The constraints -x+y leq 1, -x+3y leq 9, x ge | vedclass

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(B) To determine the nature of the feasible region,we analyze the given constraints: $1$. $-x + y \leq 1$ $2$. $-x + 3y \leq 9$ $3$. $x \geq 0, y \geq

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unbounded feasible space

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(B) To determine the nature of the feasible region,we analyze the given constraints: $1$. $-x + y \leq 1$ $2$. $-x + 3y \leq 9$ $3$. $x \geq 0, y \geq 0$ Let's find the intersection points of the lines: For $-x + y = 1$,the intercepts are $(0, 1)$ and $(-1, 0)$. For $-x + 3y = 9$,the intercepts are $(0, 3)$ and $(-9, 0)$. Since $x \geq 0$ and $y \geq 0$,we are in the first quadrant. As $x$ increases,both lines $-x + y = 1$ and $-x + 3y = 9$ allow $y$ to increase indefinitely. Specifically,for any $x \geq 0$,we can find $y$ such that $y \leq 1 + x$ and $y \leq 3 + \frac{x}{3}$. Since there is no upper bound on $x$,the region extends infinitely in the direction of the positive $x$-axis. Therefore,the feasible region is unbounded.

The constraints $-x+y \leq 1, -x+3y \leq 9, x \geq 0, y \geq 0$ define a:

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