0.00/0.00 c SCIP version 1.2.1.2 [precision: 8 byte] [memory: block] [mode: optimized] [LP solver: Clp 1.11.1] [Expressions interpreter: NONE]
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-2684661-1278432573.opb>
0.19/0.21 c original problem has 3844 variables (3844 bin, 0 int, 0 impl, 0 cont) and 12376 constraints
0.19/0.21 c problem read
0.19/0.21 c No objective function, only one solution is needed.
0.19/0.21 c presolving settings loaded
0.19/0.28 c presolving:
0.69/0.71 c (round 1) 1182 del vars, 3024 del conss, 786 chg bounds, 0 chg sides, 0 chg coeffs, 0 upgd conss, 599638 impls, 0 clqs
0.89/0.90 c (round 2) 2711 del vars, 8235 del conss, 2225 chg bounds, 0 chg sides, 0 chg coeffs, 0 upgd conss, 606587 impls, 0 clqs
0.89/0.93 c (round 3) 3135 del vars, 10349 del conss, 2386 chg bounds, 82 chg sides, 73 chg coeffs, 0 upgd conss, 609660 impls, 4 clqs
0.89/0.94 c (round 4) 3242 del vars, 10731 del conss, 2470 chg bounds, 82 chg sides, 73 chg coeffs, 0 upgd conss, 610204 impls, 4 clqs
0.89/0.95 c (round 5) 3340 del vars, 10985 del conss, 2534 chg bounds, 95 chg sides, 87 chg coeffs, 0 upgd conss, 611711 impls, 4 clqs
0.89/0.96 c (round 6) 3391 del vars, 11141 del conss, 2562 chg bounds, 104 chg sides, 95 chg coeffs, 0 upgd conss, 612268 impls, 4 clqs
0.89/0.96 c (round 7) 3433 del vars, 11259 del conss, 2593 chg bounds, 137 chg sides, 126 chg coeffs, 0 upgd conss, 612514 impls, 4 clqs
0.89/0.97 c (round 8) 3450 del vars, 11330 del conss, 2597 chg bounds, 161 chg sides, 146 chg coeffs, 0 upgd conss, 612651 impls, 4 clqs
0.89/0.97 c (round 9) 3451 del vars, 11350 del conss, 2597 chg bounds, 161 chg sides, 146 chg coeffs, 0 upgd conss, 612651 impls, 4 clqs
0.89/0.97 c (round 10) 3453 del vars, 11356 del conss, 2597 chg bounds, 169 chg sides, 152 chg coeffs, 0 upgd conss, 612651 impls, 4 clqs
0.89/0.98 c (round 11) 3454 del vars, 11359 del conss, 2597 chg bounds, 177 chg sides, 158 chg coeffs, 0 upgd conss, 612651 impls, 4 clqs
1.00/1.02 c (round 12) 3454 del vars, 11366 del conss, 2597 chg bounds, 177 chg sides, 158 chg coeffs, 1013 upgd conss, 612651 impls, 4 clqs
1.00/1.04 c (round 13) 3467 del vars, 11418 del conss, 2615 chg bounds, 221 chg sides, 290 chg coeffs, 1013 upgd conss, 614763 impls, 44 clqs
1.00/1.05 c (round 14) 3486 del vars, 11423 del conss, 2615 chg bounds, 269 chg sides, 507 chg coeffs, 1013 upgd conss, 614821 impls, 65 clqs
1.00/1.07 c (round 15) 3486 del vars, 11424 del conss, 2615 chg bounds, 290 chg sides, 618 chg coeffs, 1013 upgd conss, 614821 impls, 85 clqs
1.00/1.08 c (round 16) 3486 del vars, 11424 del conss, 2615 chg bounds, 291 chg sides, 669 chg coeffs, 1013 upgd conss, 614821 impls, 100 clqs
1.00/1.09 c (round 17) 3486 del vars, 11424 del conss, 2615 chg bounds, 291 chg sides, 712 chg coeffs, 1013 upgd conss, 614823 impls, 112 clqs
1.00/1.10 c (round 18) 3486 del vars, 11424 del conss, 2615 chg bounds, 293 chg sides, 760 chg coeffs, 1013 upgd conss, 614823 impls, 123 clqs
1.09/1.11 c (round 19) 3486 del vars, 11424 del conss, 2615 chg bounds, 293 chg sides, 787 chg coeffs, 1013 upgd conss, 614823 impls, 134 clqs
1.09/1.11 c (round 20) 3486 del vars, 11424 del conss, 2615 chg bounds, 294 chg sides, 819 chg coeffs, 1013 upgd conss, 614823 impls, 145 clqs
1.09/1.12 c (round 21) 3486 del vars, 11424 del conss, 2615 chg bounds, 294 chg sides, 838 chg coeffs, 1013 upgd conss, 614823 impls, 155 clqs
1.09/1.13 c (round 22) 3486 del vars, 11424 del conss, 2615 chg bounds, 294 chg sides, 849 chg coeffs, 1013 upgd conss, 614823 impls, 163 clqs
1.09/1.14 c (round 23) 3486 del vars, 11424 del conss, 2615 chg bounds, 294 chg sides, 860 chg coeffs, 1013 upgd conss, 614823 impls, 171 clqs
1.09/1.15 c (round 24) 3486 del vars, 11424 del conss, 2615 chg bounds, 295 chg sides, 875 chg coeffs, 1013 upgd conss, 614823 impls, 177 clqs
1.09/1.16 c presolving (25 rounds):
1.09/1.16 c 3486 deleted vars, 11424 deleted constraints, 2615 tightened bounds, 0 added holes, 295 changed sides, 875 changed coefficients
1.09/1.16 c 614823 implications, 178 cliques
1.09/1.16 c presolved problem has 358 variables (358 bin, 0 int, 0 impl, 0 cont) and 952 constraints
1.09/1.16 c 157 constraints of type <knapsack>
1.09/1.16 c 4 constraints of type <setppc>
1.09/1.16 c 791 constraints of type <logicor>
1.09/1.16 c transformed objective value is always integral (scale: 1)
1.09/1.16 c Presolving Time: 0.80
1.09/1.16 c - non default parameters ----------------------------------------------------------------------
1.09/1.16 c # SCIP version 1.2.1.2
1.09/1.16 c
1.09/1.16 c # frequency for displaying node information lines
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 100]
1.09/1.16 c display/freq = 10000
1.09/1.16 c
1.09/1.16 c # maximal time in seconds to run
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 1e+20]
1.09/1.16 c limits/time = 1799.8
1.09/1.16 c
1.09/1.16 c # maximal memory usage in MB; reported memory usage is lower than real memory usage!
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 1e+20]
1.09/1.16 c limits/memory = 1620
1.09/1.16 c
1.09/1.16 c # solving stops, if the given number of solutions were found (-1: no limit)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: -1]
1.09/1.16 c limits/solutions = 1
1.09/1.16 c
1.09/1.16 c # maximal number of separation rounds per node (-1: unlimited)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 5]
1.09/1.16 c separating/maxrounds = 1
1.09/1.16 c
1.09/1.16 c # maximal number of separation rounds in the root node (-1: unlimited)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: -1]
1.09/1.16 c separating/maxroundsroot = 5
1.09/1.16 c
1.09/1.16 c # should presolving try to simplify inequalities
1.09/1.16 c # [type: bool, range: {TRUE,FALSE}, default: FALSE]
1.09/1.16 c constraints/linear/simplifyinequalities = TRUE
1.09/1.16 c
1.09/1.16 c # should disaggregation of knapsack constraints be allowed in preprocessing?
1.09/1.16 c # [type: bool, range: {TRUE,FALSE}, default: TRUE]
1.09/1.16 c constraints/knapsack/disaggregation = FALSE
1.09/1.16 c
1.09/1.16 c # should presolving try to simplify knapsacks
1.09/1.16 c # [type: bool, range: {TRUE,FALSE}, default: FALSE]
1.09/1.16 c constraints/knapsack/simplifyinequalities = TRUE
1.09/1.16 c
1.09/1.16 c # maximal number of presolving rounds the presolver participates in (-1: no limit)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: -1]
1.09/1.16 c presolving/probing/maxrounds = 0
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <coefdiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/coefdiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.05]
1.09/1.16 c heuristics/coefdiving/maxlpiterquot = 0.075
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/coefdiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <crossover> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 30]
1.09/1.16 c heuristics/crossover/freq = -1
1.09/1.16 c
1.09/1.16 c # number of nodes added to the contingent of the total nodes
1.09/1.16 c # [type: longint, range: [0,9223372036854775807], default: 500]
1.09/1.16 c heuristics/crossover/nodesofs = 750
1.09/1.16 c
1.09/1.16 c # number of nodes without incumbent change that heuristic should wait
1.09/1.16 c # [type: longint, range: [0,9223372036854775807], default: 200]
1.09/1.16 c heuristics/crossover/nwaitingnodes = 100
1.09/1.16 c
1.09/1.16 c # contingent of sub problem nodes in relation to the number of nodes of the original problem
1.09/1.16 c # [type: real, range: [0,1], default: 0.1]
1.09/1.16 c heuristics/crossover/nodesquot = 0.15
1.09/1.16 c
1.09/1.16 c # minimum percentage of integer variables that have to be fixed
1.09/1.16 c # [type: real, range: [0,1], default: 0.666]
1.09/1.16 c heuristics/crossover/minfixingrate = 0.5
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <feaspump> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 20]
1.09/1.16 c heuristics/feaspump/freq = -1
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/feaspump/maxlpiterofs = 2000
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <fracdiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/fracdiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.05]
1.09/1.16 c heuristics/fracdiving/maxlpiterquot = 0.075
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/fracdiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <guideddiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/guideddiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.05]
1.09/1.16 c heuristics/guideddiving/maxlpiterquot = 0.075
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/guideddiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.05]
1.09/1.16 c heuristics/intdiving/maxlpiterquot = 0.075
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <intshifting> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/intshifting/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <linesearchdiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/linesearchdiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.05]
1.09/1.16 c heuristics/linesearchdiving/maxlpiterquot = 0.075
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/linesearchdiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <nlp> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 1]
1.09/1.16 c heuristics/nlp/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <objpscostdiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 20]
1.09/1.16 c heuristics/objpscostdiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to total iteration number
1.09/1.16 c # [type: real, range: [0,1], default: 0.01]
1.09/1.16 c heuristics/objpscostdiving/maxlpiterquot = 0.015
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/objpscostdiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <oneopt> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 1]
1.09/1.16 c heuristics/oneopt/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <pscostdiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/pscostdiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.05]
1.09/1.16 c heuristics/pscostdiving/maxlpiterquot = 0.075
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/pscostdiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <rens> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 0]
1.09/1.16 c heuristics/rens/freq = -1
1.09/1.16 c
1.09/1.16 c # minimum percentage of integer variables that have to be fixable
1.09/1.16 c # [type: real, range: [0,1], default: 0.5]
1.09/1.16 c heuristics/rens/minfixingrate = 0.3
1.09/1.16 c
1.09/1.16 c # number of nodes added to the contingent of the total nodes
1.09/1.16 c # [type: longint, range: [0,9223372036854775807], default: 500]
1.09/1.16 c heuristics/rens/nodesofs = 2000
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <rootsoldiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 20]
1.09/1.16 c heuristics/rootsoldiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.01]
1.09/1.16 c heuristics/rootsoldiving/maxlpiterquot = 0.015
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/rootsoldiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <rounding> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 1]
1.09/1.16 c heuristics/rounding/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <shifting> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/shifting/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <simplerounding> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 1]
1.09/1.16 c heuristics/simplerounding/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <trivial> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 0]
1.09/1.16 c heuristics/trivial/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <trysol> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 1]
1.09/1.16 c heuristics/trysol/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <veclendiving> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 10]
1.09/1.16 c heuristics/veclendiving/freq = -1
1.09/1.16 c
1.09/1.16 c # maximal fraction of diving LP iterations compared to node LP iterations
1.09/1.16 c # [type: real, range: [0,1.79769313486232e+308], default: 0.05]
1.09/1.16 c heuristics/veclendiving/maxlpiterquot = 0.075
1.09/1.16 c
1.09/1.16 c # additional number of allowed LP iterations
1.09/1.16 c # [type: int, range: [0,2147483647], default: 1000]
1.09/1.16 c heuristics/veclendiving/maxlpiterofs = 1500
1.09/1.16 c
1.09/1.16 c # frequency for calling primal heuristic <zirounding> (-1: never, 0: only at depth freqofs)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 1]
1.09/1.16 c heuristics/zirounding/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling separator <cmir> (-1: never, 0: only in root node)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 0]
1.09/1.16 c separating/cmir/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling separator <flowcover> (-1: never, 0: only in root node)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: 0]
1.09/1.16 c separating/flowcover/freq = -1
1.09/1.16 c
1.09/1.16 c # frequency for calling separator <rapidlearning> (-1: never, 0: only in root node)
1.09/1.16 c # [type: int, range: [-1,2147483647], default: -1]
1.09/1.16 c separating/rapidlearning/freq = 0
1.09/1.16 c
1.09/1.16 c -----------------------------------------------------------------------------------------------
1.09/1.16 c start solving
1.09/1.16 c
1.09/1.18 c time | node | left |LP iter|LP it/n| mem |mdpt |frac |vars |cons |cols |rows |cuts |confs|strbr| dualbound | primalbound | gap
1.09/1.18 c 0.8s| 1 | 0 | 184 | - | 13M| 0 | 173 | 358 | 952 | 358 | 926 | 0 | 0 | 0 | 0.000000e+00 | -- | Inf
1.29/1.39 c y 1.0s| 1 | 0 | 184 | - | 14M| 0 | - | 358 | 952 | 358 | 926 | 0 | 0 | 0 | 0.000000e+00 | 0.000000e+00 | 0.00%
1.39/1.40 c 1.0s| 1 | 0 | 184 | - | 14M| 0 | - | 358 | 952 | 358 | 926 | 0 | 0 | 0 | 0.000000e+00 | 0.000000e+00 | 0.00%
1.39/1.40 c 1.0s| 1 | 0 | 184 | - | 14M| 0 | - | 358 | 937 | 358 | 926 | 0 | 0 | 0 | 0.000000e+00 | 0.000000e+00 | 0.00%
1.39/1.40 c
1.39/1.40 c SCIP Status : problem is solved [optimal solution found]
1.39/1.40 c Solving Time (sec) : 1.03
1.39/1.40 c Solving Nodes : 1
1.39/1.40 c Primal Bound : +0.00000000000000e+00 (1 solutions)
1.39/1.40 c Dual Bound : +0.00000000000000e+00
1.39/1.40 c Gap : 0.00 %
1.39/1.41 s SATISFIABLE
1.39/1.41 v x3844 -x3843 -x3842 -x3841 -x3840 -x3839 -x3838 -x3837 -x3836 -x3835 -x3834 -x3833 -x3832 -x3831 -x3830 -x3829 -x3828 -x3827 -x3826
1.39/1.41 v -x3825 -x3824 -x3823 -x3822 -x3821 -x3820 -x3819 -x3818 -x3817 -x3816 -x3815 -x3814 -x3813 -x3812 -x3811 -x3810 -x3809 -x3808
1.39/1.41 v -x3807 -x3806 -x3805 -x3804 -x3803 -x3802 -x3801 -x3800 -x3799 -x3798 -x3797 -x3796 -x3795 -x3794 -x3793 -x3792 -x3791
1.39/1.41 v -x3790 -x3789 -x3788 -x3787 -x3786 -x3785 -x3784 -x3783 -x3782 x3781 x3780 x3779 x3778 x3777 x3776 -x3775 -x3774 -x3773 -x3772
1.39/1.41 v -x3771 -x3770 -x3769 -x3768 -x3767 -x3766 -x3765 -x3764 -x3763 -x3762 -x3761 -x3760 -x3759 -x3758 -x3757 -x3756 -x3755 -x3754
1.39/1.41 v -x3753 -x3752 -x3751 -x3750 -x3749 -x3748 -x3747 -x3746 -x3745 -x3744 -x3743 -x3742 -x3741 -x3740 -x3739 -x3738 -x3737 -x3736
1.39/1.41 v -x3735 -x3734 -x3733 -x3732 -x3731 -x3730 -x3729 -x3728 -x3727 -x3726 -x3725 -x3724 -x3723 -x3722 -x3721 -x3720 x3719 -x3718
1.39/1.41 v -x3717 -x3716 -x3715 -x3714 -x3713 -x3712 -x3711 -x3710 -x3709 -x3708 -x3707 -x3706 -x3705 -x3704 -x3703 -x3702 -x3701 -x3700
1.39/1.41 v -x3699 -x3698 -x3697 -x3696 -x3695 -x3694 -x3693 -x3692 -x3691 -x3690 -x3689 -x3688 -x3687 -x3686 -x3685 -x3684 -x3683 -x3682
1.39/1.41 v -x3681 -x3680 -x3679 -x3678 -x3677 -x3676 -x3675 -x3674 -x3673 -x3672 -x3671 -x3670 -x3669 -x3668 -x3667 -x3666 -x3665
1.39/1.41 v -x3664 -x3663 -x3662 -x3661 -x3660 -x3659 -x3658 x3657 x3656 x3655 x3654 x3653 x3652 x3651 -x3650 -x3649 -x3648 -x3647 -x3646
1.39/1.41 v -x3645 -x3644 -x3643 -x3642 -x3641 -x3640 -x3639 -x3638 -x3637 -x3636 -x3635 -x3634 -x3633 -x3632 -x3631 -x3630 -x3629 -x3628
1.39/1.41 v -x3627 -x3626 -x3625 -x3624 -x3623 -x3622 -x3621 -x3620 -x3619 -x3618 -x3617 -x3616 -x3615 -x3614 -x3613 -x3612 -x3611 -x3610
1.39/1.41 v -x3609 -x3608 -x3607 -x3606 -x3605 -x3604 -x3603 -x3602 -x3601 -x3600 -x3599 -x3598 -x3597 -x3596 -x3595 -x3594 -x3593 -x3592
1.39/1.41 v -x3591 -x3590 x3589 x3588 x3587 x3586 x3585 x3584 x3583 -x3582 -x3581 -x3580 -x3579 -x3578 -x3577 -x3576 -x3575 -x3574 -x3573
1.39/1.41 v -x3572 -x3571 -x3570 -x3569 -x3568 -x3567 -x3566 -x3565 -x3564 -x3563 -x3562 -x3561 -x3560 -x3559 -x3558 -x3557 -x3556 -x3555
1.39/1.41 v -x3554 -x3553 -x3552 -x3551 -x3550 -x3549 -x3548 -x3547 -x3546 -x3545 -x3544 -x3543 -x3542 -x3541 -x3540 -x3539 -x3538
1.39/1.41 v -x3537 -x3536 -x3535 -x3534 -x3533 -x3532 -x3531 -x3530 -x3529 -x3528 -x3527 -x3526 -x3525 -x3524 -x3523 -x3522 -x3521 x3520
1.39/1.41 v x3519 x3518 -x3517 -x3516 -x3515 -x3514 -x3513 -x3512 -x3511 -x3510 -x3509 -x3508 -x3507 -x3506 -x3505 -x3504 -x3503 -x3502 -x3501
1.39/1.41 v -x3500 -x3499 -x3498 -x3497 -x3496 -x3495 -x3494 -x3493 -x3492 -x3491 -x3490 -x3489 -x3488 -x3487 -x3486 -x3485 -x3484
1.39/1.41 v -x3483 -x3482 -x3481 -x3480 -x3479 -x3478 -x3477 -x3476 -x3475 -x3474 -x3473 -x3472 -x3471 -x3470 -x3469 -x3468 -x3467 -x3466
1.39/1.41 v x3465 x3464 x3463 x3462 x3461 x3460 x3459 x3458 x3457 -x3456 -x3455 -x3454 -x3453 -x3452 -x3451 -x3450 -x3449 -x3448 -x3447
1.39/1.41 v -x3446 -x3445 -x3444 -x3443 -x3442 -x3441 -x3440 -x3439 -x3438 -x3437 -x3436 -x3435 -x3434 -x3433 -x3432 -x3431 -x3430 -x3429
1.39/1.41 v -x3428 -x3427 -x3426 -x3425 -x3424 -x3423 -x3422 -x3421 -x3420 -x3419 -x3418 -x3417 -x3416 -x3415 -x3414 -x3413 -x3412 -x3411
1.39/1.41 v -x3410 -x3409 -x3408 -x3407 -x3406 -x3405 -x3404 -x3403 -x3402 -x3401 -x3400 -x3399 -x3398 -x3397 x3396 x3395 x3394 x3393 x3392
1.39/1.41 v x3391 x3390 x3389 -x3388 -x3387 -x3386 -x3385 -x3384 -x3383 -x3382 -x3381 -x3380 -x3379 -x3378 -x3377 -x3376 -x3375 -x3374
1.39/1.41 v -x3373 -x3372 -x3371 -x3370 -x3369 -x3368 -x3367 -x3366 -x3365 -x3364 -x3363 -x3362 -x3361 -x3360 -x3359 -x3358 -x3357 -x3356
1.39/1.41 v -x3355 -x3354 -x3353 -x3352 -x3351 -x3350 -x3349 -x3348 -x3347 x3346 x3345 x3344 x3343 x3342 x3341 -x3340 -x3339 -x3338 -x3337
1.39/1.41 v -x3336 -x3335 -x3334 -x3333 -x3332 -x3331 -x3330 -x3329 -x3328 -x3327 -x3326 -x3325 -x3324 -x3323 -x3322 -x3321 -x3320
1.39/1.41 v -x3319 -x3318 -x3317 -x3316 -x3315 -x3314 -x3313 -x3312 -x3311 -x3310 -x3309 -x3308 -x3307 -x3306 -x3305 -x3304 -x3303 -x3302
1.39/1.41 v -x3301 -x3300 -x3299 -x3298 -x3297 -x3296 -x3295 -x3294 -x3293 -x3292 -x3291 -x3290 -x3289 -x3288 -x3287 -x3286 -x3285 -x3284
1.39/1.41 v -x3283 -x3282 -x3281 -x3280 -x3279 x3278 x3277 x3276 x3275 x3274 x3273 x3272 -x3271 -x3270 -x3269 -x3268 -x3267 -x3266 -x3265
1.39/1.41 v -x3264 -x3263 -x3262 -x3261 -x3260 -x3259 -x3258 -x3257 -x3256 -x3255 -x3254 -x3253 -x3252 -x3251 -x3250 -x3249 -x3248 -x3247
1.39/1.41 v -x3246 -x3245 -x3244 -x3243 -x3242 -x3241 -x3240 -x3239 -x3238 -x3237 -x3236 -x3235 -x3234 -x3233 -x3232 -x3231 -x3230 -x3229
1.39/1.41 v -x3228 -x3227 -x3226 -x3225 -x3224 -x3223 -x3222 -x3221 -x3220 -x3219 -x3218 -x3217 x3216 x3215 x3214 x3213 x3212 -x3211
1.39/1.41 v -x3210 -x3209 -x3208 -x3207 -x3206 -x3205 -x3204 -x3203 -x3202 -x3201 -x3200 -x3199 -x3198 -x3197 -x3196 -x3195 -x3194 -x3193
1.39/1.41 v -x3192 -x3191 -x3190 -x3189 -x3188 -x3187 -x3186 -x3185 -x3184 -x3183 -x3182 -x3181 -x3180 -x3179 -x3178 -x3177 -x3176 -x3175
1.39/1.41 v -x3174 -x3173 -x3172 -x3171 -x3170 -x3169 -x3168 -x3167 -x3166 -x3165 -x3164 -x3163 -x3162 -x3161 -x3160 -x3159 -x3158 -x3157
1.39/1.41 v -x3156 -x3155 -x3154 -x3153 -x3152 -x3151 -x3150 -x3149 -x3148 -x3147 x3146 -x3145 -x3144 -x3143 -x3142 -x3141 -x3140 -x3139
1.39/1.41 v -x3138 -x3137 -x3136 -x3135 -x3134 -x3133 -x3132 -x3131 -x3130 -x3129 -x3128 -x3127 -x3126 -x3125 -x3124 -x3123 -x3122 -x3121
1.39/1.41 v -x3120 -x3119 -x3118 -x3117 -x3116 -x3115 -x3114 -x3113 -x3112 -x3111 -x3110 -x3109 -x3108 -x3107 -x3106 -x3105 -x3104 -x3103
1.39/1.41 v -x3102 -x3101 -x3100 -x3099 -x3098 -x3097 -x3096 -x3095 -x3094 -x3093 -x3092 -x3091 -x3090 -x3089 -x3088 -x3087 -x3086
1.39/1.41 v x3085 x3084 x3083 x3082 x3081 x3080 x3079 x3078 x3077 -x3076 -x3075 -x3074 -x3073 -x3072 -x3071 -x3070 -x3069 -x3068 -x3067 -x3066
1.39/1.41 v -x3065 -x3064 -x3063 -x3062 -x3061 -x3060 -x3059 -x3058 -x3057 -x3056 -x3055 -x3054 -x3053 -x3052 -x3051 -x3050 -x3049
1.39/1.41 v -x3048 -x3047 -x3046 -x3045 -x3044 -x3043 -x3042 -x3041 -x3040 -x3039 -x3038 -x3037 -x3036 -x3035 -x3034 -x3033 -x3032 -x3031
1.39/1.41 v -x3030 -x3029 -x3028 -x3027 -x3026 -x3025 -x3024 -x3023 -x3022 -x3021 -x3020 -x3019 -x3018 -x3017 -x3016 -x3015 -x3014 x3013
1.39/1.41 v x3012 x3011 x3010 x3009 x3008 x3007 x3006 x3005 x3004 -x3003 -x3002 -x3001 -x3000 -x2999 -x2998 -x2997 -x2996 -x2995 -x2994
1.39/1.41 v -x2993 -x2992 -x2991 -x2990 -x2989 -x2988 -x2987 -x2986 -x2985 -x2984 -x2983 -x2982 -x2981 -x2980 -x2979 -x2978 -x2977 -x2976
1.39/1.41 v -x2975 -x2974 -x2973 -x2972 -x2971 -x2970 -x2969 -x2968 -x2967 -x2966 -x2965 -x2964 -x2963 -x2962 -x2961 -x2960 -x2959 -x2958
1.39/1.41 v -x2957 -x2956 -x2955 -x2954 -x2953 x2952 x2951 x2950 x2949 x2948 x2947 x2946 x2945 x2944 x2943 -x2942 -x2941 -x2940 -x2939
1.39/1.41 v -x2938 -x2937 -x2936 -x2935 -x2934 -x2933 -x2932 -x2931 -x2930 -x2929 -x2928 -x2927 -x2926 -x2925 -x2924 -x2923 -x2922 -x2921
1.39/1.41 v -x2920 -x2919 -x2918 -x2917 -x2916 -x2915 -x2914 -x2913 -x2912 -x2911 -x2910 -x2909 -x2908 -x2907 -x2906 -x2905 -x2904 -x2903
1.39/1.41 v -x2902 -x2901 -x2900 -x2899 -x2898 -x2897 -x2896 -x2895 -x2894 -x2893 x2892 x2891 x2890 x2889 x2888 x2887 x2886 x2885 x2884
1.39/1.41 v -x2883 -x2882 -x2881 -x2880 -x2879 -x2878 -x2877 -x2876 -x2875 -x2874 -x2873 -x2872 -x2871 -x2870 -x2869 -x2868 -x2867 -x2866
1.39/1.41 v -x2865 -x2864 -x2863 -x2862 -x2861 -x2860 -x2859 -x2858 -x2857 -x2856 -x2855 -x2854 -x2853 -x2852 -x2851 -x2850 -x2849 -x2848
1.39/1.41 v -x2847 -x2846 -x2845 -x2844 -x2843 -x2842 -x2841 -x2840 -x2839 -x2838 -x2837 -x2836 -x2835 -x2834 -x2833 -x2832 -x2831 -x2830
1.39/1.41 v -x2829 -x2828 -x2827 -x2826 -x2825 -x2824 -x2823 -x2822 x2821 x2820 x2819 x2818 x2817 x2816 x2815 x2814 -x2813 -x2812 -x2811
1.39/1.41 v -x2810 -x2809 -x2808 -x2807 -x2806 -x2805 -x2804 -x2803 -x2802 -x2801 -x2800 -x2799 -x2798 -x2797 -x2796 -x2795 -x2794 -x2793
1.39/1.41 v -x2792 -x2791 -x2790 -x2789 -x2788 -x2787 -x2786 -x2785 -x2784 -x2783 -x2782 -x2781 -x2780 -x2779 -x2778 -x2777 -x2776 -x2775
1.39/1.41 v -x2774 -x2773 -x2772 -x2771 -x2770 -x2769 -x2768 -x2767 -x2766 -x2765 -x2764 -x2763 -x2762 -x2761 -x2760 -x2759 -x2758
1.39/1.41 v -x2757 x2756 x2755 x2754 x2753 x2752 -x2751 -x2750 -x2749 -x2748 -x2747 -x2746 -x2745 -x2744 -x2743 -x2742 -x2741 -x2740 -x2739
1.39/1.41 v -x2738 -x2737 -x2736 -x2735 -x2734 -x2733 -x2732 -x2731 -x2730 -x2729 -x2728 -x2727 -x2726 -x2725 -x2724 -x2723 -x2722 -x2721
1.39/1.41 v -x2720 -x2719 -x2718 -x2717 -x2716 -x2715 -x2714 -x2713 -x2712 x2711 x2710 -x2709 -x2708 -x2707 -x2706 -x2705 -x2704 -x2703
1.39/1.41 v -x2702 -x2701 -x2700 -x2699 -x2698 -x2697 -x2696 -x2695 -x2694 -x2693 -x2692 -x2691 -x2690 -x2689 -x2688 -x2687 -x2686 -x2685
1.39/1.41 v -x2684 -x2683 -x2682 -x2681 -x2680 -x2679 -x2678 -x2677 -x2676 -x2675 -x2674 -x2673 -x2672 -x2671 -x2670 -x2669 -x2668 -x2667
1.39/1.41 v -x2666 -x2665 -x2664 -x2663 -x2662 -x2661 -x2660 -x2659 -x2658 -x2657 -x2656 -x2655 -x2654 -x2653 -x2652 -x2651 -x2650 -x2649
1.39/1.41 v -x2648 x2647 x2646 x2645 x2644 x2643 -x2642 -x2641 -x2640 -x2639 -x2638 -x2637 -x2636 -x2635 -x2634 -x2633 -x2632 -x2631
1.39/1.41 v -x2630 -x2629 -x2628 -x2627 -x2626 -x2625 -x2624 -x2623 -x2622 -x2621 -x2620 -x2619 -x2618 -x2617 -x2616 -x2615 -x2614 -x2613
1.39/1.41 v -x2612 -x2611 -x2610 -x2609 -x2608 -x2607 -x2606 -x2605 -x2604 -x2603 -x2602 -x2601 -x2600 -x2599 -x2598 -x2597 -x2596 -x2595
1.39/1.41 v -x2594 -x2593 -x2592 -x2591 -x2590 -x2589 -x2588 -x2587 -x2586 -x2585 -x2584 -x2583 -x2582 -x2581 x2580 x2579 x2578 x2577
1.39/1.41 v x2576 x2575 x2574 x2573 x2572 -x2571 -x2570 -x2569 -x2568 -x2567 -x2566 -x2565 -x2564 -x2563 -x2562 -x2561 -x2560 -x2559 -x2558
1.39/1.41 v -x2557 -x2556 -x2555 -x2554 -x2553 -x2552 -x2551 -x2550 -x2549 -x2548 -x2547 -x2546 -x2545 -x2544 -x2543 -x2542 -x2541 -x2540
1.39/1.41 v -x2539 -x2538 -x2537 -x2536 -x2535 -x2534 -x2533 -x2532 -x2531 -x2530 -x2529 -x2528 -x2527 -x2526 -x2525 -x2524 -x2523 -x2522
1.39/1.41 v -x2521 -x2520 -x2519 -x2518 -x2517 -x2516 -x2515 -x2514 -x2513 -x2512 -x2511 -x2510 -x2509 -x2508 x2507 x2506 x2505 x2504
1.39/1.41 v x2503 x2502 x2501 x2500 x2499 -x2498 -x2497 -x2496 -x2495 -x2494 -x2493 -x2492 -x2491 -x2490 -x2489 -x2488 -x2487 -x2486 -x2485
1.39/1.41 v -x2484 -x2483 -x2482 -x2481 -x2480 -x2479 -x2478 -x2477 -x2476 -x2475 -x2474 -x2473 -x2472 -x2471 -x2470 -x2469 -x2468
1.39/1.41 v -x2467 -x2466 -x2465 -x2464 -x2463 -x2462 -x2461 -x2460 -x2459 -x2458 -x2457 -x2456 -x2455 -x2454 -x2453 -x2452 -x2451 -x2450
1.39/1.41 v -x2449 -x2448 -x2447 -x2446 -x2445 -x2444 -x2443 -x2442 -x2441 -x2440 -x2439 -x2438 -x2437 x2436 x2435 x2434 x2433 x2432 x2431
1.39/1.41 v x2430 x2429 x2428 -x2427 -x2426 -x2425 -x2424 -x2423 -x2422 -x2421 -x2420 -x2419 -x2418 -x2417 -x2416 -x2415 -x2414 -x2413
1.39/1.41 v -x2412 -x2411 -x2410 -x2409 -x2408 -x2407 -x2406 -x2405 -x2404 -x2403 -x2402 -x2401 -x2400 -x2399 -x2398 -x2397 -x2396 -x2395
1.39/1.41 v -x2394 -x2393 -x2392 -x2391 -x2390 -x2389 -x2388 -x2387 -x2386 -x2385 -x2384 -x2383 -x2382 -x2381 -x2380 x2379 x2378 -x2377
1.39/1.41 v -x2376 -x2375 -x2374 -x2373 -x2372 -x2371 -x2370 -x2369 -x2368 -x2367 -x2366 -x2365 -x2364 -x2363 -x2362 -x2361 -x2360 -x2359
1.39/1.41 v -x2358 -x2357 -x2356 -x2355 -x2354 -x2353 -x2352 -x2351 -x2350 -x2349 -x2348 -x2347 -x2346 -x2345 -x2344 -x2343 -x2342 -x2341
1.39/1.41 v -x2340 -x2339 -x2338 -x2337 -x2336 -x2335 -x2334 -x2333 -x2332 -x2331 -x2330 -x2329 -x2328 -x2327 -x2326 -x2325 -x2324 -x2323
1.39/1.41 v -x2322 -x2321 -x2320 -x2319 -x2318 -x2317 -x2316 -x2315 -x2314 -x2313 -x2312 -x2311 -x2310 -x2309 -x2308 -x2307 -x2306 -x2305
1.39/1.41 v -x2304 x2303 x2302 x2301 x2300 -x2299 -x2298 -x2297 -x2296 -x2295 -x2294 -x2293 -x2292 -x2291 -x2290 -x2289 -x2288 -x2287
1.39/1.41 v -x2286 -x2285 -x2284 -x2283 -x2282 -x2281 -x2280 -x2279 -x2278 -x2277 -x2276 -x2275 -x2274 -x2273 -x2272 -x2271 -x2270 -x2269
1.39/1.41 v -x2268 -x2267 -x2266 -x2265 -x2264 -x2263 -x2262 -x2261 -x2260 -x2259 -x2258 -x2257 -x2256 -x2255 -x2254 x2253 x2252 x2251
1.39/1.41 v x2250 -x2249 -x2248 -x2247 -x2246 -x2245 -x2244 -x2243 -x2242 -x2241 -x2240 -x2239 -x2238 -x2237 -x2236 -x2235 -x2234 -x2233
1.39/1.41 v -x2232 -x2231 -x2230 -x2229 -x2228 -x2227 -x2226 -x2225 -x2224 -x2223 -x2222 -x2221 -x2220 -x2219 -x2218 -x2217 -x2216 -x2215
1.39/1.41 v -x2214 -x2213 -x2212 -x2211 -x2210 -x2209 -x2208 -x2207 -x2206 -x2205 -x2204 -x2203 -x2202 -x2201 -x2200 -x2199 -x2198 -x2197
1.39/1.41 v -x2196 -x2195 -x2194 -x2193 -x2192 -x2191 -x2190 -x2189 -x2188 x2187 x2186 x2185 x2184 x2183 x2182 x2181 x2180 x2179 -x2178
1.39/1.41 v -x2177 -x2176 -x2175 -x2174 -x2173 -x2172 -x2171 -x2170 -x2169 -x2168 -x2167 -x2166 -x2165 -x2164 -x2163 -x2162 -x2161 -x2160
1.39/1.41 v -x2159 -x2158 -x2157 -x2156 -x2155 -x2154 -x2153 -x2152 -x2151 -x2150 -x2149 x2148 x2147 x2146 -x2145 -x2144 -x2143 -x2142
1.39/1.41 v -x2141 -x2140 -x2139 -x2138 -x2137 -x2136 -x2135 -x2134 -x2133 -x2132 -x2131 -x2130 -x2129 -x2128 -x2127 -x2126 -x2125 -x2124
1.39/1.41 v -x2123 -x2122 -x2121 -x2120 -x2119 -x2118 -x2117 -x2116 -x2115 -x2114 -x2113 -x2112 -x2111 -x2110 -x2109 -x2108 -x2107 -x2106
1.39/1.41 v -x2105 -x2104 -x2103 -x2102 -x2101 -x2100 -x2099 -x2098 -x2097 -x2096 -x2095 -x2094 -x2093 -x2092 -x2091 -x2090 -x2089 -x2088
1.39/1.41 v -x2087 -x2086 -x2085 -x2084 -x2083 -x2082 -x2081 -x2080 -x2079 -x2078 -x2077 -x2076 -x2075 -x2074 -x2073 -x2072 -x2071 -x2070
1.39/1.41 v -x2069 -x2068 -x2067 -x2066 -x2065 -x2064 -x2063 -x2062 -x2061 -x2060 -x2059 -x2058 -x2057 -x2056 -x2055 x2054 x2053 x2052
1.39/1.41 v x2051 x2050 x2049 x2048 x2047 -x2046 -x2045 -x2044 -x2043 -x2042 -x2041 -x2040 -x2039 -x2038 -x2037 -x2036 -x2035 -x2034 -x2033
1.39/1.41 v -x2032 -x2031 -x2030 -x2029 -x2028 -x2027 -x2026 -x2025 -x2024 -x2023 -x2022 -x2021 -x2020 -x2019 -x2018 -x2017 -x2016
1.39/1.41 v -x2015 -x2014 -x2013 -x2012 -x2011 -x2010 -x2009 -x2008 -x2007 -x2006 -x2005 -x2004 -x2003 -x2002 -x2001 -x2000 -x1999 -x1998
1.39/1.41 v -x1997 -x1996 -x1995 -x1994 -x1993 -x1992 -x1991 -x1990 x1989 x1988 x1987 x1986 x1985 -x1984 -x1983 -x1982 -x1981 -x1980 -x1979
1.39/1.41 v -x1978 -x1977 -x1976 -x1975 -x1974 -x1973 -x1972 -x1971 -x1970 -x1969 -x1968 -x1967 -x1966 -x1965 -x1964 -x1963 -x1962 -x1961
1.39/1.41 v -x1960 -x1959 -x1958 -x1957 -x1956 -x1955 -x1954 -x1953 -x1952 -x1951 -x1950 -x1949 -x1948 -x1947 -x1946 -x1945 -x1944 -x1943
1.39/1.41 v -x1942 -x1941 x1940 x1939 x1938 x1937 x1936 x1935 x1934 x1933 x1932 -x1931 -x1930 -x1929 -x1928 -x1927 -x1926 -x1925 -x1924
1.39/1.41 v -x1923 -x1921 -x1920 -x1919 -x1918 -x1917 -x1916 -x1915 -x1914 -x1913 -x1912 -x1911 -x1910 -x1909 -x1908 -x1907 -x1906 -x1905
1.39/1.41 v -x1904 -x1903 -x1902 -x1901 -x1900 -x1899 -x1898 -x1897 -x1896 -x1895 -x1894 -x1893 -x1892 -x1891 -x1890 -x1889 -x1888
1.39/1.41 v -x1887 -x1886 -x1885 -x1884 -x1883 -x1882 -x1881 -x1880 -x1879 -x1878 -x1877 -x1876 -x1875 -x1874 -x1873 -x1872 -x1871 -x1870
1.39/1.41 v -x1869 -x1868 -x1867 -x1866 -x1865 -x1864 -x1863 -x1862 -x1861 x1860 x1859 x1858 x1857 x1856 x1855 x1854 -x1853 -x1852 -x1851
1.39/1.41 v -x1850 -x1849 -x1848 -x1847 -x1846 -x1845 -x1844 -x1843 -x1842 -x1841 -x1840 -x1839 -x1838 -x1837 -x1836 -x1835 -x1834 -x1833
1.39/1.41 v -x1832 -x1831 -x1830 -x1829 -x1828 -x1827 -x1826 -x1825 -x1824 -x1823 -x1822 -x1821 -x1820 -x1819 -x1818 -x1817 -x1816 -x1815
1.39/1.41 v -x1814 -x1813 -x1812 -x1811 -x1810 -x1809 -x1808 -x1807 -x1806 -x1805 -x1804 -x1803 -x1802 -x1801 -x1800 -x1799 x1798 x1797
1.39/1.41 v -x1796 -x1795 -x1794 -x1793 -x1792 -x1791 -x1790 -x1789 -x1788 -x1787 -x1786 -x1785 -x1784 -x1783 -x1782 -x1781 -x1780 -x1779
1.39/1.41 v -x1778 -x1777 -x1776 -x1775 -x1774 -x1773 -x1772 -x1771 -x1770 -x1769 -x1768 -x1767 -x1766 -x1765 -x1764 -x1763 -x1762 -x1761
1.39/1.41 v -x1760 -x1759 -x1758 -x1757 -x1756 -x1755 -x1754 -x1753 -x1752 -x1751 -x1750 -x1749 -x1748 -x1747 -x1746 -x1745 -x1744 -x1743
1.39/1.41 v -x1742 -x1741 -x1740 -x1739 -x1738 -x1737 x1736 x1735 x1734 x1733 x1732 x1731 x1730 x1729 -x1728 -x1727 -x1726 -x1725 -x1724
1.39/1.41 v -x1723 -x1722 -x1721 -x1720 -x1719 -x1718 -x1717 -x1716 -x1715 -x1714 -x1713 -x1712 -x1711 -x1710 -x1709 -x1708 -x1707
1.39/1.41 v -x1706 -x1705 -x1704 -x1703 -x1702 -x1701 -x1700 -x1699 -x1698 -x1697 -x1696 -x1695 -x1694 -x1693 -x1692 -x1691 -x1690 -x1689
1.39/1.41 v -x1688 -x1687 -x1686 -x1685 -x1684 -x1683 -x1682 -x1681 -x1680 -x1679 -x1678 -x1677 -x1676 -x1675 x1674 x1673 x1672 x1671 x1670
1.39/1.41 v x1669 x1668 x1667 x1666 x1665 x1664 x1663 x1662 x1661 -x1660 -x1659 -x1658 -x1657 -x1656 -x1655 -x1654 -x1653 -x1652 -x1651
1.39/1.41 v -x1650 -x1649 -x1648 -x1647 -x1646 -x1645 -x1644 -x1643 -x1642 -x1641 -x1640 -x1639 -x1638 -x1637 -x1636 -x1635 -x1634 -x1633
1.39/1.41 v -x1632 -x1631 -x1630 -x1629 -x1628 -x1627 -x1626 -x1625 -x1624 -x1623 -x1622 -x1621 -x1620 -x1619 -x1618 -x1617 -x1616 -x1615
1.39/1.41 v -x1614 -x1613 x1612 x1611 x1610 x1609 x1608 x1607 x1606 x1605 x1604 x1603 x1602 x1601 x1600 x1599 x1598 x1597 x1596 -x1595
1.39/1.41 v -x1594 -x1593 -x1592 -x1591 -x1590 -x1589 -x1588 -x1587 -x1586 -x1585 -x1584 -x1583 -x1582 -x1581 -x1580 -x1579 -x1578 -x1577
1.39/1.41 v -x1576 -x1575 -x1574 -x1573 -x1572 -x1571 -x1570 -x1569 -x1568 -x1567 -x1566 -x1565 -x1564 -x1563 -x1562 -x1561 -x1560 -x1559
1.39/1.41 v -x1558 -x1557 -x1556 -x1555 -x1554 -x1553 -x1552 -x1551 x1550 x1549 x1548 x1547 x1546 x1545 x1544 x1543 x1542 x1541 x1540
1.39/1.41 v x1539 x1538 x1537 x1536 x1535 -x1534 -x1533 -x1532 -x1531 -x1530 -x1529 -x1528 -x1527 -x1526 -x1525 -x1524 -x1523 -x1522 -x1521
1.39/1.41 v -x1520 -x1519 -x1518 -x1517 -x1516 -x1515 -x1514 -x1513 -x1512 -x1511 -x1510 -x1509 -x1508 -x1507 -x1506 -x1505 -x1504 -x1503
1.39/1.41 v -x1502 -x1501 -x1500 -x1499 -x1498 -x1497 -x1496 -x1495 -x1494 -x1493 -x1492 -x1491 -x1490 -x1489 x1488 x1487 x1486 x1485
1.39/1.41 v x1484 x1483 x1482 x1481 x1480 x1479 x1478 x1477 x1476 x1475 x1474 x1473 x1472 x1471 x1470 x1469 x1468 x1467 -x1466 -x1465
1.39/1.41 v -x1464 -x1463 -x1462 -x1461 -x1460 -x1459 -x1458 -x1457 -x1456 -x1455 -x1454 -x1453 -x1452 -x1451 -x1450 -x1449 -x1448 -x1447
1.39/1.41 v -x1446 -x1445 -x1444 -x1443 -x1442 -x1441 -x1440 -x1439 -x1438 -x1437 -x1436 -x1435 -x1434 -x1433 -x1432 -x1431 -x1430 -x1429
1.39/1.41 v -x1428 -x1427 x1426 x1425 x1424 x1423 x1422 x1421 x1420 x1419 -x1418 -x1417 -x1416 -x1415 -x1414 -x1413 -x1412 -x1411 -x1410
1.39/1.41 v -x1409 -x1408 -x1407 -x1406 -x1405 -x1404 -x1403 -x1402 -x1401 -x1400 -x1399 -x1398 -x1397 -x1396 -x1395 -x1394 -x1393 -x1392
1.39/1.41 v -x1391 -x1390 -x1389 -x1388 -x1387 -x1386 -x1385 -x1384 -x1383 -x1382 -x1381 -x1380 -x1379 -x1378 -x1377 -x1376 -x1375 -x1374
1.39/1.41 v -x1373 -x1372 -x1371 -x1370 -x1369 -x1368 -x1367 -x1366 -x1365 x1364 x1363 x1362 x1361 x1360 x1359 x1358 x1357 x1356 x1355
1.39/1.41 v x1354 x1353 x1352 x1351 x1350 -x1349 -x1348 -x1347 -x1346 -x1345 -x1344 -x1343 -x1342 -x1341 -x1340 -x1339 -x1338 -x1337 -x1336
1.39/1.41 v -x1335 -x1334 -x1333 -x1332 -x1331 -x1330 -x1329 -x1328 -x1327 -x1326 -x1325 -x1324 -x1323 -x1322 -x1321 -x1320 -x1319 -x1318
1.39/1.41 v -x1317 -x1316 -x1315 -x1314 -x1313 -x1312 -x1311 -x1310 -x1309 -x1308 -x1307 -x1306 -x1305 -x1304 -x1303 x1302 x1301 x1300
1.39/1.41 v x1299 x1298 x1297 x1296 x1295 x1294 x1293 x1292 x1291 x1290 -x1289 -x1288 -x1287 -x1286 -x1285 -x1284 -x1283 -x1282 -x1281
1.39/1.41 v -x1280 -x1279 -x1278 -x1277 -x1276 -x1275 -x1274 -x1273 -x1272 -x1271 -x1270 -x1269 -x1268 -x1267 -x1266 -x1265 -x1264 -x1263
1.39/1.41 v -x1262 -x1261 -x1260 -x1259 -x1258 -x1257 -x1256 -x1255 -x1254 -x1253 -x1252 -x1251 -x1250 -x1249 -x1248 -x1247 -x1246 -x1245
1.39/1.41 v -x1244 -x1243 -x1242 -x1241 x1240 x1239 x1238 x1237 x1236 x1235 x1234 x1233 x1232 x1231 x1230 x1229 x1228 x1227 x1226 x1225
1.39/1.41 v x1224 -x1223 -x1222 -x1221 -x1220 -x1219 -x1218 -x1217 -x1216 -x1215 -x1214 -x1213 -x1212 -x1211 -x1210 -x1209 -x1208 -x1207
1.39/1.41 v -x1206 -x1205 -x1204 -x1203 -x1202 -x1201 -x1200 -x1199 -x1198 -x1197 -x1196 -x1195 -x1194 -x1193 -x1192 -x1191 -x1190 -x1189
1.39/1.41 v -x1188 -x1187 -x1186 -x1185 -x1184 -x1183 -x1182 -x1181 -x1180 -x1179 x1178 x1177 x1176 x1175 x1174 x1173 x1172 x1171 x1170
1.39/1.41 v x1169 x1168 x1167 x1166 x1165 x1164 x1163 x1162 x1161 x1160 x1159 x1158 x1157 x1156 x1155 -x1154 -x1153 -x1152 -x1151 -x1150
1.39/1.41 v -x1149 -x1148 -x1147 -x1146 -x1145 -x1144 -x1143 -x1142 -x1141 -x1140 -x1139 -x1138 -x1137 -x1136 -x1135 -x1134 -x1133 -x1132
1.39/1.41 v -x1131 -x1130 -x1129 -x1128 -x1127 -x1126 -x1125 -x1124 -x1123 -x1122 -x1121 -x1120 -x1119 -x1118 -x1117 x1116 x1115 x1114
1.39/1.41 v x1113 x1112 x1111 x1110 x1109 x1108 x1107 x1106 x1105 x1104 x1103 x1102 x1101 x1100 x1099 x1098 x1097 x1096 x1095 x1094 x1093
1.39/1.41 v x1092 x1091 x1090 x1089 x1088 x1087 x1086 x1085 x1084 x1083 x1082 -x1081 -x1080 -x1079 -x1078 -x1077 -x1076 -x1075 -x1074
1.39/1.41 v -x1073 -x1072 -x1071 -x1070 -x1069 -x1068 -x1067 -x1066 -x1065 -x1064 -x1063 -x1062 -x1061 -x1060 -x1059 -x1058 -x1057 -x1056
1.39/1.41 v -x1055 x1054 x1053 x1052 x1051 x1050 x1049 x1048 x1047 x1046 x1045 x1044 x1043 x1042 x1041 x1040 x1039 x1038 x1037 x1036 x1035
1.39/1.41 v x1034 x1033 x1032 x1031 x1030 x1029 x1028 x1027 x1026 x1025 x1024 x1023 x1022 x1021 -x1020 -x1019 -x1018 -x1017 -x1016 -x1015
1.39/1.41 v -x1014 -x1013 -x1012 -x1011 -x1010 -x1009 -x1008 -x1007 -x1006 -x1005 -x1004 -x1003 -x1002 -x1001 -x1000 -x999 -x998 -x997
1.39/1.41 v -x996 -x995 -x994 -x993 x992 x991 x990 x989 x988 x987 x986 x985 x984 x983 x982 x981 x980 x979 x978 x977 x976 x975 x974 x973
1.39/1.41 v x972 x971 x970 x969 x968 x967 x966 x965 x964 x963 x962 -x961 -x960 -x959 -x958 -x957 -x956 -x955 -x954 -x953 -x952 -x951 -x950
1.39/1.41 v -x949 -x948 -x947 -x946 -x945 -x944 -x943 -x942 -x941 -x940 -x939 -x938 -x937 -x936 -x935 -x934 -x933 -x932 -x931 x930 x929
1.39/1.41 v x928 x927 x926 x925 x924 x923 x922 x921 x920 x919 x918 x917 x916 x915 x914 x913 x912 x911 x910 x909 x908 x907 x906 x905 x904
1.39/1.41 v x903 x902 x901 x900 x899 x898 x897 x896 x895 x894 x893 x892 -x891 -x890 -x889 -x888 -x887 -x886 -x885 -x884 -x883 -x882 -x881
1.39/1.41 v -x880 -x879 -x878 -x877 -x876 -x875 -x874 -x873 -x872 -x871 -x870 -x869 x868 x867 x866 x865 x864 x863 x862 x861 x860 x859
1.39/1.41 v x858 x857 x856 x855 x854 x853 x852 x851 x850 x849 x848 x847 x846 x845 x844 x843 x842 x841 x840 x839 x838 x837 x836 x835 x834
1.39/1.41 v x833 x832 x831 x830 -x829 -x828 -x827 -x826 -x825 -x824 -x823 -x822 -x821 -x820 -x819 -x818 -x817 -x816 -x815 -x814 -x813 -x812
1.39/1.41 v -x811 -x810 -x809 -x808 -x807 x806 x805 x804 x803 x802 x801 x800 x799 x798 x797 x796 x795 x794 x793 x792 x791 x790 x789 x788
1.39/1.41 v -x787 -x786 -x785 -x784 -x783 -x782 -x781 -x780 -x779 -x778 -x777 -x776 -x775 -x774 -x773 -x772 -x771 -x770 -x769 -x768 -x767
1.39/1.41 v -x766 -x765 -x764 -x763 -x762 -x761 -x760 -x759 -x758 -x757 -x756 -x755 -x754 -x753 -x752 -x751 -x750 -x749 -x748 -x747 -x746
1.39/1.41 v -x745 x744 x743 x742 x741 x740 x739 x738 x737 x736 x735 x734 x733 x732 x731 x730 x729 x728 x727 x726 x725 x724 x723 x722
1.39/1.41 v x721 -x720 -x719 -x718 -x717 -x716 -x715 -x714 -x713 -x712 -x711 -x710 -x709 -x708 -x707 -x706 -x705 -x704 -x703 -x702 -x701
1.39/1.41 v -x700 -x699 -x698 -x697 -x696 -x695 -x694 -x693 -x692 -x691 -x690 -x689 -x688 -x687 -x686 -x685 -x684 -x683 x682 x681 x680 x679
1.39/1.41 v x678 x677 x676 x675 x674 x673 x672 x671 x670 x669 x668 x667 x666 x665 x664 x663 x662 x661 x660 x659 x658 x657 x656 x655 x654
1.39/1.41 v x653 x652 x651 x650 -x649 -x648 -x647 -x646 -x645 -x644 -x643 -x642 -x641 -x640 -x639 -x638 -x637 -x636 -x635 -x634 -x633
1.39/1.41 v -x632 -x631 -x630 -x629 -x628 -x627 -x626 -x625 -x624 -x623 -x622 -x621 x620 x619 x618 x617 x616 x615 x614 x613 x612 x611 x610
1.39/1.41 v x609 x608 x607 x606 x605 x604 x603 x602 x601 x600 x599 x598 x597 x596 x595 x594 x593 x592 x591 x590 x589 x588 x587 x586 x585
1.39/1.41 v x584 x583 x582 x581 x580 x579 x578 x577 -x576 -x575 -x574 -x573 -x572 -x571 -x570 -x569 -x568 -x567 -x566 -x565 -x564 -x563
1.39/1.41 v -x562 -x561 -x560 -x559 x558 x557 x556 x555 x554 x553 x552 x551 x550 x549 x548 x547 x546 x545 x544 x543 x542 x541 x540 x539
1.39/1.41 v x538 x537 x536 x535 x534 x533 x532 x531 x530 x529 x528 x527 x526 x525 x524 x523 x522 x521 x520 x519 x518 x517 x516 x515 x514
1.39/1.41 v x513 x512 x511 x510 x509 x508 x507 x506 -x505 -x504 -x503 -x502 -x501 -x500 -x499 -x498 -x497 x496 x495 x494 x493 x492 x491
1.39/1.41 v x490 x489 x488 x487 x486 x485 x484 x483 x482 x481 x480 x479 x478 x477 x476 x475 x474 x473 x472 x471 x470 x469 x468 x467 x466
1.39/1.41 v x465 x464 x463 x462 x461 x460 x459 x458 x457 x456 -x455 -x454 -x453 -x452 -x451 -x450 -x449 -x448 -x447 -x446 -x445 -x444 -x443
1.39/1.41 v -x442 -x441 -x440 -x439 -x438 -x437 -x436 -x435 x434 x433 x432 x431 x430 x429 x428 x427 x426 x425 x424 x423 x422 x421 x420
1.39/1.41 v x419 x418 x417 x416 x415 x414 x413 x412 x411 x410 x409 x408 x407 x406 x405 x404 x403 x402 x401 x400 x399 x398 x397 x396 x395
1.39/1.41 v x394 x393 x392 x391 x390 x389 x388 x387 x386 x385 x384 x383 x382 x381 x380 x379 x378 -x377 -x376 -x375 -x374 -x373 x372 x371
1.39/1.41 v x370 x369 x368 x367 x366 x365 x364 x363 x362 x361 x360 x359 x358 x357 x356 x355 x354 x353 x352 x351 x350 x349 x348 x347 x346
1.39/1.41 v x345 x344 x343 x342 x341 x340 x339 x338 x337 x336 x335 x334 x333 x332 x331 x330 x329 x328 -x327 -x326 -x325 -x324 -x323 -x322
1.39/1.41 v -x321 -x320 -x319 -x318 -x317 -x316 -x315 -x314 -x313 -x312 -x311 x310 x309 x308 x307 x306 x305 x304 x303 x302 x301 x300 x299
1.39/1.41 v x298 x297 x296 x295 x294 x293 x292 x291 x290 x289 x288 x287 x286 x285 x284 x283 x282 x281 x280 x279 x278 x277 x276 x275 x274
1.39/1.41 v x273 x272 x271 x270 x269 x268 x267 x266 x265 x264 x263 x262 x261 x260 x259 x258 x257 -x256 -x255 -x254 -x253 -x252 -x251 -x250
1.39/1.41 v -x249 x248 x247 x246 x245 x244 x243 x242 x241 x240 x239 x238 x237 x236 x235 x234 x233 x232 x231 x230 x229 x228 x227 x226
1.39/1.41 v x225 x224 -x223 -x222 -x221 -x220 -x219 -x218 -x217 -x216 -x215 -x214 -x213 -x212 -x211 -x210 -x209 -x208 -x207 -x206 -x205
1.39/1.41 v -x204 -x203 -x202 -x201 -x200 -x199 -x198 -x197 -x196 -x195 -x194 -x193 -x192 -x191 -x190 -x189 -x188 -x187 x186 x185 x184 x183
1.39/1.41 v x182 x181 x180 x179 x178 x177 x176 x175 x174 x173 x172 x171 x170 x169 x168 x167 x166 x165 x164 x163 x162 x161 x160 x159 x158
1.39/1.41 v x157 x156 x155 x154 x153 x152 x151 x150 x149 x148 x147 x146 x145 x144 x143 x142 x141 x140 x139 x138 x137 x136 x135 x134 x133
1.39/1.41 v x132 x131 x130 x129 x128 x127 x126 x125 x124 x123 x122 x121 x120 x119 x118 x117 x116 x115 x114 x113 x112 x111 x110 x109 x108
1.39/1.41 v x107 x106 x105 x104 x103 x102 x101 x100 x99 x98 x97 x96 x95 x94 x93 x92 x91 x90 x89 x88 x87 x86 x85 x84 x83 x82 x81 x80 x79
1.39/1.41 v x78 x77 x76 x75 x74 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
1.39/1.41 v x47 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 x19 x18 x17
1.39/1.41 v x16 x15 x14 x13 x12 x11 x10 -x9 -x8 -x7 -x6 -x5 -x4 -x3 -x2 -x1 x1922
1.39/1.41 c SCIP Status : problem is solved [optimal solution found]
1.39/1.41 c Solving Time : 1.03
1.39/1.41 c Original Problem :
1.39/1.41 c Problem name : HOME/instance-2684661-1278432573.opb
1.39/1.41 c Variables : 3844 (3844 binary, 0 integer, 0 implicit integer, 0 continuous)
1.39/1.41 c Constraints : 12376 initial, 12376 maximal
1.39/1.41 c Presolved Problem :
1.39/1.41 c Problem name : t_HOME/instance-2684661-1278432573.opb
1.39/1.41 c Variables : 358 (358 binary, 0 integer, 0 implicit integer, 0 continuous)
1.39/1.41 c Constraints : 952 initial, 952 maximal
1.39/1.41 c Presolvers : Time FixedVars AggrVars ChgTypes ChgBounds AddHoles DelCons ChgSides ChgCoefs
1.39/1.41 c trivial : 0.00 180 0 0 0 0 0 0 0
1.39/1.41 c dualfix : 0.01 33 0 0 0 0 0 0 0
1.39/1.41 c boundshift : 0.00 0 0 0 0 0 0 0 0
1.39/1.41 c inttobinary : 0.00 0 0 0 0 0 0 0 0
1.39/1.41 c implics : 0.00 0 33 0 0 0 0 0 0
1.39/1.41 c probing : 0.00 0 0 0 0 0 0 0 0
1.39/1.41 c knapsack : 0.07 0 0 0 14 0 2 118 717
1.39/1.41 c setppc : 0.00 0 0 0 0 0 0 0 0
1.39/1.41 c linear : 0.62 2440 799 0 2597 0 11363 177 158
1.39/1.41 c logicor : 0.03 1 0 0 4 0 59 0 0
1.39/1.41 c root node : - 11 - - 11 - - - -
1.39/1.41 c Constraints : Number #Separate #Propagate #EnfoLP #EnfoPS Cutoffs DomReds Cuts Conss Children
1.39/1.41 c integral : 0 0 0 0 0 0 0 0 0 0
1.39/1.41 c knapsack : 157 1 2 0 0 0 0 75 0 0
1.39/1.41 c setppc : 4 1 2 0 0 0 0 0 0 0
1.39/1.41 c logicor : 791 1 2 0 0 0 0 0 0 0
1.39/1.41 c countsols : 0 0 0 0 0 0 0 0 0 0
1.39/1.41 c Constraint Timings : TotalTime Separate Propagate EnfoLP EnfoPS
1.39/1.41 c integral : 0.00 0.00 0.00 0.00 0.00
1.39/1.41 c knapsack : 0.01 0.01 0.00 0.00 0.00
1.39/1.41 c setppc : 0.00 0.00 0.00 0.00 0.00
1.39/1.41 c logicor : 0.00 0.00 0.00 0.00 0.00
1.39/1.41 c countsols : 0.00 0.00 0.00 0.00 0.00
1.39/1.41 c Propagators : Time Calls Cutoffs DomReds
1.39/1.41 c vbounds : 0.00 1 0 0
1.39/1.41 c rootredcost : 0.00 0 0 0
1.39/1.41 c pseudoobj : 0.00 0 0 0
1.39/1.41 c Conflict Analysis : Time Calls Success Conflicts Literals Reconvs ReconvLits LP Iters
1.39/1.41 c propagation : 0.00 0 0 0 0.0 0 0.0 -
1.39/1.41 c infeasible LP : 0.00 0 0 0 0.0 0 0.0 0
1.39/1.41 c bound exceed. LP : 0.00 0 0 0 0.0 0 0.0 0
1.39/1.41 c strong branching : 0.00 0 0 0 0.0 0 0.0 0
1.39/1.41 c pseudo solution : 0.00 1 0 0 0.0 0 0.0 -
1.39/1.41 c applied globally : - - - 0 0.0 - - -
1.39/1.41 c applied locally : - - - 0 0.0 - - -
1.39/1.42 c Separators : Time Calls Cutoffs DomReds Cuts Conss
1.39/1.42 c cut pool : 0.00 0 - - 0 - (maximal pool size: 229)
1.39/1.42 c redcost : 0.00 1 0 0 0 0
1.39/1.42 c impliedbounds : 0.00 1 0 0 63 0
1.39/1.42 c intobj : 0.00 0 0 0 0 0
1.39/1.42 c cgmip : 0.00 0 0 0 0 0
1.39/1.42 c gomory : 0.04 1 0 0 0 0
1.39/1.42 c strongcg : 0.04 1 0 0 490 0
1.39/1.42 c cmir : 0.00 0 0 0 0 0
1.39/1.42 c flowcover : 0.00 0 0 0 0 0
1.39/1.42 c clique : 0.01 1 0 0 8 0
1.39/1.42 c zerohalf : 0.00 0 0 0 0 0
1.39/1.42 c mcf : 0.00 1 0 0 0 0
1.39/1.42 c rapidlearning : 0.09 1 0 11 0 0
1.39/1.42 c Pricers : Time Calls Vars
1.39/1.42 c problem variables: 0.00 0 0
1.39/1.42 c Branching Rules : Time Calls Cutoffs DomReds Cuts Conss Children
1.39/1.42 c pscost : 0.00 0 0 0 0 0 0
1.39/1.42 c inference : 0.00 0 0 0 0 0 0
1.39/1.42 c mostinf : 0.00 0 0 0 0 0 0
1.39/1.42 c leastinf : 0.00 0 0 0 0 0 0
1.39/1.42 c fullstrong : 0.00 0 0 0 0 0 0
1.39/1.42 c allfullstrong : 0.00 0 0 0 0 0 0
1.39/1.42 c random : 0.00 0 0 0 0 0 0
1.39/1.42 c relpscost : 0.00 0 0 0 0 0 0
1.39/1.42 c Primal Heuristics : Time Calls Found
1.39/1.42 c LP solutions : 0.00 - 0
1.39/1.42 c pseudo solutions : 0.00 - 0
1.39/1.42 c trivial : 0.01 1 0
1.39/1.42 c simplerounding : 0.00 0 0
1.39/1.42 c zirounding : 0.00 0 0
1.39/1.42 c rounding : 0.00 0 0
1.39/1.42 c shifting : 0.00 0 0
1.39/1.42 c intshifting : 0.00 0 0
1.39/1.42 c oneopt : 0.00 0 0
1.39/1.42 c twoopt : 0.00 0 0
1.39/1.42 c fixandinfer : 0.00 0 0
1.39/1.42 c feaspump : 0.00 0 0
1.39/1.42 c coefdiving : 0.00 0 0
1.39/1.42 c pscostdiving : 0.00 0 0
1.39/1.42 c fracdiving : 0.00 0 0
1.39/1.42 c veclendiving : 0.00 0 0
1.39/1.42 c intdiving : 0.00 0 0
1.39/1.42 c actconsdiving : 0.00 0 0
1.39/1.42 c objpscostdiving : 0.00 0 0
1.39/1.42 c rootsoldiving : 0.00 0 0
1.39/1.42 c linesearchdiving : 0.00 0 0
1.39/1.42 c guideddiving : 0.00 0 0
1.39/1.42 c octane : 0.00 0 0
1.39/1.42 c rens : 0.00 0 0
1.39/1.42 c rins : 0.00 0 0
1.39/1.42 c localbranching : 0.00 0 0
1.39/1.42 c mutation : 0.00 0 0
1.39/1.42 c crossover : 0.00 0 0
1.39/1.42 c dins : 0.00 0 0
1.39/1.42 c undercover : 0.00 0 0
1.39/1.42 c nlp : 0.00 0 0
1.39/1.42 c trysol : 0.00 0 0
1.39/1.42 c LP : Time Calls Iterations Iter/call Iter/sec
1.39/1.42 c primal LP : 0.00 0 0 0.00 -
1.39/1.42 c dual LP : 0.01 1 184 184.00 18400.00
1.39/1.42 c lex dual LP : 0.00 0 0 0.00 -
1.39/1.42 c barrier LP : 0.00 0 0 0.00 -
1.39/1.42 c diving/probing LP: 0.00 0 0 0.00 -
1.39/1.42 c strong branching : 0.00 0 0 0.00 -
1.39/1.42 c (at root node) : - 0 0 0.00 -
1.39/1.42 c conflict analysis: 0.00 0 0 0.00 -
1.39/1.42 c B&B Tree :
1.39/1.42 c number of runs : 1
1.39/1.42 c nodes : 1
1.39/1.42 c nodes (total) : 1
1.39/1.42 c nodes left : 0
1.39/1.42 c max depth : 0
1.39/1.42 c max depth (total): 0
1.39/1.42 c backtracks : 0 (0.0%)
1.39/1.42 c delayed cutoffs : 0
1.39/1.42 c repropagations : 0 (0 domain reductions, 0 cutoffs)
1.39/1.42 c avg switch length: 2.00
1.39/1.42 c switching time : 0.00
1.39/1.42 c Solution :
1.39/1.42 c Solutions found : 1 (1 improvements)
1.39/1.42 c First Solution : +0.00000000000000e+00 (in run 1, after 1 nodes, 1.02 seconds, depth 0, found by <trysol>)
1.39/1.42 c Primal Bound : +0.00000000000000e+00 (in run 1, after 1 nodes, 1.02 seconds, depth 0, found by <trysol>)
1.39/1.42 c Dual Bound : +0.00000000000000e+00
1.39/1.42 c Gap : 0.00 %
1.39/1.42 c Root Dual Bound : +0.00000000000000e+00
1.39/1.42 c Root Iterations : 184
1.39/1.44 c Time complete: 1.44.