T SUM NUM_NODES 7108
T SUM NUM_PRUNES 7
T SUM SEARCH_TIME 0.327505

Solving normal LP:
Solving with simplex method...done!
CPXlpopt ended with status 0!
CPXlpopt ended with lpstat 1!
Obj: w = 3 / 11 == 0.272727
Assigning optimum fraction and reducing LP.
temp_error_term = 0.0000001000
num_rounded = 9, num_remaining = 32
                                  w =          3 /         11 == 0.2727272727 =/= 0.2727272727
                     v1a(1,1,1,0,1) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(1,1,1,1,0) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(1,1,1,0,0) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(1,1,0,1,0) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(0,0,1,1,0) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(0,1,1,0,0) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(0,0,0,1,0) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(0,0,1,0,0) =          0 /          1 == 0.0000000000 =/= 0.0000000000
                     v1a(1,1,1,1,1) =         -2 /         11 == -0.1818181818 =/= -0.1818181818
                     v1a(1,0,1,1,1) =         -4 /         11 == -0.3636363636 =/= -0.3636363636
                     v1a(1,1,0,1,1) =         -4 /         11 == -0.3636363636 =/= -0.3636363636
                     v1a(1,0,0,1,1) =         -4 /         11 == -0.3636363636 =/= -0.3636363636
                     v1a(1,0,1,1,0) =         -3 /         11 == -0.2727272727 =/= -0.2727272727
                     v1a(1,1,0,0,1) =         -1 /         11 == -0.0909090909 =/= -0.0909090909
                     v1a(1,0,1,0,1) =         -4 /         11 == -0.3636363636 =/= -0.3636363636
                     v1a(1,0,0,0,1) =         -3 /         11 == -0.2727272727 =/= -0.2727272727
                     v1a(1,0,0,1,0) =         -3 /         11 == -0.2727272727 =/= -0.2727272727
                     v1a(1,0,1,0,0) =         -3 /         11 == -0.2727272727 =/= -0.2727272727
                     v1a(1,1,0,0,0) =          1 /         11 == 0.0909090909 =/= 0.0909090909
                     v1a(1,0,0,0,0) =         -2 /         11 == -0.1818181818 =/= -0.1818181818
                     v1a(0,1,1,1,1) =          3 /         44 == 0.0681818182 =/= 0.0681818182
                     v1a(0,0,1,1,1) =          1 /         11 == 0.0909090909 =/= 0.0909090909
                     v1a(0,1,0,1,1) =          2 /         11 == 0.1818181818 =/= 0.1818181818
                     v1a(0,1,1,0,1) =         -1 /         11 == -0.0909090909 =/= -0.0909090909
                     v1a(0,1,1,1,0) =          1 /         11 == 0.0909090909 =/= 0.0909090909
                     v1a(0,0,0,1,1) =          1 /         11 == 0.0909090909 =/= 0.0909090909
                     v1a(0,1,0,0,1) =          2 /         11 == 0.1818181818 =/= 0.1818181818
                     v1a(0,0,1,0,1) =          1 /         11 == 0.0909090909 =/= 0.0909090909
                     v1a(0,1,0,1,0) =          1 /         22 == 0.0454545455 =/= 0.0454545455
                     v1a(0,0,0,0,1) =          1 /         11 == 0.0909090909 =/= 0.0909090909
                     v1a(0,1,0,0,0) =          2 /         11 == 0.1818181818 =/= 0.1818181818

Maximum error with w : 0 / 1 == 0.000000
Maximum error without w : 0 / 1 == 0.000000
LP is feasible.
Optimum Value: 0.272727 == 3 / 11.
