In Exercises 49–58, graph each equation in a rectangular coordinate system. y = -2

A rectangular coordinate system, also known as the Cartesian coordinate system, consists of two perpendicular axes: the x-axis (horizontal) and the y-axis (vertical). Each point in this system is defined by an ordered pair (x, y), where 'x' represents the horizontal position and 'y' represents the vertical position. Understanding this system is crucial for graphing equations accurately.

Graphing linear equations involves plotting points that satisfy the equation on a coordinate plane. The equation y = -2 represents a horizontal line where the y-value is consistently -2 for all x-values. This means that no matter what value x takes, y will always be -2, resulting in a straight line parallel to the x-axis.

A horizontal line in a coordinate system is characterized by a constant y-value across all x-values. In the case of the equation y = -2, the line runs parallel to the x-axis at the y-coordinate of -2. This concept is essential for understanding how to represent equations that do not change in the vertical direction.