What are the optimal values of x1, x2, and z?
Consider the following linear programming problem:
Max Z = $15x + $20y
Subject to : 8x + 5y 40
0.4x + y 4
Determine the values for x and y that will maximize revenue. Given this optimal revenue, what is the amount of slack associated with the first constraint?
This posting provides solution to a linear programming for revenue maximization through optimization