Hint . A potential issue is as x \to 1^-, in this case we have \frac{1}{\sqrt[3]{(1-x^2)^5}} \sim \frac{1}{2^{5/3}\cdot(1-x)^{5/3}} the latter integrand is divergent over [\varepsilon,1), ...

In a case like this, you have to contend with a residue at infinity. You can see this from the contour in your hint: as the radius of the circular contour R \to \infty, the integral about that ...

I would proceed like this \begin{align}I&=\displaystyle\int \dfrac{1}{x}\sqrt[3]{\dfrac{1-x}{1+x}} \,dx \tag{1}\\&=\displaystyle\int \dfrac{6t^3}{t^6-1}\,dt\tag{2}\\&=3\displaystyle\int \dfrac{u}{u^3-1}\,du\tag{3}\\&=\underbrace{\displaystyle\int \dfrac{1}{u-1}\,du}_{I_{1}} -\underbrace{\displaystyle\int \dfrac{u-1}{u^2+u+1}\,du}_{I_{2}}\tag{4}\end{align} \tag*{} ...

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

Let x=\frac1y\implies dx=-\frac1{y^2}dy then \int_{0}^{1} \frac{1}{\sqrt[3]{- x^{4} + 1}}\, dx=\int_{1}^{+\infty} \frac{\sqrt[3]y}{y\sqrt[3]{y^{4} - 1}}\, dy and thus since \frac{\sqrt[3]y}{y\sqrt[3]{y^{4} - 1}}\sim \frac1{y^2} ...

If you want to find the real root, use the definition of rational roots to obtain (-8)^{\frac{2}{3}} = [(-8)^{\frac{1}{3}}]^2 = (\sqrt[3]{8})^2 = (-2)^2 = 4 or, equivalently, (-8)^{\frac{2}{3}} = [(-8)^2]^{\frac{1}{3}} = 64^{\frac{1}{3}} = \sqrt[3]{64} = 4 ...