\int_{1}^{2}\frac{\mathrm{d}x}{\sqrt{x}(2-x)}\geqslant \int_{1}^{2}\frac{\mathrm{d}x}{\sqrt{2}(2-x)}\ \stackrel{(u=2-x)}{=}\ \frac1{\sqrt2}\int_{0}^{1}\frac{\mathrm{d}u}{u}=\ldots

\def\th{\theta} \def\p{\pi} \def\e{\varepsilon} \def\g{\gamma} \def\G{\Gamma} \DeclareMathOperator{\sech}{sech} Let \begin{align*} z &= r_1 e^{i\th_1} \\ &= 1+r_2 e^{i\th_2} \end{align*} where r_i>0 ...

You can write \int_0^6 \frac{1}{\sqrt{x(6-x)} }dx=\int_0^6 \frac{1}{\sqrt{9-(x-3)^2} }dx, then u=x-3 which looks a lot like what you were trying.

you can use \int_{\epsilon}^{2-\epsilon}\frac{dx}{\sqrt{2x-x^2}}=-2\arcsin(\epsilon-1) and now compute the limit \epsilon tends to zero frm the right. \epsilon>0

The truth is the concept in your mind (i.e., geometric area and integration) applies to real scalar functions with single variable, while you're not integrating a real function. In your case, assuming ...

Let x = \sin^2(\theta) \implies dx=2\sin(\theta)\cos(\theta) d\theta. Consequently, \begin{align} \int_{0}^{1} \sqrt{\frac{x}{1-x}} dx & = 2 \int_{0}^{\pi/2} ...