0.00/0.00 c SCIP version 1.2.1.3 [precision: 8 byte] [memory: block] [mode: optimized] [LP solver: Clp 1.11.1]
0.00/0.00 c Copyright (c) 2002-2010 Konrad-Zuse-Zentrum fuer Informationstechnik Berlin (ZIB)
0.00/0.00 c
0.00/0.00 c user parameter file <scip.set> not found - using default parameters
0.00/0.00 c reading problem <HOME/instance-2705036-1278574753.wbo>
0.00/0.05 c original problem has 5005 variables (3959 bin, 0 int, 1046 impl, 0 cont) and 4152 constraints
0.00/0.05 c problem read
0.00/0.05 c presolving settings loaded
0.06/0.07 c presolving:
0.06/0.08 c (round 1) 27 del vars, 1 del conss, 0 chg bounds, 514 chg sides, 1028 chg coeffs, 0 upgd conss, 5734 impls, 0 clqs
0.06/0.08 c (round 2) 27 del vars, 55 del conss, 0 chg bounds, 514 chg sides, 1028 chg coeffs, 0 upgd conss, 5734 impls, 0 clqs
0.06/0.09 c (round 3) 27 del vars, 55 del conss, 1046 chg bounds, 514 chg sides, 1028 chg coeffs, 0 upgd conss, 5734 impls, 0 clqs
0.09/0.12 c (round 4) 27 del vars, 55 del conss, 1046 chg bounds, 514 chg sides, 1028 chg coeffs, 2005 upgd conss, 7554 impls, 0 clqs
0.09/0.14 c (round 5) 27 del vars, 55 del conss, 1046 chg bounds, 514 chg sides, 1039 chg coeffs, 2006 upgd conss, 7992 impls, 0 clqs
0.09/0.15 c (round 6) 27 del vars, 55 del conss, 1046 chg bounds, 536 chg sides, 1104 chg coeffs, 2006 upgd conss, 7996 impls, 19 clqs
0.09/0.16 c (round 7) 27 del vars, 64 del conss, 1046 chg bounds, 536 chg sides, 1104 chg coeffs, 2006 upgd conss, 7996 impls, 19 clqs
0.19/0.20 c (0.2s) probing: 102/3932 (2.6%) - 0 fixings, 0 aggregations, 1 implications, 0 bound changes
0.19/0.20 c (0.2s) probing aborted: 100/100 successive totally useless probings
0.19/0.20 c presolving (8 rounds):
0.19/0.20 c 27 deleted vars, 64 deleted constraints, 1046 tightened bounds, 0 added holes, 536 changed sides, 1104 changed coefficients
0.19/0.20 c 7998 implications, 19 cliques
0.19/0.20 c presolved problem has 4978 variables (3932 bin, 0 int, 1046 impl, 0 cont) and 4110 constraints
0.19/0.20 c 1 constraints of type <varbound>
0.19/0.20 c 574 constraints of type <knapsack>
0.19/0.20 c 964 constraints of type <setppc>
0.19/0.20 c 1045 constraints of type <linear>
0.19/0.20 c 1046 constraints of type <indicator>
0.19/0.20 c 480 constraints of type <logicor>
0.19/0.20 c transformed objective value is always integral (scale: 1)
0.19/0.20 c Presolving Time: 0.13
0.19/0.20 c - non default parameters ----------------------------------------------------------------------
0.19/0.20 c # SCIP version 1.2.1.3
0.19/0.20 c
0.19/0.20 c # frequency for displaying node information lines
0.19/0.20 c # [type: int, range: [-1,2147483647], default: 100]
0.19/0.20 c display/freq = 10000
0.19/0.20 c
0.19/0.20 c # maximal time in seconds to run
0.19/0.20 c # [type: real, range: [0,1.79769313486232e+308], default: 1e+20]
0.19/0.20 c limits/time = 1789.96
0.19/0.20 c
0.19/0.20 c # maximal memory usage in MB; reported memory usage is lower than real memory usage!
0.19/0.20 c # [type: real, range: [0,1.79769313486232e+308], default: 1e+20]
0.19/0.20 c limits/memory = 3420
0.19/0.20 c
0.19/0.20 c # default clock type (1: CPU user seconds, 2: wall clock time)
0.19/0.20 c # [type: int, range: [1,2], default: 1]
0.19/0.20 c timing/clocktype = 2
0.19/0.20 c
0.19/0.20 c # should presolving try to simplify inequalities
0.19/0.20 c # [type: bool, range: {TRUE,FALSE}, default: FALSE]
0.19/0.20 c constraints/linear/simplifyinequalities = TRUE
0.19/0.20 c
0.19/0.20 c # add initial coupling inequalities as linear constraints, if 'addCoupling' is true
0.19/0.20 c # [type: bool, range: {TRUE,FALSE}, default: FALSE]
0.19/0.20 c constraints/indicator/addCouplingCons = TRUE
0.19/0.20 c
0.19/0.20 c # should presolving try to simplify knapsacks
0.19/0.20 c # [type: bool, range: {TRUE,FALSE}, default: FALSE]
0.19/0.20 c constraints/knapsack/simplifyinequalities = TRUE
0.19/0.20 c
0.19/0.20 c # frequency for calling separator <rapidlearning> (-1: never, 0: only in root node)
0.19/0.20 c # [type: int, range: [-1,2147483647], default: -1]
0.19/0.20 c separating/rapidlearning/freq = 0
0.19/0.20 c
0.19/0.20 c -----------------------------------------------------------------------------------------------
0.19/0.20 c start solving
0.19/0.20 c
0.19/0.22 c time | node | left |LP iter|LP it/n| mem |mdpt |frac |vars |cons |cols |rows |cuts |confs|strbr| dualbound | primalbound | gap
0.19/0.22 c 0.2s| 1 | 0 | 320 | - | 19M| 0 | 254 |4978 |4110 |4978 |2018 | 0 | 0 | 0 | 0.000000e+00 | -- | Inf
0.49/0.54 c 0.5s| 1 | 0 | 606 | - | 20M| 0 | 464 |4978 |4110 |4978 |2253 | 235 | 0 | 0 | 0.000000e+00 | -- | Inf
0.79/0.83 c 0.8s| 1 | 0 | 914 | - | 20M| 0 | 548 |4978 |4110 |4978 |2402 | 384 | 0 | 0 | 0.000000e+00 | -- | Inf
1.00/1.06 c 1.0s| 1 | 0 | 1111 | - | 20M| 0 | 670 |4978 |4110 |4978 |2590 | 572 | 0 | 0 | 0.000000e+00 | -- | Inf
1.29/1.36 c 1.3s| 1 | 0 | 1468 | - | 21M| 0 | 765 |4978 |4110 |4978 |2772 | 754 | 0 | 0 | 0.000000e+00 | -- | Inf
1.69/1.77 c 1.7s| 1 | 0 | 1925 | - | 21M| 0 | 874 |4978 |4110 |4978 |2935 | 917 | 0 | 0 | 0.000000e+00 | -- | Inf
2.29/2.33 c 2.3s| 1 | 0 | 2614 | - | 21M| 0 | 983 |4978 |4110 |4978 |3093 |1075 | 0 | 0 | 0.000000e+00 | -- | Inf
2.59/2.67 c 2.6s| 1 | 2 | 2614 | - | 21M| 0 | 983 |4978 |4110 |4978 |3093 |1075 | 0 | 17 | 0.000000e+00 | -- | Inf
169.49/169.58 c 170s| 10000 | 9958 |395244 | 39.3 | 47M| 399 | 155 |4978 |4518 |4978 |2926 |1075 | 417 |5604 | 0.000000e+00 | -- | Inf
205.29/205.33 o 52306
205.29/205.33 c y 205s| 17845 | 17792 |451710 | 25.2 | 66M| 561 | - |4978 |4474 | 0 | 0 |1098 | 432 |6733 | 0.000000e+00 | 5.230600e+04 | Inf
210.19/210.21 o 52262
210.19/210.21 c y 210s| 19336 | 19283 |455914 | 23.4 | 69M| 617 | - |4978 |4473 | 0 | 0 |1191 | 432 |6925 | 0.000000e+00 | 5.226200e+04 | Inf
212.09/212.11 c 212s| 20000 | 19949 |456988 | 22.7 | 71M| 701 | 0 |4978 |4473 |4978 |2951 |1240 | 432 |6942 | 0.000000e+00 | 5.226200e+04 | Inf
238.09/238.18 c 238s| 30000 | 29942 |465040 | 15.4 | 97M| 815 | 44 |4978 |4481 |4978 |2926 |1842 | 442 |6999 | 0.000000e+00 | 5.226200e+04 | Inf
264.59/264.69 c 265s| 40000 | 39944 |477217 | 11.9 | 123M| 815 | 227 |4978 |4476 |4978 |2926 |2458 | 442 |7049 | 0.000000e+00 | 5.226200e+04 | Inf
292.60/292.68 c 293s| 50000 | 49942 |489557 | 9.7 | 149M| 815 | 0 |4978 |4474 |4978 |2950 |3066 | 444 |7444 | 0.000000e+00 | 5.226200e+04 | Inf
322.30/322.36 c time | node | left |LP iter|LP it/n| mem |mdpt |frac |vars |cons |cols |rows |cuts |confs|strbr| dualbound | primalbound | gap
322.30/322.36 c 322s| 60000 | 59935 |508098 | 8.4 | 174M| 815 | 0 |4978 |4465 |4978 |2951 |3673 | 458 |8099 | 0.000000e+00 | 5.226200e+04 | Inf
351.69/351.79 c 352s| 70000 | 69927 |531856 | 7.6 | 198M| 815 | 52 |4978 |4460 |4978 |2926 |4287 | 464 |8576 | 0.000000e+00 | 5.226200e+04 | Inf
379.99/380.03 c 380s| 80000 | 79924 |553406 | 6.9 | 222M| 815 | 0 |4978 |4461 |4978 |2950 |4835 | 470 |8787 | 0.000000e+00 | 5.226200e+04 | Inf
406.50/406.59 c 407s| 90000 | 89924 |563779 | 6.2 | 246M| 815 | 28 |4978 |4459 |4978 |2926 |5581 | 470 |8829 | 0.000000e+00 | 5.226200e+04 | Inf
434.30/434.39 c 434s|100000 | 99924 |582917 | 5.8 | 270M| 815 | 95 |4978 |4454 |4978 |2926 |6210 | 470 |8935 | 0.000000e+00 | 5.226200e+04 | Inf
464.59/464.68 c 465s|110000 |109915 |604693 | 5.5 | 294M| 815 | 0 |4978 |4452 |4978 |2951 |6971 | 477 |9550 | 0.000000e+00 | 5.226200e+04 | Inf
492.89/492.94 c 493s|120000 |119915 |614566 | 5.1 | 318M| 815 | 142 |4978 |4448 |4978 |2926 |8127 | 477 |9867 | 0.000000e+00 | 5.226200e+04 | Inf
521.50/521.51 c 521s|130000 |129909 |629673 | 4.8 | 342M| 815 | 0 |4978 |4448 |4978 |2952 |9230 | 488 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
549.40/549.46 c 549s|140000 |139895 |645196 | 4.6 | 367M| 815 | 0 |4978 |4452 |4978 |2951 |9471 | 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
575.59/575.68 c 576s|150000 |149895 |646480 | 4.3 | 391M| 815 | 0 |4978 |4450 |4978 |2951 |9471 | 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
602.00/602.01 c 602s|160000 |159895 |648440 | 4.0 | 415M| 815 | 0 |4978 |4450 |4978 |2952 |9845 | 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
628.60/628.69 c 629s|170000 |169895 |651663 | 3.8 | 439M| 815 | 0 |4978 |4450 |4978 |2951 | 10k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
655.40/655.43 c 655s|180000 |179895 |654908 | 3.6 | 464M| 815 | 0 |4978 |4450 |4978 |2952 | 12k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
681.60/681.68 c 682s|190000 |189895 |656306 | 3.4 | 488M| 815 | 0 |4978 |4450 |4978 |2951 | 12k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
707.80/707.88 c 708s|200000 |199895 |657650 | 3.3 | 512M| 815 | 0 |4978 |4450 |4978 |2952 | 12k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
734.50/734.55 c time | node | left |LP iter|LP it/n| mem |mdpt |frac |vars |cons |cols |rows |cuts |confs|strbr| dualbound | primalbound | gap
734.50/734.55 c 735s|210000 |209895 |660757 | 3.1 | 536M| 815 | 0 |4978 |4450 |4978 |2952 | 13k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
761.31/761.30 c 761s|220000 |219895 |664175 | 3.0 | 561M| 815 | 0 |4978 |4450 |4978 |2952 | 14k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
788.11/788.15 c 788s|230000 |229895 |667577 | 2.9 | 585M| 815 | 0 |4978 |4450 |4978 |2951 | 15k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
814.81/814.86 c 815s|240000 |239895 |670850 | 2.8 | 609M| 815 | 0 |4978 |4450 |4978 |2951 | 16k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
841.31/841.35 c 841s|250000 |249895 |673319 | 2.7 | 634M| 815 | 0 |4978 |4450 |4978 |2952 | 17k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
867.60/867.65 c 868s|260000 |259895 |674681 | 2.6 | 658M| 815 | 0 |4978 |4450 |4978 |2951 | 17k| 501 | 10k| 0.000000e+00 | 5.226200e+04 | Inf
893.90/893.97 c 894s|270000 |269895 |676045 | 2.5 | 682M| 815 | 0 |4978 |4450 |4978 |2951 | 17k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
920.31/920.32 c 920s|280000 |279895 |677440 | 2.4 | 707M| 815 | 0 |4978 |4450 |4978 |2951 | 17k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
946.61/946.61 c 947s|290000 |289895 |678837 | 2.3 | 731M| 815 | 0 |4978 |4450 |4978 |2952 | 17k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
972.81/972.89 c 973s|300000 |299895 |680189 | 2.3 | 755M| 815 | 0 |4978 |4450 |4978 |2951 | 17k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
999.10/999.19 c 999s|310000 |309895 |681545 | 2.2 | 780M| 815 | 0 |4978 |4450 |4978 |2951 | 17k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1025.41/1025.48 c 1025s|320000 |319895 |682993 | 2.1 | 804M| 815 | 0 |4978 |4450 |4978 |2949 | 17k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1052.21/1052.27 c 1052s|330000 |329895 |686474 | 2.1 | 828M| 815 | 0 |4978 |4450 |4978 |2951 | 18k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1078.61/1078.62 c 1079s|340000 |339895 |687974 | 2.0 | 852M| 815 | 0 |4978 |4450 |4978 |2951 | 18k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1105.31/1105.37 c 1105s|350000 |349895 |691198 | 2.0 | 877M| 815 | 0 |4978 |4450 |4978 |2952 | 19k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1131.82/1131.83 c time | node | left |LP iter|LP it/n| mem |mdpt |frac |vars |cons |cols |rows |cuts |confs|strbr| dualbound | primalbound | gap
1131.82/1131.83 c 1132s|360000 |359895 |692916 | 1.9 | 901M| 815 | 0 |4978 |4450 |4978 |2952 | 20k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1158.32/1158.37 c 1158s|370000 |369895 |695206 | 1.9 | 925M| 815 | 0 |4978 |4450 |4978 |2952 | 20k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1184.91/1184.93 c 1185s|380000 |379895 |697571 | 1.8 | 950M| 815 | 0 |4978 |4450 |4978 |2951 | 21k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1211.41/1211.46 c 1211s|390000 |389895 |700005 | 1.8 | 974M| 815 | 0 |4978 |4450 |4978 |2952 | 21k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1238.02/1238.07 c 1238s|400000 |399895 |702421 | 1.7 | 998M| 815 | 0 |4978 |4450 |4978 |2952 | 22k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1264.62/1264.65 c 1265s|410000 |409895 |704920 | 1.7 |1023M| 815 | 0 |4978 |4450 |4978 |2951 | 23k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1291.21/1291.25 c 1291s|420000 |419895 |707411 | 1.7 |1047M| 815 | 0 |4978 |4450 |4978 |2951 | 23k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1317.91/1317.90 c 1318s|430000 |429895 |709826 | 1.6 |1071M| 815 | 0 |4978 |4450 |4978 |2951 | 24k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1344.51/1344.57 c 1345s|440000 |439895 |712277 | 1.6 |1095M| 815 | 0 |4978 |4450 |4978 |2952 | 24k| 501 | 11k| 0.000000e+00 | 5.226200e+04 | Inf
1371.11/1371.19 c 1371s|450000 |449895 |714515 | 1.6 |1120M| 815 | 0 |4978 |4450 |4978 |2951 | 25k| 501 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1397.72/1397.78 c 1398s|460000 |459895 |716852 | 1.6 |1144M| 815 | 0 |4978 |4450 |4978 |2951 | 26k| 501 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1424.42/1424.44 c 1424s|470000 |469895 |719222 | 1.5 |1168M| 815 | 0 |4978 |4450 |4978 |2951 | 26k| 501 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1451.02/1451.06 c 1451s|480000 |479895 |721683 | 1.5 |1193M| 815 | 0 |4978 |4450 |4978 |2951 | 27k| 501 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1477.72/1477.70 c 1478s|490000 |489895 |724177 | 1.5 |1217M| 815 | 0 |4978 |4450 |4978 |2952 | 27k| 501 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1504.12/1504.12 c 1504s|500000 |499895 |725567 | 1.4 |1241M| 815 | 0 |4978 |4450 |4978 |2952 | 27k| 501 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1530.42/1530.47 c time | node | left |LP iter|LP it/n| mem |mdpt |frac |vars |cons |cols |rows |cuts |confs|strbr| dualbound | primalbound | gap
1530.42/1530.47 c 1530s|510000 |509895 |726915 | 1.4 |1266M| 815 | 0 |4978 |4450 |4978 |2951 | 27k| 501 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1557.62/1557.64 c 1558s|520000 |519891 |736061 | 1.4 |1290M| 815 | 0 |4978 |4443 |4978 |2951 | 28k| 503 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1583.93/1583.91 c 1584s|530000 |529891 |737040 | 1.4 |1314M| 815 | 0 |4978 |4443 |4978 |2952 | 28k| 503 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1610.72/1610.75 c 1611s|540000 |539891 |740751 | 1.4 |1339M| 815 | 1 |4978 |4444 |4978 |2951 | 28k| 504 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1637.12/1637.18 c 1637s|550000 |549891 |741409 | 1.3 |1363M| 815 | 0 |4978 |4444 |4978 |2952 | 28k| 504 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1663.52/1663.58 c 1664s|560000 |559891 |742073 | 1.3 |1387M| 815 | 0 |4978 |4444 |4978 |2952 | 28k| 504 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1689.92/1689.93 c 1690s|570000 |569891 |742750 | 1.3 |1411M| 815 | 0 |4978 |4444 |4978 |2951 | 28k| 504 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1716.33/1716.33 c 1716s|580000 |579891 |743436 | 1.3 |1436M| 815 | 0 |4978 |4444 |4978 |2951 | 28k| 504 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1742.72/1742.72 c 1743s|590000 |589891 |744115 | 1.3 |1460M| 815 | 0 |4978 |4444 |4978 |2951 | 28k| 504 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1769.03/1769.07 c 1769s|600000 |599891 |744822 | 1.2 |1484M| 815 | 0 |4978 |4444 |4978 |2952 | 28k| 504 | 12k| 0.000000e+00 | 5.226200e+04 | Inf
1790.02/1790.01 c
1790.02/1790.01 c SCIP Status : solving was interrupted [time limit reached]
1790.02/1790.01 c Solving Time (sec) : 1789.96
1790.02/1790.01 c Solving Nodes : 607948
1790.02/1790.01 c Primal Bound : +5.22620000000000e+04 (107 solutions)
1790.02/1790.01 c Dual Bound : +0.00000000000000e+00
1790.02/1790.01 c Gap : infinite
1790.02/1790.04 s SATISFIABLE
1790.02/1790.04 v -x2913 -x2912 -x2911 -x2910 -x2909 -x2908 -x2907 -x2906 -x2905 -x2904 x2903 x2902 -x2901 x2900 -x2899 -x2898 -x2897 -x2896 -x2895
1790.02/1790.04 v -x2894 -x2893 -x2892 -x2891 x2890 x2889 -x2888 x2887 x2886 -x2885 -x2884 x2883 x2882 -x2881 x2880 x2879 -x2878 x2877 -x2876
1790.02/1790.04 v -x2875 -x2874 -x2873 -x2872 -x2871 -x2870 -x2869 -x2868 x2867 -x2866 x2865 x2864 x2863 x2862 x2861 -x2860 -x2859 x2858 x2857
1790.02/1790.04 v -x2856 -x2855 x2854 x2853 -x2852 -x2851 -x2850 -x2849 -x2848 -x2847 -x2846 -x2845 -x2844 -x2843 -x2842 -x2841 -x2840 -x2839
1790.02/1790.04 v -x2838 -x2837 -x2836 -x2835 -x2834 -x2833 -x2832 -x2831 -x2830 -x2829 -x2828 -x2827 -x2826 -x2825 -x2824 -x2823 -x2822 -x2821
1790.02/1790.04 v -x2820 -x2819 -x2818 -x2817 -x2816 -x2815 -x2814 -x2813 -x2812 -x2811 -x2810 -x2809 -x2808 -x2807 -x2806 -x2805 -x2804 -x2803
1790.02/1790.04 v -x2802 -x2801 -x2800 -x2799 -x2798 -x2797 -x2796 -x2795 x2794 x2793 -x2792 x2791 x2790 x2789 -x2788 -x2787 -x2786 -x2785 -x2784
1790.02/1790.04 v x2783 -x2782 x2781 x2780 -x2779 x2778 x2777 -x2776 -x2775 -x2774 -x2773 -x2772 x2771 -x2770 -x2769 -x2768 -x2767 -x2766
1790.02/1790.04 v -x2765 -x2764 -x2763 -x2762 -x2761 -x2760 -x2759 -x2758 -x2757 -x2756 -x2755 x2754 x2753 x2752 x2751 x2750 x2749 x2748 x2747
1790.02/1790.04 v x2746 x2745 x2744 x2743 -x2742 x2741 x2740 x2739 x2738 x2737 x2736 x2735 x2734 x2733 -x2732 -x2731 -x2730 -x2729 x2728 -x2727
1790.02/1790.04 v x2726 -x2725 -x2724 -x2723 x2722 -x2721 -x2720 -x2719 -x2718 -x2717 -x2716 -x2715 -x2714 -x2713 -x2712 -x2711 -x2710 x2709
1790.02/1790.04 v x2708 -x2707 -x2706 -x2705 -x2704 -x2703 -x2702 x2701 x2700 x2699 x2698 -x2697 -x2696 -x2695 -x2694 -x2693 -x2692 -x2691 -x2690
1790.02/1790.04 v -x2689 -x2688 -x2687 -x2686 -x2685 -x2684 -x2683 -x2682 -x2681 -x2680 -x2679 -x2678 -x2677 -x2676 -x2675 -x2674 -x2673 -x2672
1790.02/1790.04 v -x2671 -x2670 -x2669 -x2668 -x2667 x2666 x2665 -x2664 -x2663 -x2662 -x2661 -x2660 -x2659 -x2658 -x2657 -x2656 -x2655 -x2654
1790.02/1790.04 v -x2653 -x2652 -x2651 -x2650 -x2649 -x2648 -x2647 x2646 x2645 x2644 x2643 x2642 x2641 x2640 x2639 x2638 x2637 -x2636 -x2635
1790.02/1790.04 v -x2634 x2633 x2632 -x2631 -x2630 x2629 x2628 x2627 -x2626 x2625 x2624 -x2623 x2622 x2621 x2620 -x2619 x2618 -x2617 -x2616 -x2615
1790.02/1790.04 v x2614 -x2613 x2612 x2611 x2610 -x2609 x2608 x2607 x2606 x2605 -x2604 x2603 x2602 -x2601 -x2600 -x2599 -x2598 -x2597 -x2596
1790.02/1790.04 v -x2595 -x2594 -x2593 -x2592 -x2591 -x2590 -x2589 x2588 -x2587 -x2586 -x2585 -x2584 -x2583 -x2582 x2581 x2580 x2579 x2578 -x2577
1790.02/1790.04 v -x2576 -x2575 -x2574 -x2573 -x2572 -x2571 x2570 x2569 x2568 x2567 x2566 -x2565 -x2564 -x2563 -x2562 -x2561 -x2560 -x2559
1790.02/1790.04 v -x2558 -x2557 -x2556 -x2555 -x2554 x2553 -x2552 -x2551 -x2550 -x2549 -x2548 -x2547 -x2546 -x2545 -x2544 x2543 x2542 -x2541
1790.02/1790.04 v -x2540 -x2539 -x2538 x2537 x2536 x2535 x2534 x2533 x2532 x2531 -x2530 -x2529 -x2528 -x2527 -x2526 x2525 -x2524 -x2523 -x2522
1790.02/1790.04 v -x2521 -x2520 -x2519 x2518 -x2517 -x2516 -x2515 -x2514 -x2513 -x2512 -x2511 -x2510 -x2509 -x2508 -x2507 -x2506 x2505 -x2504 -x2503
1790.02/1790.04 v -x2502 -x2501 -x2500 -x2499 -x2498 -x2497 -x2496 -x2495 -x2494 -x2493 -x2492 -x2491 x2490 x2489 x2488 x2487 x2486 x2485
1790.02/1790.04 v x2484 x2483 -x2482 -x2481 -x2480 -x2479 x2478 x2477 x2476 x2475 x2474 x2473 x2472 x2471 x2470 x2469 -x2468 -x2467 x2466 x2465
1790.02/1790.04 v x2464 -x2463 x2462 x2461 x2460 x2459 -x2458 -x2457 -x2456 -x2455 x2454 x2453 x2452 x2451 x2450 -x2449 -x2448 -x2447 x2446 -x2445
1790.02/1790.04 v -x2444 -x2443 x2442 -x2441 x2440 x2439 x2438 x2437 x2436 x2435 x2434 x2433 -x2432 -x2431 -x2430 x2429 x2428 -x2427 -x2426
1790.02/1790.04 v x2425 x2424 -x2423 -x2422 -x2421 x2420 -x2419 -x2418 -x2417 -x2416 -x2415 -x2414 x2413 x2412 -x2411 -x2410 -x2409 -x2408 -x2407
1790.02/1790.04 v -x2406 -x2405 -x2404 -x2403 -x2402 -x2401 -x2400 -x2399 -x2398 x2397 -x2396 -x2395 -x2394 -x2393 -x2392 -x2391 -x2390 -x2389
1790.02/1790.04 v -x2388 -x2387 -x2386 -x2385 -x2384 -x2383 -x2382 -x2381 -x2380 -x2379 -x2378 -x2377 -x2376 -x2375 -x2374 -x2373 -x2372
1790.02/1790.04 v -x2371 -x2370 -x2369 -x2368 -x2367 -x2366 -x2365 -x2364 -x2363 x2362 x2361 x2360 x2359 -x2358 -x2357 -x2356 x2355 x2354 x2353
1790.02/1790.04 v -x2352 x2351 x2350 -x2349 -x2348 -x2347 -x2346 -x2345 -x2344 -x2343 x2342 -x2341 x2340 -x2339 -x2338 x2337 x2336 x2335 x2334
1790.02/1790.04 v x2333 x2332 x2331 x2330 x2329 x2328 x2327 x2326 -x2325 -x2324 -x2323 -x2322 -x2321 -x2320 -x2319 -x2318 -x2317 -x2316 -x2315
1790.02/1790.04 v -x2314 -x2313 -x2312 -x2311 -x2310 -x2309 -x2308 -x2307 -x2306 -x2305 -x2304 -x2303 -x2302 -x2301 -x2300 -x2299 -x2298 -x2297
1790.02/1790.04 v -x2296 -x2295 -x2294 -x2293 -x2292 -x2291 -x2290 -x2289 -x2288 -x2287 -x2286 -x2285 -x2284 -x2283 -x2282 -x2281 -x2280 -x2279
1790.02/1790.04 v -x2278 x2277 -x2276 -x2275 -x2274 -x2273 x2272 -x2271 -x2270 -x2269 -x2268 x2267 x2266 -x2265 -x2264 -x2263 -x2262 -x2261
1790.02/1790.04 v -x2260 -x2259 -x2258 -x2257 x2256 x2255 x2254 -x2253 x2252 -x2251 -x2250 -x2249 -x2248 -x2247 -x2246 -x2245 -x2244 -x2243 x2242
1790.02/1790.04 v x2241 -x2240 -x2239 -x2238 -x2237 -x2236 -x2235 -x2234 -x2233 -x2232 -x2231 -x2230 -x2229 -x2228 -x2227 -x2226 -x2225 -x2224
1790.02/1790.04 v -x2223 -x2222 -x2221 -x2220 -x2219 -x2218 -x2217 -x2216 -x2215 -x2214 -x2213 -x2212 -x2211 -x2210 -x2209 -x2208 -x2207 x2206
1790.02/1790.04 v x2205 -x2204 -x2203 x2202 x2201 x2200 x2199 x2198 x2197 x2196 x2195 -x2194 x2193 -x2192 x2191 x2190 x2189 x2188 x2187 x2186
1790.02/1790.04 v x2185 x2184 x2183 -x2182 x2181 -x2180 -x2179 -x2178 -x2177 -x2176 -x2175 -x2174 -x2173 -x2172 -x2171 x2170 -x2169 -x2168 -x2167
1790.02/1790.04 v -x2166 -x2165 -x2164 -x2163 -x2162 -x2161 -x2160 -x2159 x2158 x2157 -x2156 -x2155 x2154 x2153 x2152 x2151 x2150 x2149 x2148
1790.02/1790.04 v x2147 x2146 x2145 x2144 x2143 x2142 x2141 x2140 x2139 x2138 x2137 x2136 x2135 -x2134 -x2133 -x2132 -x2131 -x2130 x2129 -x2128
1790.02/1790.04 v -x2127 -x2126 -x2125 -x2124 -x2123 -x2122 -x2121 -x2120 -x2119 -x2118 x2117 -x2116 x2115 -x2114 x2113 x2112 x2111 -x2110
1790.02/1790.04 v x2109 x2108 -x2107 -x2106 -x2105 -x2104 -x2103 -x2102 -x2101 -x2100 -x2099 -x2098 -x2097 -x2096 -x2095 x2094 x2093 -x2092 x2091
1790.02/1790.04 v x2090 x2089 x2088 x2087 x2086 x2085 x2084 x2083 -x2082 -x2081 -x2080 -x2079 -x2078 -x2077 -x2076 -x2075 -x2074 x2073 -x2072
1790.02/1790.04 v -x2071 -x2070 -x2069 -x2068 -x2067 -x2066 -x2065 -x2064 -x2063 -x2062 -x2061 x2060 -x2059 -x2058 -x2057 -x2056 -x2055 -x2054
1790.02/1790.04 v -x2053 -x2052 -x2051 -x2050 x2049 -x2048 -x2047 x2046 x2045 -x2044 -x2043 -x2042 -x2041 x2040 -x2039 -x2038 -x2037 -x2036
1790.02/1790.04 v -x2035 x2034 -x2033 -x2032 x2031 -x2030 -x2029 x2028 -x2027 -x2026 -x2025 -x2024 -x2023 -x2022 -x2021 -x2020 x2019 x2018 x2017
1790.02/1790.04 v -x2016 -x2015 -x2014 -x2013 -x2012 -x2011 -x2010 -x2009 -x2008 -x2007 -x2006 -x2005 -x2004 -x2003 -x2002 -x2001 -x2000 -x1999
1790.02/1790.04 v -x1998 -x1997 -x1996 -x1995 -x1994 -x1993 -x1992 -x1991 -x1990 -x1989 -x1988 -x1987 -x1986 -x1985 -x1984 -x1983 -x1982 x1981
1790.02/1790.04 v x1980 x1979 -x1978 x1977 -x1976 -x1975 -x1974 -x1973 -x1972 -x1971 -x1970 -x1969 -x1968 -x1967 x1966 -x1965 -x1964 -x1963
1790.02/1790.04 v -x1962 -x1961 -x1960 -x1959 -x1958 -x1957 -x1956 -x1955 x1954 -x1953 -x1952 -x1951 -x1950 -x1949 -x1948 -x1947 -x1946 -x1945
1790.02/1790.04 v -x1944 -x1943 -x1942 -x1941 -x1940 -x1939 -x1938 -x1937 -x1936 -x1935 -x1934 -x1933 -x1932 -x1931 -x1930 -x1929 -x1928 -x1927
1790.02/1790.04 v -x1926 -x1925 -x1924 -x1923 -x1922 -x1921 -x1920 -x1919 x1918 -x1917 -x1916 -x1915 -x1914 -x1913 x1912 -x1911 -x1910 -x1909
1790.02/1790.04 v -x1908 -x1907 x1906 x1905 -x1904 -x1903 -x1902 x1901 x1900 -x1899 -x1898 -x1897 -x1896 -x1895 -x1894 -x1893 -x1892 -x1891 -x1890
1790.02/1790.04 v -x1889 x1888 -x1887 -x1886 -x1885 -x1884 -x1883 -x1882 -x1881 -x1880 -x1879 -x1878 x1877 x1876 -x1875 -x1874 -x1873 -x1872
1790.02/1790.04 v x1871 -x1870 -x1869 -x1868 -x1867 -x1866 -x1865 -x1864 -x1863 -x1862 -x1861 -x1860 -x1859 -x1858 -x1857 -x1856 -x1855 -x1854
1790.02/1790.04 v -x1853 -x1852 -x1851 -x1850 -x1849 -x1848 x1847 -x1846 -x1845 -x1844 -x1843 -x1842 -x1841 -x1840 -x1839 -x1838 -x1837 -x1836
1790.02/1790.04 v x1835 x1834 x1833 x1832 x1831 x1830 x1829 x1828 -x1827 -x1826 -x1825 -x1824 -x1823 -x1822 x1821 x1820 x1819 x1818 x1817 x1816
1790.02/1790.04 v x1815 x1814 x1813 -x1812 -x1811 -x1810 -x1809 -x1808 -x1807 -x1806 -x1805 -x1804 x1803 -x1802 -x1801 -x1800 -x1799 -x1798
1790.02/1790.04 v -x1797 -x1796 -x1795 -x1794 -x1793 -x1792 x1791 x1790 -x1789 -x1788 x1787 x1786 x1785 x1784 x1783 x1782 x1781 x1780 x1779 x1778
1790.02/1790.04 v x1777 x1776 -x1775 -x1774 -x1773 -x1772 x1771 -x1770 -x1769 -x1768 -x1767 -x1766 -x1765 x1764 -x1763 -x1762 -x1761 -x1760
1790.02/1790.04 v -x1759 -x1758 -x1757 -x1756 -x1755 x1754 x1753 x1752 x1751 x1750 x1749 x1748 -x1747 x1746 -x1745 -x1744 x1743 x1742 x1741 -x1740
1790.02/1790.04 v x1739 -x1738 x1737 x1736 x1735 x1734 x1733 x1732 x1731 x1730 -x1729 -x1728 x1727 -x1726 x1725 x1724 x1723 x1722 x1721 x1720
1790.02/1790.04 v -x1719 x1718 -x1717 -x1716 x1715 -x1714 -x1713 -x1712 -x1711 -x1710 -x1709 -x1708 -x1707 -x1706 -x1705 -x1704 -x1703 -x1702
1790.02/1790.04 v -x1701 -x1700 -x1699 -x1698 -x1697 -x1696 -x1695 -x1694 -x1693 -x1692 -x1691 -x1690 -x1689 -x1688 -x1687 -x1686 -x1685 -x1684
1790.02/1790.04 v -x1683 -x1682 -x1681 -x1680 -x1679 -x1678 -x1677 -x1676 -x1675 -x1674 -x1673 -x1672 -x1671 -x1670 -x1669 -x1668 -x1667 -x1666
1790.02/1790.04 v -x1665 x1664 x1663 x1662 -x1661 x1660 x1659 x1658 x1657 -x1656 -x1655 x1654 x1653 x1652 x1651 x1650 x1649 x1648 x1647 x1646
1790.02/1790.04 v -x1645 x1644 x1643 -x1642 -x1641 -x1640 -x1639 -x1638 -x1637 -x1636 x1635 x1634 -x1633 -x1632 -x1631 -x1630 -x1629 -x1628
1790.02/1790.04 v x1627 x1626 -x1625 -x1624 x1623 x1622 x1621 -x1620 x1619 -x1618 -x1617 -x1616 -x1615 -x1614 -x1613 -x1612 -x1611 -x1610 -x1609
1790.02/1790.04 v x1608 x1607 x1606 x1605 x1604 x1603 -x1602 -x1601 x1600 -x1599 -x1598 -x1597 x1596 -x1595 x1594 x1593 x1592 -x1591 x1590 x1589
1790.02/1790.04 v x1588 x1587 -x1586 x1585 x1584 -x1583 x1582 x1581 x1580 -x1579 x1578 x1577 x1576 x1575 -x1574 x1573 x1572 -x1571 -x1570 -x1569
1790.02/1790.04 v -x1568 -x1567 -x1566 -x1565 -x1564 -x1563 -x1562 -x1561 -x1560 -x1559 -x1558 -x1557 -x1556 -x1555 -x1554 -x1553 -x1552
1790.02/1790.04 v -x1551 -x1550 -x1549 -x1548 x1547 -x1546 -x1545 x1544 x1543 -x1542 -x1541 x1540 x1539 x1538 x1537 x1536 -x1535 -x1534 x1533 x1532
1790.02/1790.04 v x1531 x1530 x1529 -x1528 x1527 -x1526 -x1525 -x1524 -x1523 -x1522 -x1521 x1520 x1519 -x1518 x1517 x1516 x1515 -x1514 x1513
1790.02/1790.04 v x1512 -x1511 -x1510 -x1509 -x1508 -x1507 -x1506 -x1505 -x1504 -x1503 -x1502 -x1501 -x1500 x1499 x1498 x1497 -x1496 -x1495
1790.02/1790.04 v x1494 -x1493 x1492 x1491 x1490 -x1489 -x1488 x1487 -x1486 x1485 -x1484 -x1483 -x1482 -x1481 -x1480 -x1479 x1478 -x1477 -x1476
1790.02/1790.04 v x1475 -x1474 -x1473 x1472 x1471 x1470 x1469 x1468 -x1467 -x1466 -x1465 x1464 x1463 -x1462 -x1461 x1460 x1459 x1458 x1457 x1456
1790.02/1790.04 v -x1455 -x1454 -x1453 x1452 -x1451 x1450 -x1449 x1448 x1447 x1446 -x1445 x1444 x1443 x1442 x1441 -x1440 x1439 -x1438 x1437
1790.02/1790.04 v x1436 x1435 x1434 -x1433 x1432 x1431 x1430 x1429 -x1428 -x1427 -x1426 -x1425 -x1424 -x1423 -x1422 -x1421 -x1420 -x1419 -x1418
1790.02/1790.04 v -x1417 -x1416 x1415 x1414 x1413 x1412 -x1411 -x1410 x1409 x1408 x1407 -x1406 x1405 x1404 -x1403 -x1402 -x1401 -x1400 -x1399
1790.02/1790.04 v -x1398 -x1397 -x1396 -x1395 -x1394 -x1393 -x1392 x1391 x1390 -x1389 -x1388 x1387 x1386 x1385 x1384 x1383 x1382 x1381 -x1380 -x1379
1790.02/1790.04 v -x1378 -x1377 -x1376 -x1375 -x1374 -x1373 -x1372 -x1371 -x1370 -x1369 x1368 -x1367 -x1366 -x1365 x1364 -x1363 x1362 x1361
1790.02/1790.04 v x1360 x1359 x1358 x1357 x1356 x1355 -x1354 -x1353 -x1352 -x1351 -x1350 -x1349 -x1348 -x1347 -x1346 -x1345 -x1344 -x1343 -x1342
1790.02/1790.04 v -x1341 x1340 x1339 x1338 x1337 x1336 x1335 x1334 x1333 x1332 -x1331 -x1330 -x1329 -x1328 -x1327 -x1326 -x1325 -x1324 -x1323
1790.02/1790.04 v -x1322 -x1321 x1320 -x1319 -x1318 -x1317 -x1316 -x1315 -x1314 -x1313 -x1312 -x1311 -x1310 -x1309 -x1308 -x1307 -x1306 -x1305
1790.02/1790.04 v x1304 x1303 x1302 x1301 x1300 x1299 x1298 x1297 x1296 -x1295 -x1294 -x1293 -x1292 -x1291 -x1290 -x1289 -x1288 -x1287 -x1286
1790.02/1790.04 v -x1285 x1284 x1283 -x1282 x1281 -x1280 -x1279 -x1278 x1277 -x1276 -x1275 -x1274 -x1273 -x1272 x1271 -x1270 -x1269 -x1268 -x1267
1790.02/1790.04 v -x1266 -x1265 -x1264 -x1263 -x1262 -x1261 -x1260 -x1259 -x1258 -x1257 -x1256 -x1255 -x1254 -x1253 -x1252 -x1251 -x1250
1790.02/1790.04 v -x1249 -x1248 -x1247 -x1246 -x1245 -x1244 -x1243 -x1242 -x1241 x1240 -x1239 x1238 x1237 -x1236 -x1235 -x1234 -x1233 -x1232 -x1231
1790.02/1790.04 v -x1230 x1229 -x1228 x1227 -x1226 -x1225 -x1224 -x1223 -x1222 -x1221 -x1220 -x1219 x1218 x1217 -x1216 x1215 -x1214 x1213
1790.02/1790.04 v -x1212 -x1211 -x1210 -x1209 -x1208 -x1207 -x1206 -x1205 -x1204 -x1203 x1202 x1201 x1200 x1199 x1198 x1197 x1196 x1195 x1194 -x1193
1790.02/1790.04 v -x1192 -x1191 -x1190 -x1189 -x1188 -x1187 -x1186 -x1185 -x1184 -x1183 -x1182 -x1181 -x1180 -x1179 -x1178 -x1177 -x1176
1790.02/1790.04 v -x1175 -x1174 -x1173 -x1172 -x1171 -x1170 -x1169 -x1168 -x1167 -x1166 -x1165 -x1164 -x1163 -x1162 -x1161 -x1160 -x1159 -x1158
1790.02/1790.04 v -x1157 -x1156 -x1155 -x1154 -x1153 -x1152 -x1151 -x1150 -x1149 -x1148 -x1147 -x1146 -x1145 -x1144 -x1143 -x1142 -x1141 -x1140
1790.02/1790.04 v -x1139 -x1138 -x1137 -x1136 -x1135 -x1134 -x1133 -x1132 -x1131 -x1130 -x1129 -x1128 -x1127 -x1126 -x1125 -x1124 -x1123 -x1122
1790.02/1790.04 v -x1121 -x1120 -x1119 -x1118 -x1117 -x1116 -x1115 -x1114 -x1113 -x1112 -x1111 -x1110 -x1109 -x1108 -x1107 -x1106 -x1105 -x1104
1790.02/1790.04 v -x1103 -x1102 -x1101 -x1100 -x1099 -x1098 -x1097 -x1096 -x1095 -x1094 -x1093 -x1092 -x1091 -x1090 -x1089 -x1088 -x1087 -x1086
1790.02/1790.04 v x1085 -x1084 x1083 -x1082 -x1081 -x1080 -x1079 x1078 -x1077 -x1076 -x1075 x1074 -x1073 -x1072 -x1071 -x1070 -x1069 -x1068
1790.02/1790.04 v -x1067 -x1066 -x1065 -x1064 x1063 -x1062 -x1061 -x1060 -x1059 -x1058 -x1057 -x1056 -x1055 -x1054 x1053 -x1052 -x1051 -x1050
1790.02/1790.04 v -x1049 -x1048 -x1047 -x1046 -x1045 -x1044 x1043 -x1042 -x1041 -x1040 -x1039 -x1038 -x1037 x1036 -x1035 -x1034 -x1033 -x1032
1790.02/1790.04 v -x1031 -x1030 x1029 -x1028 -x1027 -x1026 -x1025 -x1024 -x1023 x1022 -x1021 -x1020 -x1019 x1018 -x1017 -x1016 -x1015 x1014 -x1013
1790.02/1790.04 v -x1012 -x1011 -x1010 -x1009 x1008 x1007 x1006 x1005 x1004 x1003 -x1002 x1001 -x1000 -x999 -x998 -x997 -x996 -x995 -x994 -x993
1790.02/1790.04 v -x992 -x991 -x990 x989 -x988 x987 -x986 x985 -x984 -x983 -x982 -x981 -x980 -x979 -x978 -x977 -x976 -x975 -x974 -x973 -x972
1790.02/1790.04 v -x971 x970 -x969 -x968 x967 -x966 x965 -x964 x963 x962 -x961 -x960 x959 x958 -x957 -x956 x955 x954 -x953 -x952 x951 -x950
1790.02/1790.04 v -x949 -x948 -x947 x946 -x945 x944 x943 -x942 -x941 x940 -x939 x938 -x937 x936 -x935 -x934 -x933 -x932 -x931 -x930 -x929 -x928
1790.02/1790.04 v -x927 -x926 -x925 x924 -x923 -x922 x921 -x920 -x919 -x918 -x917 -x916 -x915 -x914 -x913 -x912 -x911 -x910 -x909 -x908 -x907
1790.02/1790.04 v -x906 -x905 -x904 -x903 -x902 -x901 -x900 -x899 x898 -x897 -x896 -x895 -x894 -x893 -x892 -x891 -x890 x889 -x888 -x887 -x886 -x885
1790.02/1790.04 v -x884 -x883 -x882 x881 -x880 -x879 -x878 -x877 -x876 -x875 x874 -x873 x872 x871 -x870 -x869 x868 -x867 -x866 -x865 -x864
1790.02/1790.04 v x863 -x862 -x861 -x860 -x859 -x858 -x857 -x856 -x855 x854 x853 x852 x851 x850 -x849 x848 -x847 -x846 -x845 -x844 -x843 x842
1790.02/1790.04 v x841 x840 -x839 -x838 -x837 -x836 -x835 -x834 x833 -x832 -x831 x830 -x829 x828 -x827 x826 x825 -x824 -x823 x822 x821 -x820 -x819
1790.02/1790.04 v x818 x817 -x816 -x815 -x814 x813 x812 -x811 -x810 -x809 -x808 x807 x806 -x805 -x804 x803 x802 -x801 -x800 -x799 -x798 -x797
1790.02/1790.04 v x796 -x795 -x794 x793 x792 -x791 -x790 -x789 x788 -x787 x786 -x785 -x784 x783 -x782 -x781 -x780 -x779 -x778 -x777 -x776 x775
1790.02/1790.04 v -x774 -x773 x772 x771 -x770 -x769 -x768 x767 -x766 -x765 x764 -x763 x762 -x761 -x760 -x759 -x758 -x757 -x756 -x755 -x754 -x753
1790.02/1790.04 v -x752 -x751 -x750 x749 -x748 -x747 -x746 -x745 -x744 -x743 x742 x741 -x740 -x739 -x738 -x737 -x736 -x735 -x734 -x733 -x732
1790.02/1790.04 v -x731 -x730 x729 -x728 -x727 -x726 -x725 -x724 -x723 x722 -x721 -x720 -x719 -x718 x717 -x716 -x715 x714 -x713 -x712 -x711
1790.02/1790.04 v -x710 -x709 x708 -x707 x706 -x705 x704 -x703 -x702 -x701 x700 -x699 -x698 -x697 -x696 -x695 -x694 -x693 -x692 -x691 x690 -x689
1790.02/1790.04 v -x688 -x687 -x686 x685 -x684 x683 x682 -x681 -x680 -x679 -x678 x677 -x676 -x675 -x674 x673 -x672 -x671 -x670 -x669 x668 -x667
1790.02/1790.04 v -x666 -x665 -x664 x663 -x662 -x661 -x660 x659 -x658 -x657 x656 x655 -x654 -x653 -x652 -x651 -x650 -x649 -x648 -x647 -x646
1790.02/1790.04 v -x645 x644 -x643 -x642 -x641 -x640 -x639 x638 -x637 -x636 x635 -x634 -x633 -x632 x631 -x630 -x629 x628 x627 -x626 -x625 -x624
1790.02/1790.04 v x623 -x622 -x621 -x620 -x619 -x618 x617 x616 x615 x614 x613 x612 -x611 -x610 -x609 -x608 x607 -x606 -x605 x604 -x603 -x602 x601
1790.02/1790.04 v -x600 x599 -x598 -x597 -x596 -x595 x594 -x593 -x592 x591 -x590 -x589 x588 -x587 -x586 -x585 -x584 -x583 -x582 -x581 -x580
1790.02/1790.04 v -x579 x578 -x577 -x576 -x575 -x574 x573 -x572 -x571 -x570 -x569 -x568 -x567 -x566 -x565 x564 -x563 -x562 -x561 -x560 x559 x558
1790.02/1790.04 v x557 x556 -x555 x554 -x553 -x552 -x551 -x550 -x549 -x548 -x547 x546 -x545 -x544 x543 -x542 -x541 x540 -x539 -x538 -x537 -x536
1790.02/1790.04 v -x535 x534 -x533 -x532 x531 -x530 -x529 x528 -x527 -x526 -x525 -x524 x523 -x522 -x521 x520 -x519 -x518 x517 -x516 -x515 -x514
1790.02/1790.04 v -x513 -x512 -x511 x510 -x509 x508 -x507 -x506 -x505 x504 -x503 x502 x501 x500 x499 x498 -x497 x496 -x495 -x494 x493 -x492
1790.02/1790.04 v -x491 -x490 -x489 -x488 -x487 -x486 -x485 x484 -x483 -x482 -x481 -x480 -x479 -x478 -x477 -x476 -x475 -x474 -x473 -x472 -x471
1790.02/1790.04 v -x470 -x469 x468 -x467 -x466 x465 -x464 x463 -x462 -x461 -x460 -x459 -x458 x457 -x456 -x455 x454 -x453 x452 -x451 -x450 -x449
1790.02/1790.04 v -x448 -x447 -x446 -x445 -x444 x443 -x442 x441 -x440 x439 -x438 -x437 -x436 x435 -x434 -x433 x432 -x431 x430 -x429 -x428 x427
1790.02/1790.04 v -x426 -x425 -x424 -x423 -x422 x421 -x420 -x419 x418 -x417 -x416 -x415 x414 -x413 -x412 -x411 -x410 x409 -x408 -x407 x406 -x405
1790.02/1790.04 v -x404 x403 -x402 -x401 -x400 x399 -x398 x397 -x396 -x395 x394 -x393 -x392 -x391 -x390 -x389 -x388 x387 -x386 x385 -x384
1790.02/1790.04 v x383 -x382 x381 -x380 x379 -x378 -x377 x376 -x375 -x374 -x373 x372 -x371 -x370 -x369 -x368 x367 -x366 -x365 -x364 -x363 x362
1790.02/1790.04 v -x361 -x360 x359 -x358 -x357 -x356 -x355 x354 -x353 -x352 x351 -x350 -x349 -x348 x347 -x346 -x345 -x344 x343 -x342 x341 -x340
1790.02/1790.04 v -x339 x338 -x337 x336 x335 -x334 -x333 x332 x331 x330 -x329 -x328 -x327 x326 -x325 -x324 -x323 -x322 x321 -x320 -x319 -x318
1790.02/1790.04 v x317 -x316 x315 -x314 x313 -x312 -x311 x310 -x309 -x308 -x307 -x306 -x305 x304 -x303 -x302 x301 -x300 -x299 x298 -x297 -x296
1790.02/1790.04 v -x295 -x294 -x293 -x292 -x291 -x290 -x289 -x288 -x287 -x286 -x285 -x284 -x283 x282 -x281 -x280 -x279 -x278 -x277 -x276 -x275
1790.02/1790.04 v -x274 -x273 -x272 x271 -x270 -x269 x268 -x267 -x266 -x265 x264 -x263 x262 -x261 -x260 -x259 x258 -x257 -x256 -x255 x254 -x253
1790.02/1790.04 v -x252 -x251 -x250 -x249 -x248 x247 x246 x245 -x244 -x243 -x242 -x241 -x240 -x239 -x238 -x237 -x236 -x235 -x234 x233 -x232 -x231
1790.02/1790.04 v -x230 -x229 -x228 -x227 -x226 -x225 -x224 -x223 x222 -x221 x220 -x219 x218 -x217 -x216 -x215 -x214 -x213 x212 -x211 -x210
1790.02/1790.04 v x209 -x208 -x207 -x206 -x205 -x204 x203 -x202 -x201 -x200 -x199 -x198 -x197 x196 -x195 -x194 -x193 -x192 -x191 -x190 x189 -x188
1790.02/1790.04 v -x187 -x186 -x185 x184 x183 x182 x181 -x180 -x179 x178 -x177 x176 -x175 -x174 -x173 x172 -x171 -x170 x169 -x168 -x167 x166
1790.02/1790.04 v -x165 -x164 -x163 -x162 -x161 x160 x159 x158 x157 -x156 -x155 -x154 -x153 -x152 -x151 x150 -x149 -x148 x147 x146 x145 -x144
1790.02/1790.04 v x143 -x142 -x141 -x140 -x139 -x138 -x137 -x136 -x135 x134 -x133 x132 -x131 x130 -x129 -x128 -x127 x126 -x125 -x124 x123 -x122
1790.02/1790.04 v x121 -x120 -x119 x118 -x117 -x116 -x115 -x114 -x113 -x112 x111 -x110 -x109 -x108 -x107 -x106 x105 -x104 -x103 x102 x101 -x100
1790.02/1790.04 v x99 -x98 -x97 -x96 -x95 -x94 -x93 x92 -x91 x90 x89 -x88 -x87 x86 x85 x84 -x83 -x82 -x81 -x80 -x79 -x78 -x77 -x76 -x75 x74
1790.02/1790.04 v x73 -x72 -x71 -x70 x69 -x68 -x67 -x66 -x65 -x64 -x63 x62 -x61 -x60 -x59 -x58 x57 -x56 -x55 x54 x53 x52 -x51 -x50 -x49 x48 -x47
1790.02/1790.04 v -x46 x45 -x44 -x43 x42 -x41 -x40 -x39 x38 -x37 x36 -x35 -x34 x33 -x32 -x31 x30 -x29 -x28 -x27 x26 x25 -x24 -x23 -x22 x21 x20
1790.02/1790.04 v -x19 -x18 x17 x16 x15 x14 -x13 -x12 x11 -x10 -x9 x8 -x7 -x6 x5 -x4 -x3 x2 -x1
1790.02/1790.04 c SCIP Status : solving was interrupted [time limit reached]
1790.02/1790.04 c Solving Time : 1789.96
1790.02/1790.04 c Original Problem :
1790.02/1790.04 c Problem name : HOME/instance-2705036-1278574753.wbo
1790.02/1790.04 c Variables : 5005 (3959 binary, 0 integer, 1046 implicit integer, 0 continuous)
1790.02/1790.04 c Constraints : 4152 initial, 4152 maximal
1790.02/1790.04 c Presolved Problem :
1790.02/1790.04 c Problem name : t_HOME/instance-2705036-1278574753.wbo
1790.02/1790.04 c Variables : 4978 (3932 binary, 0 integer, 1046 implicit integer, 0 continuous)
1790.02/1790.04 c Constraints : 4110 initial, 4519 maximal
1790.02/1790.04 c Presolvers : Time FixedVars AggrVars ChgTypes ChgBounds AddHoles DelCons ChgSides ChgCoefs
1790.02/1790.04 c trivial : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c dualfix : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c boundshift : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c inttobinary : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c implics : 0.00 0 27 0 0 0 0 0 0
1790.02/1790.04 c probing : 0.03 0 0 0 0 0 0 0 0
1790.02/1790.04 c varbound : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c knapsack : 0.01 0 0 0 0 0 0 22 76
1790.02/1790.04 c setppc : 0.01 0 0 0 0 0 9 0 0
1790.02/1790.04 c linear : 0.06 0 0 0 1046 0 55 514 1028
1790.02/1790.04 c indicator : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c logicor : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c bounddisjunction : 0.00 0 0 0 0 0 0 0 0
1790.02/1790.04 c root node : - 0 - - 0 - - - -
1790.02/1790.04 c Constraints : Number #Separate #Propagate #EnfoLP #EnfoPS Cutoffs DomReds Cuts Conss Children
1790.02/1790.04 c integral : 0 0 0 613214 0 0 3295 0 0 162040
1790.02/1790.04 c varbound : 1 6 1215417 527652 0 0 76 1 0 0
1790.02/1790.04 c knapsack : 574 6 1249888 529038 0 133 141686 1205 0 0
1790.02/1790.04 c setppc : 964 6 1249755 529038 0 1 424902 0 0 0
1790.02/1790.04 c linear : 1045 6 1249754 529038 0 3 137536 27146 0 0
1790.02/1790.04 c indicator : 1046 0 1249751 529038 0 0 85907 0 0 0
1790.02/1790.04 c logicor : 480+ 6 329365 526864 0 2 170847 0 0 0
1790.02/1790.04 c bounddisjunction : 0+ 0 7534 0 0 0 3520 0 0 0
1790.02/1790.04 c countsols : 0 0 0 526864 0 0 0 0 0 0
1790.02/1790.04 c Constraint Timings : TotalTime Separate Propagate EnfoLP EnfoPS
1790.02/1790.04 c integral : 67.68 0.00 0.00 67.68 0.00
1790.02/1790.04 c varbound : 0.46 0.00 0.29 0.17 0.00
1790.02/1790.04 c knapsack : 16.78 0.05 11.71 5.03 0.00
1790.02/1790.04 c setppc : 10.75 0.00 6.94 3.81 0.00
1790.02/1790.04 c linear : 64.45 0.00 8.90 55.55 0.00
1790.02/1790.04 c indicator : 98.14 0.02 39.13 58.99 0.00
1790.02/1790.04 c logicor : 5.20 0.00 0.78 4.42 0.00
1790.02/1790.04 c bounddisjunction : 0.02 0.00 0.02 0.00 0.00
1790.02/1790.04 c countsols : 0.07 0.00 0.00 0.07 0.00
1790.02/1790.04 c Propagators : Time Calls Cutoffs DomReds
1790.02/1790.04 c vbounds : 2.87 75145 0 35497
1790.02/1790.04 c rootredcost : 0.33 2 0 0
1790.02/1790.04 c pseudoobj : 25.58 1249685 0 0
1790.02/1790.04 c Conflict Analysis : Time Calls Success Conflicts Literals Reconvs ReconvLits LP Iters
1790.02/1790.04 c propagation : 0.00 139 139 649 23.0 4 13.5 -
1790.02/1790.04 c infeasible LP : 0.08 252 225 235 4.4 0 0.0 0
1790.02/1790.04 c bound exceed. LP : 0.00 0 0 0 0.0 0 0.0 0
1790.02/1790.04 c strong branching : 0.00 0 0 0 0.0 0 0.0 0
1790.02/1790.04 c pseudo solution : 0.00 0 0 0 0.0 0 0.0 -
1790.02/1790.04 c applied globally : - - - 504 13.4 - - -
1790.02/1790.04 c applied locally : - - - 0 0.0 - - -
1790.02/1790.04 c Separators : Time Calls Cutoffs DomReds Cuts Conss
1790.02/1790.04 c cut pool : 0.00 5 - - 190 - (maximal pool size: 1190)
1790.02/1790.04 c redcost : 61.84 613219 0 0 0 0
1790.02/1790.04 c impliedbounds : 0.00 6 0 0 77 0
1790.02/1790.04 c intobj : 0.00 0 0 0 0 0
1790.02/1790.04 c cgmip : 0.00 0 0 0 0 0
1790.02/1790.04 c gomory : 0.18 6 0 0 142 0
1790.02/1790.04 c strongcg : 0.16 6 0 0 176 0
1790.02/1790.04 c cmir : 0.23 6 0 0 87 0
1790.02/1790.04 c flowcover : 0.99 6 0 0 966 0
1790.02/1790.04 c clique : 0.00 6 0 0 0 0
1790.02/1790.04 c zerohalf : 0.00 0 0 0 0 0
1790.02/1790.04 c mcf : 0.00 1 0 0 0 0
1790.02/1790.04 c rapidlearning : 0.13 1 0 0 0 0
1790.02/1790.04 c Pricers : Time Calls Vars
1790.02/1790.04 c problem variables: 0.00 0 0
1790.02/1790.04 c Branching Rules : Time Calls Cutoffs DomReds Cuts Conss Children
1790.02/1790.04 c relpscost : 67.37 84176 0 3295 0 0 162040
1790.02/1790.04 c pscost : 0.00 0 0 0 0 0 0
1790.02/1790.04 c inference : 235.84 526864 0 0 0 0 1053749
1790.02/1790.04 c mostinf : 0.00 0 0 0 0 0 0
1790.02/1790.04 c leastinf : 0.00 0 0 0 0 0 0
1790.02/1790.04 c fullstrong : 0.00 0 0 0 0 0 0
1790.02/1790.04 c allfullstrong : 0.00 0 0 0 0 0 0
1790.02/1790.04 c random : 0.00 0 0 0 0 0 0
1790.02/1790.04 c Primal Heuristics : Time Calls Found
1790.02/1790.04 c LP solutions : 0.00 - 0
1790.02/1790.04 c pseudo solutions : 0.00 - 0
1790.02/1790.04 c intshifting : 0.00 0 0
1790.02/1790.04 c oneopt : 0.22 2 0
1790.02/1790.04 c objpscostdiving : 2.81 3 0
1790.02/1790.04 c rootsoldiving : 1.51 12 0
1790.02/1790.04 c crossover : 0.81 12 0
1790.02/1790.04 c feaspump : 0.93 39 0
1790.02/1790.04 c veclendiving : 18.50 1669 0
1790.02/1790.04 c coefdiving : 19.62 2799 0
1790.02/1790.04 c linesearchdiving : 20.07 2815 0
1790.02/1790.04 c pscostdiving : 21.29 2828 0
1790.02/1790.04 c fracdiving : 20.08 2891 0
1790.02/1790.04 c guideddiving : 3.47 2955 0
1790.02/1790.04 c trivial : 0.00 2 0
1790.02/1790.04 c simplerounding : 0.32 82780 0
1790.02/1790.04 c zirounding : 0.23 1000 0
1790.02/1790.04 c rounding : 0.58 3999 0
1790.02/1790.04 c shifting : 3.17 1289 0
1790.02/1790.04 c twoopt : 0.00 0 0
1790.02/1790.04 c fixandinfer : 0.00 0 0
1790.02/1790.04 c intdiving : 0.00 0 0
1790.02/1790.04 c actconsdiving : 0.00 0 0
1790.02/1790.04 c octane : 0.00 0 0
1790.02/1790.04 c rens : 0.11 1 0
1790.02/1790.04 c rins : 0.00 0 0
1790.02/1790.04 c localbranching : 0.00 0 0
1790.02/1790.04 c mutation : 0.00 0 0
1790.02/1790.04 c dins : 0.00 0 0
1790.02/1790.04 c undercover : 0.00 0 0
1790.02/1790.04 c nlp : 0.12 0 0
1790.02/1790.04 c trysol : 0.44 3108 107
1790.02/1790.04 c LP : Time Calls Iterations Iter/call Iter/sec
1790.02/1790.04 c primal LP : 0.01 0 0 0.00 -
1790.02/1790.04 c dual LP : 792.70 95961 584598 6.09 737.48
1790.02/1790.04 c lex dual LP : 0.00 0 0 0.00 -
1790.02/1790.04 c barrier LP : 0.00 0 0 0.00 -
1790.02/1790.04 c diving/probing LP: 71.02 30916 160761 5.20 2263.63
1790.02/1790.04 c strong branching : 64.88 12939 239805 18.53 3696.41
1790.02/1790.04 c (at root node) : - 17 557 32.76 -
1790.02/1790.04 c conflict analysis: 0.00 0 0 0.00 -
1790.02/1790.04 c B&B Tree :
1790.02/1790.04 c number of runs : 1
1790.02/1790.04 c nodes : 607948
1790.02/1790.04 c nodes (total) : 607948
1790.02/1790.04 c nodes left : 607839
1790.02/1790.04 c max depth : 815
1790.02/1790.04 c max depth (total): 815
1790.02/1790.04 c backtracks : 3122 (0.5%)
1790.02/1790.04 c delayed cutoffs : 3
1790.02/1790.04 c repropagations : 5839 (281 domain reductions, 3 cutoffs)
1790.02/1790.04 c avg switch length: 2.16
1790.02/1790.04 c switching time : 41.88
1790.02/1790.04 c Solution :
1790.02/1790.04 c Solutions found : 107 (2 improvements)
1790.02/1790.04 c First Solution : +5.23060000000000e+04 (in run 1, after 17844 nodes, 205.28 seconds, depth 562, found by <trysol>)
1790.02/1790.04 c Primal Bound : +5.22620000000000e+04 (in run 1, after 19335 nodes, 210.16 seconds, depth 618, found by <trysol>)
1790.02/1790.04 c Dual Bound : +0.00000000000000e+00
1790.02/1790.04 c Gap : infinite
1790.02/1790.04 c Root Dual Bound : +0.00000000000000e+00
1790.02/1790.04 c Root Iterations : 2614
1790.82/1790.84 c Time complete: 1790.86.