Consider a LPP given by minimize Z = 6x + 10y | vedclass

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(B) The constraints are $x \geq 6, y \geq 2, 2x + y \geq 10, x \geq 0, y \geq 0$. $1$. Since $x \geq 6$,it automatically implies $x \geq 0$. Thus,$x \

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$2x + y \geq 10, x \geq 0, y \geq 0$

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(B) The constraints are $x \geq 6, y \geq 2, 2x + y \geq 10, x \geq 0, y \geq 0$. $1$. Since $x \geq 6$,it automatically implies $x \geq 0$. Thus,$x \geq 0$ is a redundant constraint. $2$. Since $y \geq 2$,it automatically implies $y \geq 0$. Thus,$y \geq 0$ is a redundant constraint. $3$. For the constraint $2x + y \geq 10$,we substitute the minimum values $x = 6$ and $y = 2$: $2(6) + 2 = 12 + 2 = 14$. Since $14 \geq 10$,the constraint $2x + y \geq 10$ is satisfied by the region defined by $x \geq 6$ and $y \geq 2$. Thus,$2x + y \geq 10$ is also a redundant constraint. Therefore,the redundant constraints are $2x + y \geq 10, x \geq 0, y \geq 0$.

Consider a $LPP$ given by minimize $Z = 6x + 10y$. Subject to $x \geq 6, y \geq 2, 2x + y \geq 10, x \geq 0, y \geq 0$. Redundant constraints in this $LPP$ are $....$

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