The minimum and maximum values of the objective function f = 8x + 5y are 400 and 960
How to determine the minimum and the maximum values?
The vertices of the feasible region are given as:
(0, 100), (0, 80), (80, 60), (80, 0), and (120, 0)
The objective function is given as:
z = 8x + 5y
Calculate the value of the objective function using the vertices
F = 8 * 0 + 5 * 100 = 500
F = 8 * 0 + 5 * 80 = 400
F = 8 * 80 + 5 * 60 = 940
F = 8 * 80 + 5 * 0 = 640
F = 8 * 120 + 5 * 0 = 960
The minimum value above is 400 and the maximum value is 960
Hence, the minimum and maximum values of the objective function F = 8x + 5y are 400 and 960
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