In Exercises 61–66, find the solution set for each system by graphing both of the system's equations in the same rectangular coordinate system and finding points of intersection. Check all solutions in both equations.

A system of equations consists of two or more equations with the same variables. The solution to the system is the set of values that satisfy all equations simultaneously. In graphical terms, this is represented by the points where the graphs of the equations intersect. Understanding how to manipulate and interpret these equations is crucial for finding solutions.

Graphing linear equations involves plotting points that satisfy the equation on a coordinate plane. Each equation can be represented as a line, and the slope-intercept form (y = mx + b) is commonly used for this purpose. Accurate graphing is essential for visually identifying the intersection points, which represent the solutions to the system.

After finding the intersection points of the graphed equations, it is important to verify that these points satisfy both original equations. This process, known as checking solutions, ensures that the identified points are indeed valid solutions to the system. It reinforces the accuracy of the graphical method and confirms the integrity of the results.