YES(?,O(n^1))
1108.47/297.09	YES(?,O(n^1))
1108.47/297.09	
1108.47/297.09	We are left with following problem, upon which TcT provides the
1108.47/297.09	certificate YES(?,O(n^1)).
1108.47/297.09	
1108.47/297.09	Strict Trs:
1108.47/297.09	  { 0(0(1(0(x1)))) -> 2(3(4(x1)))
1108.47/297.09	  , 0(0(3(3(3(1(1(0(0(2(5(0(4(5(1(4(2(4(1(0(5(x1)))))))))))))))))))))
1108.47/297.09	    -> 1(2(3(0(5(2(3(0(3(5(4(1(4(4(5(0(1(1(1(5(x1))))))))))))))))))))
1108.47/297.09	  , 0(0(3(3(5(5(4(x1))))))) -> 2(3(3(0(3(4(x1))))))
1108.47/297.09	  , 0(1(1(3(4(4(0(4(1(5(5(x1))))))))))) ->
1108.47/297.09	    0(2(4(4(5(5(5(3(2(4(0(x1)))))))))))
1108.47/297.09	  , 0(2(1(3(1(2(0(3(4(2(2(5(3(0(1(3(3(5(3(2(x1)))))))))))))))))))) ->
1108.47/297.09	    1(3(1(0(2(5(3(1(1(3(1(5(0(1(1(0(3(0(3(x1)))))))))))))))))))
1108.47/297.09	  , 0(2(5(5(1(2(2(5(5(0(5(2(1(0(x1)))))))))))))) ->
1108.47/297.09	    2(0(5(5(5(0(1(2(3(4(0(1(1(x1)))))))))))))
1108.47/297.09	  , 0(3(3(2(0(2(2(3(4(0(5(1(2(5(1(2(x1)))))))))))))))) ->
1108.47/297.09	    0(1(0(1(3(0(1(1(2(2(4(0(3(4(4(x1)))))))))))))))
1108.47/297.09	  , 0(4(0(0(4(4(5(x1))))))) -> 3(5(4(1(2(4(x1))))))
1108.47/297.09	  , 0(4(1(5(4(3(5(5(0(0(5(1(2(x1))))))))))))) ->
1108.47/297.09	    0(3(5(4(5(0(5(2(0(4(2(4(x1))))))))))))
1108.47/297.09	  , 0(4(3(0(1(1(1(4(1(0(x1)))))))))) ->
1108.47/297.09	    2(5(0(2(2(1(0(5(1(3(x1))))))))))
1108.47/297.09	  , 0(4(5(2(1(5(3(0(1(1(x1)))))))))) ->
1108.47/297.09	    5(3(0(2(3(0(5(0(0(0(x1))))))))))
1108.47/297.09	  , 0(5(3(1(0(2(1(4(5(1(1(0(1(1(3(2(5(4(3(0(4(x1)))))))))))))))))))))
1108.47/297.09	    -> 1(1(5(5(4(2(3(5(3(1(0(0(5(3(5(5(4(1(3(4(x1))))))))))))))))))))
1108.47/297.09	  , 1(0(0(3(2(0(4(5(1(1(2(5(0(1(0(2(1(4(3(2(x1)))))))))))))))))))) ->
1108.47/297.09	    3(1(1(4(4(5(4(3(1(0(3(0(4(0(1(0(2(2(2(1(x1))))))))))))))))))))
1108.47/297.09	  , 1(1(1(3(0(3(5(0(5(1(1(4(2(2(0(3(2(3(3(x1))))))))))))))))))) ->
1108.47/297.09	    3(5(2(2(4(4(1(2(4(3(0(5(5(0(0(1(2(2(3(x1)))))))))))))))))))
1108.47/297.09	  , 1(2(4(3(4(4(2(2(1(4(2(1(3(1(5(1(5(3(x1)))))))))))))))))) ->
1108.47/297.09	    1(0(3(2(0(0(1(3(0(3(4(0(0(0(3(5(3(x1)))))))))))))))))
1108.47/297.09	  , 1(4(4(3(4(5(3(5(1(2(5(0(4(4(4(0(4(x1))))))))))))))))) ->
1108.47/297.09	    1(2(3(3(1(0(1(1(1(0(3(3(3(3(5(3(4(x1)))))))))))))))))
1108.47/297.09	  , 2(1(1(3(5(5(4(1(0(4(4(1(x1)))))))))))) ->
1108.47/297.09	    2(5(5(3(4(2(0(4(0(1(2(0(x1))))))))))))
1108.47/297.09	  , 2(2(0(0(2(0(5(2(4(0(4(3(2(5(2(0(x1)))))))))))))))) ->
1108.47/297.09	    4(5(4(1(3(5(1(3(0(2(5(0(2(5(3(x1)))))))))))))))
1108.47/297.09	  , 2(2(2(1(0(2(2(5(1(0(1(5(1(x1))))))))))))) ->
1108.47/297.09	    5(4(0(3(2(5(0(1(2(4(3(3(x1))))))))))))
1108.47/297.09	  , 2(4(1(3(4(1(0(0(3(2(4(4(1(2(x1)))))))))))))) ->
1108.47/297.09	    3(4(5(1(4(4(4(5(4(5(1(4(3(1(x1))))))))))))))
1108.47/297.09	  , 3(0(2(0(3(2(3(3(0(4(3(0(0(2(0(2(0(x1))))))))))))))))) ->
1108.47/297.09	    3(5(5(3(2(1(2(2(2(0(3(0(4(5(1(1(x1))))))))))))))))
1108.47/297.09	  , 3(3(1(4(2(0(3(5(0(0(x1)))))))))) ->
1108.47/297.09	    0(1(1(2(5(3(1(2(2(2(x1))))))))))
1108.47/297.09	  , 3(5(1(1(2(1(x1)))))) -> 3(3(3(1(3(1(x1))))))
1108.47/297.09	  , 4(0(4(3(3(5(2(1(3(5(5(3(2(4(5(1(0(x1))))))))))))))))) ->
1108.47/297.09	    4(4(5(5(4(2(2(0(2(1(5(2(1(5(4(5(0(x1)))))))))))))))))
1108.47/297.09	  , 4(4(5(1(1(1(3(2(5(5(4(1(x1)))))))))))) ->
1108.47/297.09	    4(2(1(0(2(0(0(0(4(3(3(1(x1))))))))))))
1108.47/297.09	  , 4(5(2(1(0(5(2(0(2(5(0(4(x1)))))))))))) ->
1108.47/297.09	    3(0(0(5(3(2(0(0(2(0(0(4(x1))))))))))))
1108.47/297.09	  , 4(5(2(2(1(5(2(4(5(0(x1)))))))))) ->
1108.47/297.09	    4(2(5(4(1(4(5(5(5(0(x1))))))))))
1108.47/297.09	  , 4(5(5(5(4(0(0(3(3(4(4(3(3(5(5(3(1(0(x1)))))))))))))))))) ->
1108.47/297.09	    3(3(2(5(1(1(5(4(1(5(1(2(5(4(1(2(1(x1)))))))))))))))))
1108.47/297.09	  , 5(2(2(4(2(5(1(4(5(4(0(4(x1)))))))))))) ->
1108.47/297.09	    2(4(5(5(5(4(3(2(5(3(1(4(x1))))))))))))
1108.47/297.09	  , 5(5(5(2(5(2(4(4(3(x1))))))))) -> 5(0(1(5(0(4(5(2(x1)))))))) }
1108.47/297.09	Obligation:
1108.47/297.09	  derivational complexity
1108.47/297.09	Answer:
1108.47/297.09	  YES(?,O(n^1))
1108.47/297.09	
1108.47/297.09	The problem is match-bounded by 2. The enriched problem is
1108.47/297.09	compatible with the following automaton.
1108.47/297.09	{ 0_0(1) -> 1
1108.47/297.09	, 0_1(1) -> 33
1108.47/297.09	, 0_1(2) -> 23
1108.47/297.09	, 0_1(3) -> 264
1108.47/297.09	, 0_1(4) -> 33
1108.47/297.09	, 0_1(7) -> 6
1108.47/297.09	, 0_1(11) -> 10
1108.47/297.09	, 0_1(19) -> 18
1108.47/297.09	, 0_1(24) -> 1
1108.47/297.09	, 0_1(24) -> 33
1108.47/297.09	, 0_1(24) -> 49
1108.47/297.09	, 0_1(24) -> 50
1108.47/297.09	, 0_1(24) -> 59
1108.47/297.09	, 0_1(24) -> 202
1108.47/297.09	, 0_1(24) -> 255
1108.47/297.09	, 0_1(24) -> 264
1108.47/297.09	, 0_1(33) -> 100
1108.47/297.09	, 0_1(36) -> 35
1108.47/297.09	, 0_1(45) -> 44
1108.47/297.09	, 0_1(48) -> 47
1108.47/297.09	, 0_1(49) -> 159
1108.47/297.09	, 0_1(50) -> 49
1108.47/297.09	, 0_1(51) -> 2
1108.47/297.09	, 0_1(55) -> 54
1108.47/297.09	, 0_1(60) -> 59
1108.47/297.09	, 0_1(63) -> 62
1108.47/297.09	, 0_1(66) -> 65
1108.47/297.09	, 0_1(72) -> 71
1108.47/297.09	, 0_1(82) -> 81
1108.47/297.09	, 0_1(85) -> 84
1108.47/297.09	, 0_1(87) -> 86
1108.47/297.09	, 0_1(91) -> 90
1108.47/297.09	, 0_1(93) -> 33
1108.47/297.09	, 0_1(95) -> 94
1108.47/297.09	, 0_1(98) -> 97
1108.47/297.09	, 0_1(100) -> 99
1108.47/297.09	, 0_1(101) -> 33
1108.47/297.09	, 0_1(110) -> 109
1108.47/297.09	, 0_1(111) -> 110
1108.47/297.09	, 0_1(116) -> 59
1108.47/297.09	, 0_1(125) -> 124
1108.47/297.09	, 0_1(127) -> 126
1108.47/297.09	, 0_1(129) -> 128
1108.47/297.09	, 0_1(131) -> 130
1108.47/297.09	, 0_1(142) -> 141
1108.47/297.09	, 0_1(145) -> 144
1108.47/297.09	, 0_1(146) -> 145
1108.47/297.09	, 0_1(149) -> 4
1108.47/297.09	, 0_1(152) -> 151
1108.47/297.09	, 0_1(153) -> 152
1108.47/297.09	, 0_1(156) -> 155
1108.47/297.09	, 0_1(159) -> 158
1108.47/297.09	, 0_1(160) -> 159
1108.47/297.09	, 0_1(161) -> 160
1108.47/297.09	, 0_1(165) -> 164
1108.47/297.09	, 0_1(169) -> 168
1108.47/297.09	, 0_1(178) -> 177
1108.47/297.09	, 0_1(180) -> 179
1108.47/297.09	, 0_1(190) -> 189
1108.47/297.09	, 0_1(193) -> 192
1108.47/297.09	, 0_1(195) -> 194
1108.47/297.09	, 0_1(199) -> 198
1108.47/297.09	, 0_1(221) -> 220
1108.47/297.09	, 0_1(223) -> 222
1108.47/297.09	, 0_1(225) -> 33
1108.47/297.09	, 0_1(240) -> 239
1108.47/297.09	, 0_1(250) -> 249
1108.47/297.09	, 0_1(252) -> 251
1108.47/297.09	, 0_1(253) -> 252
1108.47/297.09	, 0_1(254) -> 253
1108.47/297.09	, 0_1(256) -> 74
1108.47/297.09	, 0_1(257) -> 256
1108.47/297.09	, 0_1(261) -> 260
1108.47/297.09	, 0_1(262) -> 261
1108.47/297.09	, 0_1(264) -> 263
1108.47/297.09	, 0_1(291) -> 93
1108.47/297.09	, 0_1(294) -> 293
1108.47/297.09	, 1_0(1) -> 1
1108.47/297.09	, 1_1(1) -> 61
1108.47/297.09	, 1_1(2) -> 116
1108.47/297.09	, 1_1(3) -> 290
1108.47/297.09	, 1_1(4) -> 1
1108.47/297.09	, 1_1(4) -> 33
1108.47/297.09	, 1_1(4) -> 61
1108.47/297.09	, 1_1(4) -> 76
1108.47/297.09	, 1_1(4) -> 100
1108.47/297.09	, 1_1(4) -> 159
1108.47/297.09	, 1_1(4) -> 290
1108.47/297.09	, 1_1(5) -> 61
1108.47/297.09	, 1_1(15) -> 14
1108.47/297.09	, 1_1(20) -> 19
1108.47/297.09	, 1_1(21) -> 20
1108.47/297.09	, 1_1(22) -> 21
1108.47/297.09	, 1_1(24) -> 61
1108.47/297.09	, 1_1(35) -> 34
1108.47/297.09	, 1_1(40) -> 39
1108.47/297.09	, 1_1(41) -> 40
1108.47/297.09	, 1_1(43) -> 42
1108.47/297.09	, 1_1(46) -> 45
1108.47/297.09	, 1_1(47) -> 46
1108.47/297.09	, 1_1(50) -> 92
1108.47/297.09	, 1_1(51) -> 61
1108.47/297.09	, 1_1(56) -> 55
1108.47/297.09	, 1_1(61) -> 60
1108.47/297.09	, 1_1(62) -> 24
1108.47/297.09	, 1_1(64) -> 63
1108.47/297.09	, 1_1(67) -> 66
1108.47/297.09	, 1_1(68) -> 67
1108.47/297.09	, 1_1(77) -> 76
1108.47/297.09	, 1_1(90) -> 89
1108.47/297.09	, 1_1(101) -> 4
1108.47/297.09	, 1_1(109) -> 108
1108.47/297.09	, 1_1(117) -> 74
1108.47/297.09	, 1_1(118) -> 117
1108.47/297.09	, 1_1(124) -> 123
1108.47/297.09	, 1_1(130) -> 129
1108.47/297.09	, 1_1(132) -> 146
1108.47/297.09	, 1_1(133) -> 281
1108.47/297.09	, 1_1(138) -> 137
1108.47/297.09	, 1_1(147) -> 146
1108.47/297.09	, 1_1(149) -> 2
1108.47/297.09	, 1_1(154) -> 153
1108.47/297.09	, 1_1(164) -> 163
1108.47/297.09	, 1_1(166) -> 165
1108.47/297.09	, 1_1(167) -> 166
1108.47/297.09	, 1_1(168) -> 167
1108.47/297.09	, 1_1(181) -> 180
1108.47/297.09	, 1_1(185) -> 184
1108.47/297.09	, 1_1(188) -> 187
1108.47/297.09	, 1_1(200) -> 199
1108.47/297.09	, 1_1(205) -> 204
1108.47/297.09	, 1_1(212) -> 211
1108.47/297.09	, 1_1(213) -> 233
1108.47/297.09	, 1_1(217) -> 216
1108.47/297.09	, 1_1(225) -> 62
1108.47/297.09	, 1_1(229) -> 228
1108.47/297.09	, 1_1(230) -> 146
1108.47/297.09	, 1_1(242) -> 241
1108.47/297.09	, 1_1(245) -> 244
1108.47/297.09	, 1_1(249) -> 248
1108.47/297.09	, 1_1(267) -> 266
1108.47/297.09	, 1_1(272) -> 271
1108.47/297.09	, 1_1(273) -> 272
1108.47/297.09	, 1_1(276) -> 275
1108.47/297.09	, 1_1(278) -> 277
1108.47/297.09	, 1_1(292) -> 291
1108.47/297.09	, 2_0(1) -> 1
1108.47/297.09	, 2_1(1) -> 231
1108.47/297.09	, 2_1(2) -> 1
1108.47/297.09	, 2_1(2) -> 22
1108.47/297.09	, 2_1(2) -> 33
1108.47/297.09	, 2_1(2) -> 100
1108.47/297.09	, 2_1(2) -> 133
1108.47/297.09	, 2_1(2) -> 159
1108.47/297.09	, 2_1(2) -> 231
1108.47/297.09	, 2_1(2) -> 264
1108.47/297.09	, 2_1(2) -> 295
1108.47/297.09	, 2_1(3) -> 77
1108.47/297.09	, 2_1(5) -> 4
1108.47/297.09	, 2_1(9) -> 8
1108.47/297.09	, 2_1(24) -> 231
1108.47/297.09	, 2_1(25) -> 24
1108.47/297.09	, 2_1(32) -> 31
1108.47/297.09	, 2_1(33) -> 181
1108.47/297.09	, 2_1(37) -> 36
1108.47/297.09	, 2_1(50) -> 148
1108.47/297.09	, 2_1(57) -> 56
1108.47/297.09	, 2_1(61) -> 133
1108.47/297.09	, 2_1(69) -> 68
1108.47/297.09	, 2_1(70) -> 69
1108.47/297.09	, 2_1(74) -> 231
1108.47/297.09	, 2_1(77) -> 147
1108.47/297.09	, 2_1(84) -> 83
1108.47/297.09	, 2_1(88) -> 87
1108.47/297.09	, 2_1(89) -> 88
1108.47/297.09	, 2_1(93) -> 77
1108.47/297.09	, 2_1(96) -> 95
1108.47/297.09	, 2_1(105) -> 104
1108.47/297.09	, 2_1(116) -> 133
1108.47/297.09	, 2_1(132) -> 131
1108.47/297.09	, 2_1(133) -> 132
1108.47/297.09	, 2_1(134) -> 75
1108.47/297.09	, 2_1(135) -> 134
1108.47/297.09	, 2_1(139) -> 138
1108.47/297.09	, 2_1(148) -> 147
1108.47/297.09	, 2_1(151) -> 150
1108.47/297.09	, 2_1(162) -> 193
1108.47/297.09	, 2_1(177) -> 176
1108.47/297.09	, 2_1(191) -> 190
1108.47/297.09	, 2_1(197) -> 196
1108.47/297.09	, 2_1(201) -> 200
1108.47/297.09	, 2_1(216) -> 215
1108.47/297.09	, 2_1(218) -> 217
1108.47/297.09	, 2_1(219) -> 218
1108.47/297.09	, 2_1(220) -> 219
1108.47/297.09	, 2_1(226) -> 225
1108.47/297.09	, 2_1(230) -> 229
1108.47/297.09	, 2_1(231) -> 230
1108.47/297.09	, 2_1(238) -> 237
1108.47/297.09	, 2_1(239) -> 238
1108.47/297.09	, 2_1(241) -> 240
1108.47/297.09	, 2_1(244) -> 243
1108.47/297.09	, 2_1(248) -> 182
1108.47/297.09	, 2_1(251) -> 250
1108.47/297.09	, 2_1(260) -> 259
1108.47/297.09	, 2_1(263) -> 262
1108.47/297.09	, 2_1(270) -> 232
1108.47/297.09	, 2_1(279) -> 278
1108.47/297.09	, 2_1(288) -> 287
1108.47/297.09	, 2_2(296) -> 33
1108.47/297.09	, 2_2(296) -> 49
1108.47/297.09	, 2_2(296) -> 100
1108.47/297.09	, 2_2(296) -> 159
1108.47/297.09	, 2_2(296) -> 263
1108.47/297.09	, 2_2(298) -> 99
1108.47/297.09	, 2_2(298) -> 100
1108.47/297.09	, 3_0(1) -> 1
1108.47/297.09	, 3_1(1) -> 50
1108.47/297.09	, 3_1(2) -> 50
1108.47/297.09	, 3_1(3) -> 2
1108.47/297.09	, 3_1(4) -> 50
1108.47/297.09	, 3_1(6) -> 5
1108.47/297.09	, 3_1(10) -> 9
1108.47/297.09	, 3_1(12) -> 11
1108.47/297.09	, 3_1(22) -> 161
1108.47/297.09	, 3_1(23) -> 3
1108.47/297.09	, 3_1(24) -> 50
1108.47/297.09	, 3_1(31) -> 30
1108.47/297.09	, 3_1(34) -> 4
1108.47/297.09	, 3_1(39) -> 38
1108.47/297.09	, 3_1(42) -> 41
1108.47/297.09	, 3_1(49) -> 48
1108.47/297.09	, 3_1(50) -> 202
1108.47/297.09	, 3_1(51) -> 50
1108.47/297.09	, 3_1(58) -> 57
1108.47/297.09	, 3_1(61) -> 213
1108.47/297.09	, 3_1(65) -> 64
1108.47/297.09	, 3_1(73) -> 72
1108.47/297.09	, 3_1(74) -> 1
1108.47/297.09	, 3_1(74) -> 3
1108.47/297.09	, 3_1(74) -> 33
1108.47/297.09	, 3_1(74) -> 50
1108.47/297.09	, 3_1(74) -> 60
1108.47/297.09	, 3_1(74) -> 61
1108.47/297.09	, 3_1(74) -> 77
1108.47/297.09	, 3_1(74) -> 161
1108.47/297.09	, 3_1(74) -> 231
1108.47/297.09	, 3_1(74) -> 264
1108.47/297.09	, 3_1(74) -> 294
1108.47/297.09	, 3_1(78) -> 24
1108.47/297.09	, 3_1(92) -> 232
1108.47/297.09	, 3_1(93) -> 2
1108.47/297.09	, 3_1(94) -> 93
1108.47/297.09	, 3_1(97) -> 96
1108.47/297.09	, 3_1(106) -> 105
1108.47/297.09	, 3_1(108) -> 107
1108.47/297.09	, 3_1(113) -> 112
1108.47/297.09	, 3_1(116) -> 213
1108.47/297.09	, 3_1(123) -> 122
1108.47/297.09	, 3_1(126) -> 125
1108.47/297.09	, 3_1(141) -> 140
1108.47/297.09	, 3_1(149) -> 50
1108.47/297.09	, 3_1(150) -> 149
1108.47/297.09	, 3_1(155) -> 154
1108.47/297.09	, 3_1(157) -> 156
1108.47/297.09	, 3_1(162) -> 161
1108.47/297.09	, 3_1(163) -> 6
1108.47/297.09	, 3_1(170) -> 169
1108.47/297.09	, 3_1(171) -> 170
1108.47/297.09	, 3_1(172) -> 171
1108.47/297.09	, 3_1(173) -> 172
1108.47/297.09	, 3_1(175) -> 174
1108.47/297.09	, 3_1(186) -> 185
1108.47/297.09	, 3_1(189) -> 188
1108.47/297.09	, 3_1(196) -> 195
1108.47/297.09	, 3_1(213) -> 255
1108.47/297.09	, 3_1(215) -> 214
1108.47/297.09	, 3_1(222) -> 221
1108.47/297.09	, 3_1(228) -> 227
1108.47/297.09	, 3_1(232) -> 74
1108.47/297.09	, 3_1(233) -> 232
1108.47/297.09	, 3_1(259) -> 258
1108.47/297.09	, 3_1(287) -> 286
1108.47/297.09	, 3_1(290) -> 289
1108.47/297.09	, 3_2(297) -> 296
1108.47/297.09	, 3_2(299) -> 298
1108.47/297.09	, 4_0(1) -> 1
1108.47/297.09	, 4_1(1) -> 3
1108.47/297.09	, 4_1(2) -> 3
1108.47/297.09	, 4_1(3) -> 73
1108.47/297.09	, 4_1(5) -> 3
1108.47/297.09	, 4_1(14) -> 13
1108.47/297.09	, 4_1(16) -> 15
1108.47/297.09	, 4_1(17) -> 16
1108.47/297.09	, 4_1(24) -> 3
1108.47/297.09	, 4_1(26) -> 25
1108.47/297.09	, 4_1(27) -> 26
1108.47/297.09	, 4_1(33) -> 32
1108.47/297.09	, 4_1(59) -> 58
1108.47/297.09	, 4_1(63) -> 3
1108.47/297.09	, 4_1(71) -> 70
1108.47/297.09	, 4_1(76) -> 75
1108.47/297.09	, 4_1(77) -> 85
1108.47/297.09	, 4_1(80) -> 79
1108.47/297.09	, 4_1(93) -> 3
1108.47/297.09	, 4_1(104) -> 103
1108.47/297.09	, 4_1(116) -> 115
1108.47/297.09	, 4_1(119) -> 118
1108.47/297.09	, 4_1(120) -> 119
1108.47/297.09	, 4_1(122) -> 121
1108.47/297.09	, 4_1(128) -> 127
1108.47/297.09	, 4_1(136) -> 135
1108.47/297.09	, 4_1(137) -> 136
1108.47/297.09	, 4_1(140) -> 139
1108.47/297.09	, 4_1(149) -> 3
1108.47/297.09	, 4_1(158) -> 157
1108.47/297.09	, 4_1(176) -> 175
1108.47/297.09	, 4_1(179) -> 178
1108.47/297.09	, 4_1(182) -> 1
1108.47/297.09	, 4_1(182) -> 3
1108.47/297.09	, 4_1(182) -> 32
1108.47/297.09	, 4_1(182) -> 73
1108.47/297.09	, 4_1(182) -> 230
1108.47/297.09	, 4_1(182) -> 231
1108.47/297.09	, 4_1(182) -> 294
1108.47/297.09	, 4_1(183) -> 3
1108.47/297.09	, 4_1(184) -> 183
1108.47/297.09	, 4_1(194) -> 93
1108.47/297.09	, 4_1(202) -> 201
1108.47/297.09	, 4_1(203) -> 74
1108.47/297.09	, 4_1(206) -> 205
1108.47/297.09	, 4_1(207) -> 206
1108.47/297.09	, 4_1(208) -> 207
1108.47/297.09	, 4_1(210) -> 209
1108.47/297.09	, 4_1(213) -> 212
1108.47/297.09	, 4_1(224) -> 223
1108.47/297.09	, 4_1(234) -> 182
1108.47/297.09	, 4_1(235) -> 3
1108.47/297.09	, 4_1(237) -> 236
1108.47/297.09	, 4_1(247) -> 246
1108.47/297.09	, 4_1(255) -> 254
1108.47/297.09	, 4_1(266) -> 265
1108.47/297.09	, 4_1(268) -> 267
1108.47/297.09	, 4_1(269) -> 267
1108.47/297.09	, 4_1(275) -> 274
1108.47/297.09	, 4_1(281) -> 280
1108.47/297.09	, 4_1(282) -> 2
1108.47/297.09	, 4_1(286) -> 285
1108.47/297.09	, 4_1(295) -> 294
1108.47/297.09	, 4_2(63) -> 297
1108.47/297.09	, 4_2(149) -> 299
1108.47/297.09	, 5_0(1) -> 1
1108.47/297.09	, 5_1(1) -> 22
1108.47/297.09	, 5_1(2) -> 173
1108.47/297.09	, 5_1(4) -> 247
1108.47/297.09	, 5_1(8) -> 7
1108.47/297.09	, 5_1(13) -> 12
1108.47/297.09	, 5_1(18) -> 17
1108.47/297.09	, 5_1(28) -> 27
1108.47/297.09	, 5_1(29) -> 28
1108.47/297.09	, 5_1(30) -> 29
1108.47/297.09	, 5_1(33) -> 247
1108.47/297.09	, 5_1(38) -> 37
1108.47/297.09	, 5_1(44) -> 43
1108.47/297.09	, 5_1(50) -> 162
1108.47/297.09	, 5_1(52) -> 51
1108.47/297.09	, 5_1(53) -> 52
1108.47/297.09	, 5_1(54) -> 53
1108.47/297.09	, 5_1(60) -> 224
1108.47/297.09	, 5_1(75) -> 74
1108.47/297.09	, 5_1(79) -> 78
1108.47/297.09	, 5_1(81) -> 80
1108.47/297.09	, 5_1(83) -> 82
1108.47/297.09	, 5_1(86) -> 2
1108.47/297.09	, 5_1(92) -> 91
1108.47/297.09	, 5_1(93) -> 1
1108.47/297.09	, 5_1(93) -> 22
1108.47/297.09	, 5_1(93) -> 33
1108.47/297.09	, 5_1(93) -> 131
1108.47/297.09	, 5_1(93) -> 229
1108.47/297.09	, 5_1(93) -> 230
1108.47/297.09	, 5_1(93) -> 231
1108.47/297.09	, 5_1(93) -> 264
1108.47/297.09	, 5_1(93) -> 293
1108.47/297.09	, 5_1(99) -> 98
1108.47/297.09	, 5_1(102) -> 101
1108.47/297.09	, 5_1(103) -> 102
1108.47/297.09	, 5_1(107) -> 106
1108.47/297.09	, 5_1(112) -> 111
1108.47/297.09	, 5_1(114) -> 113
1108.47/297.09	, 5_1(115) -> 114
1108.47/297.09	, 5_1(121) -> 120
1108.47/297.09	, 5_1(143) -> 142
1108.47/297.09	, 5_1(144) -> 143
1108.47/297.09	, 5_1(174) -> 86
1108.47/297.09	, 5_1(183) -> 182
1108.47/297.09	, 5_1(187) -> 186
1108.47/297.09	, 5_1(192) -> 191
1108.47/297.09	, 5_1(198) -> 197
1108.47/297.09	, 5_1(204) -> 203
1108.47/297.09	, 5_1(209) -> 208
1108.47/297.09	, 5_1(211) -> 210
1108.47/297.09	, 5_1(214) -> 75
1108.47/297.09	, 5_1(227) -> 226
1108.47/297.09	, 5_1(231) -> 295
1108.47/297.09	, 5_1(235) -> 234
1108.47/297.09	, 5_1(236) -> 235
1108.47/297.09	, 5_1(243) -> 242
1108.47/297.09	, 5_1(246) -> 245
1108.47/297.09	, 5_1(247) -> 269
1108.47/297.09	, 5_1(258) -> 257
1108.47/297.09	, 5_1(265) -> 248
1108.47/297.09	, 5_1(269) -> 268
1108.47/297.09	, 5_1(271) -> 270
1108.47/297.09	, 5_1(274) -> 273
1108.47/297.09	, 5_1(277) -> 276
1108.47/297.09	, 5_1(280) -> 279
1108.47/297.09	, 5_1(283) -> 282
1108.47/297.09	, 5_1(284) -> 283
1108.47/297.09	, 5_1(285) -> 284
1108.47/297.09	, 5_1(289) -> 288
1108.47/297.09	, 5_1(293) -> 292 }
1108.47/297.09	
1108.47/297.09	Hurray, we answered YES(?,O(n^1))
1109.18/297.56	EOF