You may just perform the change of variable v=\sin x, \qquad dv=\cos x\:dx, giving \int_{\pi/6}^{\pi/2} \frac{\cos(x)}{\sin^{5/7}(x)}\, dx=\int_{1/2}^{1} \frac{dv}{v^{5/7}}=\left[\frac72 v^{2/7}\right]_{1/2}^1=\frac{7}{2}\left(1-\frac{1}{2^{2/7}}\right).

Divide top and bottom by \cos^2 x. We get \frac{\pi\sec^2 x}{\sec^2 x-\tan x}, which is \frac{\pi \sec^2 x}{\tan^2 x-\tan x+1}. Make the subsitution t=\tan x, and you should be on your way. ...

Via corindo's rearrangement: we have I = \int_0^{2 \pi} \frac{1}{\sqrt{2}\cos(x - \pi/4) + 2}\,dx =\\ \frac 1{\sqrt{2}} \int_0^{2 \pi} \frac{1}{\cos(x - \pi/4) + \sqrt{2}}\,dx = \\ \frac 1{\sqrt{2}} \int_0^{2 \pi} \frac{1}{\cos(x) + \sqrt{2}}\,dx =\\ \frac 1{\sqrt{2}} \oint_{|z| = 1} \frac{1}{iz((z + z^{-1})/2 + \sqrt{2})}\,dx = \\ \frac {\sqrt{2}}{i} \oint_{|z| = 1} \frac{1}{(z^2 + 2\sqrt{2}z + 1)}\,dz ...

HINT: Rewrite the integrand as \cos^{-3}(2x)\sin(2x)=\tan(2x)\sec^2(2x)

\displaystyle{I}\stackrel{\sim}{=}{2.001} Explanation: Remember that \displaystyle{{\cos}^{{3}}{\left({x}\right)}}={{\cos}^{{2}}{\left({x}\right)}}\cdot{\cos{{\left({x}\right)}}} \displaystyle{{\cos}^{{2}}{\left({x}\right)}}={1}-{{\sin}^{{2}}{\left({x}\right)}} ...

Yes, you are correct and you are almost done. If f is even then g(x):=\cos(x) f(\sin(x)) is even too g(-x)=\cos(-x) f(\sin(-x))=\cos(x) f(-\sin(x))=\cos(x) f(\sin(x))=g(x), and \int_\frac{-\pi}{2}^\frac{\pi}{2} \cos(x) f(\sin(x)) dx= 2\int_0^\frac{\pi}{2} \cos(x) f(\sin(x)) dx=2\int_0^1 f(t) dt=2\pi ...