Gurobi 5.0.1 (linux64) logging started Fri Jan 4 14:27:49 2013 Optimize a model with 10402 rows, 10201 columns and 64440 nonzeros Presolve removed 2871 rows and 3383 columns Presolve time: 0.14s Presolved: 7531 rows, 6818 columns, 45542 nonzeros Variable types: 100 continuous, 6718 integer (6718 binary) Root relaxation: objective 4.437363e+02, 756 iterations, 0.04 seconds Nodes | Current Node | Objective Bounds | Work Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time 0 0 443.73626 0 154 - 443.73626 - - 0s 0 0 450.86961 0 225 - 450.86961 - - 0s 0 0 451.23903 0 208 - 451.23903 - - 0s 0 0 452.02721 0 175 - 452.02721 - - 0s 0 0 452.16146 0 189 - 452.16146 - - 0s 0 0 452.21279 0 221 - 452.21279 - - 1s 0 0 452.26861 0 184 - 452.26861 - - 1s 0 0 452.64650 0 223 - 452.64650 - - 1s 0 0 452.78642 0 198 - 452.78642 - - 1s 0 0 452.81432 0 225 - 452.81432 - - 1s 0 0 453.12874 0 181 - 453.12874 - - 1s 0 0 453.13164 0 167 - 453.13164 - - 1s 0 0 453.13164 0 172 - 453.13164 - - 1s 0 0 453.13164 0 171 - 453.13164 - - 2s 0 0 453.13164 0 182 - 453.13164 - - 2s 0 0 453.13164 0 182 - 453.13164 - - 2s 0 2 453.14254 0 170 - 453.14254 - - 4s 72 72 541.45692 62 170 - 453.34708 - 29.7 5s 601 532 631.69287 156 182 - 454.05610 - 24.9 10s 603 533 606.62636 139 163 - 454.05610 - 24.8 15s 604 534 574.82778 88 205 - 454.05610 - 24.8 22s 605 535 547.96984 73 167 - 456.83175 - 24.7 29s 606 535 537.73458 66 189 - 458.87559 - 24.7 36s 607 536 525.95380 40 198 - 460.96573 - 24.7 46s 608 537 536.45672 57 219 - 466.25286 - 24.6 53s 609 537 467.57737 20 210 - 467.57737 - 24.6 64s 610 538 559.79868 125 195 - 468.11502 - 24.5 74s 611 539 477.74588 34 185 - 468.18168 - 24.5 82s 612 539 567.37402 145 192 - 470.21785 - 24.5 92s 613 540 547.96984 73 211 - 470.96130 - 24.4 101s 614 541 631.69287 156 217 - 471.22065 - 24.4 107s 615 541 559.79868 125 191 - 471.28820 - 24.3 113s 616 542 537.78192 48 208 - 471.34540 - 24.3 123s 617 543 537.73458 66 225 - 471.34882 - 24.3 128s 618 543 559.79868 125 225 - 471.34882 - 24.2 131s 621 547 600.96170 112 182 - 471.38299 - 36.4 136s 623 548 558.97492 110 173 - 471.38299 - 36.3 141s 624 549 606.62636 139 201 - 471.38299 - 36.3 150s 625 550 477.74588 34 193 - 471.38299 - 36.2 158s 626 550 567.37402 145 196 - 471.38299 - 36.2 168s 627 551 472.83510 26 226 - 471.43915 - 36.1 177s 628 552 525.95380 40 222 - 471.62546 - 36.0 186s 629 552 474.15731 28 195 - 471.87961 - 36.0 196s 630 553 537.78192 48 217 - 471.97717 - 35.9 207s 631 554 472.12259 20 203 - 472.12259 - 35.9 215s 633 555 472.19548 16 222 - 472.19548 - 35.8 225s 634 556 477.74588 34 217 - 472.21441 - 35.7 236s 635 556 558.97492 110 228 - 472.26970 - 35.6 246s 636 557 537.73458 66 211 - 472.28832 - 35.6 259s 637 558 567.37402 145 193 - 472.32845 - 35.5 269s 638 558 537.73458 66 207 - 472.35925 - 35.5 278s 639 559 631.69287 156 198 - 472.37408 - 35.4 285s 640 560 472.41261 16 191 - 472.41261 - 35.4 294s 641 560 472.41269 20 192 - 472.41269 - 35.3 299s 642 561 567.37402 145 186 - 472.41269 - 35.3 304s 643 562 616.07997 153 186 - 472.41269 - 35.2 308s 646 566 472.42690 23 203 - 472.42447 - 46.2 310s 742 620 483.35476 46 181 - 472.47669 - 57.0 315s 945 701 485.55151 42 184 - 473.35177 - 57.2 320s 1168 722 485.98125 38 202 - 473.78290 - 56.7 325s 1322 782 infeasible 44 - 473.87580 - 59.5 330s 1536 863 476.27591 31 187 - 474.06302 - 59.6 335s 1701 915 475.55843 25 197 - 474.33630 - 62.0 340s 1918 996 487.62778 47 176 - 474.51260 - 61.4 345s 2099 1046 485.03926 50 147 - 474.56573 - 62.9 350s 2298 1091 infeasible 39 - 474.74790 - 63.0 355s 2497 1215 527.75761 46 173 - 475.01334 - 63.2 360s 2704 1321 484.69029 43 159 - 475.23732 - 63.5 365s 2896 1461 571.84176 86 169 - 475.29766 - 63.4 370s 3154 1660 infeasible 51 - 475.46000 - 61.7 375s 3389 1782 485.55463 36 198 - 475.66277 - 61.8 380s 3617 1928 infeasible 50 - 475.80777 - 62.1 385s 3806 2003 infeasible 49 - 475.87714 - 63.1 390s 4011 2124 481.06696 35 187 - 476.07724 - 63.4 395s 4215 2236 490.17639 43 141 - 476.27850 - 63.5 400s 4492 2389 infeasible 45 - 476.43946 - 62.6 405s 4645 2478 532.90522 49 180 - 476.48482 - 63.7 410s 4890 2669 486.60086 45 171 - 476.49744 - 62.9 415s 5106 2829 626.00463 108 142 - 476.55473 - 62.7 420s 5303 2976 infeasible 54 - 476.59858 - 63.0 425s 5486 3049 478.38035 37 165 - 476.68411 - 63.8 430s 5723 3170 487.28014 32 186 - 476.80733 - 63.6 435s 5952 3295 484.71830 36 193 - 476.89505 - 63.5 440s 6089 3356 545.03177 52 166 - 476.91044 - 64.4 445s 6358 3623 600.39582 242 105 - 476.91044 - 62.7 450s 6730 3958 702.84581 499 59 - 476.91044 - 60.4 455s 6960 4122 568.63634 48 172 - 476.97305 - 60.5 460s 7257 4324 556.16627 43 180 - 477.05321 - 60.0 465s 7502 4447 496.33578 38 153 - 477.14843 - 60.0 470s 7723 4591 infeasible 56 - 477.21623 - 60.1 475s 8148 4999 658.70696 291 84 - 477.24393 - 58.2 480s 8547 5334 553.39849 97 144 - 477.31022 - 56.8 485s 8881 5606 infeasible 50 - 477.34080 - 55.8 490s 9116 5729 494.38029 45 176 - 477.42891 - 56.0 495s 9447 6004 522.32529 41 178 - 477.43704 - 55.5 500s 9821 6239 517.63542 36 189 - 477.55667 - 54.8 505s 10092 6395 infeasible 37 - 477.59720 - 54.8 510s 10250 6485 531.90762 44 175 - 477.62000 - 54.9 515s 10495 6606 491.65343 34 191 - 477.73875 - 55.0 520s 10808 6779 infeasible 48 - 477.80733 - 54.8 525s 11096 6964 496.13836 42 177 - 477.91811 - 54.7 530s 11321 7113 infeasible 52 - 477.96571 - 54.9 535s 11650 7290 483.54926 39 192 - 478.09808 - 54.6 540s 11905 7425 infeasible 43 - 478.12890 - 54.7 545s 12111 7529 486.71548 41 196 - 478.15927 - 55.0 550s 12321 7616 infeasible 40 - 478.20023 - 55.4 555s 12518 7725 infeasible 41 - 478.25039 - 55.6 560s 12738 7833 486.29160 35 181 - 478.34943 - 55.6 565s 12896 7957 489.11450 33 179 - 478.39841 - 56.0 570s 13040 8067 infeasible 114 - 478.39841 - 56.3 575s 13281 8201 482.50544 32 192 - 478.43812 - 56.3 580s 13406 8266 562.61401 46 179 - 478.46398 - 56.8 585s 13657 8395 infeasible 39 - 478.55907 - 56.7 590s 13893 8503 483.76096 35 174 - 478.63071 - 56.8 595s 14115 8603 507.01074 45 185 - 478.70313 - 56.9 600s 14363 8741 490.89993 40 163 - 478.75710 - 56.8 605s 14601 8858 infeasible 40 - 478.83012 - 57.0 610s 14813 8964 infeasible 47 - 478.87382 - 57.1 615s 14945 9024 infeasible 46 - 478.89224 - 57.7 620s 15156 9151 499.03058 43 160 - 478.92832 - 57.8 625s 15380 9257 infeasible 43 - 478.97207 - 57.8 630s 15589 9352 576.02956 38 153 - 479.06683 - 57.8 635s 15798 9455 489.32617 30 202 - 479.10312 - 57.9 640s 15929 9586 548.90081 85 124 - 479.10312 - 58.2 645s 16258 9915 628.40714 313 110 - 479.10312 - 57.5 650s 16533 10148 692.48224 475 99 - 479.10312 - 57.1 655s 16858 10385 488.63563 39 188 - 479.14786 - 56.7 660s 17082 10502 infeasible 43 - 479.16707 - 57.0 665s 17225 10579 557.84981 46 166 - 479.19571 - 57.3 670s 17554 10837 487.28968 35 178 - 479.21054 - 56.9 675s 17767 10961 488.91827 39 194 - 479.24255 - 57.1 680s 18059 11123 536.97948 53 178 - 479.32262 - 57.0 685s 18404 11464 616.19945 273 80 - 479.32262 - 56.5 690s 18647 11598 495.22480 42 167 - 479.37678 - 56.5 695s 18828 11747 579.50452 98 119 - 479.40472 - 56.7 700s 19111 11914 481.08488 33 177 - 479.46488 - 56.6 705s 19415 12080 infeasible 44 - 479.54972 - 56.4 710s 19773 12281 506.19496 33 180 - 479.63993 - 56.2 715s 20060 12456 491.61234 40 167 - 479.67485 - 56.1 720s 20386 12614 497.64643 38 178 - 479.72246 - 55.9 725s 20603 12721 infeasible 54 - 479.76927 - 55.7 730s 20830 12812 487.25233 39 157 - 479.81625 - 55.8 735s 21097 12944 495.84207 31 182 - 479.84710 - 55.8 740s 21375 13071 529.31744 40 173 - 479.88141 - 55.7 745s 21603 13203 484.15189 35 188 - 479.90890 - 55.7 750s 21841 13357 485.79902 30 202 - 479.92877 - 55.7 755s 22085 13499 infeasible 38 - 479.95027 - 55.8 760s 22275 13653 527.57882 51 187 - 479.95618 - 55.9 765s 22591 13829 484.17960 40 166 - 480.02038 - 55.8 770s 22931 14025 500.38656 34 190 - 480.07037 - 55.6 775s 23252 14184 480.66869 32 181 - 480.10734 - 55.4 780s 23606 14395 infeasible 46 - 480.14625 - 55.2 785s 23988 14587 infeasible 47 - 480.18928 - 55.0 790s 24233 14720 infeasible 45 - 480.22017 - 55.0 795s 24414 14799 infeasible 52 - 480.23475 - 55.2 800s 24610 14907 496.08631 40 170 - 480.25245 - 55.3 805s 24829 15045 604.76407 46 175 - 480.27239 - 55.3 810s 25052 15234 626.03204 89 126 - 480.27472 - 55.3 815s 25453 15630 818.92532 399 89 - 480.27472 - 54.8 820s 25810 15843 540.23583 50 150 - 480.28820 - 54.6 825s 26178 16046 infeasible 51 - 480.31394 - 54.3 830s 26434 16198 487.35937 33 208 - 480.37002 - 54.4 835s 26720 16348 484.05892 39 150 - 480.41042 - 54.3 840s 27054 16538 559.27088 63 148 - 480.45243 - 54.2 845s 27472 16949 687.98367 371 90 - 480.45243 - 53.8 850s 27923 17358 488.02064 40 170 - 480.45362 - 53.2 855s 28275 17565 487.68757 39 156 - 480.51019 - 53.1 860s 28694 17844 495.94755 36 203 - 480.55531 - 52.9 865s 28949 17951 520.02904 40 167 - 480.58878 - 52.9 870s 29274 18208 601.43280 190 96 - 480.59500 - 52.8 875s 29653 18428 604.27826 44 131 - 480.60980 - 52.7 880s 29946 18599 infeasible 44 - 480.65048 - 52.6 885s 30088 18691 556.18891 40 196 - 480.67035 - 52.8 890s 30265 18858 668.69412 139 99 - 480.67035 - 52.9 895s 30603 19132 484.98104 36 176 - 480.67385 - 52.6 900s 30871 19312 infeasible 43 - 480.69634 - 52.5 905s 30997 19374 598.32236 50 148 - 480.72542 - 52.8 910s 31217 19550 492.00262 36 168 - 480.73851 - 52.9 915s 31401 19640 497.90915 37 162 - 480.74676 - 53.0 920s 31639 19758 infeasible 45 - 480.78789 - 53.1 925s 31890 19861 infeasible 36 - 480.83967 - 53.1 930s 32080 19925 infeasible 46 - 480.86299 - 53.2 935s 32356 20071 489.03446 42 155 - 480.91305 - 53.2 940s 32587 20164 488.72388 34 186 - 480.92722 - 53.3 945s 32950 20447 infeasible 194 - 480.93375 - 53.0 950s 33174 20594 486.79660 52 194 - 480.94269 - 53.1 955s 33424 20706 infeasible 47 - 480.97207 - 53.2 960s 33642 20818 infeasible 41 - 481.00092 - 53.2 965s 34079 21074 481.53168 36 151 - 481.04094 - 53.0 970s 34431 21274 481.55033 33 159 - 481.06967 - 52.8 975s 34766 21463 484.80996 41 199 - 481.09531 - 52.8 980s 35074 21625 infeasible 60 - 481.14028 - 52.8 985s 35291 21751 508.26993 46 163 - 481.15927 - 52.8 990s 35502 21898 707.70182 110 119 - 481.16808 - 52.9 995s 35652 21949 infeasible 46 - 481.17301 - 53.2 1000s 35846 22035 infeasible 37 - 481.20626 - 53.3 1005s 36110 22191 490.74686 44 173 - 481.22050 - 53.2 1010s 36350 22303 523.85752 43 183 - 481.26345 - 53.2 1015s 36539 22412 546.14802 42 196 - 481.27269 - 53.4 1020s 36743 22539 infeasible 42 - 481.27720 - 53.4 1025s 36937 22611 infeasible 43 - 481.29203 - 53.5 1030s 37181 22729 560.65117 52 157 - 481.30589 - 53.6 1035s 37440 22978 605.84964 211 111 - 481.30959 - 53.5 1040s 37707 23173 552.71458 53 152 - 481.30961 - 53.5 1045s 38001 23457 629.87263 203 119 - 481.30961 - 53.4 1050s 38458 23898 830.34290 502 96 - 481.30961 - 53.1 1055s 38786 24095 infeasible 50 - 481.32773 - 53.1 1060s 39114 24278 498.68047 38 193 - 481.36865 - 53.0 1065s 39613 24761 828.94228 368 76 - 481.36865 - 52.6 1070s 39946 24949 infeasible 36 - 481.38400 - 52.5 1075s 40277 25160 506.78008 45 173 - 481.41042 - 52.5 1080s 40625 25361 infeasible 44 - 481.46436 - 52.4 1085s 40804 25473 494.99048 48 168 - 481.47289 - 52.3 1177s 40929 25553 569.46678 65 167 - 481.48286 - 52.3 1180s 41324 25789 481.78885 29 168 - 481.50941 - 52.2 1185s 41636 26006 495.94513 46 201 - 481.53037 - 52.2 1190s 41948 26221 499.17872 52 188 - 481.55096 - 52.1 1195s 42149 26289 484.84895 37 178 - 481.57743 - 52.3 1200s 42398 26416 infeasible 48 - 481.61123 - 52.3 1205s 42735 26635 487.06809 39 185 - 481.63408 - 52.2 1210s 43132 26861 infeasible 42 - 481.66214 - 52.1 1215s 43376 26981 519.90337 54 143 - 481.68789 - 52.1 1220s 43682 27133 infeasible 45 - 481.70738 - 52.1 1225s 43945 27242 infeasible 44 - 481.73750 - 52.1 1230s 44154 27327 495.47906 35 136 - 481.77109 - 52.2 1235s 44393 27440 infeasible 47 - 481.78214 - 52.3 1240s 44653 27553 534.85149 47 139 - 481.80115 - 52.3 1245s 44872 27642 499.09467 43 155 - 481.82344 - 52.3 1250s 45280 28022 652.55906 252 95 - 481.82474 - 52.1 1255s 45782 28413 487.66037 34 176 - 481.83825 - 51.9 1260s 46013 28523 489.83350 46 187 - 481.87147 - 51.9 1265s 46270 28672 infeasible 48 - 481.88554 - 52.0 1270s 46605 28836 522.03714 43 150 - 481.93010 - 51.9 1275s 46744 28949 584.95596 93 131 - 481.93596 - 52.0 1280s 47127 29190 infeasible 52 - 481.95676 - 51.9 1285s 47357 29291 infeasible 47 - 481.98480 - 51.9 1290s 47811 29627 482.19573 29 198 - 481.99628 - 51.7 1295s 48367 30143 491.86409 38 172 - 482.00181 - 51.4 1300s 48709 30302 494.42039 38 168 - 482.04458 - 51.3 1305s 48985 30439 500.99612 52 139 - 482.05892 - 51.3 1310s 49199 30521 infeasible 45 - 482.06967 - 51.4 1315s 49432 30618 485.18261 36 169 - 482.10061 - 51.5 1320s 49663 30735 603.30173 57 145 - 482.10417 - 51.5 1325s 49974 31046 707.89170 287 110 - 482.10417 - 51.4 1330s 50476 31507 679.63170 337 87 - 482.10629 - 51.1 1335s 50741 31618 496.52896 41 177 - 482.13508 - 51.2 1340s 50997 31750 485.67928 36 177 - 482.15895 - 51.2 1345s 51159 31824 527.95227 43 128 - 482.16714 - 51.3 1350s 51374 31916 486.05033 43 166 - 482.18289 - 51.3 1355s 51638 32028 533.49399 43 148 - 482.18931 - 51.3 1360s 51879 32119 493.10809 40 187 - 482.20521 - 51.4 1365s 52073 32225 infeasible 94 - 482.21254 - 51.5 1370s 52251 32291 534.86977 49 162 - 482.22050 - 51.6 1375s 52497 32407 488.33521 36 171 - 482.24068 - 51.6 1380s 52754 32540 553.11594 47 152 - 482.25028 - 51.6 1385s 53037 32725 540.33295 41 154 - 482.26356 - 51.6 1390s 53372 33028 612.78947 236 93 - 482.26429 - 51.5 1395s 53727 33312 567.03289 121 117 - 482.27519 - 51.4 1400s 54279 33801 549.55947 47 156 - 482.28232 - 51.1 1405s 54515 33973 494.36336 36 189 - 482.28820 - 51.2 1410s 54905 34275 644.71095 107 114 - 482.29227 - 51.1 1415s 55163 34395 493.23530 39 153 - 482.30556 - 51.1 1420s 55516 34588 infeasible 38 - 482.31638 - 51.0 1425s 55872 34785 538.11578 53 165 - 482.34322 - 51.0 1430s 56260 34998 501.90987 40 165 - 482.36651 - 50.8 1435s 56502 35097 infeasible 53 - 482.36966 - 50.9 1440s 56745 35262 486.71684 45 181 - 482.38295 - 50.9 1445s 57038 35430 498.26584 34 156 - 482.38889 - 50.9 1450s 57403 35751 489.44620 43 163 - 482.40425 - 50.8 1455s 57635 35860 482.85655 37 165 - 482.41114 - 50.8 1460s 57970 36129 665.03615 201 113 - 482.42261 - 50.8 1465s 58238 36236 infeasible 43 - 482.43258 - 50.8 1470s 58597 36491 552.17211 45 174 - 482.44650 - 50.7 1475s 58881 36633 484.27591 39 178 - 482.45847 - 50.8 1480s 59109 36745 infeasible 39 - 482.47607 - 50.8 1485s 59284 36846 562.26982 57 130 - 482.47987 - 50.9 1490s 59584 36986 infeasible 37 - 482.49303 - 50.9 1495s 60003 37199 529.57603 40 181 - 482.50123 - 50.7 1500s 60229 37322 592.25307 49 168 - 482.50937 - 50.8 1505s 60553 37609 608.59054 45 146 - 482.50941 - 50.8 1510s 60857 37819 infeasible 48 - 482.52893 - 50.8 1515s 61120 37929 492.46743 40 191 - 482.56369 - 50.8 1520s 61279 38002 infeasible 43 - 482.57405 - 50.8 1525s 61481 38170 598.93069 119 87 - 482.57865 - 50.9 1530s 61715 38294 infeasible 50 - 482.59085 - 50.9 1535s 61994 38498 680.80682 174 118 - 482.59259 - 50.9 1540s 62339 38696 564.71368 47 186 - 482.60877 - 50.9 1545s 62686 38963 482.70520 28 194 - 482.61257 - 50.8 1550s 62834 39053 593.42997 45 145 - 482.62537 - 51.0 1555s 63144 39263 486.56375 34 181 - 482.63211 - 50.9 1560s 63368 39376 603.56633 47 131 - 482.65290 - 51.0 1565s 63777 39775 infeasible 346 - 482.65290 - 50.8 1570s 64247 40095 596.07804 126 106 - 482.66161 - 50.7 1575s 64588 40259 494.68762 39 166 - 482.69039 - 50.7 1580s 64919 40511 677.75494 105 127 - 482.70330 - 50.6 1585s 65174 40657 infeasible 46 - 482.72619 - 50.6 1590s 65370 40771 555.28677 71 109 - 482.73344 - 50.7 1595s 65779 41075 488.59319 39 190 - 482.74649 - 50.6 1600s 66110 41331 infeasible 45 - 482.75197 - 50.6 1605s 66356 41490 594.51582 58 192 - 482.77590 - 50.7 1610s 66619 41653 infeasible 32 - 482.78701 - 50.7 1615s 67052 41942 infeasible 42 - 482.80527 - 50.6 1620s 67172 42048 701.78991 102 98 - 482.80892 - 50.7 1625s 67376 42152 501.97732 45 168 - 482.82737 - 50.7 1630s 67588 42236 496.65873 44 177 - 482.83921 - 50.8 1635s 67790 42356 infeasible 51 - 482.84296 - 50.8 1640s 68013 42457 infeasible 52 - 482.85911 - 50.9 1645s 68240 42552 infeasible 40 - 482.87731 - 50.9 1650s 68452 42656 infeasible 61 - 482.88230 - 51.0 1655s 68778 42936 624.93112 215 124 - 482.88394 - 50.9 1660s 69021 43025 infeasible 45 - 482.90087 - 51.0 1665s 69238 43114 infeasible 47 - 482.91797 - 51.0 1670s 69547 43264 533.83615 48 171 - 482.93195 - 51.0 1675s 69920 43486 493.18352 39 165 - 482.95695 - 50.9 1680s 70253 43674 560.59940 57 166 - 482.98018 - 50.9 1685s 70557 43860 infeasible 51 - 482.98401 - 50.9 1690s 70835 44003 488.52071 37 203 - 482.99645 - 50.9 1695s 70976 44090 613.36514 54 168 - 482.99881 - 51.0 1700s 71065 44165 623.91142 46 138 - 483.00046 - 51.1 1705s 71384 44376 infeasible 40 - 483.00710 - 51.0 1710s 71542 44444 485.03441 34 191 - 483.01692 - 51.1 1715s 71767 44543 505.74562 39 148 - 483.03451 - 51.1 1720s 71965 44726 532.78026 51 133 - 483.03845 - 51.1 1725s 72146 44813 534.28013 46 157 - 483.05267 - 51.2 1730s 72559 45153 infeasible 42 - 483.06077 - 51.1 1735s 72799 45263 534.90177 41 154 - 483.06967 - 51.1 1740s 73023 45371 503.50932 47 182 - 483.08127 - 51.1 1745s 73309 45484 533.30275 39 106 - 483.10278 - 51.1 1750s 73610 45667 492.26476 45 125 - 483.11645 - 51.1 1755s 74049 45941 515.42564 42 185 - 483.13767 - 51.0 1760s 74260 46050 533.27412 46 171 - 483.15038 - 51.1 1765s 74500 46138 484.90584 44 202 - 483.16808 - 51.1 1770s 74676 46254 infeasible 41 - 483.17131 - 51.2 1775s 74899 46337 494.64270 44 173 - 483.18118 - 51.2 1780s 75135 46443 519.60750 43 179 - 483.19038 - 51.2 1785s 75346 46596 616.08275 98 116 - 483.19343 - 51.3 1790s 75789 46945 488.67377 36 192 - 483.19560 - 51.2 1795s 76171 47198 infeasible 122 - 483.20540 - 51.1 1800s 76727 47671 491.02540 37 140 - 483.20686 - 50.9 1805s 76964 47862 494.67209 40 194 - 483.20878 - 51.0 1810s 77268 48082 561.30565 86 140 - 483.22000 - 51.0 1815s 77692 48443 491.56832 44 194 - 483.22050 - 50.9 1820s 77946 48565 552.93146 40 140 - 483.23221 - 50.9 1825s 78263 48882 660.81251 253 104 - 483.23221 - 50.8 1830s 78761 49255 485.36929 38 191 - 483.24008 - 50.7 1835s 79012 49357 490.70030 34 150 - 483.25215 - 50.7 1840s 79191 49480 infeasible 51 - 483.25584 - 50.8 1845s 79444 49595 538.72244 44 147 - 483.26821 - 50.8 1850s 79883 49942 618.57057 146 133 - 483.27472 - 50.7 1855s 80268 50254 582.00397 61 134 - 483.29115 - 50.6 1860s 80866 50846 799.34734 500 72 - 483.29115 - 50.4 1865s 81190 51050 602.90331 37 163 - 483.30556 - 50.4 1870s 81524 51282 569.92325 45 138 - 483.32303 - 50.4 1875s 81674 51422 555.33151 58 133 - 483.32546 - 50.4 1880s 82170 51874 808.97645 388 57 - 483.32546 - 50.3 1885s 82574 52109 484.73741 43 162 - 483.34522 - 50.2 1890s 82822 52263 infeasible 50 - 483.35608 - 50.2 1895s 83113 52438 infeasible 49 - 483.36838 - 50.3 1900s 83372 52559 547.68921 46 146 - 483.39266 - 50.3 1905s 83660 52716 infeasible 42 - 483.40122 - 50.3 1910s 83762 52804 554.69100 47 180 - 483.40792 - 50.4 1915s 84014 53008 497.11590 42 140 - 483.41688 - 50.4 1920s 84196 53160 598.65510 120 114 - 483.42529 - 50.5 1925s 84629 53477 534.72798 45 198 - 483.43883 - 50.4 1930s 84941 53720 500.86200 44 143 - 483.44733 - 50.4 1935s 85147 53848 557.20168 88 129 - 483.45528 - 50.4 1940s 85505 54116 492.37479 36 167 - 483.45987 - 50.4 1945s 85827 54357 infeasible 59 - 483.47249 - 50.4 1950s 86260 54768 741.66800 310 94 - 483.47806 - 50.3 1955s 86690 55058 infeasible 201 - 483.49235 - 50.2 1960s 87009 55195 491.58618 36 195 - 483.50008 - 50.2 1965s 87373 55459 610.04695 118 125 - 483.50941 - 50.2 1970s 87775 55754 infeasible 41 - 483.51146 - 50.1 1975s 88094 55969 546.06615 45 189 - 483.51618 - 50.1 1980s 88390 56142 infeasible 52 - 483.53071 - 50.1 1985s 88647 56343 infeasible 47 - 483.53637 - 50.1 1990s 89019 56592 527.08262 62 109 - 483.56021 - 50.1 1995s 89333 56768 492.81902 45 164 - 483.57801 - 50.1 2000s 89483 56908 582.75000 89 104 - 483.57899 - 50.2 2005s 90152 57500 523.26373 50 167 - 483.58420 - 50.0 2010s 90438 57638 infeasible 56 - 483.62034 - 50.0 2015s 90702 57787 infeasible 62 - 483.63024 - 50.0 2020s 90877 57926 505.41440 54 125 - 483.63940 - 50.1 2025s 91324 58272 637.29423 211 91 - 483.65022 - 50.0 2030s 91692 58525 505.88171 54 163 - 483.65555 - 49.9 2035s 91909 58652 504.13686 43 186 - 483.65937 - 49.9 2040s 92150 58753 488.37717 38 162 - 483.67524 - 49.9 2045s 92635 59166 492.62378 36 181 - 483.67720 - 49.9 2050s 92909 59396 627.46882 104 131 - 483.68381 - 49.9 2055s 93155 59594 492.87013 38 182 - 483.69634 - 49.9 2060s 93489 59788 500.35887 41 168 - 483.71484 - 49.9 2065s 93730 59897 510.33642 53 157 - 483.72403 - 49.9 2070s 94019 60045 489.52827 36 187 - 483.74791 - 49.9 2075s 94317 60259 infeasible 42 - 483.75716 - 49.9 2080s 94519 60372 501.51941 45 187 - 483.75919 - 50.0 2085s 94776 60588 643.93023 159 126 - 483.76225 - 50.0 2090s 95184 60826 495.84844 53 160 - 483.77521 - 49.9 2095s 95461 60942 492.92163 44 185 - 483.78758 - 49.9 2100s 95737 61081 487.49064 43 161 - 483.79939 - 49.9 2105s 96049 61347 623.02925 192 125 - 483.80077 - 49.9 2110s 96663 61825 540.80905 42 185 - 483.80097 - 49.8 2115s 96897 61997 563.64357 81 122 - 483.80414 - 49.8 2120s 97156 62150 499.86890 35 148 - 483.81680 - 49.8 2125s 97375 62219 infeasible 42 - 483.82927 - 49.9 2130s 97593 62315 538.41649 40 168 - 483.84009 - 49.9 2135s 97928 62572 539.74239 40 177 - 483.84275 - 49.9 2140s 98121 62635 infeasible 48 - 483.84275 - 49.9 2145s 98396 62765 489.02720 35 189 - 483.85986 - 49.9 2150s 98676 62895 485.40971 41 186 - 483.87109 - 49.9 2155s 98913 62978 494.48139 49 199 - 483.87172 - 50.0 2160s 99169 63131 567.64304 53 141 - 483.87736 - 50.0 2165s 99489 63389 infeasible 43 - 483.87793 - 50.0 2170s 99741 63497 infeasible 46 - 483.88720 - 50.0 2175s 100063 63737 infeasible 51 - 483.88937 - 50.0 2180s 100257 63809 581.93612 62 169 - 483.89676 - 50.0 2185s 100501 63901 487.82458 41 176 - 483.90751 - 50.1 2190s 100706 63974 infeasible 49 - 483.91755 - 50.1 2195s 100938 64098 infeasible 50 - 483.92521 - 50.1 2200s 101241 64253 497.63853 42 154 - 483.93819 - 50.1 2205s 101573 64426 495.89615 38 152 - 483.96123 - 50.1 2210s 101794 64601 619.56337 116 115 - 483.96470 - 50.1 2215s 102238 64971 491.41058 41 153 - 483.96759 - 50.0 2220s 102643 65287 664.37603 205 84 - 483.97116 - 49.9 2225s 103059 65606 infeasible 52 - 483.97385 - 49.9 2230s 103469 65891 492.50435 44 165 - 483.98319 - 49.8 2235s 103770 66004 infeasible 50 - 483.99614 - 49.8 2240s 104082 66138 infeasible 37 - 484.01122 - 49.8 2245s 104271 66219 infeasible 51 - 484.02235 - 49.9 2250s 104502 66384 579.30590 116 154 - 484.03225 - 49.9 2255s 104806 66516 infeasible 44 - 484.04771 - 49.9 2260s 105206 66833 564.71471 51 173 - 484.05892 - 49.9 2265s 105541 66973 494.70150 35 179 - 484.06846 - 49.9 2270s 105821 67135 514.95975 40 155 - 484.07246 - 49.9 2275s 106053 67253 492.46506 36 188 - 484.08295 - 49.9 2280s 106336 67397 507.44888 44 175 - 484.10075 - 49.9 2285s 106588 67494 500.15406 37 155 - 484.11960 - 49.9 2290s 106804 67593 545.06971 51 143 - 484.12897 - 50.0 2295s 107064 67677 500.63360 45 114 - 484.13911 - 50.0 2300s 107356 67828 501.31167 45 178 - 484.14739 - 50.0 2305s 107740 68071 513.19519 54 181 - 484.15772 - 49.9 2310s 107954 68161 infeasible 51 - 484.15927 - 50.0 2315s 108206 68333 infeasible 116 - 484.16710 - 50.0 2320s 108405 68400 497.92874 48 179 - 484.16907 - 50.0 2325s 108635 68566 563.63183 99 117 - 484.17445 - 50.1 2330s 109103 68884 infeasible 48 - 484.18012 - 50.0 2335s 109338 68959 infeasible 40 - 484.18880 - 50.0 2340s 109587 69060 491.84903 37 159 - 484.19468 - 50.0 2345s 109781 69144 infeasible 46 - 484.19687 - 50.1 2350s 110006 69267 infeasible 35 - 484.20983 - 50.1 2355s 110285 69431 infeasible 44 - 484.21480 - 50.1 2360s 110567 69571 494.12881 48 192 - 484.22050 - 50.1 2365s 110753 69655 infeasible 51 - 484.22235 - 50.2 2370s 110932 69716 infeasible 44 - 484.23337 - 50.2 2375s 111182 69848 infeasible 53 - 484.24285 - 50.2 2380s 111328 69938 570.93203 53 184 - 484.24606 - 50.3 2385s 111646 70180 infeasible 57 - 484.25187 - 50.3 2390s 111919 70364 576.81252 80 119 - 484.25874 - 50.3 2395s 112297 70661 686.37312 170 109 - 484.26508 - 50.3 2400s 112629 70921 502.06574 52 142 - 484.26614 - 50.2 2405s 112970 71213 740.03300 232 82 - 484.26746 - 50.2 2410s 113224 71410 615.76214 102 134 - 484.26942 - 50.2 2415s 113631 71722 585.07867 62 181 - 484.27339 - 50.2 2420s 113890 71937 545.96143 49 146 - 484.27845 - 50.2 2425s 114672 72615 546.12498 41 189 - 484.28270 - 50.0 2430s 115255 73188 709.18567 440 72 - 484.28270 - 49.8 2435s 115619 73445 infeasible 58 - 484.29070 - 49.8 2440s 115812 73512 infeasible 44 - 484.30124 - 49.8 2445s 116052 73708 488.51025 43 152 - 484.30528 - 49.9 2450s 116333 73833 infeasible 62 - 484.31073 - 49.9 2455s 116548 73944 514.32886 49 140 - 484.32106 - 49.9 2460s 116885 74175 489.91459 35 178 - 484.32839 - 49.9 2465s 117489 74690 infeasible 49 - 484.33072 - 49.8 2470s 117709 74800 infeasible 44 - 484.33854 - 49.8 2475s 117952 74985 560.56952 107 123 - 484.34372 - 49.8 2480s 118210 75085 494.77238 44 162 - 484.35311 - 49.9 2485s 118390 75243 654.09486 144 96 - 484.35540 - 49.9 2490s 118640 75435 560.43604 51 161 - 484.36157 - 49.9 2495s 119083 75849 763.42647 329 81 - 484.36157 - 49.9 2500s 119454 76110 494.28530 44 198 - 484.36278 - 49.8 2505s 119690 76220 539.05413 38 156 - 484.38244 - 49.9 2510s 119882 76402 infeasible 146 - 484.38244 - 49.9 2515s 120016 76460 infeasible 41 - 484.38400 - 50.0 2520s 120282 76606 586.11370 68 100 - 484.38909 - 50.0 2525s 120944 77230 546.51476 69 145 - 484.39216 - 49.8 2530s 121332 77491 infeasible 45 - 484.40721 - 49.8 2535s 121539 77568 infeasible 37 - 484.41130 - 49.8 2540s 121719 77724 600.69918 107 111 - 484.41460 - 49.9 2545s 121955 77864 497.70795 55 183 - 484.41489 - 49.9 2550s 122159 77938 infeasible 67 - 484.42013 - 50.0 2555s 122456 78207 641.41512 206 75 - 484.42372 - 49.9 2560s 122899 78650 855.66805 466 57 - 484.42372 - 49.8 2565s 123371 78969 484.60649 42 174 - 484.43029 - 49.8 2570s 123628 79147 573.53926 92 130 - 484.43560 - 49.8 2575s 124003 79407 489.21147 44 154 - 484.43906 - 49.8 2580s 124234 79568 504.00982 49 142 - 484.44259 - 49.8 2585s 124544 79701 529.29526 39 187 - 484.45160 - 49.8 2590s 124661 79816 653.18237 127 93 - 484.45160 - 49.9 2595s 124833 79988 714.98731 269 72 - 484.45160 - 49.9 2600s 125267 80320 542.81659 45 148 - 484.46438 - 49.9 2605s 125631 80618 infeasible 56 - 484.46793 - 49.8 2610s 125984 80854 496.96654 46 180 - 484.47863 - 49.8 2615s 126252 81000 550.14383 55 173 - 484.48577 - 49.8 2620s 126626 81297 493.59973 38 184 - 484.49015 - 49.8 2625s 126792 81425 584.70125 81 152 - 484.49217 - 49.8 2630s 127224 81666 infeasible 49 - 484.49303 - 49.8 2635s 127612 81884 584.89547 66 152 - 484.50716 - 49.7 2640s 127958 82128 574.68580 70 144 - 484.51094 - 49.7 2645s 128261 82393 589.41655 72 120 - 484.51300 - 49.7 2650s 128593 82587 infeasible 43 - 484.52159 - 49.7 2655s 128857 82723 555.60212 65 174 - 484.52582 - 49.7 2660s 129327 83181 695.77253 403 47 - 484.52711 - 49.6 2665s 129705 83404 534.03397 37 197 - 484.53566 - 49.6 2670s 130076 83683 536.17870 45 177 - 484.53751 - 49.6 2675s 130308 83859 533.58302 37 211 - 484.54172 - 49.6 2680s 130506 83971 506.29472 67 174 - 484.54773 - 49.7 2685s 130865 84195 infeasible 48 - 484.55903 - 49.6 2690s 131105 84283 infeasible 53 - 484.56662 - 49.6 2695s 131332 84380 infeasible 56 - 484.57563 - 49.7 2700s 131662 84593 infeasible 51 - 484.58504 - 49.6 2705s 132020 84758 infeasible 48 - 484.60190 - 49.6 2710s 132563 85212 740.43708 250 62 - 484.60930 - 49.5 2715s 132933 85505 infeasible 49 - 484.61767 - 49.4 2720s 133303 85714 532.20101 43 166 - 484.63184 - 49.4 2725s 133722 85998 485.85356 37 169 - 484.64098 - 49.4 2730s 133927 86106 540.39444 44 195 - 484.64737 - 49.4 2735s 134403 86470 infeasible 50 - 484.65022 - 49.3 2740s 134744 86746 567.75176 100 146 - 484.65769 - 49.3 2745s 135152 87073 569.84621 108 126 - 484.66352 - 49.3 2750s 135635 87435 infeasible 49 - 484.67178 - 49.2 2755s 135933 87564 infeasible 47 - 484.68381 - 49.2 2760s 136253 87739 534.29517 43 152 - 484.68789 - 49.2 2765s 136437 87823 495.47798 52 156 - 484.69344 - 49.3 2770s 136695 88005 infeasible 108 - 484.70285 - 49.3 2775s 137242 88438 938.99975 416 37 - 484.70285 - 49.2 2780s 137561 88618 496.77349 46 185 - 484.71577 - 49.2 2785s 137713 88716 558.68565 53 144 - 484.71852 - 49.3 2790s 138156 89108 485.37947 34 157 - 484.72152 - 49.2 2795s 138450 89264 503.39054 41 202 - 484.72689 - 49.2 2800s 138662 89360 569.05784 47 167 - 484.73465 - 49.2 2805s 138994 89601 490.97545 42 207 - 484.74161 - 49.2 2810s 139208 89689 infeasible 53 - 484.74776 - 49.3 2815s 139427 89818 infeasible 64 - 484.75106 - 49.3 2820s 139643 89922 infeasible 53 - 484.75919 - 49.3 2825s 139915 90085 544.97394 45 177 - 484.76608 - 49.4 2830s 140136 90184 infeasible 44 - 484.77521 - 49.4 2835s 140446 90390 557.88295 81 153 - 484.78532 - 49.4 2840s 140668 90486 556.34679 41 160 - 484.79141 - 49.4 2845s 141090 90811 539.08022 50 179 - 484.79709 - 49.4 2850s 141527 91161 500.86134 56 155 - 484.80156 - 49.3 2855s 141825 91326 597.75252 87 129 - 484.81074 - 49.3 2860s 142313 91691 587.13120 103 135 - 484.82133 - 49.3 2865s 142616 91856 493.09702 41 178 - 484.83026 - 49.3 2870s 142881 92005 550.81256 83 112 - 484.83566 - 49.3 2875s 143371 92422 infeasible 41 - 484.83933 - 49.2 2880s 143593 92582 infeasible 48 - 484.84052 - 49.2 2885s 143910 92795 infeasible 43 - 484.84275 - 49.2 2890s 144214 92969 521.86209 43 147 - 484.85112 - 49.2 2895s 144530 93209 496.03547 45 151 - 484.85572 - 49.2 2900s 144744 93393 691.93018 135 101 - 484.85748 - 49.2 2905s 145058 93625 881.62160 280 101 - 484.85748 - 49.2 2910s 145313 93720 infeasible 42 - 484.86358 - 49.3 2915s 145522 93825 infeasible 53 - 484.86991 - 49.3 2920s 145709 93966 infeasible 45 - 484.87099 - 49.4 2925s 145905 94070 544.88296 50 129 - 484.87290 - 49.4 2930s 146220 94237 539.63621 49 158 - 484.88354 - 49.4 2935s 146487 94381 494.11761 38 131 - 484.89288 - 49.4 2940s 146762 94522 520.89510 36 188 - 484.89873 - 49.4 2945s 146977 94614 494.53775 46 135 - 484.90449 - 49.4 2950s 147270 94794 487.71513 31 180 - 484.90810 - 49.4 2955s 147781 95289 738.21030 347 62 - 484.90810 - 49.3 2960s 148247 95601 infeasible 55 - 484.91998 - 49.3 2965s 148448 95766 607.21735 129 85 - 484.92235 - 49.3 2970s 149009 96283 564.29282 78 139 - 484.92278 - 49.2 2975s 149430 96541 491.51375 42 177 - 484.93194 - 49.2 2980s 149700 96706 496.38541 34 195 - 484.94143 - 49.2 2985s 150106 96994 infeasible 52 - 484.94824 - 49.1 2990s 150413 97202 489.69763 45 181 - 484.95301 - 49.1 2995s 150681 97364 535.61119 55 171 - 484.96092 - 49.2 3000s 151194 97791 infeasible 48 - 484.96255 - 49.1 3005s 151549 97989 534.81135 47 94 - 484.98243 - 49.1 3010s 151763 98083 infeasible 46 - 484.99278 - 49.1 3015s 152057 98304 infeasible 46 - 484.99475 - 49.1 3020s 152374 98494 infeasible 66 - 485.00280 - 49.1 3025s 152639 98615 495.03661 37 186 - 485.01107 - 49.1 3030s 153022 98898 557.20517 55 198 - 485.01473 - 49.1 3035s 153152 98964 infeasible 48 - 485.02268 - 49.1 3040s 153389 99077 499.96283 47 156 - 485.02982 - 49.1 3045s 153648 99225 491.15756 48 187 - 485.04021 - 49.1 3050s 154022 99506 574.24039 68 143 - 485.04425 - 49.1 3055s 154393 99697 542.97344 48 179 - 485.05854 - 49.1 3060s 154665 99808 infeasible 47 - 485.06118 - 49.1 3065s 154931 99950 488.06967 38 155 - 485.06967 - 49.1 3070s 155255 100130 infeasible 65 - 485.07325 - 49.1 3075s 155588 100455 688.86110 240 83 - 485.07331 - 49.1 3080s 156167 100899 infeasible 40 - 485.07700 - 49.0 3085s 156409 101006 494.41919 45 181 - 485.08226 - 49.0 3090s 156698 101243 539.17466 51 173 - 485.08458 - 49.0 3095s 157063 101456 infeasible 55 - 485.08918 - 49.0 3100s 157383 101713 630.26134 99 118 - 485.09251 - 49.0 3105s 157974 102177 492.86034 33 191 - 485.09921 - 48.9 3110s 158176 102325 485.86933 32 211 - 485.10466 - 49.0 3115s 158448 102521 infeasible 47 - 485.10605 - 49.0 3120s 158705 102642 infeasible 55 - 485.11230 - 49.0 3125s 158957 102755 574.64351 51 179 - 485.11614 - 49.0 3130s 159528 103266 492.35829 47 154 - 485.11654 - 48.9 3135s 160035 103603 infeasible 46 - 485.12597 - 48.9 3140s 160260 103692 528.74713 44 187 - 485.13659 - 48.9 3145s 160438 103784 502.11797 33 162 - 485.14629 - 48.9 3150s 160698 103924 503.67100 49 163 - 485.15300 - 48.9 3155s 161147 104253 548.32370 50 185 - 485.15582 - 48.9 3160s 161510 104571 485.23967 33 206 - 485.15598 - 48.9 3165s 161758 104670 infeasible 49 - 485.15927 - 48.9 3170s 161934 104710 489.26986 50 158 - 485.16237 - 48.9 3175s 162235 104929 509.62274 72 174 - 485.16692 - 48.9 3180s 162434 105042 infeasible 35 - 485.17116 - 49.0 3185s 162680 105164 546.81686 45 144 - 485.18012 - 49.0 3190s 163042 105322 infeasible 50 - 485.18220 - 48.9 3195s 163305 105569 628.59658 208 113 - 485.18422 - 48.9 3200s 163844 105963 493.12465 35 182 - 485.18880 - 48.9 3205s 164221 106165 503.64420 62 161 - 485.19716 - 48.8 3210s 164562 106324 486.47797 35 194 - 485.21238 - 48.8 3215s 164752 106456 565.35926 95 140 - 485.21575 - 48.8 3220s 165408 107039 1001.50689 481 49 - 485.21575 - 48.7 3225s 165716 107228 618.28153 137 138 - 485.21738 - 48.7 3230s 166029 107399 551.17594 58 139 - 485.22069 - 48.7 3235s 166321 107665 696.24705 219 94 - 485.22276 - 48.7 3240s 166937 108145 513.56436 38 188 - 485.22846 - 48.7 3245s 167317 108360 infeasible 55 - 485.23705 - 48.6 3250s 167545 108466 infeasible 46 - 485.24285 - 48.7 3255s 167767 108548 564.69999 55 190 - 485.25265 - 48.7 3260s 168013 108676 532.81573 53 166 - 485.25972 - 48.7 3265s 168241 108848 687.76791 126 74 - 485.26202 - 48.7 3270s 168911 109374 618.53179 104 123 - 485.26327 - 48.6 3275s 169165 109522 548.41735 47 171 - 485.26772 - 48.6 3280s 169398 109700 549.85016 47 114 - 485.27097 - 48.7 3285s 169715 109908 589.06054 43 156 - 485.27616 - 48.7 3290s 170427 110530 561.70073 76 117 - 485.27780 - 48.5 3295s 170705 110710 540.04585 34 197 - 485.28150 - 48.6 3300s 170907 110867 603.72400 38 160 - 485.28516 - 48.6 3305s 171343 111200 infeasible 46 - 485.28820 - 48.6 3310s 171557 111300 infeasible 63 - 485.29250 - 48.6 3315s 171941 111579 610.65680 54 199 - 485.29873 - 48.6 3320s 172529 112143 788.22377 464 48 - 485.29873 - 48.5 3325s 172962 112453 757.33871 154 96 - 485.30556 - 48.4 3330s 173408 112713 598.01927 92 168 - 485.30710 - 48.4 3335s 173628 112905 infeasible 50 - 485.30736 - 48.4 3340s 173852 112989 infeasible 52 - 485.31073 - 48.4 3345s 174146 113155 infeasible 56 - 485.31795 - 48.4 3350s 174337 113246 545.96238 46 136 - 485.32013 - 48.5 3355s 174689 113518 601.04543 51 177 - 485.32305 - 48.4 3360s 175315 114009 498.67355 48 165 - 485.33735 - 48.3 3365s 175581 114171 552.11902 55 146 - 485.34205 - 48.4 3370s 175983 114438 490.56354 38 163 - 485.35076 - 48.3 3375s 176280 114621 551.52418 63 143 - 485.35722 - 48.3 3380s 176548 114799 488.65911 36 174 - 485.36377 - 48.3 3385s 176856 114995 infeasible 42 - 485.36724 - 48.4 3390s 177181 115194 511.50824 50 128 - 485.36870 - 48.3 3395s 177492 115361 infeasible 39 - 485.37392 - 48.3 3400s 177768 115530 infeasible 49 - 485.38198 - 48.3 3405s 178000 115710 494.12588 45 164 - 485.38400 - 48.4 3410s 178370 115859 488.44108 40 188 - 485.38861 - 48.4 3415s 178771 116160 533.84324 90 132 - 485.39272 - 48.3 3420s 179147 116427 534.00587 53 192 - 485.39877 - 48.3 3425s 179483 116658 498.73172 48 173 - 485.40198 - 48.3 3430s 179797 116844 577.00803 62 164 - 485.41279 - 48.3 3435s 180145 117033 534.96017 38 148 - 485.43560 - 48.3 3440s 180419 117153 504.09515 43 164 - 485.44274 - 48.3 3445s 180804 117386 infeasible 54 - 485.45654 - 48.3 3450s 181159 117665 601.69651 49 154 - 485.45952 - 48.3 3455s 181449 117813 489.66617 47 165 - 485.47109 - 48.3 3460s 181812 118033 498.37366 45 166 - 485.47515 - 48.2 3465s 182004 118150 569.95477 43 182 - 485.47743 - 48.3 3470s 182251 118315 512.23299 44 140 - 485.48577 - 48.3 3475s 182457 118451 517.33369 45 151 - 485.48676 - 48.3 3480s 182856 118814 610.87224 139 95 - 485.48676 - 48.3 3485s 183271 119127 493.00491 39 168 - 485.49199 - 48.3 3490s 183575 119228 535.62987 42 165 - 485.49303 - 48.3 3495s 183800 119323 infeasible 47 - 485.49517 - 48.3 3500s 184130 119544 561.77728 66 135 - 485.50080 - 48.3 3505s 184870 120176 509.12609 88 162 - 485.50153 - 48.2 3510s 185145 120295 infeasible 40 - 485.51019 - 48.2 3515s 185366 120392 531.89543 43 128 - 485.51854 - 48.2 3520s 185645 120549 486.06696 40 195 - 485.52459 - 48.2 3525s 185937 120756 551.49241 42 177 - 485.52905 - 48.2 3530s 186120 120813 infeasible 42 - 485.53221 - 48.2 3535s 186392 121011 670.63315 144 110 - 485.53534 - 48.2 3540s 186627 121072 infeasible 53 - 485.53951 - 48.3 3545s 186843 121154 infeasible 48 - 485.54368 - 48.3 3550s 187113 121332 603.57092 122 131 - 485.54621 - 48.3 3555s 187760 121846 498.17519 45 192 - 485.54709 - 48.2 3560s 188014 121980 infeasible 40 - 485.55478 - 48.2 3565s 188195 122079 537.00643 40 172 - 485.55708 - 48.3 3570s 188504 122289 infeasible 43 - 485.56097 - 48.3 3575s 189041 122781 841.41332 341 58 - 485.56118 - 48.2 3580s 189487 123098 infeasible 49 - 485.56369 - 48.2 3585s 189727 123192 547.76668 46 196 - 485.56561 - 48.2 3590s 189935 123288 494.72198 45 186 - 485.57069 - 48.2 3595s Cutting planes: Learned: 70 Gomory: 50 Cover: 263 Implied bound: 21 Clique: 14 MIR: 584 GUB cover: 32 Zero half: 156 Explored 190126 nodes (9179520 simplex iterations) in 3600.00 seconds Thread count was 1 (of 16 available processors) Time limit reached Best objective -, best bound 4.860000000000e+02, gap -