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*{} ...

\begin{align} I=\int_{1}^{2}\sqrt[3]{\frac{2-x}{x^7}}dx=\int_{1}^{2}\frac1{x^2}\sqrt[3]{\frac{2-x}{x}}dx \end{align} Here you could then use \frac{2-x}{x}=u^3 which implies x=2(1+u^3)^{-1} and dx=-6u^2(1+u^3)^{-2} ...

A08 Jan 15, 2018 Given \displaystyle{\int_{{1}}^{{3}}}\sqrt{{{1}+{\left({2}{x}-\frac{{1}}{{{8}{x}}}\right)}^{{2}}}}{\left.{d}{x}\right.} Simplifying the expression under the ...

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), ...

Use the Euler substitution of the first kind , let \sqrt{x^2-3x+1}=x+t,we have \begin{align*} \int{\frac{\sqrt{x^2-3x+1}}{x}}\text{d}x&=-2\int{\frac{\left( t^2+3t+1 \right) ^2}{\left( 1-t^2 \right) ...

Try using the substitution \displaystyle t = \tan \frac{\theta}{2} , this is a handy substitution to make when there are trigonometric functions that you cannot simplify very easily. In our case we ...