Evaluate z=5x+3y at corners:
(0,0):0, (2,0):10, (20/19,45/19):235/19≈12.4, (0,3):9.
Max =235/19, Min =0. So (B) and (C) are true.
If corner points of a feasible region are (0, 0), (2, 0), (1920,1945) and (0, 3), then
(A) Maximum value of z=5x+3y is 10
(B) Minimum value of z=5x+3y is 0
(C) Maximum value of z=5x+3y is 19235 and minimum value is 0
(D) Maximum value of z=5x+3y is 10 and minimum value is 0
Choose the correct answer from the options given below :
Held on 15 Jun 2023 · Verified 13 Jul 2026.
(A) and (D) Only
(B) and (D) Only
(B) and (C) Only
(A), (B) and (D) Only
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