Question: After finding the optimal integer solution to maximize the value of z = 30X + 70Y based on the following constraints: 4x + y
After finding the optimal integer solution to maximize the value of z = 30X + 70Y based on the following constraints: 4x + y <= 8 and 2x + 5y <= 18, which of the original 2 constraints has resources left over after determining the optimal integer solution? Assume that the non-negativity constraint always exists.
a.
4x + y <= 8
b.
2x + 5y <= 18
c.
Both of the two original constraints were used entirely.
d.
Both of the two original constraints have some resources left over.
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