Answer to Question #304867 in Operations Research for omer ali

Question #304867

Q2. Maximise 1170x1 + 1110x2

Subject to: 9x1 + 5x2 ≥ 500

7x1 + 9x2 ≥ 300

5x1 + 3x2 ≤ 1500

7x1 + 9x2 ≤ 1900

2x1 + 4x2 ≤ 1000

x1, x2 ≥ 0

-Find graphically the feasible region and the optimal solution.


1
Expert's answer
2022-03-03T08:11:36-0500

Given,

"\\text{Maximise}~ 1170x_{1} + 1110x_{2}\\\\\n\\text{subject to:}\\\\\n\\begin{aligned}\n9x_1 + 5x_2 &\u2265 500\\\\\n7x_1 + 9x_2 &\u2265 300\\\\\n5x_1 + 3x_2 &\u2264 1500\\\\\n7x_1 + 9x_2 &\u2264 1900\\\\\n2x_1 + 4x_2 &\u2264 1000\\\\\n x_1, x_2 &\u2265 0\n\\end{aligned}"


To solve it graphically, we consider the constraints as equations and draw straight lines.

"\\begin{aligned}\n9x_1 + 5x_2 &= 500~~\\qquad(1)\\\\\n7x_1 + 9x_2 &= 300~~\\qquad(2)\\\\\n5x_1 + 3x_2 &= 1500\\qquad(3)\\\\\n7x_1 + 9x_2 &= 1900\\qquad(4)\\\\\n2x_1 + 4x_2 &= 1000\\qquad(5)\\\\\n\\end{aligned}"

The graph plotted is shown in the following figure.





The region of feasibility is bounded by the extreme points ABCD. The values of the objective function at the extreme points are given in the following table:


"\\begin{array}{|c|c|}\n\\hline\n\\text{Extreme points}& \\text{Value of ~} z = 1170x_1+1110x_2\\\\\n\\hline\nA(0,100) & 111000\\\\\n&\\\\\nB(500\/9,0) & 65000\\\\\n&\\\\\nC(1900\/7,0) & \\dfrac{2223000}{7}\\\\\n&\\\\\nD(0,1900\/9) & \\dfrac{703000}{3}\\\\\n&\\\\\n\\hline\n\\end{array}"


Hence the maximum values occurs at C(1900/7,0) and the maximum value is "z = \\dfrac{2223000}{7}".


Need a fast expert's response?

Submit order

and get a quick answer at the best price

for any assignment or question with DETAILED EXPLANATIONS!

Comments

No comments. Be the first!

Leave a comment

LATEST TUTORIALS
New on Blog
APPROVED BY CLIENTS