Mean Value Theorem and Average Value

Both are used to find the maximum value of a function.

Both involve finding a point where the function equals its average value.

Both require the function to be continuous and differentiable.

Both are used to calculate the area under a curve.

The function must be differentiable at the endpoints of the interval.

The function must be continuous and differentiable at a single point.

The function must be continuous on a closed interval and differentiable on an open interval.

The function must be continuous and differentiable on the entire real line.

It is less than the slope of the secant line.

It is always zero.

It is equal to the slope of the secant line connecting the endpoints of the interval.

It is greater than the slope of the secant line.

As a point where the function reaches its maximum value.

As a point where the tangent line is horizontal.

As a point where the function is not differentiable.

As a point where the slope of the tangent line equals the average slope of the interval.

The integral of the function over the interval.

The sum of the function values at the endpoints of the interval.

The derivative of the function at the midpoint of the interval.

1 over the length of the interval times the integral of the function over the interval.

It states that the function is always equal to its average value.

It states that there is a point where the function equals its average value.

It states that the function is equal to the derivative of its average value.

It states that the function is never equal to its average value.

It is the point where the function is not continuous.

It is the point where the function reaches its maximum value.

It is the point where the function takes on its average value.

It is the point where the function is not differentiable.