To avoid using a calculator

To impress the examiner

To ensure a clear understanding and correct formation of integrals

To save time during calculations

Ignore the shaded area

Directly calculate the volume

Form the integrals for the given area

Estimate the volume visually

A sphere

A cone with a smaller cone cut off the top

A cylinder

A complete cone

Add the inner and outer volumes

Subtract the inner volume from the outer volume

Multiply the inner and outer volumes

Divide the outer volume by the inner volume

They are used to color the diagram

They are optional in volume calculations

They determine the shape of the volume

They define the limits of integration

Draw the diagram

Calculate the inner volume first

Estimate the volume visually

Identify the boundaries and set up the integral

Because volumes require a different set of units

Because volumes involve three dimensions

Because the algebraic operations differ

Because volumes are always larger than areas