For the feasible region OCDBO shown in the fi | vedclass

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(C) The corner points of the given feasible region $OCDBO$ are $O(0, 0)$,$C(10, 10)$,$D(10, 20)$,and $B(0, 25)$.We evaluate the objective function $z

Vedclass · Accepted Answer

$110$

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(C) The corner points of the given feasible region $OCDBO$ are $O(0, 0)$,$C(10, 10)$,$D(10, 20)$,and $B(0, 25)$.We evaluate the objective function $z = 3x + 4y$ at each corner point:$1$. At $O(0, 0)$: $z = 3(0) + 4(0) = 0$$2$. At $C(10, 10)$: $z = 3(10) + 4(10) = 30 + 40 = 70$$3$. At $D(10, 20)$: $z = 3(10) + 4(20) = 30 + 80 = 110$$4$. At $B(0, 25)$: $z = 3(0) + 4(25) = 0 + 100 = 100$Comparing the values $0, 70, 110,$ and $100$,the maximum value of $z$ is $110$.

For the feasible region $OCDBO$ shown in the figure,the maximum value of the objective function $z = 3x + 4y$ is:

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