When your graphing linear equations the rate of change can be the same as?
When graphing linear equations, the rate of change can be the same as the slope of the line.
To find the slope of a linear equation, we need to determine the change in the vertical (y) coordinates divided by the change in the horizontal (x) coordinates between any two points on the line. This gives us the rate at which the line is "changing" as we move along it.
Once we have determined the slope or rate of change, we can use this information to graph the line. Starting from any point on the line (usually represented by its y-intercept), we can use the slope to determine the placement of additional points on the line. We do this by moving horizontally by a certain amount (the change in x) and then vertically by the appropriate amount (the change in y) using the slope.
So, in summary, when graphing linear equations, the rate of change is the same as the slope of the line.