Hint: The integrand is an even function and the integral is over a symmetric interval, then \begin{align} \int_{-1}^1 \left[ (1-x^2)-x^2(1-x^2)\right]\, dx&= ...

Use polar coordinates: x=z+\rho e^{i\theta}, \int_{B(z,r)}(x - z)^{n}dx = 2\pi \int_0^r \int_0^{2\pi}\rho^n e^{in\theta}\,\rho\,d\theta\,d\rho Here \int_0^{2\pi} e^{in\theta}\,d\theta=0 ...

First, suppose that L is fixed. Without losing generality, we can take L=1. Then just take f(x)=\begin{cases}1,&x\in [-1,0],\\1-4x,&x\in[0,1].\end{cases} Obviously, \int_{-1}^1f(x)dx=0, yet ...

I'll assume N \ge 2, and out of preference I'll write q'(r) = \frac{1}{r} \left\{(N - 1)q(r) + 2r \int_{\partial B(0,r)} u\nabla u \cdot \mathbf{n}\, dx\right\} By the divergence theorem, since ...

Let g(x)=f(a)(x-a)+f(b)(b-x) and f(x) is an increasing function, a\leq x\leq b . If we have g(a)=f(b)(b-a)>\int_a^bf(x)\mathrm{d}x>f(a)(b-a)=g(b) Since g(x) is continous, there ...

When doing the second part of the line integral, i.e. from (1,0) to (1,1), we have that \int_{(1,0)}^{(1,1)} x^2dy = \int_0^1 1 dy which gives an additional +1.