First integral : Let us multiply the numerator and denominator of the integrand by \sqrt{1+x^n} , so that the initial integral becomes \mathcal{I}=\underbrace{\int_0^1\frac{dx}{\sqrt{1-x^{2n}}}}_{\mathcal{I}_1}+ \underbrace{\int_0^1\frac{x^ndx}{\sqrt{1-x^{2n}}}}_{\mathcal{I}_2}. ...

As noted in the comments by tired the problem is easy once you establish \frac{1}{\sqrt{1-x}} = \sqrt{2}\sum_{n=0}^\infty P_n(x)\tag{1} With this in hand the ortogonality relation \int_{-1}^1 P_m(x)P_n(x){\rm dx} = \frac{2\delta_{nm}}{2m+1} ...

With x=\tan t, you have dx=(1+\tan^2t)\,dt, so the integral becomes \int_0^{\pi/4}\frac{1}{\sqrt{1+\tan^2t}(1+\tan^2t)}(1+\tan^2t)\,dt= \int_0^{\pi/4}\cos t\,dt Alternatively, with x=\sinh t ...

Substitute x^2\to x. Then, \int_0^1x\sqrt{\frac{1-x^2}{1+x^2}}\,dx=\frac12 \int_0^1\sqrt{\frac{1-x}{1+x}}\,dx Now, letting x\to \cos x and using 1-\cos x=2\sin^2(x/2) and 1+\cos x=2\cos^2(x/2) ...

Yes, the rectangle is solved just like the square. Indeed, if we have a rectangle with a shorter side 2, then any point which is outside the square with side 2 with the same center is further than 1 ...

For now let's perform the indefinite integral: \int \frac{1}{(4+x^2)^{3/2}}dx. If we use the substitution x=2\tan(\theta) this gives dx=2\sec^2(\theta)d\theta. Plugging in the subsitution ...