MHT CET · Maths · Linear Programming
The minimum value of the objective function \(\mathrm{Z}=5 x+8 \mathrm{y}\), subject to \(x+\mathrm{y} \geq 5\)
\(x \leq 4, y \leq 2, x \geq 0, y \geq 0\) occur at the point
- A \((5,0)\)
- B \((0,5)\)
- C \((4,2)\)
- D \((4,1)\)
Answer & Solution
Correct Answer
(D) \((4,1)\)
Step-by-step Solution
Detailed explanation
Feasible area is shaded.
Vertices of the feasible region are \(A \equiv(4,1), B \equiv(4,2), C \equiv(3,2)\)
\(\therefore Z(A)=(5 \times 4)+(8 \times 1)=20+8=28\)
\(Z(B)=(5 \times 4)+(8 \times 2)=20+16=36\)
\(Z(C)=(5 \times 3)+(8 \times 2)=15+16=31\)
Minima is at \((4,1)\)
Vertices of the feasible region are \(A \equiv(4,1), B \equiv(4,2), C \equiv(3,2)\)
\(\therefore Z(A)=(5 \times 4)+(8 \times 1)=20+8=28\)
\(Z(B)=(5 \times 4)+(8 \times 2)=20+16=36\)
\(Z(C)=(5 \times 3)+(8 \times 2)=15+16=31\)
Minima is at \((4,1)\)
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