(the complex analysis way) \cos t is even hence \int_{-\pi}^\pi e^{\cos t} dt = 2 \int_0^{\pi} e^{\cos t} dt then apply the (complex) change of variable z = e^{it}, dz = i e^{it} dt, \int_{-\pi}^{\pi} e^{\cos t} dt = \int_{-\pi}^{\pi} e^{\frac{e^{it}+e^{-it}}{2}} (-i e^{-it}) i e^{it} dt = -i\int_{\gamma} e^{\frac{z+z^{-1}}{2}} z^{-1} dz ...

Use the double angle formula for cosine to reduce the exponent. Explanation: \displaystyle{\cos{{\left({2}\theta\right)}}}={2}{{\cos}^{{2}}\theta}-{1} So \displaystyle{{\cos}^{{2}}\theta}=\frac{{1}}{{2}}{\left({1}+{\cos{{\left({2}\theta\right)}}}\right)} ...

Let F(\theta)=\int_{\theta}^{\theta+\pi}r(u)\sin(u)du. The derivative is F'(\theta)= r(\theta+\pi)\sin(\theta+\pi)-r(\theta)\sin(\theta)= -\sin(\theta)\Bigl(r(\theta+\pi)+r(\theta)\Bigr)= ...

The actual answer to this comes at the bottom, but here is the preliminary part: The infinitesimal work done on a particle by a force \vec F as it undergoes an infinitesimal displacement d\vec s ...

It still took a little trouble to understand what you wanted. I think you are asking about slicing the square prism obliquely to the xy-plane. The cross-sections would now indeed be rectangles. ...

Make a change of variables, z = e^{it}, which maps the interval [0,2\pi] to the unit circle. You get \begin{align} \int_0^{2\pi} f(e^{it})\cos t\,dt &= \int_0^{2\pi} f(e^{it}) ...