Solving the model
Prerequisites
- The Model is solved
Get the solution
- Information about Solution retrieval
The resulting output
For better understanding we visualized the output below.
By solving the model we generate the following output:
Optimizing the Model...
Optimize a model with 26 rows, 24 columns and 64 nonzeros
Variable types: 16 continuous, 8 integer (8 binary)
Coefficient statistics:
Matrix range [1e+00, 3e+01]
Objective range [5e+00, 9e+01]
Bounds range [1e+00, 7e+01]
RHS range [5e+00, 5e+01]
Presolve removed 16 rows and 7 columns
Presolve time: 0.00s
Presolved: 10 rows, 17 columns, 26 nonzeros
Variable types: 9 continuous, 8 integer (8 binary)
Root relaxation: objective 4.941667e+03, 9 iterations, 0.00 seconds
Nodes | Current Node | Objective Bounds | Work
Expl Unexpl | Obj Depth IntInf | Incumbent BestBd Gap | It/Node Time
0 0 4941.66667 0 2 - 4941.66667 - - 0s
H 0 0 4955.0000000 4941.66667 0.27% - 0s
0 0 cutoff 0 4955.00000 4955.00000 0.00% - 0s
Explored 1 nodes (10 simplex iterations) in 0.14 seconds
Thread count was 6 (of 6 available processors)
Solution count 1: 4955
Optimal solution found (tolerance 0.00e+00)
Best objective 4.955000000000e+03, best bound 4.955000000000e+03, gap 0.0000%
[totalCost, 4955]
machines_active_in_period_1 : 0
machines_active_in_period_2 : 1
machines_active_in_period_3 : 1
machines_active_in_period_4 : 1
machines_active_in_period_5 : 1
machines_active_in_period_6 : 1
machines_active_in_period_7 : 1
machines_active_in_period_8 : 1
produced_amount_period_1 : 0
produced_amount_period_2 : 10
produced_amount_period_3 : 25
produced_amount_period_4 : 20
produced_amount_period_5 : 25
produced_amount_period_6 : 20
produced_amount_period_7 : 15
produced_amount_period_8 : 10
storage_end_of_period_1 : 0
storage_end_of_period_2 : 0
storage_end_of_period_3 : 0
storage_end_of_period_4 : 5
storage_end_of_period_5 : 20
storage_end_of_period_6 : 35
storage_end_of_period_7 : 0
storage_end_of_period_8 : 0