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, how many whole units (i.e. integer) of X would be in the optimal integer solution? Assume that the non-negativity constraint always exists. a. 2 b. 3 c. 4 d. 5 e. None of the above.

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