\sin(x)=\sin(\pi -x), hence: 2\int_{0}^{\pi}x\,f(\sin x)\,dx=\int_{0}^{\pi}x\,f(\sin x)\,dx+\int_{0}^{\pi}(\pi -x)f(\sin(\pi-x))\,dx = \int_{0}^{\pi} \pi\,f(\sin x)\,dx.

HINT: Integrate by parts the integral \int_0^{2\pi}g''(x)\sin(x)\,dx with u=\sin(x) and v=g'(x) to obtain \int_0^{2\pi}g''(x)\sin(x)\,dx=-\int_0^{2\pi}g'(x)\cos(x)\,dx Now, integrate by ...

This is a special case of Laissant's inequality: https://en.m.wikipedia.org/wiki/Integral_of_inverse_functions From the drawing there you can see that there's a little rectangle which is not included ...

We divide the integral in the parts where \sin x\geq 0 and \sin x\leq 0, \int_0^{2\pi}e^{-2014x^2}\sin x\, dx = \int_0^{\pi}e^{-2014x^2}\sin x\, dx + \int_\pi^{2\pi}e^{-2014x^2}\sin x\, dx. ...

Since you've calculated the Fourier coefficients for the sign function as c_n=\frac{2}{\sqrt\pi}\frac{1-(-1)^n}{n}=\begin{cases}\frac{4}{\sqrt\pi n}&n\,\text{odd}\\\\0&,n\,\text{even}\end{cases} ...

For every nonzero integers k\ne\ell, \displaystyle\int_0^{2\pi}(\sin(kx)-\sin(\ell x))^2\mathrm dx=2\pi. To prove this, expand the square, use the identities -2\sin(kx)\sin(\ell x)=\cos((k+\ell)x)-\cos((k-\ell)x),\quad \sin^2(nx)=\tfrac12-\tfrac12\cos(2nx), ...