Chapter 5: Problem 13
Sketch the graph of the inequality. $$y<2-x$$
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Find the minimum and maximum values of the objective function and where they occur, subject to the indicated constraints. (For each exercise, the graph of the region determined by the constraints is provided.) Objective function: $$ z=2 x+8 y $$ Constraints: $$ \begin{aligned} x & \geq 0 \\ y & \geq 0 \\ 2 x+y & \leq 4 \end{aligned} $$
Graph the solution set of the system of inequalities. $$\left\\{\begin{array}{l}y \geq-3 \\ y \leq 1-x^{2}\end{array}\right.$$
Write a system of inequalities whose graphed solution set is a right triangle.
Sketch the graph of the inequality. $$x^{2}+y^{2} \leq 4$$
The given linear programming problem has an unusual characteristic. Sketch a graph of the solution region for the problem and describe the unusual characteristic. Find the maximum value of the objective function and where it occurs. Objective function. \(z=3 x+4 y\) Constraints. \(\begin{aligned} x & \geq 0 \\ y & \geq 0 \\ x+y & \leq 1 \\ 2 x+y & \leq 4 \end{aligned}\)
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