HINT: Integrate by parts with u=(x-1)^n and v=\frac{x^{m+1}}{m+1}.

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 ...

We need to separate it into three cases : Case 1 : If k\ge 4, then we have 4x-x^2-k=-(x-2)^2+4-k\le 0, so f(k)=\int_0^4 (x^2-4x+k)dx=4k-\frac{32}{3}So, f(k)\ge f(4)=\frac{16}{3} for k\ge 4 ...

For the shell method we should assume \int_0^2 2\pi R H dx\int_0^2 [2\pi \cdot x \cdot (5-(x^2+1))] dx=2\pi\int_0^2 (4x-x^3) dx=2\pi\left[2x^2-\frac{x^4}4\right]_0^2=8\pi

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