Legendre polynomials given an orthogonal base of L^2(-1,1) with respect to the standard inner product. Assuming f(x)\stackrel{L^2}{=}\sum_{n\geq 0}c_n P_n(x) \tag{1} the given constraints can ...

Your integrand, |x(1-x)|, is positive everywhere except at the two points x=0, x=1. That means an integral over any interval of positive length will be positive and over any interval of negative ...

I assume you are rotating about the x-axis. Then the volume of the solid of revolution is \int_{-1}^1\pi(2-2x^2)^2\,dx. Expand. We want 4\pi\int_{-1}^1 (1-2x^2+x^4)\,dx. By symmetry, this ...

We consider I(m,n)=\int_{-1}^{1}x^m P_n(x)dx\tag{1} Since x^{m} belongs to the linear span of P_0(x),\ldots, P_{m}(x), the orthogonality implies that for m<n the integral vanishes. Also, it ...

Have you tried verifying that f satisfies the orthogonality properties verified by g (which should be the case to satisfy the minimum) and replace g by f to have a case of equality in your ...

let's look at those boundary terms, keeping the Product rule for higher derivatives in mind (let n<k and m=k-n) \begin{align*} \frac{d\,^n}{d x^n}\left(\left(x^2-1\right)^k\right) &= ...