7.3Volumes by

Cylindrical Shells

APPLICATIONS OF INTEGRATION

In this section, we will learn:

How to apply the method of cylindrical shells

to find out the volume of a solid.

Let’s consider the problem of finding the

volume of the solid obtained by rotating about

the y-axis the region bounded by y = 2x2 - x3

and y = 0.

VOLUMES BY CYLINDRICAL SHELLS

If we slice perpendicular to the y-axis,

we get a washer.

However, to compute the inner radius and the outer radius of the washer, we would have to solve the cubic equation y = 2x2 - x3 for x in terms of y.

That’s not easy.

VOLUMES BY CYLINDRICAL SHELLS

The figure shows a cylindrical shell

with inner radius r1, outer radius r2,

and height h.

CYLINDRICAL SHELLS METHOD

Its volume V is calculated by subtracting

the volume V1 of the inner cylinder from

the volume of the outer cylinder V2 .

CYLINDRICAL SHELLS METHOD

Thus, we have:

2 1

2 22 1

2 22 1

2 1 2 1

2 12 1

( )

( )( )

2 ( )2

V V V

r h r h

r r h

r r r r h

r rh r r

CYLINDRICAL SHELLS METHOD

Let ∆r = r2 – r1 (thickness of the shell) and

(average radius of the shell).

Then, this formula for the volume of a cylindrical shell becomes:

2V rh r

Formula 1

12 12r r r

CYLINDRICAL SHELLS METHOD

Now, let S be the solid

obtained by rotating

about the y-axis the

region bounded by

y = f(x) [where f(x) ≥ 0],

y = 0, x = a and x = b,

where b > a ≥ 0.

CYLINDRICAL SHELLS METHOD

Divide the interval [a, b] into n subintervals

[xi - 1, xi ] of equal width and let be

the midpoint of the i th subinterval.

xix

CYLINDRICAL SHELLS METHOD

The rectangle with base [xi - 1, xi ] and height is rotated about the y-axis.

The result is a

cylindrical shell with average radius , height , and thickness ∆x.

( )if x

( )if xix

CYLINDRICAL SHELLS METHOD

Thus, by Formula 1, its volume is

calculated as follows:

(2 )[ ( )]i i iV x f x x

CYLINDRICAL SHELLS METHOD

So, an approximation to the volume V of S

is given by the sum of the volumes of

these shells:

1 1

2 ( )n n

i i ii i

V V x f x x

CYLINDRICAL SHELLS METHOD

The approximation appears to become better

as n →∞.

However, from the definition of an integral,

we know that:

1

lim 2 ( ) 2 ( )n b

i i ani

x f x x x f x dx

CYLINDRICAL SHELLS METHOD

Thus, the following appears plausible.

The volume of the solid obtained by rotating about the y-axis the region under the curve y = f(x) from a to b, is:

where 0 ≤ a < b

2 ( )b

aV xf x dx

Formula 2CYLINDRICAL SHELLS METHOD

This type of reasoning will be helpful

in other situations—such as when we

rotate about lines other than the y-axis.

CYLINDRICAL SHELLS METHOD

Find the volume of the solid obtained by

rotating about the y-axis the region

bounded by y = 2x2 - x3 and y = 0.

Example 1CYLINDRICAL SHELLS METHOD

We see that a typical shell has radius x (distance to the axis of rotation)

and height f(x) = 2x2 - x3.

Example 1CYLINDRICAL SHELLS METHOD

So, by the shell method,

the volume is:

2 2 3

0

2 3 4

0

24 51 12 5 0

32 165 5

2 2

2 (2 )

2

2 8

V x x x dx

x x x dx

x x

Example 1CYLINDRICAL SHELLS METHOD

The figure shows a computer-generated picture of the solid whose volume we computed in the example.

Example 1CYLINDRICAL SHELLS METHOD

Comparing the solution of Example 1 with

the remarks at the beginning of the section,

we see that the cylindrical shells method

is much easier than the washer method

for the problem.

We did not have to find the coordinates of the local maximum.

We did not have to solve the equation of the curve for x in terms of y.

NOTE

Find the volume of the solid obtained

by rotating about the y-axis the region

between y = x and y = x2.

Example 2CYLINDRICAL SHELLS METHOD

The region and a typical shell

are shown here.

We see that the shell has radius x (distance to the axis of rotation) and height x - x2.

Example 2CYLINDRICAL SHELLS METHOD

Thus, the volume of the solid is:

1 2

0

1 2 3

0

13 4

0

2

2

23 4 6

V x x x dx

x x dx

x x

Example 2CYLINDRICAL SHELLS METHOD

As the following example shows,

the shell method works just as well

if we rotate about the x-axis.

We simply have to draw a diagram to identify the radius and height of a shell.

CYLINDRICAL SHELLS METHOD

Use cylindrical shells to find the volume of

the solid obtained by rotating about the x-axis

the region under the curve from 0 to 1.

This problem was solved using disks in Example 2 in Section 7.2

y x

Example 3CYLINDRICAL SHELLS METHOD

To use shells, we relabel the curve

as x = y2.

For rotation about the x-axis, we see that a typical shell has radius y (distance to the axis

of rotation) and

height 1 - y2.

y x

Example 3CYLINDRICAL SHELLS METHOD

So, the volume is:

In this problem, the disk method was simpler.

1 2

0

1 3

0

12 4

0

2 1

2 ( )

22 4 2

V y y dy

y y dy

y y

Example 3CYLINDRICAL SHELLS METHOD

Find the volume of the solid obtained by

rotating the region bounded by y = x - x2

and y = 0 about the line x = 2.

Example 4CYLINDRICAL SHELLS METHOD

The figures show the region and a cylindrical

shell formed by rotation about the line x = 2,

which has radius 2 – x (distance to the axis of rotation) and height x - x2.

Example 4CYLINDRICAL SHELLS METHOD

So, the volume of the solid is:

0 2

1

0 3 2

1

143 2

0

2 2

2 3 2

24 2

V x x x dx

x x x dx

xx x

Example 4CYLINDRICAL SHELLS METHOD