Use the simplex method to solve the linear programming problem.
-Maximize $z=3 x_{1}+2 x_{2}$
Subject to: $2 \mathrm{x}_{1}+3 \mathrm{x}_{2} \leq 4$
$4 \mathrm{x}_{1}+2 \mathrm{x}_{2} \leq 12$
With
$$x_{1} \geq 0, x_{2} \geq 0$$
A) Maximum is 12 when $x_{1}=2, x_{2}=3$
B) Maximum is 9 when $x_{1}=3, x_{2}=0$
C) Maximum is 4 when $x_{1}=0, x_{2}=2$
D) Maximum is 6 when $x_{1}=2, x_{2}=0$

Question

Quizplus · Accepted Answer

The feasible region is bounded by the constraints. Evaluating the objective function at the vertices of the feasible region, the maximum value of $z$ is 6 when $x_{1}=2, x_{2}=0$.

Use the Simplex Method to Solve the Linear Programming Problem z=3x1+2x2z=3 x_{1}+2 x_{2}z=3x1​+2x2​

Use the Simplex Method to Solve the Linear Programming Problem $z=3 x_{1}+2 x_{2}$