*x13 p(f157) = -1*x2 + 35*x13 p(f159) = -1*x2 + 35*x13 p(f161) = -1*x2 + 35*x13 p(f163) = -1*x2 + 35*x13 p(f165) = -1*x2 + 35*x13 p(f167) = -1*x2 + 35*x13 p(f169) = -1*x2 + 35*x13 p(f17) = 36*x13 p(f171) = -1*x2 + 35*x13 p(f173) = -1*x2 + 35*x13 p(f175) = -1*x2 + 35*x13 p(f177) = -1*x2 + 35*x13 p(f179) = -1*x2 + 35*x13 p(f181) = -1*x2 + 35*x13 p(f19) = 36*x13 p(f21) = 36*x13 p(f23) = 36*x13 p(f25) = 36*x13 p(f27) = 36*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 36*x13 p(f65) = -1*x2 + 36*x13 p(f67) = -1*x2 + 36*x13 p(f69) = -1*x2 + 36*x13 p(f7) = 36*x13 p(f71) = -1*x2 + 36*x13 p(f73) = -1*x2 + 36*x13 p(f75) = -1*x2 + 36*x13 p(f77) = -1*x2 + 36*x13 p(f79) = -1*x2 + 36*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 36*x13 p(f83) = -1*x2 + 36*x13 p(f85) = -1*x2 + 36*x13 p(f87) = -1*x2 + 36*x13 p(f89) = -1*x2 + 36*x13 p(f91) = -1*x2 + 36*x13 p(f93) = -1*x2 + 36*x13 p(f95) = -1*x2 + 36*x13 p(f97) = -1*x2 + 36*x13 p(f99) = -1*x2 + 36*x13 Following rules are strictly oriented: [B = 35] ==> f133(A,B,C) = 36 + -1*B > 0 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 36 + -1*B > 1 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 36 + -1*B > 2 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 36 + -1*B > 3 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 36 + -1*B > 4 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 36 + -1*B > 5 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 36 + -1*B > 6 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 36 + -1*B > 8 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 36 + -1*B > 9 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 36 + -1*B > 10 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 36 + -1*B > 11 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 36 + -1*B > 12 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 36 + -1*B > 13 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 36 + -1*B > 14 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 36 + -1*B > 15 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 36 + -1*B > 16 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 36 + -1*B > 17 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 36 + -1*B > 18 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 36 + -1*B > 19 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 36 + -1*B > 20 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 36 + -1*B > 21 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 36 + -1*B > 22 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 36 + -1*B > 23 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 36 + -1*B > 24 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 36 + -1*B > 25 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 36 + -1*B > 26 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 36 + -1*B > 27 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 36 + -1*B > 28 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 36 + -1*B > 29 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 36 + -1*B > 30 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 36 + -1*B > 31 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 36 + -1*B > 32 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 36 + -1*B > 33 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 36 + -1*B > 34 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 36 + -1*B > 35 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 36 >= 36 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 36 >= 36 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 36 >= 36 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 36 >= 36 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 36 >= 36 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 36 >= 36 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 36 >= 36 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 36 >= 36 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 36 + -1*B >= 36 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 36 + -1*B >= 36 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 36 + -1*B >= 36 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 36 + -1*B >= 36 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 36 + -1*B >= 36 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 36 + -1*B >= 36 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 36 + -1*B >= 36 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 36 + -1*B >= 36 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 36 + -1*B >= 36 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 36 + -1*B >= 36 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 36 + -1*B >= 36 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 36 + -1*B >= 36 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 36 + -1*B >= 36 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 36 + -1*B >= 36 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 36 + -1*B >= 36 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 36 + -1*B >= 36 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 36 + -1*B >= 36 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 36 + -1*B >= 36 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 36 + -1*B >= 36 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 36 + -1*B >= 36 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 36 + -1*B >= 36 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 36 + -1*B >= 36 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 36 + -1*B >= 36 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 36 + -1*B >= 36 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 36 + -1*B >= 36 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 36 + -1*B >= 36 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 36 + -1*B >= 36 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 36 + -1*B >= 36 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 36 + -1*B >= 36 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 36 + -1*B >= 36 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 36 + -1*B >= 36 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 36 + -1*B >= 36 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 36 + -1*B >= 36 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 36 + -1*B >= 36 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 36 + -1*B >= 35 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 35 + -1*B >= 35 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 35 + -1*B >= 35 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 35 + -1*B >= 35 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 35 + -1*B >= 35 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 35 + -1*B >= 35 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 35 + -1*B >= 35 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 35 + -1*B >= 35 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 35 + -1*B >= 35 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 35 + -1*B >= 35 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 35 + -1*B >= 35 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 35 + -1*B >= 35 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 35 + -1*B >= 35 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 35 + -1*B >= 35 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 35 + -1*B >= 35 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 35 + -1*B >= 35 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 35 + -1*B >= 35 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 35 + -1*B >= 35 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 35 + -1*B >= 35 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 35 + -1*B >= 35 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 35 + -1*B >= 35 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 35 + -1*B >= 35 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 35 + -1*B >= 35 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 35 + -1*B >= 35 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 36 >= 36 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 36 >= 36 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 36 + -1*B >= 36 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 35 + -1*B >= 35 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 35 + -1*B >= -24 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 35 + -1*B >= -23 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 35 + -1*B >= -22 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 35 + -1*B >= -21 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 35 + -1*B >= -20 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 35 + -1*B >= -19 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 35 + -1*B >= -18 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 35 + -1*B >= -17 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 35 + -1*B >= -16 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 35 + -1*B >= -15 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 35 + -1*B >= -14 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 35 + -1*B >= -13 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 35 + -1*B >= -12 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 35 + -1*B >= -11 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 35 + -1*B >= -10 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 35 + -1*B >= -9 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 35 + -1*B >= -8 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 35 + -1*B >= -7 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 35 + -1*B >= -6 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 35 + -1*B >= -5 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 35 + -1*B >= -4 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 35 + -1*B >= -3 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 35 + -1*B >= -2 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 35 + -1*B >= -1 = f61(A,37,C) [B = 28] ==> f119(A,B,C) = 36 + -1*B >= 7 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 36 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 36 >= 36 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 36 >= 36 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 36 >= 36 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 36 >= 36 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 36 >= 36 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 36 >= 36 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 36 >= 36 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 36 >= 36 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 36 >= 36 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 36 >= 36 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 36 >= 36 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 36 >= 36 = f61(A,0,C) * Step 50: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (?,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 37*x13 p(f101) = -1*x2 + 37*x13 p(f103) = -1*x2 + 37*x13 p(f105) = -1*x2 + 37*x13 p(f107) = -1*x2 + 37*x13 p(f109) = -1*x2 + 37*x13 p(f11) = 37*x13 p(f111) = -1*x2 + 37*x13 p(f113) = -1*x2 + 37*x13 p(f115) = -1*x2 + 37*x13 p(f117) = -1*x2 + 37*x13 p(f119) = -1*x2 + 37*x13 p(f121) = -1*x2 + 37*x13 p(f123) = -1*x2 + 37*x13 p(f125) = -1*x2 + 37*x13 p(f127) = -1*x2 + 37*x13 p(f129) = -1*x2 + 37*x13 p(f13) = 37*x13 p(f131) = -1*x2 + 37*x13 p(f133) = -1*x2 + 37*x13 p(f135) = -1*x2 + 37*x13 p(f137) = -1*x2 + 36*x13 p(f139) = -1*x2 + 36*x13 p(f141) = -1*x2 + 36*x13 p(f143) = -1*x2 + 36*x13 p(f145) = -1*x2 + 36*x13 p(f147) = -1*x2 + 36*x13 p(f149) = -1*x2 + 36*x13 p(f15) = 37*x13 p(f151) = -1*x2 + 36*x13 p(f153) = -1*x2 + 36*x13 p(f155) = -1*x2 + 36*x13 p(f157) = -1*x2 + 36*x13 p(f159) = -1*x2 + 36*x13 p(f161) = -1*x2 + 36*x13 p(f163) = -1*x2 + 36*x13 p(f165) = -1*x2 + 36*x13 p(f167) = -1*x2 + 36*x13 p(f169) = -1*x2 + 36*x13 p(f17) = 37*x13 p(f171) = -1*x2 + 36*x13 p(f173) = -1*x2 + 36*x13 p(f175) = -1*x2 + 36*x13 p(f177) = -1*x2 + 36*x13 p(f179) = -1*x2 + 36*x13 p(f181) = -1*x2 + 36*x13 p(f19) = 37*x13 p(f21) = 37*x13 p(f23) = 37*x13 p(f25) = 37*x13 p(f27) = 37*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 37*x13 p(f65) = -1*x2 + 37*x13 p(f67) = -1*x2 + 37*x13 p(f69) = -1*x2 + 37*x13 p(f7) = 37*x13 p(f71) = -1*x2 + 37*x13 p(f73) = -1*x2 + 37*x13 p(f75) = -1*x2 + 37*x13 p(f77) = -1*x2 + 37*x13 p(f79) = -1*x2 + 37*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 37*x13 p(f83) = -1*x2 + 37*x13 p(f85) = -1*x2 + 37*x13 p(f87) = -1*x2 + 37*x13 p(f89) = -1*x2 + 37*x13 p(f91) = -1*x2 + 37*x13 p(f93) = -1*x2 + 37*x13 p(f95) = -1*x2 + 37*x13 p(f97) = -1*x2 + 37*x13 p(f99) = -1*x2 + 37*x13 Following rules are strictly oriented: [B = 36] ==> f135(A,B,C) = 37 + -1*B > 0 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 37 + -1*B > 1 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 37 + -1*B > 2 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 37 + -1*B > 3 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 37 + -1*B > 4 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 37 + -1*B > 5 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 37 + -1*B > 6 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 37 + -1*B > 7 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 37 + -1*B > 9 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 37 + -1*B > 10 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 37 + -1*B > 11 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 37 + -1*B > 12 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 37 + -1*B > 13 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 37 + -1*B > 14 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 37 + -1*B > 15 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 37 + -1*B > 16 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 37 + -1*B > 17 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 37 + -1*B > 18 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 37 + -1*B > 19 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 37 + -1*B > 20 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 37 + -1*B > 21 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 37 + -1*B > 22 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 37 + -1*B > 23 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 37 + -1*B > 24 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 37 + -1*B > 25 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 37 + -1*B > 26 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 37 + -1*B > 27 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 37 + -1*B > 28 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 37 + -1*B > 29 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 37 + -1*B > 30 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 37 + -1*B > 31 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 37 + -1*B > 32 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 37 + -1*B > 33 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 37 + -1*B > 34 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 37 + -1*B > 35 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 37 + -1*B > 36 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 37 >= 37 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 37 >= 37 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 37 >= 37 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 37 >= 37 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 37 >= 37 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 37 >= 37 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 37 >= 37 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 37 >= 37 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 37 + -1*B >= 37 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 37 + -1*B >= 37 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 37 + -1*B >= 37 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 37 + -1*B >= 37 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 37 + -1*B >= 37 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 37 + -1*B >= 37 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 37 + -1*B >= 37 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 37 + -1*B >= 37 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 37 + -1*B >= 37 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 37 + -1*B >= 37 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 37 + -1*B >= 37 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 37 + -1*B >= 37 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 37 + -1*B >= 37 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 37 + -1*B >= 37 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 37 + -1*B >= 37 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 37 + -1*B >= 37 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 37 + -1*B >= 37 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 37 + -1*B >= 37 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 37 + -1*B >= 37 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 37 + -1*B >= 37 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 37 + -1*B >= 37 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 37 + -1*B >= 37 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 37 + -1*B >= 37 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 37 + -1*B >= 37 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 37 + -1*B >= 37 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 37 + -1*B >= 37 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 37 + -1*B >= 37 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 37 + -1*B >= 37 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 37 + -1*B >= 37 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 37 + -1*B >= 37 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 37 + -1*B >= 37 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 37 + -1*B >= 37 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 37 + -1*B >= 37 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 37 + -1*B >= 37 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 37 + -1*B >= 37 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 37 + -1*B >= 36 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 36 + -1*B >= 36 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 36 + -1*B >= 36 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 36 + -1*B >= 36 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 36 + -1*B >= 36 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 36 + -1*B >= 36 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 36 + -1*B >= 36 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 36 + -1*B >= 36 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 36 + -1*B >= 36 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 36 + -1*B >= 36 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 36 + -1*B >= 36 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 36 + -1*B >= 36 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 36 + -1*B >= 36 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 36 + -1*B >= 36 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 36 + -1*B >= 36 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 36 + -1*B >= 36 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 36 + -1*B >= 36 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 36 + -1*B >= 36 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 36 + -1*B >= 36 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 36 + -1*B >= 36 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 36 + -1*B >= 36 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 36 + -1*B >= 36 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 36 + -1*B >= 36 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 37 >= 37 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 37 >= 37 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 37 + -1*B >= 37 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 36 + -1*B >= 36 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 36 + -1*B >= -23 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 36 + -1*B >= -22 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 36 + -1*B >= -21 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 36 + -1*B >= -20 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 36 + -1*B >= -19 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 36 + -1*B >= -18 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 36 + -1*B >= -17 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 36 + -1*B >= -16 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 36 + -1*B >= -15 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 36 + -1*B >= -14 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 36 + -1*B >= -13 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 36 + -1*B >= -12 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 36 + -1*B >= -11 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 36 + -1*B >= -10 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 36 + -1*B >= -9 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 36 + -1*B >= -8 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 36 + -1*B >= -7 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 36 + -1*B >= -6 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 36 + -1*B >= -5 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 36 + -1*B >= -4 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 36 + -1*B >= -3 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 36 + -1*B >= -2 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 36 + -1*B >= -1 = f61(A,38,C) [B = 28] ==> f119(A,B,C) = 37 + -1*B >= 8 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 37 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 37 >= 37 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 37 >= 37 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 37 >= 37 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 37 >= 37 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 37 >= 37 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 37 >= 37 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 37 >= 37 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 37 >= 37 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 37 >= 37 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 37 >= 37 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 37 >= 37 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 37 >= 37 = f61(A,0,C) * Step 51: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (?,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 38*x13 p(f101) = -1*x2 + 38*x13 p(f103) = -1*x2 + 38*x13 p(f105) = -1*x2 + 38*x13 p(f107) = -1*x2 + 38*x13 p(f109) = -1*x2 + 38*x13 p(f11) = 38*x13 p(f111) = -1*x2 + 38*x13 p(f113) = -1*x2 + 38*x13 p(f115) = -1*x2 + 38*x13 p(f117) = -1*x2 + 38*x13 p(f119) = -1*x2 + 38*x13 p(f121) = -1*x2 + 38*x13 p(f123) = -1*x2 + 38*x13 p(f125) = -1*x2 + 38*x13 p(f127) = -1*x2 + 38*x13 p(f129) = -1*x2 + 38*x13 p(f13) = 38*x13 p(f131) = -1*x2 + 38*x13 p(f133) = -1*x2 + 38*x13 p(f135) = -1*x2 + 38*x13 p(f137) = -1*x2 + 38*x13 p(f139) = -1*x2 + 38*x13 p(f141) = -1*x2 + 37*x13 p(f143) = -1*x2 + 37*x13 p(f145) = -1*x2 + 37*x13 p(f147) = -1*x2 + 37*x13 p(f149) = -1*x2 + 37*x13 p(f15) = 38*x13 p(f151) = -1*x2 + 37*x13 p(f153) = -1*x2 + 37*x13 p(f155) = -1*x2 + 37*x13 p(f157) = -1*x2 + 37*x13 p(f159) = -1*x2 + 37*x13 p(f161) = -1*x2 + 37*x13 p(f163) = -1*x2 + 37*x13 p(f165) = -1*x2 + 37*x13 p(f167) = -1*x2 + 37*x13 p(f169) = -1*x2 + 37*x13 p(f17) = 38*x13 p(f171) = -1*x2 + 37*x13 p(f173) = -1*x2 + 37*x13 p(f175) = -1*x2 + 37*x13 p(f177) = -1*x2 + 37*x13 p(f179) = -1*x2 + 37*x13 p(f181) = -1*x2 + 37*x13 p(f19) = 38*x13 p(f21) = 38*x13 p(f23) = 38*x13 p(f25) = 38*x13 p(f27) = 38*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 38*x13 p(f65) = -1*x2 + 38*x13 p(f67) = -1*x2 + 38*x13 p(f69) = -1*x2 + 38*x13 p(f7) = 38*x13 p(f71) = -1*x2 + 38*x13 p(f73) = -1*x2 + 38*x13 p(f75) = -1*x2 + 38*x13 p(f77) = -1*x2 + 38*x13 p(f79) = -1*x2 + 38*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 38*x13 p(f83) = -1*x2 + 38*x13 p(f85) = -1*x2 + 38*x13 p(f87) = -1*x2 + 38*x13 p(f89) = -1*x2 + 38*x13 p(f91) = -1*x2 + 38*x13 p(f93) = -1*x2 + 38*x13 p(f95) = -1*x2 + 38*x13 p(f97) = -1*x2 + 38*x13 p(f99) = -1*x2 + 38*x13 Following rules are strictly oriented: [B = 37] ==> f137(A,B,C) = 38 + -1*B > 0 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 38 + -1*B > 1 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 38 + -1*B > 2 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 38 + -1*B > 3 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 38 + -1*B > 4 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 38 + -1*B > 5 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 38 + -1*B > 6 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 38 + -1*B > 7 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 38 + -1*B > 8 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 38 + -1*B > 10 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 38 + -1*B > 11 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 38 + -1*B > 12 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 38 + -1*B > 13 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 38 + -1*B > 14 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 38 + -1*B > 15 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 38 + -1*B > 16 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 38 + -1*B > 17 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 38 + -1*B > 18 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 38 + -1*B > 19 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 38 + -1*B > 20 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 38 + -1*B > 21 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 38 + -1*B > 22 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 38 + -1*B > 23 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 38 + -1*B > 24 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 38 + -1*B > 25 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 38 + -1*B > 26 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 38 + -1*B > 27 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 38 + -1*B > 28 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 38 + -1*B > 29 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 38 + -1*B > 30 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 38 + -1*B > 31 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 38 + -1*B > 32 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 38 + -1*B > 33 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 38 + -1*B > 34 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 38 + -1*B > 35 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 38 + -1*B > 36 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 38 + -1*B > 37 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 38 >= 38 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 38 >= 38 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 38 >= 38 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 38 >= 38 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 38 >= 38 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 38 >= 38 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 38 >= 38 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 38 >= 38 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 38 + -1*B >= 38 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 38 + -1*B >= 38 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 38 + -1*B >= 38 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 38 + -1*B >= 38 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 38 + -1*B >= 38 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 38 + -1*B >= 38 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 38 + -1*B >= 38 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 38 + -1*B >= 38 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 38 + -1*B >= 38 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 38 + -1*B >= 38 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 38 + -1*B >= 38 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 38 + -1*B >= 38 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 38 + -1*B >= 38 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 38 + -1*B >= 38 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 38 + -1*B >= 38 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 38 + -1*B >= 38 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 38 + -1*B >= 38 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 38 + -1*B >= 38 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 38 + -1*B >= 38 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 38 + -1*B >= 38 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 38 + -1*B >= 38 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 38 + -1*B >= 38 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 38 + -1*B >= 38 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 38 + -1*B >= 38 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 38 + -1*B >= 38 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 38 + -1*B >= 38 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 38 + -1*B >= 38 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 38 + -1*B >= 38 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 38 + -1*B >= 38 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 38 + -1*B >= 38 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 38 + -1*B >= 38 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 38 + -1*B >= 38 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 38 + -1*B >= 38 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 38 + -1*B >= 38 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 38 + -1*B >= 38 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 38 + -1*B >= 38 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 38 + -1*B >= 38 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 38 + -1*B >= 37 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 37 + -1*B >= 37 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 37 + -1*B >= 37 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 37 + -1*B >= 37 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 37 + -1*B >= 37 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 37 + -1*B >= 37 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 37 + -1*B >= 37 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 37 + -1*B >= 37 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 37 + -1*B >= 37 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 37 + -1*B >= 37 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 37 + -1*B >= 37 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 37 + -1*B >= 37 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 37 + -1*B >= 37 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 37 + -1*B >= 37 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 37 + -1*B >= 37 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 37 + -1*B >= 37 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 37 + -1*B >= 37 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 37 + -1*B >= 37 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 37 + -1*B >= 37 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 37 + -1*B >= 37 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 37 + -1*B >= 37 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 38 >= 38 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 38 >= 38 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 38 + -1*B >= 38 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 37 + -1*B >= 37 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 37 + -1*B >= -22 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 37 + -1*B >= -21 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 37 + -1*B >= -20 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 37 + -1*B >= -19 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 37 + -1*B >= -18 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 37 + -1*B >= -17 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 37 + -1*B >= -16 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 37 + -1*B >= -15 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 37 + -1*B >= -14 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 37 + -1*B >= -13 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 37 + -1*B >= -12 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 37 + -1*B >= -11 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 37 + -1*B >= -10 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 37 + -1*B >= -9 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 37 + -1*B >= -8 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 37 + -1*B >= -7 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 37 + -1*B >= -6 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 37 + -1*B >= -5 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 37 + -1*B >= -4 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 37 + -1*B >= -3 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 37 + -1*B >= -2 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 38 + -1*B >= -1 = f61(A,39,C) [B = 28] ==> f119(A,B,C) = 38 + -1*B >= 9 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 38 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 38 >= 38 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 38 >= 38 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 38 >= 38 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 38 >= 38 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 38 >= 38 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 38 >= 38 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 38 >= 38 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 38 >= 38 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 38 >= 38 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 38 >= 38 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 38 >= 38 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 38 >= 38 = f61(A,0,C) * Step 52: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (?,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 58*x13 p(f101) = -1*x2 + 58*x13 p(f103) = -1*x2 + 58*x13 p(f105) = -1*x2 + 58*x13 p(f107) = -1*x2 + 58*x13 p(f109) = -1*x2 + 58*x13 p(f11) = 58*x13 p(f111) = -1*x2 + 58*x13 p(f113) = -1*x2 + 58*x13 p(f115) = -1*x2 + 58*x13 p(f117) = -1*x2 + 58*x13 p(f119) = -1*x2 + 58*x13 p(f121) = -1*x2 + 58*x13 p(f123) = -1*x2 + 58*x13 p(f125) = -1*x2 + 58*x13 p(f127) = -1*x2 + 58*x13 p(f129) = -1*x2 + 58*x13 p(f13) = 58*x13 p(f131) = -1*x2 + 58*x13 p(f133) = -1*x2 + 58*x13 p(f135) = -1*x2 + 58*x13 p(f137) = -1*x2 + 58*x13 p(f139) = -1*x2 + 58*x13 p(f141) = -1*x2 + 58*x13 p(f143) = -1*x2 + 58*x13 p(f145) = -1*x2 + 58*x13 p(f147) = -1*x2 + 58*x13 p(f149) = -1*x2 + 58*x13 p(f15) = 58*x13 p(f151) = -1*x2 + 58*x13 p(f153) = -1*x2 + 58*x13 p(f155) = -1*x2 + 58*x13 p(f157) = -1*x2 + 58*x13 p(f159) = -1*x2 + 58*x13 p(f161) = -1*x2 + 58*x13 p(f163) = -1*x2 + 58*x13 p(f165) = -1*x2 + 58*x13 p(f167) = -1*x2 + 58*x13 p(f169) = -1*x2 + 58*x13 p(f17) = 58*x13 p(f171) = -1*x2 + 58*x13 p(f173) = -1*x2 + 58*x13 p(f175) = -1*x2 + 58*x13 p(f177) = -1*x2 + 58*x13 p(f179) = -1*x2 + 57*x13 p(f181) = -1*x2 + 57*x13 p(f19) = 58*x13 p(f21) = 58*x13 p(f23) = 58*x13 p(f25) = 58*x13 p(f27) = 58*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 58*x13 p(f65) = -1*x2 + 58*x13 p(f67) = -1*x2 + 58*x13 p(f69) = -1*x2 + 58*x13 p(f7) = 58*x13 p(f71) = -1*x2 + 58*x13 p(f73) = -1*x2 + 58*x13 p(f75) = -1*x2 + 58*x13 p(f77) = -1*x2 + 58*x13 p(f79) = -1*x2 + 58*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 58*x13 p(f83) = -1*x2 + 58*x13 p(f85) = -1*x2 + 58*x13 p(f87) = -1*x2 + 58*x13 p(f89) = -1*x2 + 58*x13 p(f91) = -1*x2 + 58*x13 p(f93) = -1*x2 + 58*x13 p(f95) = -1*x2 + 58*x13 p(f97) = -1*x2 + 58*x13 p(f99) = -1*x2 + 58*x13 Following rules are strictly oriented: [B = 57] ==> f177(A,B,C) = 58 + -1*B > 0 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 58 + -1*B > 1 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 58 + -1*B > 2 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 58 + -1*B > 3 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 58 + -1*B > 4 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 58 + -1*B > 5 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 58 + -1*B > 6 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 58 + -1*B > 7 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 58 + -1*B > 8 = f61(A,50,C) [B = 44] ==> f151(A,B,C) = 58 + -1*B > 13 = f61(A,45,C) [B = 38] ==> f139(A,B,C) = 58 + -1*B > 19 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 58 + -1*B > 20 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 58 + -1*B > 21 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 58 + -1*B > 22 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 58 + -1*B > 23 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 58 + -1*B > 24 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 58 + -1*B > 25 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 58 + -1*B > 26 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 58 + -1*B > 27 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 58 + -1*B > 28 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 58 + -1*B > 30 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 58 + -1*B > 31 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 58 + -1*B > 32 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 58 + -1*B > 33 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 58 + -1*B > 34 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 58 + -1*B > 35 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 58 + -1*B > 36 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 58 + -1*B > 37 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 58 + -1*B > 38 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 58 + -1*B > 39 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 58 + -1*B > 40 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 58 + -1*B > 41 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 58 + -1*B > 42 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 58 + -1*B > 43 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 58 + -1*B > 44 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 58 + -1*B > 45 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 58 + -1*B > 46 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 58 + -1*B > 47 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 58 + -1*B > 48 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 58 + -1*B > 49 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 58 + -1*B > 50 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 58 + -1*B > 51 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 58 + -1*B > 52 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 58 + -1*B > 53 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 58 + -1*B > 54 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 58 + -1*B > 55 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 58 + -1*B > 56 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 58 + -1*B > 57 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 58 >= 58 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 58 >= 58 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 58 >= 58 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 58 >= 58 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 58 >= 58 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 58 >= 58 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 58 >= 58 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 58 >= 58 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 58 + -1*B >= 58 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 58 + -1*B >= 58 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 58 + -1*B >= 58 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 58 + -1*B >= 58 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 58 + -1*B >= 58 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 58 + -1*B >= 58 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 58 + -1*B >= 58 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 58 + -1*B >= 58 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 58 + -1*B >= 58 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 58 + -1*B >= 58 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 58 + -1*B >= 58 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 58 + -1*B >= 58 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 58 + -1*B >= 58 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 58 + -1*B >= 58 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 58 + -1*B >= 58 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 58 + -1*B >= 58 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 58 + -1*B >= 58 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 58 + -1*B >= 58 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 58 + -1*B >= 58 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 58 + -1*B >= 58 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 58 + -1*B >= 58 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 58 + -1*B >= 58 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 58 + -1*B >= 58 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 58 + -1*B >= 58 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 58 + -1*B >= 58 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 58 + -1*B >= 58 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 58 + -1*B >= 58 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 58 + -1*B >= 58 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 58 + -1*B >= 58 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 58 + -1*B >= 58 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 58 + -1*B >= 58 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 58 + -1*B >= 58 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 58 + -1*B >= 58 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 58 + -1*B >= 58 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 58 + -1*B >= 58 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 58 + -1*B >= 58 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 58 + -1*B >= 58 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 58 + -1*B >= 58 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 58 + -1*B >= 58 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 58 + -1*B >= 58 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 58 + -1*B >= 58 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 58 + -1*B >= 58 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 58 + -1*B >= 58 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 58 + -1*B >= 58 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 58 + -1*B >= 58 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 58 + -1*B >= 58 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 58 + -1*B >= 58 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 58 + -1*B >= 58 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 58 + -1*B >= 58 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 58 + -1*B >= 58 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 58 + -1*B >= 58 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 58 + -1*B >= 58 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 58 + -1*B >= 58 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 58 + -1*B >= 58 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 58 + -1*B >= 58 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 58 + -1*B >= 58 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 58 + -1*B >= 57 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 57 + -1*B >= 57 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 58 >= 58 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 58 >= 58 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 58 + -1*B >= 58 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 57 + -1*B >= 57 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 57 + -1*B >= -2 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 57 + -1*B >= -1 = f61(A,59,C) [B = 48] ==> f159(A,B,C) = 58 + -1*B >= 9 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 58 + -1*B >= 10 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 58 + -1*B >= 11 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 58 + -1*B >= 12 = f61(A,46,C) [B = 43] ==> f149(A,B,C) = 58 + -1*B >= 14 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 58 + -1*B >= 15 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 58 + -1*B >= 16 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 58 + -1*B >= 17 = f61(A,41,C) [B = 39] ==> f141(A,B,C) = 58 + -1*B >= 18 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 58 + -1*B >= 29 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 58 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 58 >= 58 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 58 >= 58 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 58 >= 58 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 58 >= 58 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 58 >= 58 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 58 >= 58 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 58 >= 58 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 58 >= 58 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 58 >= 58 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 58 >= 58 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 58 >= 58 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 58 >= 58 = f61(A,0,C) * Step 53: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (?,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 40*x13 p(f101) = -1*x2 + 40*x13 p(f103) = -1*x2 + 40*x13 p(f105) = -1*x2 + 40*x13 p(f107) = -1*x2 + 40*x13 p(f109) = -1*x2 + 40*x13 p(f11) = 40*x13 p(f111) = -1*x2 + 40*x13 p(f113) = -1*x2 + 40*x13 p(f115) = -1*x2 + 40*x13 p(f117) = -1*x2 + 40*x13 p(f119) = -1*x2 + 40*x13 p(f121) = -1*x2 + 40*x13 p(f123) = -1*x2 + 40*x13 p(f125) = -1*x2 + 40*x13 p(f127) = -1*x2 + 40*x13 p(f129) = -1*x2 + 40*x13 p(f13) = 40*x13 p(f131) = -1*x2 + 40*x13 p(f133) = -1*x2 + 40*x13 p(f135) = -1*x2 + 40*x13 p(f137) = -1*x2 + 40*x13 p(f139) = -1*x2 + 40*x13 p(f141) = -1*x2 + 40*x13 p(f143) = -1*x2 + 39*x13 p(f145) = -1*x2 + 39*x13 p(f147) = -1*x2 + 39*x13 p(f149) = -1*x2 + 39*x13 p(f15) = 40*x13 p(f151) = -1*x2 + 39*x13 p(f153) = -1*x2 + 39*x13 p(f155) = -1*x2 + 39*x13 p(f157) = -1*x2 + 39*x13 p(f159) = -1*x2 + 39*x13 p(f161) = -1*x2 + 39*x13 p(f163) = -1*x2 + 39*x13 p(f165) = -1*x2 + 39*x13 p(f167) = -1*x2 + 39*x13 p(f169) = -1*x2 + 39*x13 p(f17) = 40*x13 p(f171) = -1*x2 + 39*x13 p(f173) = -1*x2 + 39*x13 p(f175) = -1*x2 + 39*x13 p(f177) = -1*x2 + 39*x13 p(f179) = -1*x2 + 39*x13 p(f181) = -1*x2 + 39*x13 p(f19) = 40*x13 p(f21) = 40*x13 p(f23) = 40*x13 p(f25) = 40*x13 p(f27) = 40*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 40*x13 p(f65) = -1*x2 + 40*x13 p(f67) = -1*x2 + 40*x13 p(f69) = -1*x2 + 40*x13 p(f7) = 40*x13 p(f71) = -1*x2 + 40*x13 p(f73) = -1*x2 + 40*x13 p(f75) = -1*x2 + 40*x13 p(f77) = -1*x2 + 40*x13 p(f79) = -1*x2 + 40*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 40*x13 p(f83) = -1*x2 + 40*x13 p(f85) = -1*x2 + 40*x13 p(f87) = -1*x2 + 40*x13 p(f89) = -1*x2 + 40*x13 p(f91) = -1*x2 + 40*x13 p(f93) = -1*x2 + 40*x13 p(f95) = -1*x2 + 40*x13 p(f97) = -1*x2 + 40*x13 p(f99) = -1*x2 + 40*x13 Following rules are strictly oriented: [B = 39] ==> f141(A,B,C) = 40 + -1*B > 0 = f61(A,40,C) [B = 38] ==> f139(A,B,C) = 40 + -1*B > 1 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 40 + -1*B > 2 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 40 + -1*B > 3 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 40 + -1*B > 4 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 40 + -1*B > 5 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 40 + -1*B > 6 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 40 + -1*B > 7 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 40 + -1*B > 8 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 40 + -1*B > 9 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 40 + -1*B > 10 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 40 + -1*B > 12 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 40 + -1*B > 13 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 40 + -1*B > 14 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 40 + -1*B > 15 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 40 + -1*B > 16 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 40 + -1*B > 17 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 40 + -1*B > 18 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 40 + -1*B > 19 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 40 + -1*B > 20 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 40 + -1*B > 21 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 40 + -1*B > 22 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 40 + -1*B > 23 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 40 + -1*B > 24 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 40 + -1*B > 25 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 40 + -1*B > 26 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 40 + -1*B > 27 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 40 + -1*B > 28 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 40 + -1*B > 29 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 40 + -1*B > 30 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 40 + -1*B > 31 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 40 + -1*B > 32 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 40 + -1*B > 33 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 40 + -1*B > 34 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 40 + -1*B > 35 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 40 + -1*B > 36 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 40 + -1*B > 37 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 40 + -1*B > 38 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 40 + -1*B > 39 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 40 >= 40 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 40 >= 40 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 40 >= 40 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 40 >= 40 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 40 >= 40 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 40 >= 40 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 40 >= 40 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 40 >= 40 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 40 + -1*B >= 40 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 40 + -1*B >= 40 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 40 + -1*B >= 40 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 40 + -1*B >= 40 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 40 + -1*B >= 40 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 40 + -1*B >= 40 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 40 + -1*B >= 40 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 40 + -1*B >= 40 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 40 + -1*B >= 40 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 40 + -1*B >= 40 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 40 + -1*B >= 40 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 40 + -1*B >= 40 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 40 + -1*B >= 40 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 40 + -1*B >= 40 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 40 + -1*B >= 40 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 40 + -1*B >= 40 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 40 + -1*B >= 40 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 40 + -1*B >= 40 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 40 + -1*B >= 40 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 40 + -1*B >= 40 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 40 + -1*B >= 40 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 40 + -1*B >= 40 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 40 + -1*B >= 40 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 40 + -1*B >= 40 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 40 + -1*B >= 40 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 40 + -1*B >= 40 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 40 + -1*B >= 40 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 40 + -1*B >= 40 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 40 + -1*B >= 40 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 40 + -1*B >= 40 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 40 + -1*B >= 40 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 40 + -1*B >= 40 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 40 + -1*B >= 40 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 40 + -1*B >= 40 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 40 + -1*B >= 40 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 40 + -1*B >= 40 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 40 + -1*B >= 40 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 40 + -1*B >= 40 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 40 + -1*B >= 39 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 39 + -1*B >= 39 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 39 + -1*B >= 39 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 39 + -1*B >= 39 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 39 + -1*B >= 39 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 39 + -1*B >= 39 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 39 + -1*B >= 39 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 39 + -1*B >= 39 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 39 + -1*B >= 39 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 39 + -1*B >= 39 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 39 + -1*B >= 39 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 39 + -1*B >= 39 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 39 + -1*B >= 39 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 39 + -1*B >= 39 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 39 + -1*B >= 39 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 39 + -1*B >= 39 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 39 + -1*B >= 39 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 39 + -1*B >= 39 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 39 + -1*B >= 39 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 39 + -1*B >= 39 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 40 >= 40 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 40 >= 40 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 40 + -1*B >= 40 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 39 + -1*B >= 39 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 39 + -1*B >= -20 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 39 + -1*B >= -19 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 39 + -1*B >= -18 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 39 + -1*B >= -17 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 39 + -1*B >= -16 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 39 + -1*B >= -15 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 39 + -1*B >= -14 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 39 + -1*B >= -13 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 39 + -1*B >= -12 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 39 + -1*B >= -11 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 39 + -1*B >= -10 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 39 + -1*B >= -9 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 39 + -1*B >= -8 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 39 + -1*B >= -7 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 39 + -1*B >= -6 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 39 + -1*B >= -5 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 39 + -1*B >= -4 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 39 + -1*B >= -3 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 39 + -1*B >= -2 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 39 + -1*B >= -1 = f61(A,41,C) [B = 28] ==> f119(A,B,C) = 40 + -1*B >= 11 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 40 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 40 >= 40 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 40 >= 40 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 40 >= 40 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 40 >= 40 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 40 >= 40 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 40 >= 40 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 40 >= 40 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 40 >= 40 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 40 >= 40 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 40 >= 40 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 40 >= 40 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 40 >= 40 = f61(A,0,C) * Step 54: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (?,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 42*x13 p(f101) = -1*x2 + 41*x13 p(f103) = -1*x2 + 41*x13 p(f105) = -1*x2 + 41*x13 p(f107) = -1*x2 + 41*x13 p(f109) = -1*x2 + 41*x13 p(f11) = 41*x13 p(f111) = -1*x2 + 41*x13 p(f113) = -1*x2 + 41*x13 p(f115) = -1*x2 + 41*x13 p(f117) = -1*x2 + 41*x13 p(f119) = -1*x2 + 41*x13 p(f121) = -1*x2 + 41*x13 p(f123) = -1*x2 + 41*x13 p(f125) = -1*x2 + 41*x13 p(f127) = -1*x2 + 41*x13 p(f129) = -1*x2 + 41*x13 p(f13) = 41*x13 p(f131) = -1*x2 + 41*x13 p(f133) = -1*x2 + 41*x13 p(f135) = -1*x2 + 41*x13 p(f137) = -1*x2 + 41*x13 p(f139) = -1*x2 + 41*x13 p(f141) = -1*x2 + 41*x13 p(f143) = -1*x2 + 41*x13 p(f145) = -1*x2 + 40*x13 p(f147) = -1*x2 + 40*x13 p(f149) = -1*x2 + 40*x13 p(f15) = 41*x13 p(f151) = -1*x2 + 40*x13 p(f153) = -1*x2 + 40*x13 p(f155) = -1*x2 + 40*x13 p(f157) = -1*x2 + 40*x13 p(f159) = -1*x2 + 40*x13 p(f161) = -1*x2 + 40*x13 p(f163) = -1*x2 + 40*x13 p(f165) = -1*x2 + 40*x13 p(f167) = -1*x2 + 40*x13 p(f169) = -1*x2 + 40*x13 p(f17) = 41*x13 p(f171) = -1*x2 + 40*x13 p(f173) = -1*x2 + 40*x13 p(f175) = -1*x2 + 40*x13 p(f177) = -1*x2 + 40*x13 p(f179) = -1*x2 + 40*x13 p(f181) = -1*x2 + 40*x13 p(f19) = 41*x13 p(f21) = 41*x13 p(f23) = 41*x13 p(f25) = 41*x13 p(f27) = 41*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 41*x13 p(f65) = -1*x2 + 41*x13 p(f67) = -1*x2 + 41*x13 p(f69) = -1*x2 + 41*x13 p(f7) = 41*x13 p(f71) = -1*x2 + 41*x13 p(f73) = -1*x2 + 41*x13 p(f75) = -1*x2 + 41*x13 p(f77) = -1*x2 + 41*x13 p(f79) = -1*x2 + 41*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 41*x13 p(f83) = -1*x2 + 41*x13 p(f85) = -1*x2 + 41*x13 p(f87) = -1*x2 + 41*x13 p(f89) = -1*x2 + 41*x13 p(f91) = -1*x2 + 41*x13 p(f93) = -1*x2 + 41*x13 p(f95) = -1*x2 + 41*x13 p(f97) = -1*x2 + 41*x13 p(f99) = -1*x2 + 41*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 42 > 41 = f7(0,B,C) [B = 40] ==> f143(A,B,C) = 41 + -1*B > 0 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 41 + -1*B > 2 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 41 + -1*B > 3 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 41 + -1*B > 4 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 41 + -1*B > 5 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 41 + -1*B > 6 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 41 + -1*B > 7 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 41 + -1*B > 8 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 41 + -1*B > 9 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 41 + -1*B > 10 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 41 + -1*B > 11 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 41 + -1*B > 13 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 41 + -1*B > 14 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 41 + -1*B > 15 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 41 + -1*B > 16 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 41 + -1*B > 17 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 41 + -1*B > 18 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 41 + -1*B > 19 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 41 + -1*B > 20 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 41 + -1*B > 21 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 41 + -1*B > 22 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 41 + -1*B > 23 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 41 + -1*B > 24 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 41 + -1*B > 25 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 41 + -1*B > 26 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 41 + -1*B > 27 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 41 + -1*B > 28 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 41 + -1*B > 29 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 41 + -1*B > 30 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 41 + -1*B > 31 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 41 + -1*B > 32 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 41 + -1*B > 33 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 41 + -1*B > 34 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 41 + -1*B > 35 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 41 + -1*B > 36 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 41 + -1*B > 37 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 41 + -1*B > 38 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 41 + -1*B > 39 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 41 + -1*B > 40 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 41 >= 41 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 41 >= 41 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 41 >= 41 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 41 >= 41 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 41 >= 41 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 41 >= 41 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 41 >= 41 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 41 >= 41 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 41 + -1*B >= 41 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 41 + -1*B >= 41 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 41 + -1*B >= 41 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 41 + -1*B >= 41 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 41 + -1*B >= 41 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 41 + -1*B >= 41 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 41 + -1*B >= 41 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 41 + -1*B >= 41 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 41 + -1*B >= 41 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 41 + -1*B >= 41 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 41 + -1*B >= 41 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 41 + -1*B >= 41 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 41 + -1*B >= 41 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 41 + -1*B >= 41 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 41 + -1*B >= 41 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 41 + -1*B >= 41 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 41 + -1*B >= 41 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 41 + -1*B >= 41 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 41 + -1*B >= 41 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 41 + -1*B >= 41 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 41 + -1*B >= 41 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 41 + -1*B >= 41 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 41 + -1*B >= 41 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 41 + -1*B >= 41 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 41 + -1*B >= 41 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 41 + -1*B >= 41 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 41 + -1*B >= 41 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 41 + -1*B >= 41 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 41 + -1*B >= 41 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 41 + -1*B >= 41 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 41 + -1*B >= 41 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 41 + -1*B >= 41 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 41 + -1*B >= 41 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 41 + -1*B >= 41 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 41 + -1*B >= 41 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 41 + -1*B >= 41 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 41 + -1*B >= 41 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 41 + -1*B >= 41 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 41 + -1*B >= 41 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 41 + -1*B >= 40 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 40 + -1*B >= 40 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 40 + -1*B >= 40 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 40 + -1*B >= 40 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 40 + -1*B >= 40 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 40 + -1*B >= 40 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 40 + -1*B >= 40 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 40 + -1*B >= 40 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 40 + -1*B >= 40 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 40 + -1*B >= 40 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 40 + -1*B >= 40 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 40 + -1*B >= 40 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 40 + -1*B >= 40 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 40 + -1*B >= 40 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 40 + -1*B >= 40 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 40 + -1*B >= 40 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 40 + -1*B >= 40 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 40 + -1*B >= 40 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 40 + -1*B >= 40 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 41 >= 41 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 41 + -1*B >= 41 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 40 + -1*B >= 40 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 40 + -1*B >= -19 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 40 + -1*B >= -18 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 40 + -1*B >= -17 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 40 + -1*B >= -16 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 40 + -1*B >= -15 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 40 + -1*B >= -14 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 40 + -1*B >= -13 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 40 + -1*B >= -12 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 40 + -1*B >= -11 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 40 + -1*B >= -10 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 40 + -1*B >= -9 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 40 + -1*B >= -8 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 40 + -1*B >= -7 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 40 + -1*B >= -6 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 40 + -1*B >= -5 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 40 + -1*B >= -4 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 40 + -1*B >= -3 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 40 + -1*B >= -2 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 40 + -1*B >= -1 = f61(A,42,C) [B = 39] ==> f141(A,B,C) = 41 + -1*B >= 1 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 41 + -1*B >= 12 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 41 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 41 >= 41 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 41 >= 41 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 41 >= 41 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 41 >= 41 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 41 >= 41 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 41 >= 41 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 41 >= 41 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 41 >= 41 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 41 >= 41 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 41 >= 41 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 41 >= 41 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 41 >= 41 = f61(A,0,C) * Step 55: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (?,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 42*x13 p(f101) = -1*x2 + 42*x13 p(f103) = -1*x2 + 42*x13 p(f105) = -1*x2 + 42*x13 p(f107) = -1*x2 + 42*x13 p(f109) = -1*x2 + 42*x13 p(f11) = 42*x13 p(f111) = -1*x2 + 42*x13 p(f113) = -1*x2 + 42*x13 p(f115) = -1*x2 + 42*x13 p(f117) = -1*x2 + 42*x13 p(f119) = -1*x2 + 42*x13 p(f121) = -1*x2 + 42*x13 p(f123) = -1*x2 + 42*x13 p(f125) = -1*x2 + 42*x13 p(f127) = -1*x2 + 42*x13 p(f129) = -1*x2 + 42*x13 p(f13) = 42*x13 p(f131) = -1*x2 + 42*x13 p(f133) = -1*x2 + 42*x13 p(f135) = -1*x2 + 42*x13 p(f137) = -1*x2 + 42*x13 p(f139) = -1*x2 + 42*x13 p(f141) = -1*x2 + 42*x13 p(f143) = -1*x2 + 42*x13 p(f145) = -1*x2 + 42*x13 p(f147) = -1*x2 + 41*x13 p(f149) = -1*x2 + 41*x13 p(f15) = 42*x13 p(f151) = -1*x2 + 41*x13 p(f153) = -1*x2 + 41*x13 p(f155) = -1*x2 + 41*x13 p(f157) = -1*x2 + 41*x13 p(f159) = -1*x2 + 41*x13 p(f161) = -1*x2 + 41*x13 p(f163) = -1*x2 + 41*x13 p(f165) = -1*x2 + 41*x13 p(f167) = -1*x2 + 41*x13 p(f169) = -1*x2 + 41*x13 p(f17) = 42*x13 p(f171) = -1*x2 + 41*x13 p(f173) = -1*x2 + 41*x13 p(f175) = -1*x2 + 41*x13 p(f177) = -1*x2 + 41*x13 p(f179) = -1*x2 + 41*x13 p(f181) = -1*x2 + 41*x13 p(f19) = 42*x13 p(f21) = 42*x13 p(f23) = 42*x13 p(f25) = 42*x13 p(f27) = 42*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 42*x13 p(f65) = -1*x2 + 42*x13 p(f67) = -1*x2 + 42*x13 p(f69) = -1*x2 + 42*x13 p(f7) = 42*x13 p(f71) = -1*x2 + 42*x13 p(f73) = -1*x2 + 42*x13 p(f75) = -1*x2 + 42*x13 p(f77) = -1*x2 + 42*x13 p(f79) = -1*x2 + 42*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 42*x13 p(f83) = -1*x2 + 42*x13 p(f85) = -1*x2 + 42*x13 p(f87) = -1*x2 + 42*x13 p(f89) = -1*x2 + 42*x13 p(f91) = -1*x2 + 42*x13 p(f93) = -1*x2 + 42*x13 p(f95) = -1*x2 + 42*x13 p(f97) = -1*x2 + 42*x13 p(f99) = -1*x2 + 42*x13 Following rules are strictly oriented: [B = 41] ==> f145(A,B,C) = 42 + -1*B > 0 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 42 + -1*B > 1 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 42 + -1*B > 3 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 42 + -1*B > 4 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 42 + -1*B > 5 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 42 + -1*B > 6 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 42 + -1*B > 7 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 42 + -1*B > 8 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 42 + -1*B > 9 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 42 + -1*B > 10 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 42 + -1*B > 11 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 42 + -1*B > 12 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 42 + -1*B > 14 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 42 + -1*B > 15 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 42 + -1*B > 16 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 42 + -1*B > 17 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 42 + -1*B > 18 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 42 + -1*B > 19 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 42 + -1*B > 20 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 42 + -1*B > 21 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 42 + -1*B > 22 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 42 + -1*B > 23 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 42 + -1*B > 24 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 42 + -1*B > 25 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 42 + -1*B > 26 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 42 + -1*B > 27 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 42 + -1*B > 28 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 42 + -1*B > 29 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 42 + -1*B > 30 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 42 + -1*B > 31 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 42 + -1*B > 32 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 42 + -1*B > 33 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 42 + -1*B > 34 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 42 + -1*B > 35 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 42 + -1*B > 36 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 42 + -1*B > 37 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 42 + -1*B > 38 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 42 + -1*B > 39 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 42 + -1*B > 40 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 42 + -1*B > 41 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 42 >= 42 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 42 >= 42 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 42 >= 42 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 42 >= 42 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 42 >= 42 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 42 >= 42 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 42 >= 42 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 42 >= 42 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 42 + -1*B >= 42 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 42 + -1*B >= 42 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 42 + -1*B >= 42 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 42 + -1*B >= 42 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 42 + -1*B >= 42 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 42 + -1*B >= 42 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 42 + -1*B >= 42 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 42 + -1*B >= 42 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 42 + -1*B >= 42 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 42 + -1*B >= 42 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 42 + -1*B >= 42 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 42 + -1*B >= 42 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 42 + -1*B >= 42 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 42 + -1*B >= 42 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 42 + -1*B >= 42 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 42 + -1*B >= 42 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 42 + -1*B >= 42 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 42 + -1*B >= 42 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 42 + -1*B >= 42 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 42 + -1*B >= 42 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 42 + -1*B >= 42 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 42 + -1*B >= 42 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 42 + -1*B >= 42 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 42 + -1*B >= 42 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 42 + -1*B >= 42 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 42 + -1*B >= 42 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 42 + -1*B >= 42 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 42 + -1*B >= 42 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 42 + -1*B >= 42 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 42 + -1*B >= 42 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 42 + -1*B >= 42 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 42 + -1*B >= 42 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 42 + -1*B >= 42 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 42 + -1*B >= 42 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 42 + -1*B >= 42 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 42 + -1*B >= 42 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 42 + -1*B >= 42 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 42 + -1*B >= 42 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 42 + -1*B >= 42 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 42 + -1*B >= 42 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 42 + -1*B >= 41 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 41 + -1*B >= 41 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 41 + -1*B >= 41 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 41 + -1*B >= 41 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 41 + -1*B >= 41 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 41 + -1*B >= 41 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 41 + -1*B >= 41 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 41 + -1*B >= 41 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 41 + -1*B >= 41 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 41 + -1*B >= 41 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 41 + -1*B >= 41 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 41 + -1*B >= 41 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 41 + -1*B >= 41 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 41 + -1*B >= 41 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 41 + -1*B >= 41 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 41 + -1*B >= 41 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 41 + -1*B >= 41 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 41 + -1*B >= 41 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 42 >= 42 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 42 >= 42 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 42 + -1*B >= 42 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 41 + -1*B >= 41 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 41 + -1*B >= -18 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 41 + -1*B >= -17 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 41 + -1*B >= -16 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 41 + -1*B >= -15 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 41 + -1*B >= -14 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 41 + -1*B >= -13 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 41 + -1*B >= -12 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 41 + -1*B >= -11 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 41 + -1*B >= -10 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 41 + -1*B >= -9 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 41 + -1*B >= -8 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 41 + -1*B >= -7 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 41 + -1*B >= -6 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 41 + -1*B >= -5 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 41 + -1*B >= -4 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 41 + -1*B >= -3 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 41 + -1*B >= -2 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 41 + -1*B >= -1 = f61(A,43,C) [B = 39] ==> f141(A,B,C) = 42 + -1*B >= 2 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 42 + -1*B >= 13 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 42 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 42 >= 42 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 42 >= 42 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 42 >= 42 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 42 >= 42 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 42 >= 42 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 42 >= 42 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 42 >= 42 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 42 >= 42 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 42 >= 42 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 42 >= 42 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 42 >= 42 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 42 >= 42 = f61(A,0,C) * Step 56: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (?,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 44*x13 p(f101) = -1*x2 + 43*x13 p(f103) = -1*x2 + 43*x13 p(f105) = -1*x2 + 43*x13 p(f107) = -1*x2 + 43*x13 p(f109) = -1*x2 + 43*x13 p(f11) = 43*x13 p(f111) = -1*x2 + 43*x13 p(f113) = -1*x2 + 43*x13 p(f115) = -1*x2 + 43*x13 p(f117) = -1*x2 + 43*x13 p(f119) = -1*x2 + 43*x13 p(f121) = -1*x2 + 43*x13 p(f123) = -1*x2 + 43*x13 p(f125) = -1*x2 + 43*x13 p(f127) = -1*x2 + 43*x13 p(f129) = -1*x2 + 43*x13 p(f13) = 43*x13 p(f131) = -1*x2 + 43*x13 p(f133) = -1*x2 + 43*x13 p(f135) = -1*x2 + 43*x13 p(f137) = -1*x2 + 43*x13 p(f139) = -1*x2 + 43*x13 p(f141) = -1*x2 + 43*x13 p(f143) = -1*x2 + 43*x13 p(f145) = -1*x2 + 43*x13 p(f147) = -1*x2 + 43*x13 p(f149) = -1*x2 + 42*x13 p(f15) = 43*x13 p(f151) = -1*x2 + 42*x13 p(f153) = -1*x2 + 42*x13 p(f155) = -1*x2 + 42*x13 p(f157) = -1*x2 + 42*x13 p(f159) = -1*x2 + 42*x13 p(f161) = -1*x2 + 42*x13 p(f163) = -1*x2 + 42*x13 p(f165) = -1*x2 + 42*x13 p(f167) = -1*x2 + 42*x13 p(f169) = -1*x2 + 42*x13 p(f17) = 43*x13 p(f171) = -1*x2 + 42*x13 p(f173) = -1*x2 + 42*x13 p(f175) = -1*x2 + 42*x13 p(f177) = -1*x2 + 42*x13 p(f179) = -1*x2 + 42*x13 p(f181) = -1*x2 + 42*x13 p(f19) = 43*x13 p(f21) = 43*x13 p(f23) = 43*x13 p(f25) = 43*x13 p(f27) = 43*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 43*x13 p(f65) = -1*x2 + 43*x13 p(f67) = -1*x2 + 43*x13 p(f69) = -1*x2 + 43*x13 p(f7) = 43*x13 p(f71) = -1*x2 + 43*x13 p(f73) = -1*x2 + 43*x13 p(f75) = -1*x2 + 43*x13 p(f77) = -1*x2 + 43*x13 p(f79) = -1*x2 + 43*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 43*x13 p(f83) = -1*x2 + 43*x13 p(f85) = -1*x2 + 43*x13 p(f87) = -1*x2 + 43*x13 p(f89) = -1*x2 + 43*x13 p(f91) = -1*x2 + 43*x13 p(f93) = -1*x2 + 43*x13 p(f95) = -1*x2 + 43*x13 p(f97) = -1*x2 + 43*x13 p(f99) = -1*x2 + 43*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 44 > 43 = f7(0,B,C) [B = 42] ==> f147(A,B,C) = 43 + -1*B > 0 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 43 + -1*B > 1 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 43 + -1*B > 2 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 43 + -1*B > 4 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 43 + -1*B > 5 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 43 + -1*B > 6 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 43 + -1*B > 7 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 43 + -1*B > 8 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 43 + -1*B > 9 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 43 + -1*B > 10 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 43 + -1*B > 11 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 43 + -1*B > 12 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 43 + -1*B > 13 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 43 + -1*B > 15 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 43 + -1*B > 16 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 43 + -1*B > 17 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 43 + -1*B > 18 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 43 + -1*B > 19 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 43 + -1*B > 20 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 43 + -1*B > 21 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 43 + -1*B > 22 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 43 + -1*B > 23 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 43 + -1*B > 24 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 43 + -1*B > 25 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 43 + -1*B > 26 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 43 + -1*B > 27 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 43 + -1*B > 28 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 43 + -1*B > 29 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 43 + -1*B > 30 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 43 + -1*B > 31 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 43 + -1*B > 32 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 43 + -1*B > 33 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 43 + -1*B > 34 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 43 + -1*B > 35 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 43 + -1*B > 36 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 43 + -1*B > 37 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 43 + -1*B > 38 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 43 + -1*B > 39 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 43 + -1*B > 40 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 43 + -1*B > 41 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 43 + -1*B > 42 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 43 >= 43 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 43 >= 43 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 43 >= 43 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 43 >= 43 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 43 >= 43 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 43 >= 43 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 43 >= 43 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 43 >= 43 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 43 + -1*B >= 43 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 43 + -1*B >= 43 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 43 + -1*B >= 43 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 43 + -1*B >= 43 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 43 + -1*B >= 43 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 43 + -1*B >= 43 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 43 + -1*B >= 43 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 43 + -1*B >= 43 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 43 + -1*B >= 43 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 43 + -1*B >= 43 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 43 + -1*B >= 43 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 43 + -1*B >= 43 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 43 + -1*B >= 43 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 43 + -1*B >= 43 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 43 + -1*B >= 43 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 43 + -1*B >= 43 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 43 + -1*B >= 43 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 43 + -1*B >= 43 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 43 + -1*B >= 43 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 43 + -1*B >= 43 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 43 + -1*B >= 43 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 43 + -1*B >= 43 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 43 + -1*B >= 43 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 43 + -1*B >= 43 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 43 + -1*B >= 43 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 43 + -1*B >= 43 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 43 + -1*B >= 43 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 43 + -1*B >= 43 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 43 + -1*B >= 43 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 43 + -1*B >= 43 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 43 + -1*B >= 43 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 43 + -1*B >= 43 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 43 + -1*B >= 43 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 43 + -1*B >= 43 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 43 + -1*B >= 43 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 43 + -1*B >= 43 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 43 + -1*B >= 43 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 43 + -1*B >= 43 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 43 + -1*B >= 43 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 43 + -1*B >= 43 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 43 + -1*B >= 43 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 43 + -1*B >= 42 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 42 + -1*B >= 42 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 42 + -1*B >= 42 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 42 + -1*B >= 42 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 42 + -1*B >= 42 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 42 + -1*B >= 42 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 42 + -1*B >= 42 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 42 + -1*B >= 42 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 42 + -1*B >= 42 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 42 + -1*B >= 42 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 42 + -1*B >= 42 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 42 + -1*B >= 42 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 42 + -1*B >= 42 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 42 + -1*B >= 42 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 42 + -1*B >= 42 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 42 + -1*B >= 42 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 42 + -1*B >= 42 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 43 >= 43 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 43 + -1*B >= 43 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 42 + -1*B >= 42 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 42 + -1*B >= -17 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 42 + -1*B >= -16 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 42 + -1*B >= -15 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 42 + -1*B >= -14 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 42 + -1*B >= -13 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 42 + -1*B >= -12 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 42 + -1*B >= -11 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 42 + -1*B >= -10 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 42 + -1*B >= -9 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 42 + -1*B >= -8 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 42 + -1*B >= -7 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 42 + -1*B >= -6 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 42 + -1*B >= -5 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 42 + -1*B >= -4 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 42 + -1*B >= -3 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 42 + -1*B >= -2 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 42 + -1*B >= -1 = f61(A,44,C) [B = 39] ==> f141(A,B,C) = 43 + -1*B >= 3 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 43 + -1*B >= 14 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 43 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 43 >= 43 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 43 >= 43 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 43 >= 43 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 43 >= 43 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 43 >= 43 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 43 >= 43 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 43 >= 43 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 43 >= 43 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 43 >= 43 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 43 >= 43 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 43 >= 43 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 43 >= 43 = f61(A,0,C) * Step 57: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (?,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (44,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 45*x13 p(f101) = -1*x2 + 44*x13 p(f103) = -1*x2 + 44*x13 p(f105) = -1*x2 + 44*x13 p(f107) = -1*x2 + 44*x13 p(f109) = -1*x2 + 44*x13 p(f11) = 44*x13 p(f111) = -1*x2 + 44*x13 p(f113) = -1*x2 + 44*x13 p(f115) = -1*x2 + 44*x13 p(f117) = -1*x2 + 44*x13 p(f119) = -1*x2 + 44*x13 p(f121) = -1*x2 + 44*x13 p(f123) = -1*x2 + 44*x13 p(f125) = -1*x2 + 44*x13 p(f127) = -1*x2 + 44*x13 p(f129) = -1*x2 + 44*x13 p(f13) = 44*x13 p(f131) = -1*x2 + 44*x13 p(f133) = -1*x2 + 44*x13 p(f135) = -1*x2 + 44*x13 p(f137) = -1*x2 + 44*x13 p(f139) = -1*x2 + 44*x13 p(f141) = -1*x2 + 44*x13 p(f143) = -1*x2 + 44*x13 p(f145) = -1*x2 + 44*x13 p(f147) = -1*x2 + 44*x13 p(f149) = -1*x2 + 44*x13 p(f15) = 44*x13 p(f151) = -1*x2 + 43*x13 p(f153) = -1*x2 + 43*x13 p(f155) = -1*x2 + 43*x13 p(f157) = -1*x2 + 43*x13 p(f159) = -1*x2 + 43*x13 p(f161) = -1*x2 + 43*x13 p(f163) = -1*x2 + 43*x13 p(f165) = -1*x2 + 43*x13 p(f167) = -1*x2 + 43*x13 p(f169) = -1*x2 + 43*x13 p(f17) = 44*x13 p(f171) = -1*x2 + 43*x13 p(f173) = -1*x2 + 43*x13 p(f175) = -1*x2 + 43*x13 p(f177) = -1*x2 + 43*x13 p(f179) = -1*x2 + 43*x13 p(f181) = -1*x2 + 43*x13 p(f19) = 44*x13 p(f21) = 44*x13 p(f23) = 44*x13 p(f25) = 44*x13 p(f27) = 44*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 44*x13 p(f65) = -1*x2 + 44*x13 p(f67) = -1*x2 + 44*x13 p(f69) = -1*x2 + 44*x13 p(f7) = 44*x13 p(f71) = -1*x2 + 44*x13 p(f73) = -1*x2 + 44*x13 p(f75) = -1*x2 + 44*x13 p(f77) = -1*x2 + 44*x13 p(f79) = -1*x2 + 44*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 44*x13 p(f83) = -1*x2 + 44*x13 p(f85) = -1*x2 + 44*x13 p(f87) = -1*x2 + 44*x13 p(f89) = -1*x2 + 44*x13 p(f91) = -1*x2 + 44*x13 p(f93) = -1*x2 + 44*x13 p(f95) = -1*x2 + 44*x13 p(f97) = -1*x2 + 44*x13 p(f99) = -1*x2 + 44*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 45 > 44 = f7(0,B,C) [B = 43] ==> f149(A,B,C) = 44 + -1*B > 0 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 44 + -1*B > 1 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 44 + -1*B > 2 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 44 + -1*B > 3 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 44 + -1*B > 5 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 44 + -1*B > 6 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 44 + -1*B > 7 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 44 + -1*B > 8 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 44 + -1*B > 9 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 44 + -1*B > 10 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 44 + -1*B > 11 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 44 + -1*B > 12 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 44 + -1*B > 13 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 44 + -1*B > 14 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 44 + -1*B > 16 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 44 + -1*B > 17 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 44 + -1*B > 18 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 44 + -1*B > 19 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 44 + -1*B > 20 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 44 + -1*B > 21 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 44 + -1*B > 22 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 44 + -1*B > 23 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 44 + -1*B > 24 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 44 + -1*B > 25 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 44 + -1*B > 26 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 44 + -1*B > 27 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 44 + -1*B > 28 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 44 + -1*B > 29 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 44 + -1*B > 30 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 44 + -1*B > 31 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 44 + -1*B > 32 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 44 + -1*B > 33 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 44 + -1*B > 34 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 44 + -1*B > 35 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 44 + -1*B > 36 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 44 + -1*B > 37 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 44 + -1*B > 38 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 44 + -1*B > 39 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 44 + -1*B > 40 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 44 + -1*B > 41 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 44 + -1*B > 42 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 44 + -1*B > 43 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 44 >= 44 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 44 >= 44 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 44 >= 44 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 44 >= 44 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 44 >= 44 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 44 >= 44 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 44 >= 44 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 44 >= 44 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 44 + -1*B >= 44 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 44 + -1*B >= 44 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 44 + -1*B >= 44 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 44 + -1*B >= 44 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 44 + -1*B >= 44 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 44 + -1*B >= 44 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 44 + -1*B >= 44 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 44 + -1*B >= 44 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 44 + -1*B >= 44 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 44 + -1*B >= 44 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 44 + -1*B >= 44 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 44 + -1*B >= 44 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 44 + -1*B >= 44 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 44 + -1*B >= 44 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 44 + -1*B >= 44 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 44 + -1*B >= 44 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 44 + -1*B >= 44 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 44 + -1*B >= 44 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 44 + -1*B >= 44 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 44 + -1*B >= 44 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 44 + -1*B >= 44 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 44 + -1*B >= 44 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 44 + -1*B >= 44 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 44 + -1*B >= 44 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 44 + -1*B >= 44 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 44 + -1*B >= 44 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 44 + -1*B >= 44 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 44 + -1*B >= 44 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 44 + -1*B >= 44 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 44 + -1*B >= 44 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 44 + -1*B >= 44 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 44 + -1*B >= 44 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 44 + -1*B >= 44 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 44 + -1*B >= 44 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 44 + -1*B >= 44 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 44 + -1*B >= 44 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 44 + -1*B >= 44 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 44 + -1*B >= 44 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 44 + -1*B >= 44 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 44 + -1*B >= 44 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 44 + -1*B >= 44 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 44 + -1*B >= 44 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 44 + -1*B >= 43 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 43 + -1*B >= 43 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 43 + -1*B >= 43 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 43 + -1*B >= 43 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 43 + -1*B >= 43 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 43 + -1*B >= 43 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 43 + -1*B >= 43 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 43 + -1*B >= 43 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 43 + -1*B >= 43 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 43 + -1*B >= 43 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 43 + -1*B >= 43 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 43 + -1*B >= 43 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 43 + -1*B >= 43 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 43 + -1*B >= 43 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 43 + -1*B >= 43 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 43 + -1*B >= 43 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 44 >= 44 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 44 + -1*B >= 44 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 43 + -1*B >= 43 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 43 + -1*B >= -16 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 43 + -1*B >= -15 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 43 + -1*B >= -14 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 43 + -1*B >= -13 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 43 + -1*B >= -12 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 43 + -1*B >= -11 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 43 + -1*B >= -10 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 43 + -1*B >= -9 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 43 + -1*B >= -8 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 43 + -1*B >= -7 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 43 + -1*B >= -6 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 43 + -1*B >= -5 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 43 + -1*B >= -4 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 43 + -1*B >= -3 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 43 + -1*B >= -2 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 43 + -1*B >= -1 = f61(A,45,C) [B = 39] ==> f141(A,B,C) = 44 + -1*B >= 4 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 44 + -1*B >= 15 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 44 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 44 >= 44 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 44 >= 44 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 44 >= 44 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 44 >= 44 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 44 >= 44 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 44 >= 44 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 44 >= 44 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 44 >= 44 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 44 >= 44 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 44 >= 44 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 44 >= 44 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 44 >= 44 = f61(A,0,C) * Step 58: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (?,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (45,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (44,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 46*x13 p(f101) = -1*x2 + 46*x13 p(f103) = -1*x2 + 46*x13 p(f105) = -1*x2 + 46*x13 p(f107) = -1*x2 + 46*x13 p(f109) = -1*x2 + 46*x13 p(f11) = 46*x13 p(f111) = -1*x2 + 46*x13 p(f113) = -1*x2 + 46*x13 p(f115) = -1*x2 + 46*x13 p(f117) = -1*x2 + 46*x13 p(f119) = -1*x2 + 46*x13 p(f121) = -1*x2 + 46*x13 p(f123) = -1*x2 + 46*x13 p(f125) = -1*x2 + 46*x13 p(f127) = -1*x2 + 46*x13 p(f129) = -1*x2 + 46*x13 p(f13) = 46*x13 p(f131) = -1*x2 + 46*x13 p(f133) = -1*x2 + 46*x13 p(f135) = -1*x2 + 46*x13 p(f137) = -1*x2 + 46*x13 p(f139) = -1*x2 + 46*x13 p(f141) = -1*x2 + 46*x13 p(f143) = -1*x2 + 46*x13 p(f145) = -1*x2 + 46*x13 p(f147) = -1*x2 + 46*x13 p(f149) = -1*x2 + 46*x13 p(f15) = 46*x13 p(f151) = -1*x2 + 46*x13 p(f153) = -1*x2 + 46*x13 p(f155) = -1*x2 + 45*x13 p(f157) = -1*x2 + 45*x13 p(f159) = -1*x2 + 45*x13 p(f161) = -1*x2 + 45*x13 p(f163) = -1*x2 + 45*x13 p(f165) = -1*x2 + 45*x13 p(f167) = -1*x2 + 45*x13 p(f169) = -1*x2 + 45*x13 p(f17) = 46*x13 p(f171) = -1*x2 + 45*x13 p(f173) = -1*x2 + 45*x13 p(f175) = -1*x2 + 45*x13 p(f177) = -1*x2 + 45*x13 p(f179) = -1*x2 + 45*x13 p(f181) = -1*x2 + 45*x13 p(f19) = 46*x13 p(f21) = 46*x13 p(f23) = 46*x13 p(f25) = 46*x13 p(f27) = 46*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 46*x13 p(f65) = -1*x2 + 46*x13 p(f67) = -1*x2 + 46*x13 p(f69) = -1*x2 + 46*x13 p(f7) = 46*x13 p(f71) = -1*x2 + 46*x13 p(f73) = -1*x2 + 46*x13 p(f75) = -1*x2 + 46*x13 p(f77) = -1*x2 + 46*x13 p(f79) = -1*x2 + 46*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 46*x13 p(f83) = -1*x2 + 46*x13 p(f85) = -1*x2 + 46*x13 p(f87) = -1*x2 + 46*x13 p(f89) = -1*x2 + 46*x13 p(f91) = -1*x2 + 46*x13 p(f93) = -1*x2 + 46*x13 p(f95) = -1*x2 + 46*x13 p(f97) = -1*x2 + 46*x13 p(f99) = -1*x2 + 46*x13 Following rules are strictly oriented: [B = 45] ==> f153(A,B,C) = 46 + -1*B > 0 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 46 + -1*B > 1 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 46 + -1*B > 2 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 46 + -1*B > 3 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 46 + -1*B > 4 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 46 + -1*B > 5 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 46 + -1*B > 7 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 46 + -1*B > 8 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 46 + -1*B > 9 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 46 + -1*B > 10 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 46 + -1*B > 11 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 46 + -1*B > 12 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 46 + -1*B > 13 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 46 + -1*B > 14 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 46 + -1*B > 15 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 46 + -1*B > 16 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 46 + -1*B > 18 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 46 + -1*B > 19 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 46 + -1*B > 20 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 46 + -1*B > 21 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 46 + -1*B > 22 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 46 + -1*B > 23 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 46 + -1*B > 24 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 46 + -1*B > 25 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 46 + -1*B > 26 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 46 + -1*B > 27 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 46 + -1*B > 28 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 46 + -1*B > 29 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 46 + -1*B > 30 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 46 + -1*B > 31 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 46 + -1*B > 32 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 46 + -1*B > 33 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 46 + -1*B > 34 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 46 + -1*B > 35 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 46 + -1*B > 36 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 46 + -1*B > 37 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 46 + -1*B > 38 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 46 + -1*B > 39 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 46 + -1*B > 40 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 46 + -1*B > 41 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 46 + -1*B > 42 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 46 + -1*B > 43 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 46 + -1*B > 44 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 46 + -1*B > 45 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 46 >= 46 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 46 >= 46 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 46 >= 46 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 46 >= 46 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 46 >= 46 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 46 >= 46 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 46 >= 46 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 46 >= 46 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 46 + -1*B >= 46 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 46 + -1*B >= 46 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 46 + -1*B >= 46 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 46 + -1*B >= 46 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 46 + -1*B >= 46 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 46 + -1*B >= 46 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 46 + -1*B >= 46 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 46 + -1*B >= 46 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 46 + -1*B >= 46 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 46 + -1*B >= 46 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 46 + -1*B >= 46 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 46 + -1*B >= 46 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 46 + -1*B >= 46 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 46 + -1*B >= 46 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 46 + -1*B >= 46 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 46 + -1*B >= 46 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 46 + -1*B >= 46 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 46 + -1*B >= 46 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 46 + -1*B >= 46 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 46 + -1*B >= 46 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 46 + -1*B >= 46 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 46 + -1*B >= 46 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 46 + -1*B >= 46 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 46 + -1*B >= 46 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 46 + -1*B >= 46 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 46 + -1*B >= 46 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 46 + -1*B >= 46 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 46 + -1*B >= 46 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 46 + -1*B >= 46 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 46 + -1*B >= 46 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 46 + -1*B >= 46 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 46 + -1*B >= 46 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 46 + -1*B >= 46 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 46 + -1*B >= 46 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 46 + -1*B >= 46 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 46 + -1*B >= 46 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 46 + -1*B >= 46 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 46 + -1*B >= 46 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 46 + -1*B >= 46 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 46 + -1*B >= 46 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 46 + -1*B >= 46 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 46 + -1*B >= 46 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 46 + -1*B >= 46 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 46 + -1*B >= 46 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 46 + -1*B >= 45 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 45 + -1*B >= 45 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 45 + -1*B >= 45 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 45 + -1*B >= 45 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 45 + -1*B >= 45 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 45 + -1*B >= 45 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 45 + -1*B >= 45 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 45 + -1*B >= 45 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 45 + -1*B >= 45 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 45 + -1*B >= 45 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 45 + -1*B >= 45 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 45 + -1*B >= 45 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 45 + -1*B >= 45 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 45 + -1*B >= 45 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 46 >= 46 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 46 >= 46 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 46 + -1*B >= 46 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 45 + -1*B >= 45 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 45 + -1*B >= -14 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 45 + -1*B >= -13 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 45 + -1*B >= -12 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 45 + -1*B >= -11 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 45 + -1*B >= -10 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 45 + -1*B >= -9 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 45 + -1*B >= -8 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 45 + -1*B >= -7 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 45 + -1*B >= -6 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 45 + -1*B >= -5 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 45 + -1*B >= -4 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 45 + -1*B >= -3 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 45 + -1*B >= -2 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 45 + -1*B >= -1 = f61(A,47,C) [B = 39] ==> f141(A,B,C) = 46 + -1*B >= 6 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 46 + -1*B >= 17 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 46 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 46 >= 46 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 46 >= 46 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 46 >= 46 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 46 >= 46 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 46 >= 46 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 46 >= 46 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 46 >= 46 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 46 >= 46 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 46 >= 46 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 46 >= 46 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 46 >= 46 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 46 >= 46 = f61(A,0,C) * Step 59: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (?,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (46,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (45,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (44,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 48*x13 p(f101) = -1*x2 + 47*x13 p(f103) = -1*x2 + 47*x13 p(f105) = -1*x2 + 47*x13 p(f107) = -1*x2 + 47*x13 p(f109) = -1*x2 + 47*x13 p(f11) = 47*x13 p(f111) = -1*x2 + 47*x13 p(f113) = -1*x2 + 47*x13 p(f115) = -1*x2 + 47*x13 p(f117) = -1*x2 + 47*x13 p(f119) = -1*x2 + 47*x13 p(f121) = -1*x2 + 47*x13 p(f123) = -1*x2 + 47*x13 p(f125) = -1*x2 + 47*x13 p(f127) = -1*x2 + 47*x13 p(f129) = -1*x2 + 47*x13 p(f13) = 47*x13 p(f131) = -1*x2 + 47*x13 p(f133) = -1*x2 + 47*x13 p(f135) = -1*x2 + 47*x13 p(f137) = -1*x2 + 47*x13 p(f139) = -1*x2 + 47*x13 p(f141) = -1*x2 + 47*x13 p(f143) = -1*x2 + 47*x13 p(f145) = -1*x2 + 47*x13 p(f147) = -1*x2 + 47*x13 p(f149) = -1*x2 + 47*x13 p(f15) = 47*x13 p(f151) = -1*x2 + 47*x13 p(f153) = -1*x2 + 47*x13 p(f155) = -1*x2 + 47*x13 p(f157) = -1*x2 + 46*x13 p(f159) = -1*x2 + 46*x13 p(f161) = -1*x2 + 46*x13 p(f163) = -1*x2 + 46*x13 p(f165) = -1*x2 + 46*x13 p(f167) = -1*x2 + 46*x13 p(f169) = -1*x2 + 46*x13 p(f17) = 47*x13 p(f171) = -1*x2 + 46*x13 p(f173) = -1*x2 + 46*x13 p(f175) = -1*x2 + 46*x13 p(f177) = -1*x2 + 46*x13 p(f179) = -1*x2 + 46*x13 p(f181) = -1*x2 + 46*x13 p(f19) = 47*x13 p(f21) = 47*x13 p(f23) = 47*x13 p(f25) = 47*x13 p(f27) = 47*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 47*x13 p(f65) = -1*x2 + 47*x13 p(f67) = -1*x2 + 47*x13 p(f69) = -1*x2 + 47*x13 p(f7) = 47*x13 p(f71) = -1*x2 + 47*x13 p(f73) = -1*x2 + 47*x13 p(f75) = -1*x2 + 47*x13 p(f77) = -1*x2 + 47*x13 p(f79) = -1*x2 + 47*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 47*x13 p(f83) = -1*x2 + 47*x13 p(f85) = -1*x2 + 47*x13 p(f87) = -1*x2 + 47*x13 p(f89) = -1*x2 + 47*x13 p(f91) = -1*x2 + 47*x13 p(f93) = -1*x2 + 47*x13 p(f95) = -1*x2 + 47*x13 p(f97) = -1*x2 + 47*x13 p(f99) = -1*x2 + 47*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 48 > 47 = f7(0,B,C) [B = 46] ==> f155(A,B,C) = 47 + -1*B > 0 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 47 + -1*B > 1 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 47 + -1*B > 2 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 47 + -1*B > 3 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 47 + -1*B > 4 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 47 + -1*B > 5 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 47 + -1*B > 6 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 47 + -1*B > 8 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 47 + -1*B > 9 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 47 + -1*B > 10 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 47 + -1*B > 11 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 47 + -1*B > 12 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 47 + -1*B > 13 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 47 + -1*B > 14 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 47 + -1*B > 15 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 47 + -1*B > 16 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 47 + -1*B > 17 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 47 + -1*B > 19 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 47 + -1*B > 20 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 47 + -1*B > 21 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 47 + -1*B > 22 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 47 + -1*B > 23 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 47 + -1*B > 24 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 47 + -1*B > 25 = f61(A,22,C) [B = 20] ==> f103(A,B,C) = 47 + -1*B > 26 = f61(A,21,C) [B = 19] ==> f101(A,B,C) = 47 + -1*B > 27 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 47 + -1*B > 28 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 47 + -1*B > 29 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 47 + -1*B > 30 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 47 + -1*B > 31 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 47 + -1*B > 32 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 47 + -1*B > 33 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 47 + -1*B > 34 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 47 + -1*B > 35 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 47 + -1*B > 36 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 47 + -1*B > 37 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 47 + -1*B > 38 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 47 + -1*B > 39 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 47 + -1*B > 40 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 47 + -1*B > 41 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 47 + -1*B > 42 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 47 + -1*B > 43 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 47 + -1*B > 44 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 47 + -1*B > 45 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 47 + -1*B > 46 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 47 >= 47 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 47 >= 47 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 47 >= 47 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 47 >= 47 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 47 >= 47 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 47 >= 47 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 47 >= 47 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 47 >= 47 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 47 + -1*B >= 47 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 47 + -1*B >= 47 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 47 + -1*B >= 47 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 47 + -1*B >= 47 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 47 + -1*B >= 47 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 47 + -1*B >= 47 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 47 + -1*B >= 47 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 47 + -1*B >= 47 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 47 + -1*B >= 47 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 47 + -1*B >= 47 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 47 + -1*B >= 47 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 47 + -1*B >= 47 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 47 + -1*B >= 47 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 47 + -1*B >= 47 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 47 + -1*B >= 47 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 47 + -1*B >= 47 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 47 + -1*B >= 47 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 47 + -1*B >= 47 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 47 + -1*B >= 47 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 47 + -1*B >= 47 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 47 + -1*B >= 47 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 47 + -1*B >= 47 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 47 + -1*B >= 47 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 47 + -1*B >= 47 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 47 + -1*B >= 47 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 47 + -1*B >= 47 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 47 + -1*B >= 47 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 47 + -1*B >= 47 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 47 + -1*B >= 47 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 47 + -1*B >= 47 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 47 + -1*B >= 47 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 47 + -1*B >= 47 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 47 + -1*B >= 47 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 47 + -1*B >= 47 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 47 + -1*B >= 47 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 47 + -1*B >= 47 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 47 + -1*B >= 47 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 47 + -1*B >= 47 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 47 + -1*B >= 47 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 47 + -1*B >= 47 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 47 + -1*B >= 47 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 47 + -1*B >= 47 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 47 + -1*B >= 47 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 47 + -1*B >= 47 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 47 + -1*B >= 47 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 47 + -1*B >= 46 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 46 + -1*B >= 46 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 46 + -1*B >= 46 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 46 + -1*B >= 46 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 46 + -1*B >= 46 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 46 + -1*B >= 46 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 46 + -1*B >= 46 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 46 + -1*B >= 46 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 46 + -1*B >= 46 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 46 + -1*B >= 46 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 46 + -1*B >= 46 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 46 + -1*B >= 46 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 46 + -1*B >= 46 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 47 >= 47 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 47 + -1*B >= 47 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 46 + -1*B >= 46 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 46 + -1*B >= -13 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 46 + -1*B >= -12 = f61(A,59,C) [B = 57] ==> f177(A,B,C) = 46 + -1*B >= -11 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 46 + -1*B >= -10 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 46 + -1*B >= -9 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 46 + -1*B >= -8 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 46 + -1*B >= -7 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 46 + -1*B >= -6 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 46 + -1*B >= -5 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 46 + -1*B >= -4 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 46 + -1*B >= -3 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 46 + -1*B >= -2 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 46 + -1*B >= -1 = f61(A,48,C) [B = 39] ==> f141(A,B,C) = 47 + -1*B >= 7 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 47 + -1*B >= 18 = f61(A,29,C) [B >= 50] ==> f61(A,B,C) = 47 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 47 >= 47 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 47 >= 47 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 47 >= 47 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 47 >= 47 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 47 >= 47 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 47 >= 47 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 47 >= 47 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 47 >= 47 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 47 >= 47 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 47 >= 47 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 47 >= 47 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 47 >= 47 = f61(A,0,C) * Step 60: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (?,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (48,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (46,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (45,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (44,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 58*x13 p(f101) = -1*x2 + 58*x13 p(f103) = -1*x2 + 58*x13 p(f105) = -1*x2 + 58*x13 p(f107) = -1*x2 + 58*x13 p(f109) = -1*x2 + 58*x13 p(f11) = 58*x13 p(f111) = -1*x2 + 58*x13 p(f113) = -1*x2 + 58*x13 p(f115) = -1*x2 + 58*x13 p(f117) = -1*x2 + 58*x13 p(f119) = -1*x2 + 58*x13 p(f121) = -1*x2 + 58*x13 p(f123) = -1*x2 + 58*x13 p(f125) = -1*x2 + 58*x13 p(f127) = -1*x2 + 58*x13 p(f129) = -1*x2 + 58*x13 p(f13) = 58*x13 p(f131) = -1*x2 + 58*x13 p(f133) = -1*x2 + 58*x13 p(f135) = -1*x2 + 58*x13 p(f137) = -1*x2 + 58*x13 p(f139) = -1*x2 + 58*x13 p(f141) = -1*x2 + 58*x13 p(f143) = -1*x2 + 58*x13 p(f145) = -1*x2 + 58*x13 p(f147) = -1*x2 + 58*x13 p(f149) = -1*x2 + 58*x13 p(f15) = 58*x13 p(f151) = -1*x2 + 58*x13 p(f153) = -1*x2 + 58*x13 p(f155) = -1*x2 + 58*x13 p(f157) = -1*x2 + 58*x13 p(f159) = -1*x2 + 58*x13 p(f161) = -1*x2 + 58*x13 p(f163) = -1*x2 + 58*x13 p(f165) = -1*x2 + 58*x13 p(f167) = -1*x2 + 58*x13 p(f169) = -1*x2 + 58*x13 p(f17) = 58*x13 p(f171) = -1*x2 + 58*x13 p(f173) = -1*x2 + 58*x13 p(f175) = -1*x2 + 58*x13 p(f177) = -1*x2 + 58*x13 p(f179) = -1*x2 + 58*x13 p(f181) = -1*x2 + 57*x13 p(f19) = 58*x13 p(f21) = 58*x13 p(f23) = 58*x13 p(f25) = 58*x13 p(f27) = 58*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 58*x13 p(f65) = -1*x2 + 58*x13 p(f67) = -1*x2 + 58*x13 p(f69) = -1*x2 + 58*x13 p(f7) = 58*x13 p(f71) = -1*x2 + 58*x13 p(f73) = -1*x2 + 58*x13 p(f75) = -1*x2 + 58*x13 p(f77) = -1*x2 + 58*x13 p(f79) = -1*x2 + 58*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 58*x13 p(f83) = -1*x2 + 58*x13 p(f85) = -1*x2 + 58*x13 p(f87) = -1*x2 + 58*x13 p(f89) = -1*x2 + 58*x13 p(f91) = -1*x2 + 58*x13 p(f93) = -1*x2 + 58*x13 p(f95) = -1*x2 + 58*x13 p(f97) = -1*x2 + 58*x13 p(f99) = -1*x2 + 58*x13 Following rules are strictly oriented: [B = 57] ==> f177(A,B,C) = 58 + -1*B > 0 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 58 + -1*B > 1 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 58 + -1*B > 2 = f61(A,56,C) [B = 54] ==> f171(A,B,C) = 58 + -1*B > 3 = f61(A,55,C) [B = 53] ==> f169(A,B,C) = 58 + -1*B > 4 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 58 + -1*B > 5 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 58 + -1*B > 6 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 58 + -1*B > 7 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 58 + -1*B > 8 = f61(A,50,C) [B = 47] ==> f157(A,B,C) = 58 + -1*B > 10 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 58 + -1*B > 11 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 58 + -1*B > 12 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 58 + -1*B > 13 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 58 + -1*B > 14 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 58 + -1*B > 15 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 58 + -1*B > 16 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 58 + -1*B > 17 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 58 + -1*B > 19 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 58 + -1*B > 20 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 58 + -1*B > 21 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 58 + -1*B > 22 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 58 + -1*B > 23 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 58 + -1*B > 24 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 58 + -1*B > 25 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 58 + -1*B > 26 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 58 + -1*B > 27 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 58 + -1*B > 28 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 58 + -1*B > 30 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 58 + -1*B > 31 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 58 + -1*B > 32 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 58 + -1*B > 33 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 58 + -1*B > 34 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 58 + -1*B > 35 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 58 + -1*B > 36 = f61(A,22,C) [B = 19] ==> f101(A,B,C) = 58 + -1*B > 38 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 58 + -1*B > 39 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 58 + -1*B > 40 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 58 + -1*B > 41 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 58 + -1*B > 42 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 58 + -1*B > 43 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 58 + -1*B > 44 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 58 + -1*B > 45 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 58 + -1*B > 46 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 58 + -1*B > 47 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 58 + -1*B > 48 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 58 + -1*B > 49 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 58 + -1*B > 50 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 58 + -1*B > 51 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 58 + -1*B > 52 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 58 + -1*B > 53 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 58 + -1*B > 54 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 58 + -1*B > 55 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 58 + -1*B > 56 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 58 + -1*B > 57 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 58 >= 58 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 58 >= 58 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 58 >= 58 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 58 >= 58 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 58 >= 58 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 58 >= 58 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 58 >= 58 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 58 >= 58 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 58 + -1*B >= 58 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 58 + -1*B >= 58 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 58 + -1*B >= 58 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 58 + -1*B >= 58 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 58 + -1*B >= 58 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 58 + -1*B >= 58 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 58 + -1*B >= 58 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 58 + -1*B >= 58 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 58 + -1*B >= 58 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 58 + -1*B >= 58 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 58 + -1*B >= 58 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 58 + -1*B >= 58 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 58 + -1*B >= 58 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 58 + -1*B >= 58 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 58 + -1*B >= 58 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 58 + -1*B >= 58 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 58 + -1*B >= 58 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 58 + -1*B >= 58 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 58 + -1*B >= 58 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 58 + -1*B >= 58 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 58 + -1*B >= 58 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 58 + -1*B >= 58 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 58 + -1*B >= 58 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 58 + -1*B >= 58 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 58 + -1*B >= 58 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 58 + -1*B >= 58 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 58 + -1*B >= 58 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 58 + -1*B >= 58 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 58 + -1*B >= 58 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 58 + -1*B >= 58 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 58 + -1*B >= 58 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 58 + -1*B >= 58 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 58 + -1*B >= 58 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 58 + -1*B >= 58 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 58 + -1*B >= 58 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 58 + -1*B >= 58 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 58 + -1*B >= 58 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 58 + -1*B >= 58 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 58 + -1*B >= 58 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 58 + -1*B >= 58 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 58 + -1*B >= 58 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 58 + -1*B >= 58 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 58 + -1*B >= 58 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 58 + -1*B >= 58 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 58 + -1*B >= 58 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 58 + -1*B >= 58 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 58 + -1*B >= 58 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 58 + -1*B >= 58 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 58 + -1*B >= 58 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 58 + -1*B >= 58 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 58 + -1*B >= 58 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 58 + -1*B >= 58 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 58 + -1*B >= 58 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 58 + -1*B >= 58 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 58 + -1*B >= 58 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 58 + -1*B >= 58 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 58 + -1*B >= 58 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 58 + -1*B >= 57 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) True ==> f0(A,B,C) = 58 >= 58 = f7(0,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 58 >= 58 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 58 + -1*B >= 58 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 57 + -1*B >= 57 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 57 + -1*B >= -2 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 58 + -1*B >= -1 = f61(A,59,C) [B = 48] ==> f159(A,B,C) = 58 + -1*B >= 9 = f61(A,49,C) [B = 39] ==> f141(A,B,C) = 58 + -1*B >= 18 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 58 + -1*B >= 29 = f61(A,29,C) [B = 20] ==> f103(A,B,C) = 58 + -1*B >= 37 = f61(A,21,C) [B >= 50] ==> f61(A,B,C) = 58 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 58 >= 58 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 58 >= 58 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 58 >= 58 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 58 >= 58 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 58 >= 58 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 58 >= 58 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 58 >= 58 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 58 >= 58 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 58 >= 58 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 58 >= 58 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 58 >= 58 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 58 >= 58 = f61(A,0,C) * Step 61: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (?,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (58,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (48,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (46,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (45,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (44,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: We apply a polynomial interpretation of shape linear: p(f0) = 59*x13 p(f101) = -1*x2 + 58*x13 p(f103) = -1*x2 + 58*x13 p(f105) = -1*x2 + 58*x13 p(f107) = -1*x2 + 58*x13 p(f109) = -1*x2 + 58*x13 p(f11) = 58*x13 p(f111) = -1*x2 + 58*x13 p(f113) = -1*x2 + 58*x13 p(f115) = -1*x2 + 58*x13 p(f117) = -1*x2 + 58*x13 p(f119) = -1*x2 + 58*x13 p(f121) = -1*x2 + 58*x13 p(f123) = -1*x2 + 58*x13 p(f125) = -1*x2 + 58*x13 p(f127) = -1*x2 + 58*x13 p(f129) = -1*x2 + 58*x13 p(f13) = 58*x13 p(f131) = -1*x2 + 58*x13 p(f133) = -1*x2 + 58*x13 p(f135) = -1*x2 + 58*x13 p(f137) = -1*x2 + 58*x13 p(f139) = -1*x2 + 58*x13 p(f141) = -1*x2 + 58*x13 p(f143) = -1*x2 + 58*x13 p(f145) = -1*x2 + 58*x13 p(f147) = -1*x2 + 58*x13 p(f149) = -1*x2 + 58*x13 p(f15) = 58*x13 p(f151) = -1*x2 + 58*x13 p(f153) = -1*x2 + 58*x13 p(f155) = -1*x2 + 58*x13 p(f157) = -1*x2 + 58*x13 p(f159) = -1*x2 + 58*x13 p(f161) = -1*x2 + 58*x13 p(f163) = -1*x2 + 58*x13 p(f165) = -1*x2 + 58*x13 p(f167) = -1*x2 + 58*x13 p(f169) = -1*x2 + 58*x13 p(f17) = 58*x13 p(f171) = -1*x2 + 58*x13 p(f173) = -1*x2 + 58*x13 p(f175) = -1*x2 + 58*x13 p(f177) = -1*x2 + 58*x13 p(f179) = -1*x2 + 58*x13 p(f181) = -1*x2 + 57*x13 p(f19) = 58*x13 p(f21) = 58*x13 p(f23) = 58*x13 p(f25) = 58*x13 p(f27) = 58*x13 p(f315) = -1*x2 p(f319) = -1*x2 p(f321) = -1*x2 p(f323) = -1*x2 p(f325) = -1*x2 p(f327) = -1*x2 p(f329) = -1*x2 p(f331) = -1*x2 p(f333) = -1*x2 p(f335) = -1*x2 p(f337) = -1*x2 p(f339) = -1*x2 p(f341) = -1*x2 p(f343) = -1*x2 p(f345) = -1*x2 p(f347) = -1*x2 p(f349) = -1*x2 p(f351) = -1*x2 p(f353) = -1*x2 p(f355) = -1*x2 p(f357) = -1*x2 p(f359) = -1*x2 p(f361) = -1*x2 p(f363) = -1*x2 p(f365) = -1*x2 p(f367) = -1*x2 p(f369) = -1*x2 p(f371) = -1*x2 p(f373) = -1*x2 p(f375) = -1*x2 p(f377) = -1*x2 p(f379) = -1*x2 p(f381) = -1*x2 p(f383) = -1*x2 p(f385) = -1*x2 p(f387) = -1*x2 p(f389) = -1*x2 p(f391) = -1*x2 p(f393) = -1*x2 p(f395) = -1*x2 p(f397) = -1*x2 p(f399) = -1*x2 p(f401) = -1*x2 p(f403) = -1*x2 p(f405) = -1*x2 p(f407) = -1*x2 p(f409) = -1*x2 p(f411) = -1*x2 p(f413) = -1*x2 p(f415) = -1*x2 p(f417) = -1*x2 p(f419) = -1*x2 p(f421) = -1*x2 p(f423) = -1*x2 p(f425) = -1*x2 p(f427) = -1*x2 p(f429) = -1*x2 p(f431) = -1*x2 p(f433) = -1*x2 p(f435) = -1*x2 p(f437) = -1*x2 p(f439) = -1*x2 p(f441) = -1*x2 p(f443) = -1*x2 p(f445) = -1*x2 p(f447) = -1*x2 p(f449) = -1*x2 p(f451) = -1*x2 p(f453) = -1*x2 p(f455) = -1*x2 p(f457) = -1*x2 p(f459) = -1*x2 p(f461) = -1*x2 p(f463) = -1*x2 p(f465) = -1*x2 p(f467) = -1*x2 p(f469) = -1*x2 p(f471) = -1*x2 p(f473) = -1*x2 p(f475) = -1*x2 p(f477) = -1*x2 p(f479) = -1*x2 p(f481) = -1*x2 p(f483) = -1*x2 p(f485) = -1*x2 p(f487) = -1*x2 p(f489) = -1*x2 p(f491) = -1*x2 p(f493) = -1*x2 p(f495) = -1*x2 p(f497) = -1*x2 p(f499) = -1*x2 p(f501) = -1*x2 p(f503) = -1*x2 p(f505) = -1*x2 p(f507) = -1*x2 p(f509) = -1*x2 p(f511) = -1*x2 p(f513) = -1*x2 p(f515) = -1*x2 p(f517) = -1*x2 p(f519) = -1*x2 p(f521) = -1*x2 p(f523) = -1*x2 p(f525) = -1*x2 p(f527) = -1*x2 p(f529) = -1*x2 p(f531) = -1*x2 p(f533) = -1*x2 p(f535) = -1*x2 p(f537) = -1*x2 p(f539) = -1*x2 p(f541) = -1*x2 p(f543) = -1*x2 p(f545) = -1*x2 p(f547) = -1*x2 p(f549) = -1*x2 p(f551) = -1*x2 p(f553) = -1*x2 p(f555) = -1*x2 p(f61) = -1*x2 + 58*x13 p(f65) = -1*x2 + 58*x13 p(f67) = -1*x2 + 58*x13 p(f69) = -1*x2 + 58*x13 p(f7) = 58*x13 p(f71) = -1*x2 + 58*x13 p(f73) = -1*x2 + 58*x13 p(f75) = -1*x2 + 58*x13 p(f77) = -1*x2 + 58*x13 p(f79) = -1*x2 + 58*x13 p(f808) = -1*x2 p(f81) = -1*x2 + 58*x13 p(f83) = -1*x2 + 58*x13 p(f85) = -1*x2 + 58*x13 p(f87) = -1*x2 + 58*x13 p(f89) = -1*x2 + 58*x13 p(f91) = -1*x2 + 58*x13 p(f93) = -1*x2 + 58*x13 p(f95) = -1*x2 + 58*x13 p(f97) = -1*x2 + 58*x13 p(f99) = -1*x2 + 58*x13 Following rules are strictly oriented: True ==> f0(A,B,C) = 59 > 58 = f7(0,B,C) [B = 57] ==> f177(A,B,C) = 58 + -1*B > 0 = f61(A,58,C) [B = 56] ==> f175(A,B,C) = 58 + -1*B > 1 = f61(A,57,C) [B = 55] ==> f173(A,B,C) = 58 + -1*B > 2 = f61(A,56,C) [B = 53] ==> f169(A,B,C) = 58 + -1*B > 4 = f61(A,54,C) [B = 52] ==> f167(A,B,C) = 58 + -1*B > 5 = f61(A,53,C) [B = 51] ==> f165(A,B,C) = 58 + -1*B > 6 = f61(A,52,C) [B = 50] ==> f163(A,B,C) = 58 + -1*B > 7 = f61(A,51,C) [B = 49] ==> f161(A,B,C) = 58 + -1*B > 8 = f61(A,50,C) [B = 48] ==> f159(A,B,C) = 58 + -1*B > 9 = f61(A,49,C) [B = 47] ==> f157(A,B,C) = 58 + -1*B > 10 = f61(A,48,C) [B = 46] ==> f155(A,B,C) = 58 + -1*B > 11 = f61(A,47,C) [B = 45] ==> f153(A,B,C) = 58 + -1*B > 12 = f61(A,46,C) [B = 44] ==> f151(A,B,C) = 58 + -1*B > 13 = f61(A,45,C) [B = 43] ==> f149(A,B,C) = 58 + -1*B > 14 = f61(A,44,C) [B = 42] ==> f147(A,B,C) = 58 + -1*B > 15 = f61(A,43,C) [B = 41] ==> f145(A,B,C) = 58 + -1*B > 16 = f61(A,42,C) [B = 40] ==> f143(A,B,C) = 58 + -1*B > 17 = f61(A,41,C) [B = 38] ==> f139(A,B,C) = 58 + -1*B > 19 = f61(A,39,C) [B = 37] ==> f137(A,B,C) = 58 + -1*B > 20 = f61(A,38,C) [B = 36] ==> f135(A,B,C) = 58 + -1*B > 21 = f61(A,37,C) [B = 35] ==> f133(A,B,C) = 58 + -1*B > 22 = f61(A,36,C) [B = 34] ==> f131(A,B,C) = 58 + -1*B > 23 = f61(A,35,C) [B = 33] ==> f129(A,B,C) = 58 + -1*B > 24 = f61(A,34,C) [B = 32] ==> f127(A,B,C) = 58 + -1*B > 25 = f61(A,33,C) [B = 31] ==> f125(A,B,C) = 58 + -1*B > 26 = f61(A,32,C) [B = 30] ==> f123(A,B,C) = 58 + -1*B > 27 = f61(A,31,C) [B = 29] ==> f121(A,B,C) = 58 + -1*B > 28 = f61(A,30,C) [B = 27] ==> f117(A,B,C) = 58 + -1*B > 30 = f61(A,28,C) [B = 26] ==> f115(A,B,C) = 58 + -1*B > 31 = f61(A,27,C) [B = 25] ==> f113(A,B,C) = 58 + -1*B > 32 = f61(A,26,C) [B = 24] ==> f111(A,B,C) = 58 + -1*B > 33 = f61(A,25,C) [B = 23] ==> f109(A,B,C) = 58 + -1*B > 34 = f61(A,24,C) [B = 22] ==> f107(A,B,C) = 58 + -1*B > 35 = f61(A,23,C) [B = 21] ==> f105(A,B,C) = 58 + -1*B > 36 = f61(A,22,C) [B = 19] ==> f101(A,B,C) = 58 + -1*B > 38 = f61(A,20,C) [B = 18] ==> f99(A,B,C) = 58 + -1*B > 39 = f61(A,19,C) [B = 17] ==> f97(A,B,C) = 58 + -1*B > 40 = f61(A,18,C) [B = 16] ==> f95(A,B,C) = 58 + -1*B > 41 = f61(A,17,C) [B = 15] ==> f93(A,B,C) = 58 + -1*B > 42 = f61(A,16,C) [B = 14] ==> f91(A,B,C) = 58 + -1*B > 43 = f61(A,15,C) [B = 13] ==> f89(A,B,C) = 58 + -1*B > 44 = f61(A,14,C) [B = 12] ==> f87(A,B,C) = 58 + -1*B > 45 = f61(A,13,C) [B = 11] ==> f85(A,B,C) = 58 + -1*B > 46 = f61(A,12,C) [B = 10] ==> f83(A,B,C) = 58 + -1*B > 47 = f61(A,11,C) [B = 9] ==> f81(A,B,C) = 58 + -1*B > 48 = f61(A,10,C) [B = 8] ==> f79(A,B,C) = 58 + -1*B > 49 = f61(A,9,C) [B = 7] ==> f77(A,B,C) = 58 + -1*B > 50 = f61(A,8,C) [B = 6] ==> f75(A,B,C) = 58 + -1*B > 51 = f61(A,7,C) [B = 5] ==> f73(A,B,C) = 58 + -1*B > 52 = f61(A,6,C) [B = 4] ==> f71(A,B,C) = 58 + -1*B > 53 = f61(A,5,C) [B = 3] ==> f69(A,B,C) = 58 + -1*B > 54 = f61(A,4,C) [B = 2] ==> f67(A,B,C) = 58 + -1*B > 55 = f61(A,3,C) [B = 1] ==> f65(A,B,C) = 58 + -1*B > 56 = f61(A,2,C) [B = 0] ==> f61(A,B,C) = 58 + -1*B > 57 = f61(A,1,C) Following rules are weakly oriented: [A >= 2] ==> f11(A,B,C) = 58 >= 58 = f13(A,B,C) [A >= 3] ==> f13(A,B,C) = 58 >= 58 = f15(A,B,C) [A >= 4] ==> f15(A,B,C) = 58 >= 58 = f17(A,B,C) [A >= 5] ==> f17(A,B,C) = 58 >= 58 = f19(A,B,C) [A >= 6] ==> f19(A,B,C) = 58 >= 58 = f21(A,B,C) [A >= 7] ==> f21(A,B,C) = 58 >= 58 = f23(A,B,C) [A >= 8] ==> f23(A,B,C) = 58 >= 58 = f25(A,B,C) [A >= 9] ==> f25(A,B,C) = 58 >= 58 = f27(A,B,C) [B >= 2] ==> f65(A,B,C) = 58 + -1*B >= 58 + -1*B = f67(A,B,C) [B >= 3] ==> f67(A,B,C) = 58 + -1*B >= 58 + -1*B = f69(A,B,C) [B >= 4] ==> f69(A,B,C) = 58 + -1*B >= 58 + -1*B = f71(A,B,C) [B >= 5] ==> f71(A,B,C) = 58 + -1*B >= 58 + -1*B = f73(A,B,C) [B >= 6] ==> f73(A,B,C) = 58 + -1*B >= 58 + -1*B = f75(A,B,C) [B >= 7] ==> f75(A,B,C) = 58 + -1*B >= 58 + -1*B = f77(A,B,C) [B >= 8] ==> f77(A,B,C) = 58 + -1*B >= 58 + -1*B = f79(A,B,C) [B >= 9] ==> f79(A,B,C) = 58 + -1*B >= 58 + -1*B = f81(A,B,C) [B >= 10] ==> f81(A,B,C) = 58 + -1*B >= 58 + -1*B = f83(A,B,C) [B >= 11] ==> f83(A,B,C) = 58 + -1*B >= 58 + -1*B = f85(A,B,C) [B >= 12] ==> f85(A,B,C) = 58 + -1*B >= 58 + -1*B = f87(A,B,C) [B >= 13] ==> f87(A,B,C) = 58 + -1*B >= 58 + -1*B = f89(A,B,C) [B >= 14] ==> f89(A,B,C) = 58 + -1*B >= 58 + -1*B = f91(A,B,C) [B >= 15] ==> f91(A,B,C) = 58 + -1*B >= 58 + -1*B = f93(A,B,C) [B >= 16] ==> f93(A,B,C) = 58 + -1*B >= 58 + -1*B = f95(A,B,C) [B >= 17] ==> f95(A,B,C) = 58 + -1*B >= 58 + -1*B = f97(A,B,C) [B >= 18] ==> f97(A,B,C) = 58 + -1*B >= 58 + -1*B = f99(A,B,C) [B >= 19] ==> f99(A,B,C) = 58 + -1*B >= 58 + -1*B = f101(A,B,C) [B >= 20] ==> f101(A,B,C) = 58 + -1*B >= 58 + -1*B = f103(A,B,C) [B >= 21] ==> f103(A,B,C) = 58 + -1*B >= 58 + -1*B = f105(A,B,C) [B >= 22] ==> f105(A,B,C) = 58 + -1*B >= 58 + -1*B = f107(A,B,C) [B >= 23] ==> f107(A,B,C) = 58 + -1*B >= 58 + -1*B = f109(A,B,C) [B >= 24] ==> f109(A,B,C) = 58 + -1*B >= 58 + -1*B = f111(A,B,C) [B >= 25] ==> f111(A,B,C) = 58 + -1*B >= 58 + -1*B = f113(A,B,C) [B >= 26] ==> f113(A,B,C) = 58 + -1*B >= 58 + -1*B = f115(A,B,C) [B >= 27] ==> f115(A,B,C) = 58 + -1*B >= 58 + -1*B = f117(A,B,C) [B >= 28] ==> f117(A,B,C) = 58 + -1*B >= 58 + -1*B = f119(A,B,C) [B >= 29] ==> f119(A,B,C) = 58 + -1*B >= 58 + -1*B = f121(A,B,C) [B >= 30] ==> f121(A,B,C) = 58 + -1*B >= 58 + -1*B = f123(A,B,C) [B >= 31] ==> f123(A,B,C) = 58 + -1*B >= 58 + -1*B = f125(A,B,C) [B >= 32] ==> f125(A,B,C) = 58 + -1*B >= 58 + -1*B = f127(A,B,C) [B >= 33] ==> f127(A,B,C) = 58 + -1*B >= 58 + -1*B = f129(A,B,C) [B >= 34] ==> f129(A,B,C) = 58 + -1*B >= 58 + -1*B = f131(A,B,C) [B >= 35] ==> f131(A,B,C) = 58 + -1*B >= 58 + -1*B = f133(A,B,C) [B >= 36] ==> f133(A,B,C) = 58 + -1*B >= 58 + -1*B = f135(A,B,C) [B >= 37] ==> f135(A,B,C) = 58 + -1*B >= 58 + -1*B = f137(A,B,C) [B >= 38] ==> f137(A,B,C) = 58 + -1*B >= 58 + -1*B = f139(A,B,C) [B >= 39] ==> f139(A,B,C) = 58 + -1*B >= 58 + -1*B = f141(A,B,C) [B >= 40] ==> f141(A,B,C) = 58 + -1*B >= 58 + -1*B = f143(A,B,C) [B >= 41] ==> f143(A,B,C) = 58 + -1*B >= 58 + -1*B = f145(A,B,C) [B >= 42] ==> f145(A,B,C) = 58 + -1*B >= 58 + -1*B = f147(A,B,C) [B >= 43] ==> f147(A,B,C) = 58 + -1*B >= 58 + -1*B = f149(A,B,C) [B >= 44] ==> f149(A,B,C) = 58 + -1*B >= 58 + -1*B = f151(A,B,C) [B >= 45] ==> f151(A,B,C) = 58 + -1*B >= 58 + -1*B = f153(A,B,C) [B >= 46] ==> f153(A,B,C) = 58 + -1*B >= 58 + -1*B = f155(A,B,C) [B >= 47] ==> f155(A,B,C) = 58 + -1*B >= 58 + -1*B = f157(A,B,C) [B >= 48] ==> f157(A,B,C) = 58 + -1*B >= 58 + -1*B = f159(A,B,C) [B >= 49] ==> f159(A,B,C) = 58 + -1*B >= 58 + -1*B = f161(A,B,C) [B >= 50] ==> f161(A,B,C) = 58 + -1*B >= 58 + -1*B = f163(A,B,C) [B >= 51] ==> f163(A,B,C) = 58 + -1*B >= 58 + -1*B = f165(A,B,C) [B >= 52] ==> f165(A,B,C) = 58 + -1*B >= 58 + -1*B = f167(A,B,C) [B >= 53] ==> f167(A,B,C) = 58 + -1*B >= 58 + -1*B = f169(A,B,C) [B >= 54] ==> f169(A,B,C) = 58 + -1*B >= 58 + -1*B = f171(A,B,C) [B >= 55] ==> f171(A,B,C) = 58 + -1*B >= 58 + -1*B = f173(A,B,C) [B >= 56] ==> f173(A,B,C) = 58 + -1*B >= 58 + -1*B = f175(A,B,C) [B >= 57] ==> f175(A,B,C) = 58 + -1*B >= 58 + -1*B = f177(A,B,C) [B >= 58] ==> f177(A,B,C) = 58 + -1*B >= 58 + -1*B = f179(A,B,C) [B >= 59] ==> f179(A,B,C) = 58 + -1*B >= 57 + -1*B = f181(A,B,C) [C >= 2] ==> f319(A,B,C) = -1*B >= -1*B = f321(A,B,C) [C >= 3] ==> f321(A,B,C) = -1*B >= -1*B = f323(A,B,C) [C >= 4] ==> f323(A,B,C) = -1*B >= -1*B = f325(A,B,C) [C >= 5] ==> f325(A,B,C) = -1*B >= -1*B = f327(A,B,C) [C >= 6] ==> f327(A,B,C) = -1*B >= -1*B = f329(A,B,C) [C >= 7] ==> f329(A,B,C) = -1*B >= -1*B = f331(A,B,C) [C >= 8] ==> f331(A,B,C) = -1*B >= -1*B = f333(A,B,C) [C >= 9] ==> f333(A,B,C) = -1*B >= -1*B = f335(A,B,C) [C >= 10] ==> f335(A,B,C) = -1*B >= -1*B = f337(A,B,C) [C >= 11] ==> f337(A,B,C) = -1*B >= -1*B = f339(A,B,C) [C >= 12] ==> f339(A,B,C) = -1*B >= -1*B = f341(A,B,C) [C >= 13] ==> f341(A,B,C) = -1*B >= -1*B = f343(A,B,C) [C >= 14] ==> f343(A,B,C) = -1*B >= -1*B = f345(A,B,C) [C >= 15] ==> f345(A,B,C) = -1*B >= -1*B = f347(A,B,C) [C >= 16] ==> f347(A,B,C) = -1*B >= -1*B = f349(A,B,C) [C >= 17] ==> f349(A,B,C) = -1*B >= -1*B = f351(A,B,C) [C >= 18] ==> f351(A,B,C) = -1*B >= -1*B = f353(A,B,C) [C >= 19] ==> f353(A,B,C) = -1*B >= -1*B = f355(A,B,C) [C >= 20] ==> f355(A,B,C) = -1*B >= -1*B = f357(A,B,C) [C >= 21] ==> f357(A,B,C) = -1*B >= -1*B = f359(A,B,C) [C >= 22] ==> f359(A,B,C) = -1*B >= -1*B = f361(A,B,C) [C >= 23] ==> f361(A,B,C) = -1*B >= -1*B = f363(A,B,C) [C >= 24] ==> f363(A,B,C) = -1*B >= -1*B = f365(A,B,C) [C >= 25] ==> f365(A,B,C) = -1*B >= -1*B = f367(A,B,C) [C >= 26] ==> f367(A,B,C) = -1*B >= -1*B = f369(A,B,C) [C >= 27] ==> f369(A,B,C) = -1*B >= -1*B = f371(A,B,C) [C >= 28] ==> f371(A,B,C) = -1*B >= -1*B = f373(A,B,C) [C >= 29] ==> f373(A,B,C) = -1*B >= -1*B = f375(A,B,C) [C >= 30] ==> f375(A,B,C) = -1*B >= -1*B = f377(A,B,C) [C >= 31] ==> f377(A,B,C) = -1*B >= -1*B = f379(A,B,C) [C >= 32] ==> f379(A,B,C) = -1*B >= -1*B = f381(A,B,C) [C >= 33] ==> f381(A,B,C) = -1*B >= -1*B = f383(A,B,C) [C >= 34] ==> f383(A,B,C) = -1*B >= -1*B = f385(A,B,C) [C >= 35] ==> f385(A,B,C) = -1*B >= -1*B = f387(A,B,C) [C >= 36] ==> f387(A,B,C) = -1*B >= -1*B = f389(A,B,C) [C >= 37] ==> f389(A,B,C) = -1*B >= -1*B = f391(A,B,C) [C >= 38] ==> f391(A,B,C) = -1*B >= -1*B = f393(A,B,C) [C >= 39] ==> f393(A,B,C) = -1*B >= -1*B = f395(A,B,C) [C >= 40] ==> f395(A,B,C) = -1*B >= -1*B = f397(A,B,C) [C >= 41] ==> f397(A,B,C) = -1*B >= -1*B = f399(A,B,C) [C >= 42] ==> f399(A,B,C) = -1*B >= -1*B = f401(A,B,C) [C >= 43] ==> f401(A,B,C) = -1*B >= -1*B = f403(A,B,C) [C >= 44] ==> f403(A,B,C) = -1*B >= -1*B = f405(A,B,C) [C >= 45] ==> f405(A,B,C) = -1*B >= -1*B = f407(A,B,C) [C >= 46] ==> f407(A,B,C) = -1*B >= -1*B = f409(A,B,C) [C >= 47] ==> f409(A,B,C) = -1*B >= -1*B = f411(A,B,C) [C >= 48] ==> f411(A,B,C) = -1*B >= -1*B = f413(A,B,C) [C >= 49] ==> f413(A,B,C) = -1*B >= -1*B = f415(A,B,C) [C >= 50] ==> f415(A,B,C) = -1*B >= -1*B = f417(A,B,C) [C >= 51] ==> f417(A,B,C) = -1*B >= -1*B = f419(A,B,C) [C >= 52] ==> f419(A,B,C) = -1*B >= -1*B = f421(A,B,C) [C >= 53] ==> f421(A,B,C) = -1*B >= -1*B = f423(A,B,C) [C >= 54] ==> f423(A,B,C) = -1*B >= -1*B = f425(A,B,C) [C >= 55] ==> f425(A,B,C) = -1*B >= -1*B = f427(A,B,C) [C >= 56] ==> f427(A,B,C) = -1*B >= -1*B = f429(A,B,C) [C >= 57] ==> f429(A,B,C) = -1*B >= -1*B = f431(A,B,C) [C >= 58] ==> f431(A,B,C) = -1*B >= -1*B = f433(A,B,C) [C >= 59] ==> f433(A,B,C) = -1*B >= -1*B = f435(A,B,C) [C >= 60] ==> f435(A,B,C) = -1*B >= -1*B = f437(A,B,C) [C >= 61] ==> f437(A,B,C) = -1*B >= -1*B = f439(A,B,C) [C >= 62] ==> f439(A,B,C) = -1*B >= -1*B = f441(A,B,C) [C >= 63] ==> f441(A,B,C) = -1*B >= -1*B = f443(A,B,C) [C >= 64] ==> f443(A,B,C) = -1*B >= -1*B = f445(A,B,C) [C >= 65] ==> f445(A,B,C) = -1*B >= -1*B = f447(A,B,C) [C >= 66] ==> f447(A,B,C) = -1*B >= -1*B = f449(A,B,C) [C >= 67] ==> f449(A,B,C) = -1*B >= -1*B = f451(A,B,C) [C >= 68] ==> f451(A,B,C) = -1*B >= -1*B = f453(A,B,C) [C >= 69] ==> f453(A,B,C) = -1*B >= -1*B = f455(A,B,C) [C >= 70] ==> f455(A,B,C) = -1*B >= -1*B = f457(A,B,C) [C >= 71] ==> f457(A,B,C) = -1*B >= -1*B = f459(A,B,C) [C >= 72] ==> f459(A,B,C) = -1*B >= -1*B = f461(A,B,C) [C >= 73] ==> f461(A,B,C) = -1*B >= -1*B = f463(A,B,C) [C >= 74] ==> f463(A,B,C) = -1*B >= -1*B = f465(A,B,C) [C >= 75] ==> f465(A,B,C) = -1*B >= -1*B = f467(A,B,C) [C >= 76] ==> f467(A,B,C) = -1*B >= -1*B = f469(A,B,C) [C >= 77] ==> f469(A,B,C) = -1*B >= -1*B = f471(A,B,C) [C >= 78] ==> f471(A,B,C) = -1*B >= -1*B = f473(A,B,C) [C >= 79] ==> f473(A,B,C) = -1*B >= -1*B = f475(A,B,C) [C >= 80] ==> f475(A,B,C) = -1*B >= -1*B = f477(A,B,C) [C >= 81] ==> f477(A,B,C) = -1*B >= -1*B = f479(A,B,C) [C >= 82] ==> f479(A,B,C) = -1*B >= -1*B = f481(A,B,C) [C >= 83] ==> f481(A,B,C) = -1*B >= -1*B = f483(A,B,C) [C >= 84] ==> f483(A,B,C) = -1*B >= -1*B = f485(A,B,C) [C >= 85] ==> f485(A,B,C) = -1*B >= -1*B = f487(A,B,C) [C >= 86] ==> f487(A,B,C) = -1*B >= -1*B = f489(A,B,C) [C >= 87] ==> f489(A,B,C) = -1*B >= -1*B = f491(A,B,C) [C >= 88] ==> f491(A,B,C) = -1*B >= -1*B = f493(A,B,C) [C >= 89] ==> f493(A,B,C) = -1*B >= -1*B = f495(A,B,C) [C >= 90] ==> f495(A,B,C) = -1*B >= -1*B = f497(A,B,C) [C >= 91] ==> f497(A,B,C) = -1*B >= -1*B = f499(A,B,C) [C >= 92] ==> f499(A,B,C) = -1*B >= -1*B = f501(A,B,C) [C >= 93] ==> f501(A,B,C) = -1*B >= -1*B = f503(A,B,C) [C >= 94] ==> f503(A,B,C) = -1*B >= -1*B = f505(A,B,C) [C >= 95] ==> f505(A,B,C) = -1*B >= -1*B = f507(A,B,C) [C >= 96] ==> f507(A,B,C) = -1*B >= -1*B = f509(A,B,C) [C >= 97] ==> f509(A,B,C) = -1*B >= -1*B = f511(A,B,C) [C >= 98] ==> f511(A,B,C) = -1*B >= -1*B = f513(A,B,C) [C >= 99] ==> f513(A,B,C) = -1*B >= -1*B = f515(A,B,C) [C >= 100] ==> f515(A,B,C) = -1*B >= -1*B = f517(A,B,C) [C >= 101] ==> f517(A,B,C) = -1*B >= -1*B = f519(A,B,C) [C >= 102] ==> f519(A,B,C) = -1*B >= -1*B = f521(A,B,C) [C >= 103] ==> f521(A,B,C) = -1*B >= -1*B = f523(A,B,C) [C >= 104] ==> f523(A,B,C) = -1*B >= -1*B = f525(A,B,C) [C >= 105] ==> f525(A,B,C) = -1*B >= -1*B = f527(A,B,C) [C >= 106] ==> f527(A,B,C) = -1*B >= -1*B = f529(A,B,C) [C >= 107] ==> f529(A,B,C) = -1*B >= -1*B = f531(A,B,C) [C >= 108] ==> f531(A,B,C) = -1*B >= -1*B = f533(A,B,C) [C >= 109] ==> f533(A,B,C) = -1*B >= -1*B = f535(A,B,C) [C >= 110] ==> f535(A,B,C) = -1*B >= -1*B = f537(A,B,C) [C >= 111] ==> f537(A,B,C) = -1*B >= -1*B = f539(A,B,C) [C >= 112] ==> f539(A,B,C) = -1*B >= -1*B = f541(A,B,C) [C >= 113] ==> f541(A,B,C) = -1*B >= -1*B = f543(A,B,C) [C >= 114] ==> f543(A,B,C) = -1*B >= -1*B = f545(A,B,C) [C >= 115] ==> f545(A,B,C) = -1*B >= -1*B = f547(A,B,C) [C >= 116] ==> f547(A,B,C) = -1*B >= -1*B = f549(A,B,C) [C >= 117] ==> f549(A,B,C) = -1*B >= -1*B = f551(A,B,C) [C >= 118] ==> f551(A,B,C) = -1*B >= -1*B = f553(A,B,C) [C >= 119] ==> f553(A,B,C) = -1*B >= -1*B = f555(A,B,C) [9 >= A && A >= 1] ==> f7(A,B,C) = 58 >= 58 = f11(A,B,C) [49 >= B && B >= 1] ==> f61(A,B,C) = 58 + -1*B >= 58 + -1*B = f65(A,B,C) [119 >= C && C >= 1] ==> f315(A,B,C) = -1*B >= -1*B = f319(A,B,C) [C >= 120] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,1 + C) [C = 119] ==> f555(A,B,C) = -1*B >= -1*B = f315(A,B,120) [C = 118] ==> f553(A,B,C) = -1*B >= -1*B = f315(A,B,119) [C = 117] ==> f551(A,B,C) = -1*B >= -1*B = f315(A,B,118) [C = 116] ==> f549(A,B,C) = -1*B >= -1*B = f315(A,B,117) [C = 115] ==> f547(A,B,C) = -1*B >= -1*B = f315(A,B,116) [C = 114] ==> f545(A,B,C) = -1*B >= -1*B = f315(A,B,115) [C = 113] ==> f543(A,B,C) = -1*B >= -1*B = f315(A,B,114) [C = 112] ==> f541(A,B,C) = -1*B >= -1*B = f315(A,B,113) [C = 111] ==> f539(A,B,C) = -1*B >= -1*B = f315(A,B,112) [C = 110] ==> f537(A,B,C) = -1*B >= -1*B = f315(A,B,111) [C = 109] ==> f535(A,B,C) = -1*B >= -1*B = f315(A,B,110) [C = 108] ==> f533(A,B,C) = -1*B >= -1*B = f315(A,B,109) [C = 107] ==> f531(A,B,C) = -1*B >= -1*B = f315(A,B,108) [C = 106] ==> f529(A,B,C) = -1*B >= -1*B = f315(A,B,107) [C = 105] ==> f527(A,B,C) = -1*B >= -1*B = f315(A,B,106) [C = 104] ==> f525(A,B,C) = -1*B >= -1*B = f315(A,B,105) [C = 103] ==> f523(A,B,C) = -1*B >= -1*B = f315(A,B,104) [C = 102] ==> f521(A,B,C) = -1*B >= -1*B = f315(A,B,103) [C = 101] ==> f519(A,B,C) = -1*B >= -1*B = f315(A,B,102) [C = 100] ==> f517(A,B,C) = -1*B >= -1*B = f315(A,B,101) [C = 99] ==> f515(A,B,C) = -1*B >= -1*B = f315(A,B,100) [C = 98] ==> f513(A,B,C) = -1*B >= -1*B = f315(A,B,99) [C = 97] ==> f511(A,B,C) = -1*B >= -1*B = f315(A,B,98) [C = 96] ==> f509(A,B,C) = -1*B >= -1*B = f315(A,B,97) [C = 95] ==> f507(A,B,C) = -1*B >= -1*B = f315(A,B,96) [C = 94] ==> f505(A,B,C) = -1*B >= -1*B = f315(A,B,95) [C = 93] ==> f503(A,B,C) = -1*B >= -1*B = f315(A,B,94) [C = 92] ==> f501(A,B,C) = -1*B >= -1*B = f315(A,B,93) [C = 91] ==> f499(A,B,C) = -1*B >= -1*B = f315(A,B,92) [C = 90] ==> f497(A,B,C) = -1*B >= -1*B = f315(A,B,91) [C = 89] ==> f495(A,B,C) = -1*B >= -1*B = f315(A,B,90) [C = 88] ==> f493(A,B,C) = -1*B >= -1*B = f315(A,B,89) [C = 87] ==> f491(A,B,C) = -1*B >= -1*B = f315(A,B,88) [C = 86] ==> f489(A,B,C) = -1*B >= -1*B = f315(A,B,87) [C = 85] ==> f487(A,B,C) = -1*B >= -1*B = f315(A,B,86) [C = 84] ==> f485(A,B,C) = -1*B >= -1*B = f315(A,B,85) [C = 83] ==> f483(A,B,C) = -1*B >= -1*B = f315(A,B,84) [C = 82] ==> f481(A,B,C) = -1*B >= -1*B = f315(A,B,83) [C = 81] ==> f479(A,B,C) = -1*B >= -1*B = f315(A,B,82) [C = 80] ==> f477(A,B,C) = -1*B >= -1*B = f315(A,B,81) [C = 79] ==> f475(A,B,C) = -1*B >= -1*B = f315(A,B,80) [C = 78] ==> f473(A,B,C) = -1*B >= -1*B = f315(A,B,79) [C = 77] ==> f471(A,B,C) = -1*B >= -1*B = f315(A,B,78) [C = 76] ==> f469(A,B,C) = -1*B >= -1*B = f315(A,B,77) [C = 75] ==> f467(A,B,C) = -1*B >= -1*B = f315(A,B,76) [C = 74] ==> f465(A,B,C) = -1*B >= -1*B = f315(A,B,75) [C = 73] ==> f463(A,B,C) = -1*B >= -1*B = f315(A,B,74) [C = 72] ==> f461(A,B,C) = -1*B >= -1*B = f315(A,B,73) [C = 71] ==> f459(A,B,C) = -1*B >= -1*B = f315(A,B,72) [C = 70] ==> f457(A,B,C) = -1*B >= -1*B = f315(A,B,71) [C = 69] ==> f455(A,B,C) = -1*B >= -1*B = f315(A,B,70) [C = 68] ==> f453(A,B,C) = -1*B >= -1*B = f315(A,B,69) [C = 67] ==> f451(A,B,C) = -1*B >= -1*B = f315(A,B,68) [C = 66] ==> f449(A,B,C) = -1*B >= -1*B = f315(A,B,67) [C = 65] ==> f447(A,B,C) = -1*B >= -1*B = f315(A,B,66) [C = 64] ==> f445(A,B,C) = -1*B >= -1*B = f315(A,B,65) [C = 63] ==> f443(A,B,C) = -1*B >= -1*B = f315(A,B,64) [C = 62] ==> f441(A,B,C) = -1*B >= -1*B = f315(A,B,63) [C = 61] ==> f439(A,B,C) = -1*B >= -1*B = f315(A,B,62) [C = 60] ==> f437(A,B,C) = -1*B >= -1*B = f315(A,B,61) [C = 59] ==> f435(A,B,C) = -1*B >= -1*B = f315(A,B,60) [C = 58] ==> f433(A,B,C) = -1*B >= -1*B = f315(A,B,59) [C = 57] ==> f431(A,B,C) = -1*B >= -1*B = f315(A,B,58) [C = 56] ==> f429(A,B,C) = -1*B >= -1*B = f315(A,B,57) [C = 55] ==> f427(A,B,C) = -1*B >= -1*B = f315(A,B,56) [C = 54] ==> f425(A,B,C) = -1*B >= -1*B = f315(A,B,55) [C = 53] ==> f423(A,B,C) = -1*B >= -1*B = f315(A,B,54) [C = 52] ==> f421(A,B,C) = -1*B >= -1*B = f315(A,B,53) [C = 51] ==> f419(A,B,C) = -1*B >= -1*B = f315(A,B,52) [C = 50] ==> f417(A,B,C) = -1*B >= -1*B = f315(A,B,51) [C = 49] ==> f415(A,B,C) = -1*B >= -1*B = f315(A,B,50) [C = 48] ==> f413(A,B,C) = -1*B >= -1*B = f315(A,B,49) [C = 47] ==> f411(A,B,C) = -1*B >= -1*B = f315(A,B,48) [C = 46] ==> f409(A,B,C) = -1*B >= -1*B = f315(A,B,47) [C = 45] ==> f407(A,B,C) = -1*B >= -1*B = f315(A,B,46) [C = 44] ==> f405(A,B,C) = -1*B >= -1*B = f315(A,B,45) [C = 43] ==> f403(A,B,C) = -1*B >= -1*B = f315(A,B,44) [C = 42] ==> f401(A,B,C) = -1*B >= -1*B = f315(A,B,43) [C = 41] ==> f399(A,B,C) = -1*B >= -1*B = f315(A,B,42) [C = 40] ==> f397(A,B,C) = -1*B >= -1*B = f315(A,B,41) [C = 39] ==> f395(A,B,C) = -1*B >= -1*B = f315(A,B,40) [C = 38] ==> f393(A,B,C) = -1*B >= -1*B = f315(A,B,39) [C = 37] ==> f391(A,B,C) = -1*B >= -1*B = f315(A,B,38) [C = 36] ==> f389(A,B,C) = -1*B >= -1*B = f315(A,B,37) [C = 35] ==> f387(A,B,C) = -1*B >= -1*B = f315(A,B,36) [C = 34] ==> f385(A,B,C) = -1*B >= -1*B = f315(A,B,35) [C = 33] ==> f383(A,B,C) = -1*B >= -1*B = f315(A,B,34) [C = 32] ==> f381(A,B,C) = -1*B >= -1*B = f315(A,B,33) [C = 31] ==> f379(A,B,C) = -1*B >= -1*B = f315(A,B,32) [C = 30] ==> f377(A,B,C) = -1*B >= -1*B = f315(A,B,31) [C = 29] ==> f375(A,B,C) = -1*B >= -1*B = f315(A,B,30) [C = 28] ==> f373(A,B,C) = -1*B >= -1*B = f315(A,B,29) [C = 27] ==> f371(A,B,C) = -1*B >= -1*B = f315(A,B,28) [C = 26] ==> f369(A,B,C) = -1*B >= -1*B = f315(A,B,27) [C = 25] ==> f367(A,B,C) = -1*B >= -1*B = f315(A,B,26) [C = 24] ==> f365(A,B,C) = -1*B >= -1*B = f315(A,B,25) [C = 23] ==> f363(A,B,C) = -1*B >= -1*B = f315(A,B,24) [C = 22] ==> f361(A,B,C) = -1*B >= -1*B = f315(A,B,23) [C = 21] ==> f359(A,B,C) = -1*B >= -1*B = f315(A,B,22) [C = 20] ==> f357(A,B,C) = -1*B >= -1*B = f315(A,B,21) [C = 19] ==> f355(A,B,C) = -1*B >= -1*B = f315(A,B,20) [C = 18] ==> f353(A,B,C) = -1*B >= -1*B = f315(A,B,19) [C = 17] ==> f351(A,B,C) = -1*B >= -1*B = f315(A,B,18) [C = 16] ==> f349(A,B,C) = -1*B >= -1*B = f315(A,B,17) [C = 15] ==> f347(A,B,C) = -1*B >= -1*B = f315(A,B,16) [C = 14] ==> f345(A,B,C) = -1*B >= -1*B = f315(A,B,15) [C = 13] ==> f343(A,B,C) = -1*B >= -1*B = f315(A,B,14) [C = 12] ==> f341(A,B,C) = -1*B >= -1*B = f315(A,B,13) [C = 11] ==> f339(A,B,C) = -1*B >= -1*B = f315(A,B,12) [C = 10] ==> f337(A,B,C) = -1*B >= -1*B = f315(A,B,11) [C = 9] ==> f335(A,B,C) = -1*B >= -1*B = f315(A,B,10) [C = 8] ==> f333(A,B,C) = -1*B >= -1*B = f315(A,B,9) [C = 7] ==> f331(A,B,C) = -1*B >= -1*B = f315(A,B,8) [C = 6] ==> f329(A,B,C) = -1*B >= -1*B = f315(A,B,7) [C = 5] ==> f327(A,B,C) = -1*B >= -1*B = f315(A,B,6) [C = 4] ==> f325(A,B,C) = -1*B >= -1*B = f315(A,B,5) [C = 3] ==> f323(A,B,C) = -1*B >= -1*B = f315(A,B,4) [C = 2] ==> f321(A,B,C) = -1*B >= -1*B = f315(A,B,3) [C = 1] ==> f319(A,B,C) = -1*B >= -1*B = f315(A,B,2) [C = 0] ==> f315(A,B,C) = -1*B >= -1*B = f315(A,B,1) [C >= 120] ==> f315(A,B,C) = -1*B >= -1*B = f808(A,B,C) [B >= 60] ==> f181(A,B,C) = 57 + -1*B >= 57 + -1*B = f61(A,1 + B,C) [B = 59] ==> f181(A,B,C) = 57 + -1*B >= -2 = f61(A,60,C) [B = 58] ==> f179(A,B,C) = 58 + -1*B >= -1 = f61(A,59,C) [B = 54] ==> f171(A,B,C) = 58 + -1*B >= 3 = f61(A,55,C) [B = 39] ==> f141(A,B,C) = 58 + -1*B >= 18 = f61(A,40,C) [B = 28] ==> f119(A,B,C) = 58 + -1*B >= 29 = f61(A,29,C) [B = 20] ==> f103(A,B,C) = 58 + -1*B >= 37 = f61(A,21,C) [B >= 50] ==> f61(A,B,C) = 58 + -1*B >= -1*B = f315(A,B,0) [A >= 10] ==> f27(A,B,C) = 58 >= 58 = f7(1 + A,B,C) [A = 9] ==> f27(A,B,C) = 58 >= 58 = f7(10,B,C) [A = 8] ==> f25(A,B,C) = 58 >= 58 = f7(9,B,C) [A = 7] ==> f23(A,B,C) = 58 >= 58 = f7(8,B,C) [A = 6] ==> f21(A,B,C) = 58 >= 58 = f7(7,B,C) [A = 5] ==> f19(A,B,C) = 58 >= 58 = f7(6,B,C) [A = 4] ==> f17(A,B,C) = 58 >= 58 = f7(5,B,C) [A = 3] ==> f15(A,B,C) = 58 >= 58 = f7(4,B,C) [A = 2] ==> f13(A,B,C) = 58 >= 58 = f7(3,B,C) [A = 1] ==> f11(A,B,C) = 58 >= 58 = f7(2,B,C) [A = 0] ==> f7(A,B,C) = 58 >= 58 = f7(1,B,C) [A >= 10] ==> f7(A,B,C) = 58 >= 58 = f61(A,0,C) * Step 62: KnowledgePropagation WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (?,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (?,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (?,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (?,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (?,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (?,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (?,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (?,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (?,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (?,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (?,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (?,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (?,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (?,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (?,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (?,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (?,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (?,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (?,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (?,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (?,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (?,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (?,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (?,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (?,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (?,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (?,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (?,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (?,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (?,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (?,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (?,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (?,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (?,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (?,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (?,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (?,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (?,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (?,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (?,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (?,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (?,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (?,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (?,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (?,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (?,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (?,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (?,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (59,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (58,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (48,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (46,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (45,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (44,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: KnowledgePropagation + Details: We propagate bounds from predecessors. * Step 63: PolyRank WORST_CASE(?,O(1)) + Considered Problem: Rules: 1. f11(A,B,C) -> f13(A,B,C) [A >= 2] (11,1) 3. f13(A,B,C) -> f15(A,B,C) [A >= 3] (11,1) 5. f15(A,B,C) -> f17(A,B,C) [A >= 4] (11,1) 7. f17(A,B,C) -> f19(A,B,C) [A >= 5] (11,1) 9. f19(A,B,C) -> f21(A,B,C) [A >= 6] (11,1) 11. f21(A,B,C) -> f23(A,B,C) [A >= 7] (11,1) 13. f23(A,B,C) -> f25(A,B,C) [A >= 8] (11,1) 15. f25(A,B,C) -> f27(A,B,C) [A >= 9] (1,1) 17. f65(A,B,C) -> f67(A,B,C) [B >= 2] (1943,1) 19. f67(A,B,C) -> f69(A,B,C) [B >= 3] (1943,1) 21. f69(A,B,C) -> f71(A,B,C) [B >= 4] (1943,1) 23. f71(A,B,C) -> f73(A,B,C) [B >= 5] (1943,1) 25. f73(A,B,C) -> f75(A,B,C) [B >= 6] (1943,1) 27. f75(A,B,C) -> f77(A,B,C) [B >= 7] (1943,1) 29. f77(A,B,C) -> f79(A,B,C) [B >= 8] (1943,1) 31. f79(A,B,C) -> f81(A,B,C) [B >= 9] (1943,1) 33. f81(A,B,C) -> f83(A,B,C) [B >= 10] (1943,1) 35. f83(A,B,C) -> f85(A,B,C) [B >= 11] (1943,1) 37. f85(A,B,C) -> f87(A,B,C) [B >= 12] (1943,1) 39. f87(A,B,C) -> f89(A,B,C) [B >= 13] (1943,1) 41. f89(A,B,C) -> f91(A,B,C) [B >= 14] (1943,1) 43. f91(A,B,C) -> f93(A,B,C) [B >= 15] (1943,1) 45. f93(A,B,C) -> f95(A,B,C) [B >= 16] (1943,1) 47. f95(A,B,C) -> f97(A,B,C) [B >= 17] (1943,1) 49. f97(A,B,C) -> f99(A,B,C) [B >= 18] (1943,1) 51. f99(A,B,C) -> f101(A,B,C) [B >= 19] (1943,1) 53. f101(A,B,C) -> f103(A,B,C) [B >= 20] (1943,1) 55. f103(A,B,C) -> f105(A,B,C) [B >= 21] (1943,1) 57. f105(A,B,C) -> f107(A,B,C) [B >= 22] (1943,1) 59. f107(A,B,C) -> f109(A,B,C) [B >= 23] (1943,1) 61. f109(A,B,C) -> f111(A,B,C) [B >= 24] (1943,1) 63. f111(A,B,C) -> f113(A,B,C) [B >= 25] (1943,1) 65. f113(A,B,C) -> f115(A,B,C) [B >= 26] (1943,1) 67. f115(A,B,C) -> f117(A,B,C) [B >= 27] (1943,1) 69. f117(A,B,C) -> f119(A,B,C) [B >= 28] (1943,1) 71. f119(A,B,C) -> f121(A,B,C) [B >= 29] (1943,1) 73. f121(A,B,C) -> f123(A,B,C) [B >= 30] (1943,1) 75. f123(A,B,C) -> f125(A,B,C) [B >= 31] (1943,1) 77. f125(A,B,C) -> f127(A,B,C) [B >= 32] (1943,1) 79. f127(A,B,C) -> f129(A,B,C) [B >= 33] (1943,1) 81. f129(A,B,C) -> f131(A,B,C) [B >= 34] (1943,1) 83. f131(A,B,C) -> f133(A,B,C) [B >= 35] (1943,1) 85. f133(A,B,C) -> f135(A,B,C) [B >= 36] (1943,1) 87. f135(A,B,C) -> f137(A,B,C) [B >= 37] (1943,1) 89. f137(A,B,C) -> f139(A,B,C) [B >= 38] (1943,1) 91. f139(A,B,C) -> f141(A,B,C) [B >= 39] (1943,1) 93. f141(A,B,C) -> f143(A,B,C) [B >= 40] (1943,1) 95. f143(A,B,C) -> f145(A,B,C) [B >= 41] (1943,1) 97. f145(A,B,C) -> f147(A,B,C) [B >= 42] (1943,1) 99. f147(A,B,C) -> f149(A,B,C) [B >= 43] (1943,1) 101. f149(A,B,C) -> f151(A,B,C) [B >= 44] (1943,1) 103. f151(A,B,C) -> f153(A,B,C) [B >= 45] (1943,1) 105. f153(A,B,C) -> f155(A,B,C) [B >= 46] (1943,1) 107. f155(A,B,C) -> f157(A,B,C) [B >= 47] (1943,1) 109. f157(A,B,C) -> f159(A,B,C) [B >= 48] (1943,1) 111. f159(A,B,C) -> f161(A,B,C) [B >= 49] (1,1) 113. f161(A,B,C) -> f163(A,B,C) [B >= 50] (1,1) 115. f163(A,B,C) -> f165(A,B,C) [B >= 51] (1,1) 117. f165(A,B,C) -> f167(A,B,C) [B >= 52] (1,1) 119. f167(A,B,C) -> f169(A,B,C) [B >= 53] (1,1) 121. f169(A,B,C) -> f171(A,B,C) [B >= 54] (1,1) 123. f171(A,B,C) -> f173(A,B,C) [B >= 55] (1,1) 125. f173(A,B,C) -> f175(A,B,C) [B >= 56] (1,1) 127. f175(A,B,C) -> f177(A,B,C) [B >= 57] (1,1) 129. f177(A,B,C) -> f179(A,B,C) [B >= 58] (1,1) 131. f179(A,B,C) -> f181(A,B,C) [B >= 59] (1,1) 133. f319(A,B,C) -> f321(A,B,C) [C >= 2] (120,1) 135. f321(A,B,C) -> f323(A,B,C) [C >= 3] (120,1) 137. f323(A,B,C) -> f325(A,B,C) [C >= 4] (120,1) 139. f325(A,B,C) -> f327(A,B,C) [C >= 5] (120,1) 141. f327(A,B,C) -> f329(A,B,C) [C >= 6] (120,1) 143. f329(A,B,C) -> f331(A,B,C) [C >= 7] (120,1) 145. f331(A,B,C) -> f333(A,B,C) [C >= 8] (120,1) 147. f333(A,B,C) -> f335(A,B,C) [C >= 9] (120,1) 149. f335(A,B,C) -> f337(A,B,C) [C >= 10] (120,1) 151. f337(A,B,C) -> f339(A,B,C) [C >= 11] (120,1) 153. f339(A,B,C) -> f341(A,B,C) [C >= 12] (120,1) 155. f341(A,B,C) -> f343(A,B,C) [C >= 13] (120,1) 157. f343(A,B,C) -> f345(A,B,C) [C >= 14] (120,1) 159. f345(A,B,C) -> f347(A,B,C) [C >= 15] (120,1) 161. f347(A,B,C) -> f349(A,B,C) [C >= 16] (120,1) 163. f349(A,B,C) -> f351(A,B,C) [C >= 17] (120,1) 165. f351(A,B,C) -> f353(A,B,C) [C >= 18] (120,1) 167. f353(A,B,C) -> f355(A,B,C) [C >= 19] (120,1) 169. f355(A,B,C) -> f357(A,B,C) [C >= 20] (120,1) 171. f357(A,B,C) -> f359(A,B,C) [C >= 21] (120,1) 173. f359(A,B,C) -> f361(A,B,C) [C >= 22] (120,1) 175. f361(A,B,C) -> f363(A,B,C) [C >= 23] (120,1) 177. f363(A,B,C) -> f365(A,B,C) [C >= 24] (120,1) 179. f365(A,B,C) -> f367(A,B,C) [C >= 25] (120,1) 181. f367(A,B,C) -> f369(A,B,C) [C >= 26] (120,1) 183. f369(A,B,C) -> f371(A,B,C) [C >= 27] (120,1) 185. f371(A,B,C) -> f373(A,B,C) [C >= 28] (120,1) 187. f373(A,B,C) -> f375(A,B,C) [C >= 29] (120,1) 189. f375(A,B,C) -> f377(A,B,C) [C >= 30] (120,1) 191. f377(A,B,C) -> f379(A,B,C) [C >= 31] (120,1) 193. f379(A,B,C) -> f381(A,B,C) [C >= 32] (120,1) 195. f381(A,B,C) -> f383(A,B,C) [C >= 33] (120,1) 197. f383(A,B,C) -> f385(A,B,C) [C >= 34] (120,1) 199. f385(A,B,C) -> f387(A,B,C) [C >= 35] (120,1) 201. f387(A,B,C) -> f389(A,B,C) [C >= 36] (120,1) 203. f389(A,B,C) -> f391(A,B,C) [C >= 37] (120,1) 205. f391(A,B,C) -> f393(A,B,C) [C >= 38] (120,1) 207. f393(A,B,C) -> f395(A,B,C) [C >= 39] (120,1) 209. f395(A,B,C) -> f397(A,B,C) [C >= 40] (120,1) 211. f397(A,B,C) -> f399(A,B,C) [C >= 41] (120,1) 213. f399(A,B,C) -> f401(A,B,C) [C >= 42] (120,1) 215. f401(A,B,C) -> f403(A,B,C) [C >= 43] (120,1) 217. f403(A,B,C) -> f405(A,B,C) [C >= 44] (120,1) 219. f405(A,B,C) -> f407(A,B,C) [C >= 45] (120,1) 221. f407(A,B,C) -> f409(A,B,C) [C >= 46] (120,1) 223. f409(A,B,C) -> f411(A,B,C) [C >= 47] (120,1) 225. f411(A,B,C) -> f413(A,B,C) [C >= 48] (120,1) 227. f413(A,B,C) -> f415(A,B,C) [C >= 49] (120,1) 229. f415(A,B,C) -> f417(A,B,C) [C >= 50] (120,1) 231. f417(A,B,C) -> f419(A,B,C) [C >= 51] (120,1) 233. f419(A,B,C) -> f421(A,B,C) [C >= 52] (120,1) 235. f421(A,B,C) -> f423(A,B,C) [C >= 53] (120,1) 237. f423(A,B,C) -> f425(A,B,C) [C >= 54] (120,1) 239. f425(A,B,C) -> f427(A,B,C) [C >= 55] (120,1) 241. f427(A,B,C) -> f429(A,B,C) [C >= 56] (120,1) 243. f429(A,B,C) -> f431(A,B,C) [C >= 57] (120,1) 245. f431(A,B,C) -> f433(A,B,C) [C >= 58] (120,1) 247. f433(A,B,C) -> f435(A,B,C) [C >= 59] (120,1) 249. f435(A,B,C) -> f437(A,B,C) [C >= 60] (120,1) 251. f437(A,B,C) -> f439(A,B,C) [C >= 61] (120,1) 253. f439(A,B,C) -> f441(A,B,C) [C >= 62] (120,1) 255. f441(A,B,C) -> f443(A,B,C) [C >= 63] (120,1) 257. f443(A,B,C) -> f445(A,B,C) [C >= 64] (120,1) 259. f445(A,B,C) -> f447(A,B,C) [C >= 65] (120,1) 261. f447(A,B,C) -> f449(A,B,C) [C >= 66] (120,1) 263. f449(A,B,C) -> f451(A,B,C) [C >= 67] (120,1) 265. f451(A,B,C) -> f453(A,B,C) [C >= 68] (120,1) 267. f453(A,B,C) -> f455(A,B,C) [C >= 69] (120,1) 269. f455(A,B,C) -> f457(A,B,C) [C >= 70] (120,1) 271. f457(A,B,C) -> f459(A,B,C) [C >= 71] (120,1) 273. f459(A,B,C) -> f461(A,B,C) [C >= 72] (120,1) 275. f461(A,B,C) -> f463(A,B,C) [C >= 73] (120,1) 277. f463(A,B,C) -> f465(A,B,C) [C >= 74] (120,1) 279. f465(A,B,C) -> f467(A,B,C) [C >= 75] (120,1) 281. f467(A,B,C) -> f469(A,B,C) [C >= 76] (120,1) 283. f469(A,B,C) -> f471(A,B,C) [C >= 77] (120,1) 285. f471(A,B,C) -> f473(A,B,C) [C >= 78] (120,1) 287. f473(A,B,C) -> f475(A,B,C) [C >= 79] (120,1) 289. f475(A,B,C) -> f477(A,B,C) [C >= 80] (120,1) 291. f477(A,B,C) -> f479(A,B,C) [C >= 81] (120,1) 293. f479(A,B,C) -> f481(A,B,C) [C >= 82] (120,1) 295. f481(A,B,C) -> f483(A,B,C) [C >= 83] (120,1) 297. f483(A,B,C) -> f485(A,B,C) [C >= 84] (120,1) 299. f485(A,B,C) -> f487(A,B,C) [C >= 85] (120,1) 301. f487(A,B,C) -> f489(A,B,C) [C >= 86] (120,1) 303. f489(A,B,C) -> f491(A,B,C) [C >= 87] (120,1) 305. f491(A,B,C) -> f493(A,B,C) [C >= 88] (120,1) 307. f493(A,B,C) -> f495(A,B,C) [C >= 89] (120,1) 309. f495(A,B,C) -> f497(A,B,C) [C >= 90] (120,1) 311. f497(A,B,C) -> f499(A,B,C) [C >= 91] (120,1) 313. f499(A,B,C) -> f501(A,B,C) [C >= 92] (120,1) 315. f501(A,B,C) -> f503(A,B,C) [C >= 93] (120,1) 317. f503(A,B,C) -> f505(A,B,C) [C >= 94] (120,1) 319. f505(A,B,C) -> f507(A,B,C) [C >= 95] (120,1) 321. f507(A,B,C) -> f509(A,B,C) [C >= 96] (120,1) 323. f509(A,B,C) -> f511(A,B,C) [C >= 97] (120,1) 325. f511(A,B,C) -> f513(A,B,C) [C >= 98] (120,1) 327. f513(A,B,C) -> f515(A,B,C) [C >= 99] (120,1) 329. f515(A,B,C) -> f517(A,B,C) [C >= 100] (120,1) 331. f517(A,B,C) -> f519(A,B,C) [C >= 101] (120,1) 333. f519(A,B,C) -> f521(A,B,C) [C >= 102] (120,1) 335. f521(A,B,C) -> f523(A,B,C) [C >= 103] (120,1) 337. f523(A,B,C) -> f525(A,B,C) [C >= 104] (120,1) 339. f525(A,B,C) -> f527(A,B,C) [C >= 105] (120,1) 341. f527(A,B,C) -> f529(A,B,C) [C >= 106] (120,1) 343. f529(A,B,C) -> f531(A,B,C) [C >= 107] (120,1) 345. f531(A,B,C) -> f533(A,B,C) [C >= 108] (120,1) 347. f533(A,B,C) -> f535(A,B,C) [C >= 109] (120,1) 349. f535(A,B,C) -> f537(A,B,C) [C >= 110] (120,1) 351. f537(A,B,C) -> f539(A,B,C) [C >= 111] (120,1) 353. f539(A,B,C) -> f541(A,B,C) [C >= 112] (120,1) 355. f541(A,B,C) -> f543(A,B,C) [C >= 113] (120,1) 357. f543(A,B,C) -> f545(A,B,C) [C >= 114] (120,1) 359. f545(A,B,C) -> f547(A,B,C) [C >= 115] (120,1) 361. f547(A,B,C) -> f549(A,B,C) [C >= 116] (120,1) 363. f549(A,B,C) -> f551(A,B,C) [C >= 117] (120,1) 365. f551(A,B,C) -> f553(A,B,C) [C >= 118] (120,1) 367. f553(A,B,C) -> f555(A,B,C) [C >= 119] (1,1) 368. f0(A,B,C) -> f7(0,B,C) True (1,1) 370. f7(A,B,C) -> f11(A,B,C) [9 >= A && A >= 1] (11,1) 372. f61(A,B,C) -> f65(A,B,C) [49 >= B && B >= 1] (1943,1) 374. f315(A,B,C) -> f319(A,B,C) [119 >= C && C >= 1] (120,1) 376. f555(A,B,C) -> f315(A,B,1 + C) [C >= 120] (1,1) 377. f555(A,B,C) -> f315(A,B,120) [C = 119] (1,1) 378. f553(A,B,C) -> f315(A,B,119) [C = 118] (120,1) 379. f551(A,B,C) -> f315(A,B,118) [C = 117] (118,1) 380. f549(A,B,C) -> f315(A,B,117) [C = 116] (118,1) 381. f547(A,B,C) -> f315(A,B,116) [C = 115] (118,1) 382. f545(A,B,C) -> f315(A,B,115) [C = 114] (118,1) 383. f543(A,B,C) -> f315(A,B,114) [C = 113] (118,1) 384. f541(A,B,C) -> f315(A,B,113) [C = 112] (118,1) 385. f539(A,B,C) -> f315(A,B,112) [C = 111] (118,1) 386. f537(A,B,C) -> f315(A,B,111) [C = 110] (118,1) 387. f535(A,B,C) -> f315(A,B,110) [C = 109] (118,1) 388. f533(A,B,C) -> f315(A,B,109) [C = 108] (118,1) 389. f531(A,B,C) -> f315(A,B,108) [C = 107] (118,1) 390. f529(A,B,C) -> f315(A,B,107) [C = 106] (118,1) 391. f527(A,B,C) -> f315(A,B,106) [C = 105] (118,1) 392. f525(A,B,C) -> f315(A,B,105) [C = 104] (118,1) 393. f523(A,B,C) -> f315(A,B,104) [C = 103] (118,1) 394. f521(A,B,C) -> f315(A,B,103) [C = 102] (118,1) 395. f519(A,B,C) -> f315(A,B,102) [C = 101] (118,1) 396. f517(A,B,C) -> f315(A,B,101) [C = 100] (118,1) 397. f515(A,B,C) -> f315(A,B,100) [C = 99] (118,1) 398. f513(A,B,C) -> f315(A,B,99) [C = 98] (118,1) 399. f511(A,B,C) -> f315(A,B,98) [C = 97] (118,1) 400. f509(A,B,C) -> f315(A,B,97) [C = 96] (118,1) 401. f507(A,B,C) -> f315(A,B,96) [C = 95] (118,1) 402. f505(A,B,C) -> f315(A,B,95) [C = 94] (118,1) 403. f503(A,B,C) -> f315(A,B,94) [C = 93] (118,1) 404. f501(A,B,C) -> f315(A,B,93) [C = 92] (118,1) 405. f499(A,B,C) -> f315(A,B,92) [C = 91] (118,1) 406. f497(A,B,C) -> f315(A,B,91) [C = 90] (118,1) 407. f495(A,B,C) -> f315(A,B,90) [C = 89] (118,1) 408. f493(A,B,C) -> f315(A,B,89) [C = 88] (118,1) 409. f491(A,B,C) -> f315(A,B,88) [C = 87] (118,1) 410. f489(A,B,C) -> f315(A,B,87) [C = 86] (118,1) 411. f487(A,B,C) -> f315(A,B,86) [C = 85] (118,1) 412. f485(A,B,C) -> f315(A,B,85) [C = 84] (118,1) 413. f483(A,B,C) -> f315(A,B,84) [C = 83] (118,1) 414. f481(A,B,C) -> f315(A,B,83) [C = 82] (118,1) 415. f479(A,B,C) -> f315(A,B,82) [C = 81] (118,1) 416. f477(A,B,C) -> f315(A,B,81) [C = 80] (118,1) 417. f475(A,B,C) -> f315(A,B,80) [C = 79] (118,1) 418. f473(A,B,C) -> f315(A,B,79) [C = 78] (118,1) 419. f471(A,B,C) -> f315(A,B,78) [C = 77] (118,1) 420. f469(A,B,C) -> f315(A,B,77) [C = 76] (118,1) 421. f467(A,B,C) -> f315(A,B,76) [C = 75] (118,1) 422. f465(A,B,C) -> f315(A,B,75) [C = 74] (118,1) 423. f463(A,B,C) -> f315(A,B,74) [C = 73] (118,1) 424. f461(A,B,C) -> f315(A,B,73) [C = 72] (118,1) 425. f459(A,B,C) -> f315(A,B,72) [C = 71] (118,1) 426. f457(A,B,C) -> f315(A,B,71) [C = 70] (118,1) 427. f455(A,B,C) -> f315(A,B,70) [C = 69] (118,1) 428. f453(A,B,C) -> f315(A,B,69) [C = 68] (118,1) 429. f451(A,B,C) -> f315(A,B,68) [C = 67] (118,1) 430. f449(A,B,C) -> f315(A,B,67) [C = 66] (118,1) 431. f447(A,B,C) -> f315(A,B,66) [C = 65] (118,1) 432. f445(A,B,C) -> f315(A,B,65) [C = 64] (118,1) 433. f443(A,B,C) -> f315(A,B,64) [C = 63] (118,1) 434. f441(A,B,C) -> f315(A,B,63) [C = 62] (118,1) 435. f439(A,B,C) -> f315(A,B,62) [C = 61] (118,1) 436. f437(A,B,C) -> f315(A,B,61) [C = 60] (118,1) 437. f435(A,B,C) -> f315(A,B,60) [C = 59] (118,1) 438. f433(A,B,C) -> f315(A,B,59) [C = 58] (118,1) 439. f431(A,B,C) -> f315(A,B,58) [C = 57] (118,1) 440. f429(A,B,C) -> f315(A,B,57) [C = 56] (120,1) 441. f427(A,B,C) -> f315(A,B,56) [C = 55] (118,1) 442. f425(A,B,C) -> f315(A,B,55) [C = 54] (118,1) 443. f423(A,B,C) -> f315(A,B,54) [C = 53] (118,1) 444. f421(A,B,C) -> f315(A,B,53) [C = 52] (118,1) 445. f419(A,B,C) -> f315(A,B,52) [C = 51] (118,1) 446. f417(A,B,C) -> f315(A,B,51) [C = 50] (118,1) 447. f415(A,B,C) -> f315(A,B,50) [C = 49] (120,1) 448. f413(A,B,C) -> f315(A,B,49) [C = 48] (120,1) 449. f411(A,B,C) -> f315(A,B,48) [C = 47] (118,1) 450. f409(A,B,C) -> f315(A,B,47) [C = 46] (118,1) 451. f407(A,B,C) -> f315(A,B,46) [C = 45] (120,1) 452. f405(A,B,C) -> f315(A,B,45) [C = 44] (118,1) 453. f403(A,B,C) -> f315(A,B,44) [C = 43] (118,1) 454. f401(A,B,C) -> f315(A,B,43) [C = 42] (118,1) 455. f399(A,B,C) -> f315(A,B,42) [C = 41] (118,1) 456. f397(A,B,C) -> f315(A,B,41) [C = 40] (120,1) 457. f395(A,B,C) -> f315(A,B,40) [C = 39] (120,1) 458. f393(A,B,C) -> f315(A,B,39) [C = 38] (118,1) 459. f391(A,B,C) -> f315(A,B,38) [C = 37] (118,1) 460. f389(A,B,C) -> f315(A,B,37) [C = 36] (118,1) 461. f387(A,B,C) -> f315(A,B,36) [C = 35] (118,1) 462. f385(A,B,C) -> f315(A,B,35) [C = 34] (118,1) 463. f383(A,B,C) -> f315(A,B,34) [C = 33] (118,1) 464. f381(A,B,C) -> f315(A,B,33) [C = 32] (118,1) 465. f379(A,B,C) -> f315(A,B,32) [C = 31] (118,1) 466. f377(A,B,C) -> f315(A,B,31) [C = 30] (118,1) 467. f375(A,B,C) -> f315(A,B,30) [C = 29] (120,1) 468. f373(A,B,C) -> f315(A,B,29) [C = 28] (118,1) 469. f371(A,B,C) -> f315(A,B,28) [C = 27] (118,1) 470. f369(A,B,C) -> f315(A,B,27) [C = 26] (118,1) 471. f367(A,B,C) -> f315(A,B,26) [C = 25] (118,1) 472. f365(A,B,C) -> f315(A,B,25) [C = 24] (118,1) 473. f363(A,B,C) -> f315(A,B,24) [C = 23] (118,1) 474. f361(A,B,C) -> f315(A,B,23) [C = 22] (118,1) 475. f359(A,B,C) -> f315(A,B,22) [C = 21] (118,1) 476. f357(A,B,C) -> f315(A,B,21) [C = 20] (118,1) 477. f355(A,B,C) -> f315(A,B,20) [C = 19] (118,1) 478. f353(A,B,C) -> f315(A,B,19) [C = 18] (118,1) 479. f351(A,B,C) -> f315(A,B,18) [C = 17] (118,1) 480. f349(A,B,C) -> f315(A,B,17) [C = 16] (118,1) 481. f347(A,B,C) -> f315(A,B,16) [C = 15] (118,1) 482. f345(A,B,C) -> f315(A,B,15) [C = 14] (118,1) 483. f343(A,B,C) -> f315(A,B,14) [C = 13] (118,1) 484. f341(A,B,C) -> f315(A,B,13) [C = 12] (118,1) 485. f339(A,B,C) -> f315(A,B,12) [C = 11] (118,1) 486. f337(A,B,C) -> f315(A,B,11) [C = 10] (118,1) 487. f335(A,B,C) -> f315(A,B,10) [C = 9] (118,1) 488. f333(A,B,C) -> f315(A,B,9) [C = 8] (120,1) 489. f331(A,B,C) -> f315(A,B,8) [C = 7] (118,1) 490. f329(A,B,C) -> f315(A,B,7) [C = 6] (118,1) 491. f327(A,B,C) -> f315(A,B,6) [C = 5] (118,1) 492. f325(A,B,C) -> f315(A,B,5) [C = 4] (118,1) 493. f323(A,B,C) -> f315(A,B,4) [C = 3] (120,1) 494. f321(A,B,C) -> f315(A,B,3) [C = 2] (118,1) 495. f319(A,B,C) -> f315(A,B,2) [C = 1] (118,1) 496. f315(A,B,C) -> f315(A,B,1) [C = 0] (1,1) 497. f315(A,B,C) -> f808(A,B,C) [C >= 120] (1,1) 499. f181(A,B,C) -> f61(A,1 + B,C) [B >= 60] (1,1) 500. f181(A,B,C) -> f61(A,60,C) [B = 59] (1,1) 501. f179(A,B,C) -> f61(A,59,C) [B = 58] (1,1) 502. f177(A,B,C) -> f61(A,58,C) [B = 57] (1,1) 503. f175(A,B,C) -> f61(A,57,C) [B = 56] (1,1) 504. f173(A,B,C) -> f61(A,56,C) [B = 55] (1,1) 505. f171(A,B,C) -> f61(A,55,C) [B = 54] (1,1) 506. f169(A,B,C) -> f61(A,54,C) [B = 53] (1,1) 507. f167(A,B,C) -> f61(A,53,C) [B = 52] (1,1) 508. f165(A,B,C) -> f61(A,52,C) [B = 51] (1,1) 509. f163(A,B,C) -> f61(A,51,C) [B = 50] (1,1) 510. f161(A,B,C) -> f61(A,50,C) [B = 49] (1,1) 511. f159(A,B,C) -> f61(A,49,C) [B = 48] (59,1) 512. f157(A,B,C) -> f61(A,48,C) [B = 47] (58,1) 513. f155(A,B,C) -> f61(A,47,C) [B = 46] (48,1) 514. f153(A,B,C) -> f61(A,46,C) [B = 45] (46,1) 515. f151(A,B,C) -> f61(A,45,C) [B = 44] (87,1) 516. f149(A,B,C) -> f61(A,44,C) [B = 43] (45,1) 517. f147(A,B,C) -> f61(A,43,C) [B = 42] (44,1) 518. f145(A,B,C) -> f61(A,42,C) [B = 41] (42,1) 519. f143(A,B,C) -> f61(A,41,C) [B = 40] (42,1) 520. f141(A,B,C) -> f61(A,40,C) [B = 39] (40,1) 521. f139(A,B,C) -> f61(A,39,C) [B = 38] (58,1) 522. f137(A,B,C) -> f61(A,38,C) [B = 37] (38,1) 523. f135(A,B,C) -> f61(A,37,C) [B = 36] (37,1) 524. f133(A,B,C) -> f61(A,36,C) [B = 35] (36,1) 525. f131(A,B,C) -> f61(A,35,C) [B = 34] (58,1) 526. f129(A,B,C) -> f61(A,34,C) [B = 33] (34,1) 527. f127(A,B,C) -> f61(A,33,C) [B = 32] (34,1) 528. f125(A,B,C) -> f61(A,32,C) [B = 31] (32,1) 529. f123(A,B,C) -> f61(A,31,C) [B = 30] (31,1) 530. f121(A,B,C) -> f61(A,30,C) [B = 29] (52,1) 531. f119(A,B,C) -> f61(A,29,C) [B = 28] (53,1) 532. f117(A,B,C) -> f61(A,28,C) [B = 27] (28,1) 533. f115(A,B,C) -> f61(A,27,C) [B = 26] (50,1) 534. f113(A,B,C) -> f61(A,26,C) [B = 25] (26,1) 535. f111(A,B,C) -> f61(A,25,C) [B = 24] (25,1) 536. f109(A,B,C) -> f61(A,24,C) [B = 23] (24,1) 537. f107(A,B,C) -> f61(A,23,C) [B = 22] (23,1) 538. f105(A,B,C) -> f61(A,22,C) [B = 21] (22,1) 539. f103(A,B,C) -> f61(A,21,C) [B = 20] (22,1) 540. f101(A,B,C) -> f61(A,20,C) [B = 19] (21,1) 541. f99(A,B,C) -> f61(A,19,C) [B = 18] (52,1) 542. f97(A,B,C) -> f61(A,18,C) [B = 17] (59,1) 543. f95(A,B,C) -> f61(A,17,C) [B = 16] (17,1) 544. f93(A,B,C) -> f61(A,16,C) [B = 15] (16,1) 545. f91(A,B,C) -> f61(A,15,C) [B = 14] (34,1) 546. f89(A,B,C) -> f61(A,14,C) [B = 13] (59,1) 547. f87(A,B,C) -> f61(A,13,C) [B = 12] (59,1) 548. f85(A,B,C) -> f61(A,12,C) [B = 11] (12,1) 549. f83(A,B,C) -> f61(A,11,C) [B = 10] (35,1) 550. f81(A,B,C) -> f61(A,10,C) [B = 9] (15,1) 551. f79(A,B,C) -> f61(A,9,C) [B = 8] (15,1) 552. f77(A,B,C) -> f61(A,8,C) [B = 7] (59,1) 553. f75(A,B,C) -> f61(A,7,C) [B = 6] (47,1) 554. f73(A,B,C) -> f61(A,6,C) [B = 5] (36,1) 555. f71(A,B,C) -> f61(A,5,C) [B = 4] (50,1) 556. f69(A,B,C) -> f61(A,4,C) [B = 3] (48,1) 557. f67(A,B,C) -> f61(A,3,C) [B = 2] (59,1) 558. f65(A,B,C) -> f61(A,2,C) [B = 1] (55,1) 559. f61(A,B,C) -> f61(A,1,C) [B = 0] (1,1) 560. f61(A,B,C) -> f315(A,B,0) [B >= 50] (1,1) 562. f27(A,B,C) -> f7(1 + A,B,C) [A >= 10] (1,1) 563. f27(A,B,C) -> f7(10,B,C) [A = 9] (1,1) 564. f25(A,B,C) -> f7(9,B,C) [A = 8] (11,1) 565. f23(A,B,C) -> f7(8,B,C) [A = 7] (11,1) 566. f21(A,B,C) -> f7(7,B,C) [A = 6] (11,1) 567. f19(A,B,C) -> f7(6,B,C) [A = 5] (11,1) 568. f17(A,B,C) -> f7(5,B,C) [A = 4] (5,1) 569. f15(A,B,C) -> f7(4,B,C) [A = 3] (4,1) 570. f13(A,B,C) -> f7(3,B,C) [A = 2] (3,1) 571. f11(A,B,C) -> f7(2,B,C) [A = 1] (8,1) 572. f7(A,B,C) -> f7(1,B,C) [A = 0] (1,1) 573. f7(A,B,C) -> f61(A,0,C) [A >= 10] (1,1) Signature: {(f0,13) ;(f101,13) ;(f103,13) ;(f105,13) ;(f107,13) ;(f109,13) ;(f11,13) ;(f111,13) ;(f113,13) ;(f115,13) ;(f117,13) ;(f119,13) ;(f121,13) ;(f123,13) ;(f125,13) ;(f127,13) ;(f129,13) ;(f13,13) ;(f131,13) ;(f133,13) ;(f135,13) ;(f137,13) ;(f139,13) ;(f141,13) ;(f143,13) ;(f145,13) ;(f147,13) ;(f149,13) ;(f15,13) ;(f151,13) ;(f153,13) ;(f155,13) ;(f157,13) ;(f159,13) ;(f161,13) ;(f163,13) ;(f165,13) ;(f167,13) ;(f169,13) ;(f17,13) ;(f171,13) ;(f173,13) ;(f175,13) ;(f177,13) ;(f179,13) ;(f181,13) ;(f19,13) ;(f21,13) ;(f23,13) ;(f25,13) ;(f27,13) ;(f315,13) ;(f319,13) ;(f321,13) ;(f323,13) ;(f325,13) ;(f327,13) ;(f329,13) ;(f331,13) ;(f333,13) ;(f335,13) ;(f337,13) ;(f339,13) ;(f341,13) ;(f343,13) ;(f345,13) ;(f347,13) ;(f349,13) ;(f351,13) ;(f353,13) ;(f355,13) ;(f357,13) ;(f359,13) ;(f361,13) ;(f363,13) ;(f365,13) ;(f367,13) ;(f369,13) ;(f371,13) ;(f373,13) ;(f375,13) ;(f377,13) ;(f379,13) ;(f381,13) ;(f383,13) ;(f385,13) ;(f387,13) ;(f389,13) ;(f391,13) ;(f393,13) ;(f395,13) ;(f397,13) ;(f399,13) ;(f401,13) ;(f403,13) ;(f405,13) ;(f407,13) ;(f409,13) ;(f411,13) ;(f413,13) ;(f415,13) ;(f417,13) ;(f419,13) ;(f421,13) ;(f423,13) ;(f425,13) ;(f427,13) ;(f429,13) ;(f431,13) ;(f433,13) ;(f435,13) ;(f437,13) ;(f439,13) ;(f441,13) ;(f443,13) ;(f445,13) ;(f447,13) ;(f449,13) ;(f451,13) ;(f453,13) ;(f455,13) ;(f457,13) ;(f459,13) ;(f461,13) ;(f463,13) ;(f465,13) ;(f467,13) ;(f469,13) ;(f471,13) ;(f473,13) ;(f475,13) ;(f477,13) ;(f479,13) ;(f481,13) ;(f483,13) ;(f485,13) ;(f487,13) ;(f489,13) ;(f491,13) ;(f493,13) ;(f495,13) ;(f497,13) ;(f499,13) ;(f501,13) ;(f503,13) ;(f505,13) ;(f507,13) ;(f509,13) ;(f511,13) ;(f513,13) ;(f515,13) ;(f517,13) ;(f519,13) ;(f521,13) ;(f523,13) ;(f525,13) ;(f527,13) ;(f529,13) ;(f531,13) ;(f533,13) ;(f535,13) ;(f537,13) ;(f539,13) ;(f541,13) ;(f543,13) ;(f545,13) ;(f547,13) ;(f549,13) ;(f551,13) ;(f553,13) ;(f555,13) ;(f61,13) ;(f65,13) ;(f67,13) ;(f69,13) ;(f7,13) ;(f71,13) ;(f73,13) ;(f75,13) ;(f77,13) ;(f79,13) ;(f808,13) ;(f81,13) ;(f83,13) ;(f85,13) ;(f87,13) ;(f89,13) ;(f91,13) ;(f93,13) ;(f95,13) ;(f97,13) ;(f99,13)} Flow Graph: [1->{3,570},3->{5,569},5->{7,568},7->{9,567},9->{11,566},11->{13,565},13->{15,564},15->{562,563},17->{19 ,557},19->{21,556},21->{23,555},23->{25,554},25->{27,553},27->{29,552},29->{31,551},31->{33,550},33->{35 ,549},35->{37,548},37->{39,547},39->{41,546},41->{43,545},43->{45,544},45->{47,543},47->{49,542},49->{51 ,541},51->{53,540},53->{55,539},55->{57,538},57->{59,537},59->{61,536},61->{63,535},63->{65,534},65->{67 ,533},67->{69,532},69->{71,531},71->{73,530},73->{75,529},75->{77,528},77->{79,527},79->{81,526},81->{83 ,525},83->{85,524},85->{87,523},87->{89,522},89->{91,521},91->{93,520},93->{95,519},95->{97,518},97->{99 ,517},99->{101,516},101->{103,515},103->{105,514},105->{107,513},107->{109,512},109->{111,511},111->{113 ,510},113->{115,509},115->{117,508},117->{119,507},119->{121,506},121->{123,505},123->{125,504},125->{127 ,503},127->{129,502},129->{131,501},131->{499,500},133->{135,494},135->{137,493},137->{139,492},139->{141 ,491},141->{143,490},143->{145,489},145->{147,488},147->{149,487},149->{151,486},151->{153,485},153->{155 ,484},155->{157,483},157->{159,482},159->{161,481},161->{163,480},163->{165,479},165->{167,478},167->{169 ,477},169->{171,476},171->{173,475},173->{175,474},175->{177,473},177->{179,472},179->{181,471},181->{183 ,470},183->{185,469},185->{187,468},187->{189,467},189->{191,466},191->{193,465},193->{195,464},195->{197 ,463},197->{199,462},199->{201,461},201->{203,460},203->{205,459},205->{207,458},207->{209,457},209->{211 ,456},211->{213,455},213->{215,454},215->{217,453},217->{219,452},219->{221,451},221->{223,450},223->{225 ,449},225->{227,448},227->{229,447},229->{231,446},231->{233,445},233->{235,444},235->{237,443},237->{239 ,442},239->{241,441},241->{243,440},243->{245,439},245->{247,438},247->{249,437},249->{251,436},251->{253 ,435},253->{255,434},255->{257,433},257->{259,432},259->{261,431},261->{263,430},263->{265,429},265->{267 ,428},267->{269,427},269->{271,426},271->{273,425},273->{275,424},275->{277,423},277->{279,422},279->{281 ,421},281->{283,420},283->{285,419},285->{287,418},287->{289,417},289->{291,416},291->{293,415},293->{295 ,414},295->{297,413},297->{299,412},299->{301,411},301->{303,410},303->{305,409},305->{307,408},307->{309 ,407},309->{311,406},311->{313,405},313->{315,404},315->{317,403},317->{319,402},319->{321,401},321->{323 ,400},323->{325,399},325->{327,398},327->{329,397},329->{331,396},331->{333,395},333->{335,394},335->{337 ,393},337->{339,392},339->{341,391},341->{343,390},343->{345,389},345->{347,388},347->{349,387},349->{351 ,386},351->{353,385},353->{355,384},355->{357,383},357->{359,382},359->{361,381},361->{363,380},363->{365 ,379},365->{367,378},367->{376,377},368->{572},370->{1,571},372->{17,558},374->{133,495},376->{497} ,377->{497},378->{374},379->{374},380->{374},381->{374},382->{374},383->{374},384->{374},385->{374} ,386->{374},387->{374},388->{374},389->{374},390->{374},391->{374},392->{374},393->{374},394->{374} ,395->{374},396->{374},397->{374},398->{374},399->{374},400->{374},401->{374},402->{374},403->{374} ,404->{374},405->{374},406->{374},407->{374},408->{374},409->{374},410->{374},411->{374},412->{374} ,413->{374},414->{374},415->{374},416->{374},417->{374},418->{374},419->{374},420->{374},421->{374} ,422->{374},423->{374},424->{374},425->{374},426->{374},427->{374},428->{374},429->{374},430->{374} ,431->{374},432->{374},433->{374},434->{374},435->{374},436->{374},437->{374},438->{374},439->{374} ,440->{374},441->{374},442->{374},443->{374},444->{374},445->{374},446->{374},447->{374},448->{374} ,449->{374},450->{374},451->{374},452->{374},453->{374},454->{374},455->{374},456->{374},457->{374} ,458->{374},459->{374},460->{374},461->{374},462->{374},463->{374},464->{374},465->{374},466->{374} ,467->{374},468->{374},469->{374},470->{374},471->{374},472->{374},473->{374},474->{374},475->{374} ,476->{374},477->{374},478->{374},479->{374},480->{374},481->{374},482->{374},483->{374},484->{374} ,485->{374},486->{374},487->{374},488->{374},489->{374},490->{374},491->{374},492->{374},493->{374} ,494->{374},495->{374},496->{374},497->{},499->{560},500->{560},501->{560},502->{560},503->{560},504->{560} ,505->{560},506->{560},507->{560},508->{560},509->{560},510->{560},511->{372},512->{372},513->{372} ,514->{372},515->{372},516->{372},517->{372},518->{372},519->{372},520->{372},521->{372},522->{372} ,523->{372},524->{372},525->{372},526->{372},527->{372},528->{372},529->{372},530->{372},531->{372} ,532->{372},533->{372},534->{372},535->{372},536->{372},537->{372},538->{372},539->{372},540->{372} ,541->{372},542->{372},543->{372},544->{372},545->{372},546->{372},547->{372},548->{372},549->{372} ,550->{372},551->{372},552->{372},553->{372},554->{372},555->{372},556->{372},557->{372},558->{372} ,559->{372},560->{496},562->{573},563->{573},564->{370},565->{370},566->{370},567->{370},568->{370} ,569->{370},570->{370},571->{370},572->{370},573->{559}] + Applied Processor: PolyRank {useFarkas = True, withSizebounds = [], shape = Linear} + Details: The problem is already solved. YES(?,O(1))