CUET · MATHS · PYQ PAPER 2025
Let the corner points of the bounded feasible region of the linear programming problem \(( LPP ) Z=a x+b y\) be \((0,0),(2,0),\left(\frac{20}{19}, \frac{45}{19}\right)\) and \((0,3)\).
If the optimal value of \(Z\) occurs at both points \((2,0)\) and \(\left(\frac{20}{19}, \frac{45}{19}\right)\), then the relation between \(a\) and \(b\) is:
- A \(a=3 b\)
- B \(5 a=2 b\)
- C \(2 a=5 b\)
- D \(3 a=2 b\)
Answer & Solution
Correct Answer
(C) \(2 a=5 b\)
Step-by-step Solution
Detailed explanation
\(Z_{(2,0)} = a(2) + b(0) = 2a\) \(Z_{(\frac{20}{19}, \frac{45}{19})} = a\left(\frac{20}{19}\right) + b\left(\frac{45}{19}\right) = \frac{20a + 45b}{19}\) \(2a = \frac{20a + 45b}{19}\) \(38a = 20a + 45b\) \(18a = 45b\) \(2a = 5b\)
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