Assuming the area below the line y=0 (i.e. x>1) does NOT count, the area to be rotated is shown in the graph attached.
A. Again, using Pappus's theorem,
Area, A = (2/3)*1*(1-(-1))=4/3 (2/3 of the enclosing rectangle, or you can integrate)
Distance of centroid from axis of rotation, R = (2-0) = 2
Volume = 2 π RA = 2 π 2 * 4/3 = 16 π / 3 (approximately = 16.76 units)
B. By integration, using the washer method
Volume = [tex]2\pi\int_{-1}^1(1-x^2)(2-x)dx[/tex]
[tex]=2\pi\int_{-1}^1(x^3-2x^2-x+2)dx[/tex]
[tex]=2\pi[x^4/4-2x^3/3-x^2/2+2x]_{-1}^{1}[/tex]
[tex]=2\pi([1/4-2/3-1/2+2]-[1/4+2/3-1/2-2])[/tex]
[tex]=2\pi(8/3)[/tex]
= 16 π /3 as before
