It is a measure of how much the function changed per unit, on average, over that interval. It is derived from the slope of the straight line connecting the interval's endpoints on the function's …

Learn how to calculate the average rate of change of a function over a specific interval. Discover how changes in the function's value relate to changes in x. Use tables and visuals to …

On a position-time graph, the slope at any particular point is the velocity at that point. This is because velocity is the rate of change of position, or change in position over time. Here, the …

Learn how to calculate the average rate of change for a function and its connection to the slope of a secant line. Grasp the concept of instantaneous rate of change and its significance in …

In proportional relationships, the unit rate is the slope of the line. Changes in x lead to steady changes in y when there's a proportional relationship. We can use the unit rate to write and …

In this section, we will study the rate of change of a quantity and how is it related geometrically to secant and tangent lines.

Find a function's average rate of change over a specific interval, given the function's graph or a table of values.

Average rate of change is the same as the slope between 2 points. Find the ordered pairs for the start point (x1,y1) and end point (x2,y2) of the interval. Then, use the slope formula to …

The common ratio refers to the rate of change in an exponential function. It is the factor by which the output of the function changes when the input increases by one unit.

In differential calculus, we learned that the derivative f ′ of a function f gives the instantaneous rate of change of f for a given input. Now we're going the other way!