In Exercises 5–14, an objective function and a system of linear inequalities representing constraints are given. a. Graph the system of inequalities representing the constraints. b. Find the value of the objective function at each corner of the graphed region. c. Use the values in part (b) to determine the maximum value of the objective function and the values of x and y for which the maximum occurs.

Graph the solution set of each system of inequalities.

$x\le4$

$x\ge0$

$y\ge0$

$x+2y\ge2$

Graph the solution set of each system of inequalities.

$2y+x\ge-5$

$y\le3+x$

$x\le0$

$y\le0$

Graph the solution set of each system of inequalities.

$2x+3y\le12$

$2x+3y>-6$

$3x+y\lt{4}$

$x\ge0$

$y\ge0$

Graph the solution set of each system of inequalities.

$y>x^2+2$

$y\le x-2$

Graph the solution set of each system of inequalities.

$3x-2y\ge6$

$x+y\le-5$

$y\le4$

Graph the solution set of each system of inequalities.

$y\le x^3-x$

$y>-3$

Graph the solution set of each system of inequalities.

$y\ge3^{x}$

$y\ge2$

Graph the solution set of each system of inequalities.

$y\le\log x$

$y\ge\left|x-2\right|$

Graph the solution set of each system of inequalities.

$e^{x}-y\le1$

$x-2y\ge4$

Graph the inequality $2x+3y$ < $6$.

Graph the inequality $y$ < $2^{x}$.

Graph the system of inequalities and indicate the region (if any) of solutions satisfying all equations.

$3x-2y>6$

$3x-2y$ < $-4$

Graph the system of inequalities and indicate the region (if any) of solutions satisfying all equations.

$x+y\le4$

$y\ge1$

$x>0$