The Optimal Solution of the Linear Programming Problem Is at the Intersection

The optimal solution of the linear programming problem is at the intersection of constraints 1 and 2.
Max 2x₁ + x₂
s.t.4x₁ + 1x₂ < 400
4x₁ + 3x₂ < 600
1x₁ + 2x₂ $\le$ 300
x₁ ,x₂ > 0
a.Over what range can the coefficient of x₁ vary before the current solution is no longer optimal?
b.Over what range can the coefficient of x₂ vary before the current solution is no longer optimal?
c.Compute the dual prices for the three constraints.

Correct Answer:

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a.1.33 < c1

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