The way you have set up the integral for the washer method is correct. However, the integral for the shell method (or the cylindrical shell method as it's also called) is slightly wrong. It should ...

Close. It is a very good thing to exploit symmetry, but here there is a problem. The region A between the curves, from x=-1 to x=1 is congruent to the region B between the two curves, from x=0 ...

Note that the region V is above the plane z=0: x\in[0,2] \implies z=4-x^2\ge 0. Thus, the limits for z are from 0 to 4-x^2 and not otherwise: \int_0^2\int_0^{4-x^2}\int_0^2 (2x+y) dy dz dx.

Close: The volume of a solid of revolution is given by \pi \int_a^b (f(x))^2dx Where f(x) gives your radius. Why? The intuitive derivation is that at each point, the area of a circular wedge ...

Using the shell method, you would get \displaystyle V=\int_0^2 2\pi r(x)h(x)\;dx=\int_0^2 2\pi x(4x-2x^2)dx=4\pi\int_0^2(2x^2-x^3)dx Alternatively, the disc method gives \displaystyle V=\int_0^8 \pi\left(\left(\sqrt{\frac{y}{2}}\right)^2-\left(\frac{y}{4}\right)^2\right)dy=\int_0^8\pi\left(\frac{y}{2}-\frac{y^2}{16}\right)dy

Note that on the interval [0, 1], -3x^2 > (x^2 - 4x). So the "upper curve" we are interested in is -3x^2 and the lower curve (x^2 - 4x). Always subtract the curve that is UNDER, from the ...