Identifying the type of stationary point

Calculating the area under the curve

Finding the x-intercepts

Determining the y-intercepts

It reaches a maximum

It becomes negative

It equals zero

It becomes undefined

By analyzing the derivative on either side

By checking the second derivative

By calculating the integral

By finding the slope of the tangent

To make the graph look better

To simplify the equation

To ensure the derivative changes sign

To avoid errors in calculation

It makes the graph look cluttered

It may lead to incorrect conclusions

It complicates the calculations

It is difficult to compute

2

3

-1

0

The function is always increasing

The function has no stationary points

The derivative is the same on opposite sides

The derivative is always positive