Suppose you have a linear integer optimization problem. You solve the problem as a linear optimization problem by ignoring the integer constraints and obtain an integer optimal solution (i. e., your model did not require the variables to be integer, but it turned out when you solved the problem Solver found an optimal answer where the variables are integer).

Which of the statements below are correct (choose only one):

A. You can categorically state that you have the optimal solution to the integer optimization problem.

B. You can categorically state that you do not have the optimal solution to the integer optimization problem.

C. None of the above.

Option (A) is the correct answer to the given question.

Explanation:

The integer programming problem is also known as the computational optimization or the functionality method that main objective to limits the some or many of the parameters may be integer. The objective of linear optimization problem to make the objective function as well as integer constraints linear.

The integer programming problem conclusively specify of the optimised solution to the issue of the integral optimisation. All the other option are not correct for the linear integer optimization problem because they are not give objective function as well as integer constraints as linear.