Graph the solution set of each system of inequalities. 2x + y > 2 x - 3y < 6

Inequalities are mathematical expressions that show the relationship between two values when they are not equal. They can be represented using symbols such as '>', '<', '≥', and '≤'. Understanding how to interpret and manipulate inequalities is crucial for solving systems of inequalities, as it allows us to determine the range of values that satisfy the conditions set by the inequalities.

Graphing linear inequalities involves plotting the corresponding linear equation and then shading the appropriate region of the graph. The boundary line is dashed if the inequality is strict ('>' or '<') and solid if it is inclusive ('≥' or '≤'). This visual representation helps in identifying the solution set where all inequalities in the system are satisfied.

A system of inequalities consists of two or more inequalities that are considered simultaneously. The solution to the system is the region where the shaded areas of all inequalities overlap on the graph. Analyzing systems of inequalities is essential for finding feasible solutions in various applications, such as optimization problems in economics and engineering.