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

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

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.

The graphical representation consists of shaded regions on a coordinate plane, where each region corresponds to the solutions of the inequalities. The overlapping region represents the solutions to the entire system.

The boundary line represents the points where the inequality changes from true to false. If the inequality is strict (e.g., < or >), the line is dashed; if it is inclusive (e.g., ≤ or ≥), the line is solid.

If a point lies above the boundary line of a linear inequality, it means that the point satisfies the inequality, indicating that it is part of the solution set.

If a point lies below the boundary line of a linear inequality, it means that the point does not satisfy the inequality, indicating that it is not part of the solution set.