Understanding Differentiability and Continuity

To calculate the area under the curve at a point

To find the slope of the tangent line at a point

To check if a function is increasing or decreasing at a point

To determine if a function is continuous at a point

The function is not defined at that point

The function is decreasing at that point

The function is continuous at that point

The function has a maximum at that point

It might be differentiable

It is definitely differentiable

It is undefined

It is not differentiable

The slope approaches infinity

The slope approaches zero

The slope becomes undefined

The slope remains constant

A point where the function can be redefined to be continuous

A point where the function has a jump

A point where the function has a vertical asymptote

A point where the function is not defined

It makes the function continuous

It has no effect on differentiability

It prevents the function from being differentiable

It makes the function differentiable

Yes, for example, a linear function

Yes, for example, the absolute value function

No, all continuous functions are differentiable

No, it cannot

It is not continuous at the vertex

It has a sharp corner at the vertex

It is not defined at the vertex

It has a vertical tangent at the vertex

It defines the area under the curve

It shows the maximum value of the function

It indicates the rate of change of the function

It determines the continuity of the function

The limit does not exist at that point

The function has a maximum at that point

The function is continuous at that point

The function is differentiable at that point