You need to apply the binomial theorem to find the true coefficients of the Laurent series. The coefficient that is relevant for the integral is the central one, \binom{2n}{n}.

HINT \int_0^{\pi}\cos^{2n} \theta d\theta=2\int_0^{\pi/2}\cos^{2n} \theta d\theta which is Wallis' integral: integral

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. ...

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 ...

I=\int\sqrt{\frac{x-3}{2-x}}~{\rm d}x Integrating Let x=2\cos^2t+3\sin^2t, dx=\sin2tdt I=\int\sqrt{\frac{-\cos^2t}{-\sin^2t}}\sin2tdt=\int2\cos^2tdt=\int(1+\cos2t)dt=t+\frac12\sin2t+c\\I=\underbrace{\cos^{-1}\sqrt{3-x}}_{\pi/2-\sin^{-1}\sqrt{3-x}}+\sqrt{x-2}\sqrt{3-x}+c\\I=\underbrace{\sqrt{x-2}\sqrt{3-x}}_{\sqrt{5x-x^2-6}}-\sin^{-1}{\sqrt{3-x}}+c' ...