Use the shell method to set up and evaluate the integral that gives the volume of the solid generated by revolving the plane region about the y-axis.

The volume of a shell of radius r, height h and thickness dy (because revolving around the y-axis) is

2πrh dx

Now, our plane region is symmetric about the y-axis, so revolving all of it it is the same as revolving only the part for x>=0. o, we'll take the volume to be

∫[0,2] 2πrh dx
where r=x and h=y
= 2π∫[0,2] x(4-x^2) dx
= 2π(2x^2 - 1/4 x^4) [0,2]
= 8π

You can check using shells of thickness dy. The volume is then

∫[0,4] πr^2 dy
where r=x
= π∫[0,4] (4-y) dy
= π(4y - 1/2 y^2) [0,4]
= 8π