In order for a linear programming problem to have a unique solution, the solution must exist
A)at the intersection of the non-negativity constraints.
B)at the intersection of a non-negativity constraint and a resource constraint.
C)at the intersection of the objective function and a constraint.
D)at the intersection of two or more constraints.

Question

Quizplus · Accepted Answer

In order for a linear programming problem to have a unique solution, the solution must exist at the intersection of two or more constraints. This is because the objective function can be optimized at multiple points, but only the intersection of multiple constraints will limit the feasible region to a single point.

In Order for a Linear Programming Problem to Have a Unique