91Ó°ÊÓ

The system of inequality is $\left\{\begin{array}{l}y<3x+1\\ yâ‰\yen -x-2\end{array}\right.$

To find the solution of inequality by graphing.

Graph the line $y=3x+1$.

It is a dashed line since it contains the inequality $<$.

Choose $(0,0)$as a test point.

It is a solution to the given inequality, so shade the region that contains the point$(0,0)$

Graph the line$y=-x-2$

The boundary line is a solid line since it contains the inequality $â‰\yen$.

Use $(0,0)$as a test point .

It is a solution so shade the region that contains the point $(0,0)$.

The point where the boundary line intersect is not a solution since it is not a solution to $y<3x+1$

The solution is all the points in the area shaded twice which appears as the darkest shaded region.

Choose $(0,0)$as a test point.

$y<3x+1$

$0<3\left(0\right)+1$

$0<1$is true.

For the inequality, $yâ‰\yen -x-2$,

$0â‰\yen -\left(0\right)-2$

$0â‰\yen -2$is true

The region containing $(0,0)$ is the solution to the system.