Step 1:

The curve equations are $\"\"$ , $\"\"$ and $\"\"$ .

Cylindrical shells method:

The volume of the solid obtained by rotating about the $\"\"$ -axis the region under the curve is

$\"\"$

$\"\"$ .

Find the point of intersections.

Substitute x = 0 in $\"\"$ .

$\"\"$

Now we integrate over the interval 0 to 8.

Step 2:

Let us assume the volume of the solid is obtained by rotating about $\"\"$ -axis.

Consider $\"\"$ .

Apply cube root on each side.

$\"\"$

Volume of the solid obtained by rotating about the $\"\"$ -axis the region under the curve $\"\"$ , $\"\"$ is

$\"\"$

Solution:

$\"\"$