Understanding the Mean Value Theorem

2

1

3

0

The function is continuous everywhere.

There is a point where the derivative equals the average rate of change.

The function has no sharp turns.

The function is always increasing.

It represents the average rate of change between two points.

It represents the minimum value of the function.

It represents the instantaneous rate of change.

It represents the maximum value of the function.

It is always positive.

It equals the average rate of change over the interval.

It is always negative.

It is always zero.

The function must be increasing over the interval.

The function must be differentiable over the closed interval.

The function must be continuous over the open interval.

The function must be differentiable over the open interval.

It is continuous.

It has a constant slope.

It is always decreasing.

It is always increasing.

Because continuity implies differentiability.

Because a function can be continuous but have sharp turns.

Because continuity and differentiability are unrelated.

Because differentiability implies discontinuity.

Because it does not guarantee differentiability.

Because it guarantees differentiability.

Because it implies continuity.

Because it implies differentiability.

h is differentiable over the closed interval.

h is continuous over the closed interval.

h is continuous and decreasing over the interval.

The limit of h' as x approaches 5 is 1.

It guarantees h' at 5 is 1.

It does not necessarily imply h' at 5 is 1.

It implies h' is undefined.

It implies h' is zero.