Systems of Linear Inequalities

A system of linear inequalities is a set of two or more linear inequalities that involve the same variables. The solution is the set of all points that satisfy all inequalities in the system.

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

A point is part of the solution set if it satisfies all the inequalities in the system, meaning it lies in the region defined by the inequalities.

The graphical representation of a linear inequality is a half-plane divided by a line. The line represents the boundary, and the shaded area indicates the solutions.

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 >).

1. Graph each inequality as if it were an equation. 2. Use a solid or dashed line as appropriate. 3. Shade the appropriate half-plane for each inequality. 4. The solution set is where the shaded regions overlap.

The solution set is the region on the graph where the shaded areas of all inequalities overlap, representing all possible solutions.

A point is not part of the solution set if it does not satisfy at least one of the inequalities in the system, meaning it lies outside the shaded region.

Substitute the x and y values of the point into the inequality. If the resulting statement is true, the point is a solution.

An example of a linear inequality is y < 2x + 3.