A firm has prepared the following binary integer program to evaluate a number of potential new capital projects. The firm's goal is to maximize the net present value of their decision while not spending more than their currently available capital.

Max 100x₁ + 120x₂ + 90x₃ + 135x₄
s.t. 150x₁ + 200x₂ + 225x₃ + 175x₄ ≤ 500 {Constraint 1}
x₁ + x₂ + x₃ + x₄ ≥ 2 {Constraint 2}
x₂ + x₄ ≤ 1 {Constraint 3}
x₂ + x₃ ≥ 1 {Constraint 4}
x₁ = x₄ {Constraint 5}
xj = { 1, if project j is selected ; 0,otherwise }

Which constraint ensures that the firm will not spend more capital than it has available (assume that each potential project has a different cost)?

 

A. Constraint 1

B.Constraint 2

C.Constraint 3

D.Constraint 4

E.Constraint 5