Answer:
Step-by-step explanation:
Here the region between two curves is rotated about a vertical line.
The functions are
[tex]y = sin^2x, \\y = sin^4x, \\x in [0,[pi]/2].[/tex]
Intersecting points are x=0 and x =pi/2
Since rotated about x = pi/2 we get
using cylindrical shell method
Volume = [tex]2\pi rh\\=2\pi \int\limits^\frac{\pi}{2} _0 {xy} \, dx \\=2\pi \int\limits^\frac{\pi}{2} _0 (x+\frac{\pi}{2} )(sin^2 x -sin^4 x) dx\\[/tex]
From wolfram alpha we find that
Volume= [tex]2\pi (\frac{3\pi^2 }{64)} =\frac{6\pi^3}{64}[/tex]
