Before moving to contour integration, let's simplify our integral \int_0^1 \frac{1}{1+x^2} \sqrt{\frac{x^3}{1-x}}dx =\int_0^1 \frac{x^2}{1+x^2} \sqrt{\frac{1}{x(1-x)}}dx Take the standard ...

Partial fractions for sure (and logs will emerge), and consider the two improper integrals \int_{-1}^0 \frac{1}{x^2-1} \ dx \ \text{ with } \int_0^1 \frac{1}{x^2-1} \ dx. You need BOTH to ...

Your partial fraction decomposition is incorrect. It should be \dfrac{x+1}{x^2(x-1)} = - \dfrac1{x^2} - \dfrac2x + \dfrac2{x-1} Hence, \begin{align} \int_{-2}^{-1}\dfrac{x+1}{x^2(x-1)} dx & = - ...

Let us analyze the function for each of the branch points z=0 and z=1 separately: Around z=0, the function f_0(z) = z^{-2/3} + O(z^{1/3}). We choose the branch cut such that it extends to z>0 ...

\frac{1}{x^{1/3}-x^{4/3}}=\frac{1}{x^{1/3}(1 -x)}. If 0\le x\le1/2 then \frac{1}{x^{1/3}(1-x)}\le\frac{2}{x^{1/3}}. If 1/2\le x\le1 then \frac{1}{x^{1/3}(1-x)}\ge\frac{1}{1-x}.

Using Leibnizt rule The first one is \frac{d}{dx}\int_a^{x}f(x-t)dt= f(0)+ \int_a^{x}f'(x-t)dt= f(0)-f(0)+f(x-a) and the second is \frac{d}{dx}\int_a^{x}f(x-t)g(t)dt = f(0)g(x)+ \int_a^{x} f'(x-t)g(t)dt