A linear inequality is a mathematical statement that compares a linear expression to a value using inequality symbols (>, <, ≥, ≤).

To graph a linear inequality, first graph the corresponding linear equation as a dashed (for < or >) or solid line (for ≤ or ≥). Then shade the region that satisfies the inequality.

The solution to a system of inequalities represents all the points that satisfy all inequalities in the system simultaneously.

A solid line indicates that points on the line are included in the solution (≥ or ≤), while a dashed line indicates that points on the line are not included (> or <).

To determine if a point is a solution, substitute the point's coordinates into each inequality. If the point satisfies all inequalities, it is a solution.

The shaded region represents all the possible solutions to the inequality, indicating where the inequality holds true.

It represents the area below the line y = 2x + 3, excluding the line itself.