The problem is an accidental algebra mistake, as I pointed out in comments: n(n+1)(2n+1)=2n^3+3n^2+n\neq n^3+3n^2+n, and this should do it.

Put D=[0,1]^2. We have: g_{n+1}g_0-g_ng_1=\int\int_D x^{n}(x-t)f(x)f(t)dxdt=\int\int_D t^{n}(t-x)f(x)f(t)dxdt Hence adding the two integrals: 2(g_{n+1}g_0-g_ng_1)=\int\int_D (x^{n}-t^n)(x-t)f(x)f(t)dxdt ...

As you can see from this tinyurl link to W|A , your solution is correct. And I can verify that the work you uploaded is also correct. You will want to be careful to change the limits of integration ...

In this case the first part is 2c (area of the rectangle). Then calculate the integral of 2 e^{-4x} from c to infinity. That part will be in closed form {2\over{4}} -0. So calculate c as 2c+{1\over{2}} = 1 ...

Suppose that you want to find the area of the gray part in the following figure : \qquad\qquad\qquad Then, your attempt is not true. The area is given by \int_{-3}^{-1}\left(\frac 23x+2\right)dx+\int_{-1}^{1}\left(\left(\frac 23x+2\right)-\left(\frac 13x^2+\frac 43x+1\right)\right)dx

Let's get rid of that pesky |3x| by observing that |3x|=|3(-x)| and, luckily for us, x^2-4=(-x)^2-4. That means that both functions are symmetric about the y axis (so when graphed the part for ...