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.
E)None of the above

Question

Quizplus · Accepted Answer

A unique solution for a linear programming problem exists where the constraints intersect, and since the problem involves multiple constraints, the unique solution must exist at the intersection of two or more constraints. The non-negativity constraints and resource constraints can lead to feasible solutions, but they do not necessarily guarantee a unique one. The objective function identifies the direction of optimization but does not alone lead to a unique solution.

In Order for a Linear Programming Problem to Have a Unique