Gurobi 5.0.1 (linux64) logging started Tue Dec 25 09:22:36 2012 Optimize a model with 40402 rows, 40401 columns and 183153 nonzeros Presolve removed 36054 rows and 19098 columns Presolve time: 0.32s Presolved: 4348 rows, 21303 columns, 54046 nonzeros Variable types: 199 continuous, 21104 integer (21104 binary) Root relaxation: objective 7.831312e+02, 1449 iterations, 0.07 seconds Nodes | Current Node | Objective Bounds | Work Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time 0 0 783.13119 0 337 - 783.13119 - - 0s 0 0 883.80844 0 393 - 883.80844 - - 0s 0 0 895.65877 0 410 - 895.65877 - - 1s 0 0 897.48841 0 407 - 897.48841 - - 1s 0 0 898.30556 0 397 - 898.30556 - - 1s 0 0 899.08593 0 379 - 899.08593 - - 1s 0 0 899.24157 0 363 - 899.24157 - - 1s 0 0 899.73631 0 411 - 899.73631 - - 1s 0 0 900.13972 0 308 - 900.13972 - - 1s 0 0 900.28105 0 302 - 900.28105 - - 2s 0 0 900.33333 0 307 - 900.33333 - - 2s 0 0 900.33333 0 298 - 900.33333 - - 3s 0 2 900.33333 0 298 - 900.33333 - - 4s 31 32 914.14716 22 347 - 900.73333 - 36.3 5s 601 470 922.97756 12 298 - 903.13930 - 24.5 11s 603 471 918.66667 13 365 - 903.13930 - 24.4 19s 604 472 923.38472 21 186 - 903.13930 - 24.4 25s 605 473 922.97756 12 291 - 907.09093 - 24.3 33s 606 473 1008.27848 77 281 - 911.23452 - 24.3 42s 607 474 923.38472 21 388 - 915.61692 - 24.3 54s 608 475 1015.04031 99 191 - 918.48833 - 24.2 58s 609 475 921.50167 7 319 - 921.50167 - 24.2 67s 610 476 929.03714 31 296 - 921.92294 - 24.1 78s 611 477 1015.04031 99 355 - 922.22964 - 24.1 86s 612 477 950.73151 32 303 - 923.08714 - 24.1 94s 613 478 1002.89794 67 198 - 923.51353 - 24.0 100s 614 479 1017.78556 114 314 - 924.95196 - 24.0 107s 615 479 950.73151 32 326 - 925.09873 - 23.9 120s 616 480 1007.83019 75 328 - 925.23528 - 23.9 127s 617 481 925.23713 9 340 - 925.23713 - 23.9 131s 618 481 1007.83019 75 340 - 925.23713 - 23.8 136s 621 485 1008.27848 77 298 - 925.38553 - 44.8 148s 623 486 925.38553 12 359 - 925.38553 - 44.6 155s 624 487 1015.03600 103 296 - 925.38553 - 44.5 168s 625 488 929.24150 30 216 - 925.38553 - 44.5 175s 626 488 1017.78556 114 207 - 925.38553 - 44.4 182s 627 489 925.38553 7 198 - 925.38553 - 44.3 187s 628 490 1002.46264 70 192 - 925.38553 - 44.3 192s 629 490 925.38553 9 325 - 925.38553 - 44.2 204s 630 491 1002.89794 67 335 - 925.38553 - 44.1 213s 631 492 973.36291 40 314 - 925.38553 - 44.0 223s 632 492 925.38553 9 194 - 925.38553 - 44.0 228s 633 493 925.38553 21 182 - 925.38553 - 43.9 232s 634 494 1014.41187 99 201 - 925.47179 - 43.8 238s 635 494 925.50047 7 186 - 925.50047 - 43.8 246s 636 495 925.57297 21 183 - 925.57297 - 43.7 251s 637 496 1002.46264 70 170 - 925.68949 - 43.6 257s 638 496 1015.03600 103 175 - 925.84618 - 43.6 261s 640 498 1007.83019 75 169 - 925.96635 - 43.4 269s 641 498 1008.27848 77 189 - 925.99380 - 43.4 275s 643 500 925.99380 21 178 - 925.99380 - 43.2 284s 644 500 973.36291 40 177 - 925.99380 - 43.2 288s 645 501 1008.27848 77 189 - 925.99380 - 43.1 294s 646 502 1008.27848 77 206 - 926.07710 - 43.0 299s 647 502 926.45423 21 188 - 926.45423 - 43.0 305s 649 504 1002.46264 70 160 - 926.45423 - 42.8 312s 650 504 1014.41187 99 175 - 926.45423 - 42.8 315s 652 506 929.24150 30 144 - 926.45423 - 42.6 325s 687 517 929.12223 26 371 - 926.55470 - 65.0 330s 866 561 929.12312 26 386 - 927.99396 - 58.1 335s 1170 681 928.88614 30 207 - 928.64891 - 50.0 340s 1627 840 953.38554 71 168 - 929.86579 - 41.8 345s 1834 967 1027.57944 134 127 - 929.86579 - 41.1 350s 2330 1180 990.44857 87 130 - 930.65479 - 36.2 355s 2721 1365 934.66274 30 200 - 931.25727 - 34.5 360s 3168 1667 952.37912 64 132 - 931.69987 - 32.8 365s 3582 1857 infeasible 48 - 931.96784 - 31.8 370s 3969 2132 1025.71204 112 112 - 932.14388 - 30.9 375s 4468 2436 933.44892 31 199 - 932.39938 - 30.0 380s 5008 2647 932.98758 30 242 - 932.82117 - 28.8 385s 5471 2894 995.14245 80 103 - 933.18787 - 28.2 390s 5899 3095 951.42856 35 243 - 933.51129 - 27.8 395s 6236 3281 990.49654 98 152 - 933.59712 - 28.0 400s 6627 3522 965.50046 65 160 - 933.71490 - 27.9 405s 7039 3758 936.78306 38 220 - 933.80433 - 27.7 410s 7570 4005 937.41570 36 185 - 934.09301 - 27.3 415s 7973 4216 infeasible 34 - 934.21248 - 27.2 420s 8339 4402 971.60150 45 137 - 934.28110 - 27.1 425s 8689 4614 infeasible 43 - 934.35140 - 27.3 430s 9008 4802 infeasible 36 - 934.35609 - 27.2 435s 9430 4951 944.16274 34 216 - 934.59712 - 27.2 440s 9821 5223 1022.59699 170 153 - 934.70344 - 27.1 445s 10201 5294 infeasible 44 - 935.02714 - 26.8 450s 10531 5407 938.01002 35 233 - 935.16779 - 27.0 455s 10884 5581 975.68722 64 197 - 935.28862 - 27.2 460s 11265 5758 963.98980 38 215 - 935.41715 - 27.2 465s 11533 5957 1004.86362 161 295 - 935.43420 - 27.4 470s 11844 6075 948.11020 35 209 - 935.60232 - 27.4 475s 12213 6237 953.19198 39 221 - 935.67331 - 27.3 480s 12579 6341 infeasible 44 - 935.77540 - 27.4 485s 12858 6415 940.52371 36 216 - 935.89793 - 27.6 490s 13219 6564 951.44504 42 229 - 935.99191 - 27.6 495s 13677 6710 963.27144 42 209 - 936.12570 - 27.3 500s 14098 6839 infeasible 36 - 936.30391 - 27.1 505s 14550 6987 infeasible 39 - 936.49017 - 27.0 510s 14844 7087 952.96703 38 208 - 936.58285 - 27.1 515s 15243 7196 944.85274 45 165 - 936.73217 - 27.0 520s 15596 7334 936.82258 39 225 - 936.81752 - 27.1 525s 15952 7407 936.99212 39 203 - 936.99212 - 27.2 530s 16261 7502 937.14551 34 216 - 937.14551 - 27.3 535s 16650 7675 infeasible 42 - 937.24608 - 27.4 540s 16999 7854 956.07719 46 192 - 937.31772 - 27.4 545s 17409 7948 947.98819 37 212 - 937.45241 - 27.4 550s 17751 8053 969.49978 42 212 - 937.55656 - 27.4 555s 18010 8111 942.03750 37 202 - 937.67743 - 27.5 560s 18348 8217 955.09295 39 214 - 937.74374 - 27.6 565s 18674 8368 948.06210 36 222 - 937.79920 - 27.7 570s 19054 8502 959.69615 44 213 - 937.88766 - 27.7 575s 19338 8639 991.01389 82 124 - 937.95140 - 27.8 580s 19701 8754 949.76807 38 207 - 938.04387 - 27.8 585s 20054 8856 infeasible 38 - 938.24608 - 27.8 590s 20397 9035 961.16819 46 234 - 938.30927 - 27.9 595s 20678 9100 991.33635 43 222 - 938.45049 - 27.8 600s 21037 9265 968.85041 40 227 - 938.49236 - 27.8 605s 21435 9411 987.76842 55 145 - 938.53354 - 27.8 610s 21818 9470 infeasible 45 - 938.59734 - 27.9 615s 22093 9520 953.44822 41 228 - 938.67413 - 28.0 620s 22553 9642 967.85720 48 137 - 938.77772 - 27.9 625s 22916 9762 940.89261 41 197 - 938.89131 - 27.9 630s 23215 9931 987.06274 51 215 - 938.92099 - 28.0 635s 23566 10016 961.95757 42 220 - 938.99648 - 28.0 640s 23841 10152 1029.22556 119 242 - 939.02574 - 28.2 645s 24200 10283 971.00616 44 203 - 939.10939 - 28.2 650s 24571 10362 945.59734 36 205 - 939.21026 - 28.2 655s 24925 10418 969.20228 42 209 - 939.34346 - 28.1 660s 25245 10534 infeasible 86 - 939.43620 - 28.2 665s 25631 10648 961.14431 59 202 - 939.54383 - 28.1 670s 25827 10695 943.69186 38 224 - 939.58653 - 28.3 675s 26137 10771 infeasible 42 - 939.64944 - 28.4 680s 26506 10835 infeasible 50 - 939.76030 - 28.3 685s 26787 11009 983.36733 60 161 - 939.77444 - 28.3 690s 27071 11079 infeasible 41 - 939.84195 - 28.5 695s 27347 11111 infeasible 46 - 939.91579 - 28.6 700s 27740 11230 948.16148 35 222 - 940.01272 - 28.6 705s 28130 11333 965.10283 41 220 - 940.07522 - 28.5 710s 28493 11460 infeasible 63 - 940.11717 - 28.6 715s 28873 11545 982.54284 48 188 - 940.20591 - 28.5 720s 29128 11662 952.84202 40 222 - 940.24584 - 28.6 725s 29461 11722 960.24325 39 192 - 940.30183 - 28.7 730s 29809 11801 962.66977 48 188 - 940.36556 - 28.7 735s 30157 11925 infeasible 70 - 940.42923 - 28.7 740s 30499 12094 947.19362 38 234 - 940.49750 - 28.8 745s 30631 12149 975.58924 50 148 - 940.53839 - 28.8 750s 30922 12320 940.61050 37 228 - 940.55811 - 28.8 755s 31293 12443 infeasible 84 - 940.60105 - 28.8 760s 31499 12558 945.07977 40 209 - 940.62889 - 28.9 765s 31888 12706 infeasible 45 - 940.68392 - 28.9 770s 32169 12764 945.86633 41 200 - 940.74144 - 29.0 775s 32544 12828 infeasible 53 - 940.82842 - 29.0 780s 32929 12922 962.98627 41 216 - 940.85821 - 28.9 785s 33296 13046 infeasible 63 - 940.94231 - 28.9 790s 33685 13122 966.95714 54 140 - 941.04530 - 28.9 795s 34032 13212 infeasible 52 - 941.11122 - 28.9 800s 34287 13251 946.98326 42 229 - 941.17444 - 28.9 805s 34586 13460 infeasible 72 - 941.18025 - 29.0 810s 34895 13696 983.47949 60 138 - 941.18258 - 29.0 815s 35169 13841 961.40231 47 223 - 941.23933 - 29.1 820s 35575 13980 965.98852 36 231 - 941.33425 - 29.0 825s 35990 14033 infeasible 41 - 941.44426 - 28.9 830s 36318 14124 972.04105 40 225 - 941.52733 - 29.0 835s 36600 14199 infeasible 42 - 941.57031 - 29.1 840s 36952 14312 961.56487 58 184 - 941.59747 - 29.1 845s 37359 14497 966.22072 48 229 - 941.66274 - 29.0 850s 37752 14631 941.87935 37 225 - 941.71439 - 29.0 855s 38107 14722 944.58741 44 204 - 941.76548 - 29.0 860s 38509 14853 959.68814 40 222 - 941.82964 - 29.0 865s 38883 14953 978.35246 49 231 - 941.89584 - 29.0 870s 39216 14995 941.98490 35 211 - 941.98490 - 29.0 875s 39617 15039 962.04932 38 222 - 942.06801 - 29.0 880s 39938 15142 1005.71431 86 166 - 942.09734 - 28.9 885s 40345 15271 972.38062 44 209 - 942.17522 - 28.9 890s 40693 15360 infeasible 43 - 942.24138 - 28.9 895s 40900 15404 963.52195 45 183 - 942.28868 - 28.9 1030s 41156 15481 980.37571 79 139 - 942.35504 - 29.0 1035s 41523 15579 973.33994 60 189 - 942.42087 - 29.0 1040s 41773 15815 1017.01815 163 79 - 942.42087 - 29.0 1045s 42098 15925 953.33685 43 209 - 942.50210 - 29.0 1050s 42488 16016 958.55376 35 228 - 942.56858 - 29.0 1055s 42834 16097 infeasible 41 - 942.61658 - 29.0 1060s 43191 16286 984.56090 69 149 - 942.66314 - 29.0 1065s 43508 16402 infeasible 42 - 942.70260 - 29.0 1070s 43868 16512 966.49564 43 211 - 942.78723 - 29.0 1075s 44112 16546 972.20636 41 209 - 942.83356 - 29.0 1080s 44494 16600 963.33950 41 203 - 942.91688 - 29.0 1085s 44865 16680 982.28706 55 219 - 943.02709 - 29.0 1090s 45225 16720 949.84734 37 216 - 943.09734 - 29.0 1095s 45588 16768 947.85684 44 188 - 943.19382 - 29.0 1100s 45958 16914 975.31051 54 170 - 943.28188 - 29.0 1105s 46331 16955 948.16274 51 218 - 943.36180 - 29.0 1110s 46708 17044 987.89123 40 235 - 943.44073 - 29.0 1115s 47123 17088 956.99335 54 176 - 943.54636 - 28.9 1120s 47463 17239 955.87007 40 236 - 943.59712 - 28.9 1125s 47856 17325 947.92648 45 227 - 943.64229 - 28.9 1130s 48239 17363 971.68572 43 192 - 943.73704 - 28.9 1135s 48694 17426 948.75017 48 216 - 943.84107 - 28.8 1140s 49042 17497 944.97461 46 208 - 943.89307 - 28.8 1145s 49430 17593 949.54847 47 224 - 943.97244 - 28.8 1150s 49816 17656 986.08887 52 229 - 944.04535 - 28.8 1155s 50176 17715 973.43848 42 219 - 944.09392 - 28.8 1160s 50537 17849 991.50000 74 61 - 944.13214 - 28.8 1165s 50839 17972 infeasible 43 - 944.18655 - 28.8 1170s 51252 17991 infeasible 48 - 944.26807 - 28.8 1175s 51477 18032 962.24851 39 220 - 944.32441 - 28.8 1180s 51844 18067 947.81173 35 208 - 944.40934 - 28.8 1185s 52163 18109 952.06569 40 217 - 944.46576 - 28.8 1190s 52474 18145 infeasible 42 - 944.50479 - 28.8 1195s 52885 18224 960.94794 45 176 - 944.58430 - 28.8 1200s 53245 18417 955.59734 36 217 - 944.59734 - 28.8 1205s 53571 18509 955.59409 46 237 - 944.60919 - 28.8 1210s 53876 18629 977.50891 54 234 - 944.66274 - 28.8 1215s 54243 18711 968.50362 61 197 - 944.73139 - 28.8 1220s 54564 18816 965.76807 43 205 - 944.76807 - 28.9 1225s 54902 18901 954.68186 37 220 - 944.80293 - 28.9 1230s 55183 18949 981.04172 56 139 - 944.86366 - 28.9 1235s 55545 19051 infeasible 49 - 944.90260 - 28.9 1240s 55899 19182 954.53329 47 179 - 944.96787 - 28.9 1245s 56309 19304 infeasible 40 - 945.03343 - 28.9 1250s 56692 19344 infeasible 49 - 945.10052 - 28.8 1255s 57086 19416 963.32401 41 211 - 945.16274 - 28.8 1260s 57493 19432 infeasible 56 - 945.24803 - 28.8 1265s 57826 19557 1000.57123 111 240 - 945.28784 - 28.8 1270s 57964 19683 1046.00008 187 240 - 945.28784 - 28.8 1275s 58297 19829 1022.88236 108 296 - 945.32402 - 28.7 1280s 58728 19875 infeasible 56 - 945.39574 - 28.7 1285s 59056 19991 infeasible 44 - 945.41784 - 28.7 1290s 59461 20049 964.80625 50 224 - 945.48131 - 28.7 1295s 59821 20200 1049.88965 97 145 - 945.50707 - 28.6 1300s 60128 20330 976.81504 47 225 - 945.53776 - 28.7 1305s 60484 20396 972.72653 50 160 - 945.57322 - 28.7 1310s 60867 20487 956.98898 46 220 - 945.60600 - 28.7 1315s 61249 20576 949.95049 49 218 - 945.67406 - 28.6 1320s 61508 20599 infeasible 44 - 945.72377 - 28.7 1325s 61814 20658 968.99739 46 150 - 945.79431 - 28.7 1330s 62123 20714 964.43304 58 178 - 945.82689 - 28.7 1335s 62504 20856 991.49504 116 112 - 945.88327 - 28.7 1340s 62830 20965 952.37069 44 207 - 945.92728 - 28.7 1345s 63226 21058 988.91092 51 205 - 945.97734 - 28.7 1350s 63600 21150 985.24057 53 137 - 946.01854 - 28.7 1355s 63900 21304 infeasible 46 - 946.03628 - 28.6 1360s 64296 21435 1014.11111 103 119 - 946.08430 - 28.6 1365s 64732 21481 951.65574 42 211 - 946.15290 - 28.5 1370s 65067 21533 964.68704 41 225 - 946.22471 - 28.5 1375s 65412 21558 infeasible 39 - 946.30138 - 28.5 1380s 65802 21650 947.82668 43 213 - 946.36682 - 28.5 1385s 66175 21726 infeasible 38 - 946.42412 - 28.5 1390s 66541 21827 966.05888 51 211 - 946.46077 - 28.5 1395s 66835 21998 953.78345 38 227 - 946.48679 - 28.5 1400s 67182 22026 972.20244 55 198 - 946.54283 - 28.5 1405s 67449 22180 infeasible 51 - 946.55626 - 28.6 1410s 67737 22332 1013.32301 130 107 - 946.58399 - 28.6 1415s 68095 22476 infeasible 38 - 946.59809 - 28.6 1420s 68432 22648 infeasible 116 - 946.64564 - 28.7 1425s 68754 22727 infeasible 52 - 946.68473 - 28.7 1430s 69071 22874 996.64755 102 135 - 946.71768 - 28.7 1435s 69385 22967 971.17893 40 195 - 946.77029 - 28.8 1440s 69685 23061 952.71639 34 213 - 946.82614 - 28.8 1445s 70017 23110 999.93674 43 218 - 946.85540 - 28.9 1450s 70324 23196 1015.65091 86 328 - 946.88064 - 28.9 1455s 70683 23277 969.54806 43 205 - 946.93895 - 28.9 1460s 70966 23282 957.37620 42 240 - 946.98025 - 29.0 1465s 71281 23465 980.84712 91 246 - 947.00158 - 29.0 1470s 71577 23527 infeasible 55 - 947.03920 - 29.1 1475s 71800 23546 954.18344 45 244 - 947.10420 - 29.2 1481s 72037 23548 infeasible 38 - 947.15570 - 29.2 1485s 72295 23595 974.99358 44 208 - 947.20845 - 29.3 1490s 72570 23669 965.68095 45 232 - 947.24656 - 29.3 1495s 72872 23689 infeasible 46 - 947.32224 - 29.4 1500s 73140 23766 infeasible 48 - 947.34714 - 29.4 1505s 73406 23891 infeasible 51 - 947.35715 - 29.5 1510s 73719 24000 957.58052 44 226 - 947.39734 - 29.6 1515s 74006 24042 infeasible 47 - 947.44354 - 29.6 1520s 74313 24148 989.39289 55 173 - 947.46958 - 29.6 1525s 74669 24226 948.71773 44 152 - 947.51225 - 29.6 1530s 74969 24377 1017.62021 78 110 - 947.53161 - 29.7 1535s 75294 24443 infeasible 48 - 947.58345 - 29.7 1540s 75600 24543 986.24060 74 121 - 947.60897 - 29.7 1545s 75921 24671 953.03605 45 205 - 947.65061 - 29.7 1550s 76257 24747 976.48235 42 217 - 947.68963 - 29.8 1555s 76602 24799 951.37069 39 191 - 947.74680 - 29.8 1560s 76921 24843 962.30200 44 233 - 947.78020 - 29.8 1565s 77272 24929 947.85002 43 225 - 947.85002 - 29.8 1570s 77631 24963 infeasible 46 - 947.90556 - 29.8 1575s 77978 24998 infeasible 51 - 947.93990 - 29.8 1580s 78385 25156 infeasible 48 - 947.98741 - 29.8 1585s 78750 25207 infeasible 48 - 948.02939 - 29.8 1590s 79034 25274 950.06125 52 233 - 948.06102 - 29.9 1595s 79329 25362 981.13244 83 118 - 948.12862 - 29.9 1600s 79650 25511 973.91039 62 158 - 948.16250 - 29.9 1605s 80051 25615 infeasible 55 - 948.19444 - 29.9 1610s 80371 25635 infeasible 48 - 948.27241 - 30.0 1615s 80732 25687 977.20151 43 221 - 948.32110 - 30.0 1620s 80999 25741 979.76515 60 106 - 948.35393 - 30.0 1625s 81370 25865 infeasible 41 - 948.38665 - 30.0 1630s 81692 25943 967.98469 54 162 - 948.43624 - 30.0 1635s 82000 26026 infeasible 50 - 948.47277 - 30.1 1640s 82233 26050 infeasible 53 - 948.49542 - 30.1 1645s 82607 26289 999.46453 112 79 - 948.49584 - 30.1 1650s 82727 26409 1006.08599 194 90 - 948.49584 - 30.0 1655s 82941 26485 956.48758 43 210 - 948.52664 - 30.1 1660s 83246 26503 infeasible 55 - 948.58652 - 30.1 1665s 83544 26512 991.53356 50 226 - 948.60956 - 30.1 1670s 83818 26550 956.15737 51 171 - 948.63663 - 30.2 1675s 84158 26644 968.84280 47 226 - 948.66274 - 30.2 1680s 84487 26792 953.50774 47 229 - 948.69226 - 30.2 1685s 84786 26838 infeasible 51 - 948.74570 - 30.2 1690s 85023 26899 980.50408 57 153 - 948.76807 - 30.3 1695s 85353 27038 997.39859 85 197 - 948.78304 - 30.3 1700s 85447 27132 1008.79223 128 208 - 948.78304 - 30.3 1705s 85522 27207 1021.42827 172 221 - 948.78304 - 30.4 1710s 85653 27248 950.91107 39 231 - 948.78729 - 30.4 1715s 85924 27279 965.47931 45 213 - 948.81327 - 30.5 1720s 86182 27297 971.72974 48 224 - 948.85826 - 30.5 1725s 86517 27325 954.32163 43 213 - 948.90411 - 30.5 1730s 86739 27341 950.34482 38 217 - 948.93645 - 30.6 1740s 86958 27446 994.10407 83 141 - 948.95755 - 30.6 1745s 87300 27523 985.34467 59 190 - 948.99584 - 30.6 1750s 87635 27676 infeasible 81 - 949.02323 - 30.6 1755s 87979 27732 971.14136 53 164 - 949.06160 - 30.6 1760s 88392 27845 infeasible 38 - 949.12481 - 30.6 1765s 88644 27909 996.52764 50 135 - 949.16250 - 30.7 1770s 88992 27976 infeasible 54 - 949.22641 - 30.7 1775s 89329 28073 976.52922 55 165 - 949.26140 - 30.7 1780s 89638 28247 954.03317 43 207 - 949.27177 - 30.7 1785s 89869 28250 955.15426 57 154 - 949.33066 - 30.8 1790s 90157 28309 infeasible 38 - 949.35158 - 30.8 1795s 90483 28340 982.76256 44 164 - 949.40132 - 30.8 1800s 90752 28411 infeasible 46 - 949.45618 - 30.9 1805s 91070 28456 987.83872 55 176 - 949.48695 - 30.9 1810s 91380 28493 949.59124 42 191 - 949.53801 - 30.9 1815s 91690 28540 infeasible 41 - 949.59734 - 31.0 1820s 91970 28581 965.55457 49 233 - 949.61413 - 31.0 1825s 92202 28624 950.31413 46 190 - 949.64641 - 31.0 1830s 92541 28682 967.26807 41 206 - 949.68825 - 31.0 1835s 92803 28715 971.20751 51 212 - 949.73843 - 31.1 1840s 93196 28887 infeasible 39 - 949.76807 - 31.0 1845s 93569 28962 infeasible 50 - 949.81398 - 31.0 1850s 93718 28989 964.02013 46 181 - 949.83396 - 31.0 1858s 93772 29043 1002.37038 73 111 - 949.83396 - 31.0 1860s 94123 29114 infeasible 39 - 949.87013 - 31.0 1865s 94422 29174 infeasible 62 - 949.89763 - 31.1 1870s 94686 29206 954.83141 37 206 - 949.94821 - 31.1 1875s 94952 29259 infeasible 45 - 949.98814 - 31.1 1880s 95248 29290 963.60426 47 184 - 950.04839 - 31.2 1885s 95574 29347 958.46285 39 241 - 950.08726 - 31.2 1890s 95854 29415 961.94454 41 210 - 950.11847 - 31.2 1895s 96127 29453 infeasible 54 - 950.16108 - 31.3 1900s 96455 29512 infeasible 42 - 950.19753 - 31.3 1905s 96709 29601 978.15517 52 228 - 950.23070 - 31.3 1910s 96979 29663 978.80285 40 232 - 950.26401 - 31.4 1915s 97284 29787 964.63714 57 227 - 950.28155 - 31.4 1920s 97586 29815 966.32279 47 227 - 950.33763 - 31.4 1925s 97801 29844 973.73418 49 240 - 950.36390 - 31.5 1930s 98104 29899 952.73292 51 188 - 950.40023 - 31.5 1935s 98315 29902 infeasible 53 - 950.45895 - 31.6 1940s 98644 30013 975.76082 63 161 - 950.48674 - 31.6 1945s 98937 30083 infeasible 45 - 950.51913 - 31.6 1950s 99219 30106 962.04258 39 219 - 950.55812 - 31.6 1955s 99552 30110 961.38155 50 236 - 950.59954 - 31.6 1960s 99890 30241 1003.98378 133 139 - 950.63147 - 31.6 1965s 100231 30356 973.89382 48 171 - 950.66274 - 31.6 1970s 100571 30492 990.54761 71 168 - 950.67979 - 31.6 1975s 100863 30526 966.64104 51 213 - 950.73092 - 31.7 1980s 101197 30596 infeasible 49 - 950.76807 - 31.7 1985s 101511 30641 985.56646 55 141 - 950.80113 - 31.7 1990s 101792 30736 980.07645 69 147 - 950.84615 - 31.7 1995s 102116 30895 1038.82231 105 112 - 950.86364 - 31.7 2000s 102403 31013 964.44777 51 239 - 950.88889 - 31.7 2006s 102624 31037 952.00975 48 237 - 950.91831 - 31.8 2010s 102904 31035 infeasible 54 - 950.99266 - 31.8 2015s 103240 31095 infeasible 47 - 951.05117 - 31.8 2020s 103576 31113 977.56045 49 228 - 951.12759 - 31.8 2025s 103936 31159 984.55228 54 128 - 951.18849 - 31.8 2030s 104273 31187 infeasible 53 - 951.24595 - 31.8 2035s 104529 31235 968.89495 43 225 - 951.29685 - 31.9 2040s 104830 31280 977.38889 52 202 - 951.33881 - 31.9 2045s 105152 31307 infeasible 48 - 951.38264 - 31.9 2050s 105511 31332 974.80377 35 219 - 951.44302 - 31.9 2055s 105795 31407 infeasible 38 - 951.47531 - 31.9 2060s 106155 31503 infeasible 42 - 951.50139 - 31.9 2065s 106484 31628 962.95654 52 222 - 951.52379 - 31.9 2070s 106725 31695 infeasible 50 - 951.54258 - 32.0 2075s 107106 31716 infeasible 46 - 951.59734 - 32.0 2080s 107467 31798 961.95062 45 165 - 951.64307 - 32.0 2085s 107756 31966 959.74631 54 224 - 951.65907 - 32.0 2090s 108132 32133 1001.01361 74 133 - 951.67271 - 32.0 2095s 108472 32196 infeasible 45 - 951.72697 - 32.0 2100s 108760 32312 963.81440 46 234 - 951.74996 - 32.0 2105s 109132 32339 954.04936 40 219 - 951.78878 - 32.0 2110s 109360 32468 1035.58840 119 179 - 951.79963 - 32.0 2115s 109644 32534 973.13220 45 215 - 951.82917 - 32.0 2120s 109942 32560 infeasible 64 - 951.86364 - 32.0 2125s 110292 32595 968.33584 40 224 - 951.92966 - 32.0 2130s 110621 32658 952.16600 49 200 - 951.97668 - 32.1 2135s 110922 32724 infeasible 42 - 952.02035 - 32.1 2140s 111268 32750 infeasible 56 - 952.06726 - 32.1 2145s 111551 32806 infeasible 47 - 952.09282 - 32.1 2150s 111962 32876 952.18698 44 163 - 952.15920 - 32.1 2155s 112281 32970 infeasible 58 - 952.19319 - 32.1 2160s 112604 33084 964.77037 54 188 - 952.22223 - 32.1 2166s 112801 33107 infeasible 43 - 952.25031 - 32.1 2170s 113205 33222 957.31000 41 191 - 952.29457 - 32.1 2175s 113560 33277 infeasible 39 - 952.32926 - 32.1 2180s 113813 33309 infeasible 43 - 952.36744 - 32.1 2185s 114135 33365 960.22002 42 220 - 952.42034 - 32.2 2190s 114483 33419 infeasible 45 - 952.45534 - 32.2 2195s 114832 33485 infeasible 51 - 952.51877 - 32.2 2200s 115146 33558 1008.49092 74 151 - 952.55218 - 32.2 2205s 115430 33673 1023.92600 83 116 - 952.58313 - 32.2 2210s 115691 33711 955.46757 47 175 - 952.61590 - 32.2 2215s 116024 33754 958.05415 44 221 - 952.65444 - 32.3 2220s 116428 33933 960.46646 43 148 - 952.66646 - 32.3 2225s 116796 34067 infeasible 48 - 952.69243 - 32.3 2230s 117176 34140 958.17707 43 231 - 952.74569 - 32.2 2235s 117493 34203 infeasible 47 - 952.77397 - 32.3 2240s 117758 34322 953.50728 41 207 - 952.79047 - 32.3 2245s 118094 34407 infeasible 71 - 952.82398 - 32.3 2250s 118437 34473 954.67242 48 186 - 952.87380 - 32.3 2255s 118710 34543 987.26496 59 197 - 952.91688 - 32.3 2260s 118983 34567 962.06646 45 186 - 952.96695 - 32.3 2265s 119298 34631 infeasible 63 - 953.01302 - 32.4 2270s 119647 34790 961.24584 44 218 - 953.04839 - 32.4 2275s 119933 34837 964.85380 61 163 - 953.08313 - 32.4 2280s 120181 34858 infeasible 50 - 953.12390 - 32.4 2285s 120474 34963 1007.28155 90 143 - 953.16331 - 32.4 2290s 120802 35086 955.85077 42 220 - 953.19229 - 32.4 2295s 121095 35188 985.83695 57 201 - 953.21876 - 32.5 2300s 121353 35219 993.55213 73 159 - 953.26401 - 32.5 2305s 121634 35276 966.18817 47 213 - 953.31799 - 32.5 2310s 121909 35336 953.39189 53 234 - 953.34491 - 32.5 2315s 122209 35474 963.15270 40 228 - 953.37084 - 32.5 2320s 122466 35538 975.92914 45 155 - 953.40859 - 32.6 2325s 122656 35718 1016.58836 118 187 - 953.40859 - 32.6 2330s 122781 35827 infeasible 180 - 953.40859 - 32.6 2335s 122928 35855 infeasible 54 - 953.43890 - 32.6 2340s 123256 35938 963.95062 45 172 - 953.46353 - 32.6 2345s 123559 36110 966.16274 43 213 - 953.47465 - 32.7 2350s 123799 36198 953.55494 40 211 - 953.49251 - 32.7 2355s 124084 36236 979.14208 42 236 - 953.51123 - 32.7 2360s 124422 36285 infeasible 55 - 953.54014 - 32.7 2365s 124739 36356 infeasible 49 - 953.58502 - 32.7 2370s 125033 36451 978.18447 67 199 - 953.59769 - 32.7 2375s 125243 36645 1061.21882 154 84 - 953.59769 - 32.8 2380s 125554 36651 infeasible 42 - 953.63062 - 32.8 2385s 125906 36739 989.47485 97 158 - 953.66274 - 32.8 2390s 126231 36927 994.60013 66 128 - 953.66677 - 32.8 2395s 126569 37009 954.91348 53 203 - 953.70438 - 32.8 2400s 126885 37166 infeasible 56 - 953.71806 - 32.8 2405s 127204 37179 973.76807 41 209 - 953.76807 - 32.8 2410s 127546 37279 991.58383 64 164 - 953.79784 - 32.8 2415s 127802 37361 967.98695 42 210 - 953.82309 - 32.8 2420s 128075 37478 infeasible 47 - 953.84883 - 32.8 2425s 128364 37566 959.71824 64 173 - 953.87084 - 32.8 2430s 128561 37689 infeasible 52 - 953.87380 - 32.9 2435s 128816 37710 959.78553 54 158 - 953.92565 - 32.9 2440s 129043 37757 974.63303 58 163 - 953.94590 - 32.9 2445s 129296 37771 infeasible 46 - 953.97657 - 33.0 2450s 129528 37871 998.02949 90 117 - 954.01070 - 33.0 2455s 129688 37926 955.44608 40 207 - 954.02804 - 33.0 2460s 130000 37925 979.46321 68 149 - 954.08214 - 33.0 2465s 130247 37944 967.40150 55 153 - 954.11090 - 33.0 2470s 130602 38063 infeasible 45 - 954.14259 - 33.0 2475s 130864 38069 985.35450 44 216 - 954.18005 - 33.1 2480s 131122 38240 1033.73963 172 205 - 954.19111 - 33.1 2485s 131260 38356 1091.37108 235 204 - 954.19111 - 33.1 2490s 131459 38487 1003.64689 83 164 - 954.19308 - 33.1 2495s 131739 38539 infeasible 51 - 954.22440 - 33.1 2500s 132064 38626 infeasible 64 - 954.26575 - 33.1 2505s 132336 38714 966.41894 62 91 - 954.30168 - 33.1 2510s 132657 38874 958.13385 56 168 - 954.31909 - 33.1 2515s 132917 38992 966.63804 74 196 - 954.34320 - 33.1 2520s 133149 39064 infeasible 56 - 954.35937 - 33.1 2525s 133428 39113 infeasible 39 - 954.39816 - 33.2 2530s 133628 39179 958.13111 59 208 - 954.41727 - 33.2 2535s 133849 39299 989.12509 43 208 - 954.42255 - 33.2 2540s 134151 39414 973.37053 94 81 - 954.44813 - 33.2 2545s 134452 39629 977.90208 79 181 - 954.45614 - 33.2 2550s 134687 39779 971.22669 91 64 - 954.45924 - 33.2 2555s 134908 39912 963.53488 46 211 - 954.47202 - 33.3 2560s 135223 39984 959.19546 49 222 - 954.50916 - 33.3 2565s 135433 40164 993.65142 166 55 - 954.51090 - 33.3 2570s 135604 40278 1041.66627 242 169 - 954.51090 - 33.3 2575s 135774 40372 1111.70583 318 137 - 954.51090 - 33.3 2580s 136030 40460 1021.30004 78 125 - 954.52862 - 33.3 2585s 136330 40559 infeasible 58 - 954.55365 - 33.3 2590s 136589 40691 969.43396 78 71 - 954.56510 - 33.3 2595s 136791 40755 966.26580 59 134 - 954.58760 - 33.3 2600s 137014 40837 968.20912 73 123 - 954.60250 - 33.4 2605s 137343 40982 962.90845 60 225 - 954.62628 - 33.4 2610s 137586 41060 955.45344 40 209 - 954.66274 - 33.4 2615s 137906 41156 infeasible 49 - 954.68825 - 33.4 2620s 138162 41249 961.58066 64 182 - 954.72500 - 33.4 2625s 138460 41319 infeasible 47 - 954.75025 - 33.4 2630s 138753 41389 969.08333 78 83 - 954.78837 - 33.5 2635s 138993 41611 1058.35815 193 86 - 954.78837 - 33.5 2640s 139257 41804 995.76678 66 156 - 954.79406 - 33.5 2645s 139576 41880 968.96342 44 183 - 954.82898 - 33.5 2650s 139800 41894 infeasible 54 - 954.87007 - 33.5 2655s 140051 41989 infeasible 54 - 954.88684 - 33.6 2660s 140387 42080 infeasible 49 - 954.91646 - 33.5 2665s 140577 42137 974.35339 54 181 - 954.93705 - 33.6 2674s 140601 42161 973.58887 77 155 - 954.93705 - 33.6 2675s 140905 42268 infeasible 54 - 954.95880 - 33.6 2680s 141147 42372 1011.74727 119 169 - 954.98167 - 33.6 2685s 141481 42405 956.17124 62 194 - 955.01733 - 33.6 2690s 141720 42492 974.05871 46 159 - 955.04759 - 33.6 2695s 142042 42538 963.90024 46 217 - 955.10140 - 33.6 2700s 142363 42636 infeasible 88 - 955.13220 - 33.6 2705s 142580 42761 987.86078 76 158 - 955.14039 - 33.6 2710s 142806 42855 963.61213 52 176 - 955.15264 - 33.7 2715s 143057 43034 1009.00257 128 205 - 955.16019 - 33.7 2720s 143237 43180 1077.12445 204 147 - 955.16019 - 33.7 2725s 143568 43303 977.17000 92 97 - 955.17786 - 33.7 2730s 143836 43326 infeasible 60 - 955.20783 - 33.7 2735s 144118 43439 infeasible 44 - 955.23742 - 33.7 2740s 144336 43457 966.01688 62 207 - 955.26768 - 33.7 2745s 144559 43604 967.26807 47 209 - 955.26808 - 33.8 2750s 144856 43616 infeasible 52 - 955.33006 - 33.8 2755s 145135 43692 infeasible 87 - 955.35432 - 33.8 2760s 145402 43836 977.67560 81 135 - 955.37469 - 33.8 2765s 145659 44008 968.78441 80 173 - 955.38461 - 33.8 2770s 145935 44113 infeasible 38 - 955.41552 - 33.8 2775s 146208 44261 983.17091 83 173 - 955.42936 - 33.9 2780s 146525 44357 infeasible 47 - 955.46249 - 33.9 2785s 146748 44501 infeasible 44 - 955.47390 - 33.9 2790s 147060 44627 infeasible 56 - 955.49584 - 33.9 2795s 147346 44727 infeasible 49 - 955.51255 - 33.9 2800s 147714 44821 infeasible 54 - 955.54038 - 33.9 2805s 148033 44993 983.64022 51 178 - 955.55470 - 33.9 2810s 148369 45146 infeasible 54 - 955.58313 - 33.9 2815s 148566 45195 979.09502 47 207 - 955.59734 - 33.9 2820s 148890 45400 infeasible 48 - 955.59734 - 33.8 2825s 149128 45604 998.25524 144 118 - 955.59734 - 33.9 2830s 149395 45764 986.08716 104 106 - 955.60455 - 33.9 2835s 149705 45888 959.01600 45 220 - 955.60611 - 33.9 2840s 150012 45964 963.37308 61 153 - 955.63845 - 33.9 2845s 150348 46145 975.29228 67 156 - 955.65512 - 33.9 2850s 150609 46276 959.91274 46 225 - 955.66274 - 33.9 2855s 150912 46464 992.00648 78 141 - 955.66646 - 33.9 2860s 151204 46518 infeasible 44 - 955.71101 - 33.9 2865s 151461 46650 infeasible 117 - 955.74020 - 33.9 2870s 151662 46752 967.31348 76 183 - 955.74739 - 33.9 2875s 151925 46930 1034.59489 110 287 - 955.75380 - 33.9 2880s 152142 47099 1006.69189 144 95 - 955.75396 - 34.0 2885s 152450 47261 983.86961 82 137 - 955.76807 - 34.0 2890s 152541 47284 963.91107 60 182 - 955.77778 - 34.0 2896s 152718 47345 974.00059 66 194 - 955.79208 - 34.0 2900s 153029 47453 976.33748 59 173 - 955.81527 - 34.0 2905s 153340 47627 977.55134 73 115 - 955.83134 - 34.0 2910s 153533 47746 1021.74745 122 91 - 955.84264 - 34.0 2915s 153773 47891 1002.08134 74 334 - 955.84653 - 34.0 2920s 154036 48045 1012.54660 94 149 - 955.86461 - 34.0 2925s 154283 48191 965.02015 48 180 - 955.87380 - 34.0 2930s 154548 48308 989.72895 100 125 - 955.90103 - 34.0 2935s 154864 48402 966.59734 54 225 - 955.93067 - 34.0 2940s 155208 48483 infeasible 52 - 955.97214 - 34.0 2945s 155487 48614 978.89147 54 150 - 955.98866 - 34.0 2950s 155817 48734 970.25646 64 113 - 956.01275 - 34.0 2955s 156156 48935 993.31381 97 94 - 956.03132 - 34.0 2960s 156451 48978 981.76916 50 170 - 956.07268 - 34.0 2965s 156677 49139 1042.39831 155 246 - 956.07759 - 34.1 2970s 156978 49219 infeasible 35 - 956.09881 - 34.1 2975s 157270 49371 986.89449 64 172 - 956.11859 - 34.1 2980s 157526 49521 967.38938 67 196 - 956.12786 - 34.1 2985s 157775 49621 972.53336 68 145 - 956.13788 - 34.1 2990s 158035 49782 962.46516 59 154 - 956.15383 - 34.1 2995s 158342 49984 1023.85437 101 168 - 956.16261 - 34.1 3000s 158617 50121 977.40936 78 254 - 956.17042 - 34.2 3005s 158979 50312 infeasible 82 - 956.19209 - 34.1 3010s 159268 50449 962.34772 54 192 - 956.20752 - 34.1 3015s 159565 50601 962.58643 60 122 - 956.23850 - 34.2 3020s 159871 50787 988.85436 98 137 - 956.24595 - 34.2 3025s 160121 50870 970.41455 39 232 - 956.25256 - 34.2 3030s 160438 51074 994.15423 68 180 - 956.25756 - 34.2 3035s 160729 51177 961.18314 57 214 - 956.27955 - 34.2 3040s 160994 51336 967.25472 61 198 - 956.28543 - 34.2 3045s 161283 51517 959.42632 59 179 - 956.28699 - 34.2 3050s 161575 51671 985.89695 50 239 - 956.30867 - 34.2 3055s 161848 51794 987.75690 66 113 - 956.32948 - 34.2 3060s 162179 51948 959.27930 64 197 - 956.34734 - 34.2 3065s 162429 52087 956.89986 41 214 - 956.35128 - 34.2 3070s 162603 52240 1008.02930 132 204 - 956.35214 - 34.2 3075s 162789 52379 999.57997 81 141 - 956.35604 - 34.3 3080s 163069 52524 972.61067 58 146 - 956.36548 - 34.2 3085s 163309 52699 1024.52537 131 197 - 956.37519 - 34.3 3090s 163526 52780 972.31816 64 166 - 956.38901 - 34.3 3095s 163722 52859 976.29784 41 219 - 956.41274 - 34.3 3100s 163980 53049 1002.36621 114 226 - 956.41920 - 34.3 3105s 164267 53180 1012.06141 114 149 - 956.43861 - 34.3 3110s 164534 53299 969.87110 51 122 - 956.45605 - 34.3 3115s 164825 53483 972.68758 88 170 - 956.46215 - 34.3 3120s 165120 53664 1009.30320 91 132 - 956.46607 - 34.4 3125s 165376 53766 infeasible 62 - 956.47951 - 34.4 3130s 165676 53894 988.07393 50 202 - 956.48893 - 34.4 3135s 166024 54079 972.79055 63 191 - 956.49818 - 34.4 3140s 166254 54167 infeasible 54 - 956.51743 - 34.4 3145s 166549 54202 970.69441 50 180 - 956.56407 - 34.4 3150s 166847 54333 982.56596 36 224 - 956.58675 - 34.4 3155s 167129 54524 997.36116 96 295 - 956.59387 - 34.4 3160s 167427 54746 infeasible 73 - 956.59734 - 34.4 3165s 167685 54874 986.12203 72 129 - 956.59734 - 34.4 3170s 167923 54994 966.43794 44 196 - 956.59825 - 34.5 3175s 168213 55174 1021.09825 111 151 - 956.60804 - 34.5 3180s 168493 55331 986.43605 84 210 - 956.61450 - 34.5 3185s 168712 55503 994.91517 76 181 - 956.61762 - 34.5 3190s 168964 55608 980.55125 67 173 - 956.62616 - 34.5 3195s 169259 55767 982.20876 62 115 - 956.63971 - 34.5 3200s 169490 55896 963.41272 51 145 - 956.64906 - 34.5 3206s 169686 56080 1000.52794 109 106 - 956.65026 - 34.5 3210s 169968 56220 973.87277 78 344 - 956.65895 - 34.6 3215s 170264 56335 977.34301 67 115 - 956.66646 - 34.6 3220s 170487 56485 971.50340 68 326 - 956.66833 - 34.6 3225s 170806 56674 965.85033 57 133 - 956.67534 - 34.6 3230s 171106 56834 1004.92803 59 230 - 956.69734 - 34.6 3235s 171344 56984 984.93055 101 246 - 956.71689 - 34.6 3240s 171508 57112 1083.95543 167 160 - 956.71689 - 34.6 3245s 171743 57193 960.44086 39 202 - 956.73313 - 34.6 3250s 172036 57377 971.62868 60 197 - 956.74137 - 34.6 3255s 172169 57417 966.80548 61 82 - 956.74609 - 34.6 3260s 172343 57569 infeasible 127 - 956.74609 - 34.6 3265s 172493 57623 961.43435 45 156 - 956.74986 - 34.7 3270s 172692 57798 1003.46912 108 129 - 956.74987 - 34.7 3275s 172894 57869 infeasible 66 - 956.76705 - 34.7 3280s 173127 57967 962.71075 57 153 - 956.77386 - 34.7 3285s 173296 58116 infeasible 108 - 956.77386 - 34.7 3290s 173478 58280 997.66419 123 202 - 956.77503 - 34.7 3295s 173625 58380 965.16274 41 208 - 956.77521 - 34.7 3300s 173789 58449 972.30120 48 231 - 956.78252 - 34.7 3305s 173956 58553 963.53348 57 137 - 956.78587 - 34.7 3310s 174092 58639 966.86623 70 135 - 956.78628 - 34.7 3315s 174285 58769 1003.36570 91 228 - 956.78777 - 34.7 3320s 174475 58903 965.14566 59 195 - 956.79236 - 34.7 3325s 174640 59025 971.06646 58 117 - 956.79521 - 34.7 3330s 174767 59090 infeasible 44 - 956.79608 - 34.8 3335s 174971 59177 963.33185 63 153 - 956.80182 - 34.8 3340s 175218 59303 1002.63549 66 122 - 956.80786 - 34.8 3345s 175441 59417 985.75889 100 151 - 956.82068 - 34.8 3350s 175591 59489 infeasible 49 - 956.83076 - 34.8 3355s 175784 59610 1015.77544 88 140 - 956.84264 - 34.8 3360s 175997 59750 infeasible 40 - 956.84355 - 34.8 3365s 176176 59838 981.03788 74 198 - 956.84921 - 34.8 3370s 176334 59881 964.06646 43 116 - 956.85846 - 34.8 3375s 176555 59979 989.03689 52 178 - 956.86900 - 34.8 3380s 176774 60142 infeasible 66 - 956.87185 - 34.8 3385s 176944 60260 998.98447 91 134 - 956.87380 - 34.8 3390s 177135 60411 1082.47664 181 235 - 956.87380 - 34.8 3395s 177249 60523 1102.02305 248 231 - 956.87380 - 34.8 3400s 177357 60575 1016.65890 76 333 - 956.87854 - 34.8 3405s 177483 60657 1001.86312 88 178 - 956.88091 - 34.8 3410s 177653 60785 1007.19148 95 200 - 956.88244 - 34.9 3415s 177762 60857 978.33988 51 158 - 956.88279 - 34.9 3420s 177982 60978 978.48586 76 129 - 956.88875 - 34.9 3425s 178171 61088 982.78221 67 142 - 956.89411 - 34.9 3430s 178359 61230 infeasible 135 - 956.89413 - 34.9 3435s 178505 61299 1009.39711 94 114 - 956.90380 - 34.9 3440s 178720 61386 987.54201 53 193 - 956.91672 - 34.9 3445s 178918 61479 965.00880 48 152 - 956.92181 - 34.9 3450s 179140 61634 973.32036 45 211 - 956.92512 - 34.9 3455s 179347 61695 961.28331 57 213 - 956.94169 - 34.9 3460s 179548 61827 infeasible 131 - 956.94639 - 34.9 3465s 179751 61960 972.09046 65 98 - 956.95865 - 34.9 3470s 179955 62036 infeasible 54 - 956.97227 - 34.9 3475s 180101 62101 963.95002 49 207 - 956.97593 - 34.9 3480s 180275 62250 983.77509 71 120 - 956.97978 - 34.9 3485s 180457 62352 960.47934 50 142 - 956.98331 - 34.9 3490s 180654 62437 infeasible 52 - 956.99825 - 35.0 3495s 180799 62547 1010.49401 116 260 - 956.99917 - 35.0 3500s 180974 62680 1070.41173 186 240 - 956.99917 - 35.0 3505s 181167 62769 988.15687 57 186 - 957.00885 - 35.0 3510s 181343 62858 984.08620 90 127 - 957.01780 - 35.0 3515s 181481 62942 989.54820 87 144 - 957.02386 - 35.0 3520s 181618 63023 990.92544 71 110 - 957.02761 - 35.0 3525s 181796 63108 983.94444 84 56 - 957.03867 - 35.0 3530s 181982 63243 990.62444 77 174 - 957.04315 - 35.0 3535s 182283 63440 infeasible 45 - 957.05091 - 35.0 3540s 182375 63527 1003.54758 107 152 - 957.05189 - 35.0 3545s 182558 63651 962.18378 48 160 - 957.05518 - 35.0 3550s 182744 63766 993.32801 76 170 - 957.05971 - 35.0 3555s 182900 63829 958.81234 48 149 - 957.07440 - 35.0 3560s 183112 63956 infeasible 52 - 957.08212 - 35.0 3565s 183330 64070 981.01335 78 131 - 957.09193 - 35.0 3570s 183439 64085 infeasible 64 - 957.09741 - 35.1 3575s 183609 64179 969.42829 45 201 - 957.10414 - 35.1 3580s 183824 64326 996.71747 90 90 - 957.11216 - 35.1 3585s 184064 64482 988.49511 90 177 - 957.11681 - 35.1 3590s 184207 64571 968.33615 64 140 - 957.11981 - 35.1 3595s Cutting planes: Learned: 22 Gomory: 101 Cover: 589 Implied bound: 362 Clique: 26 MIR: 851 GUB cover: 19 Zero half: 317 Explored 184337 nodes (6470304 simplex iterations) in 3600.00 seconds Thread count was 1 (of 16 available processors) Time limit reached Best objective -, best bound 9.580000000000e+02, gap -