What is true about parallel lines in terms of their slopes?

Parallel lines have the same slope, which means that the rate of change of y with respect to x is identical for both lines. This characteristic ensures that they will never intersect, maintaining a constant distance apart. In a coordinate plane, if two lines are described by their equations in slope-intercept form (y = mx + b), having parallel lines requires that both lines possess the same value of 'm', which represents their slopes.

Other considerations about slopes clarify the context: negative reciprocals apply to perpendicular lines, meaning that if two lines intersect at a right angle, the product of their slopes equals -1. Positive slopes indicate lines that are rising as they move from left to right, while undefined slopes are associated with vertical lines. However, neither of these relationships pertains to parallel lines, which consistently maintain equal slopes. This concept is fundamental in geometry and aids in understanding how lines interact within a coordinate system.