\displaystyle{I} = \displaystyle\frac{{1}}{{{2}\sqrt{{2}}}}{a}{r}{c}{\tan{{\left(\frac{{{x}^{{2}}-{1}}}{{\sqrt{{2}}{x}}}\right)}}}-\frac{{1}}{{{4}\sqrt{{2}}}}{\ln}{\left|\frac{{{x}^{{2}}-\sqrt{{2}}{x}+{1}}}{{{x}^{{2}}+\sqrt{{2}}{x}+{1}}}\right|}+{C} ...

\displaystyle{{\tan}^{{-{{1}}}}{x}}+{C} Explanation: Let \displaystyle{x}={\tan{\theta}} , so that \displaystyle{\left.{d}{x}\right.}={{\sec}^{{2}}\theta}{d}\theta \displaystyle\int\frac{{{1}{\left.{d}{x}\right.}}}{{{1}+{x}^{{2}}}} ...

\displaystyle\int\frac{{1}}{{x}^{{4}}}{\left(.\right)}{\left.{d}{x}\right.}=-\frac{{1}}{{{3}{x}^{{3}}}}+{C} Explanation: Note that: \displaystyle\frac{{d}}{{{\left.{d}{x}\right.}}}\frac{{1}}{{x}^{{3}}}=\frac{{d}}{{{\left.{d}{x}\right.}}}{x}^{{-{3}}}=-{3}{x}^{{-{4}}}=-{3}{\left(\frac{{1}}{{x}^{{4}}}\right)} ...

\displaystyle\frac{{1}}{{3}}{\ln}{\left|{x}+{1}\right|}-\frac{{1}}{{6}}{\ln}{\left|{x}^{{2}}-{x}+{1}\right|}+\frac{\sqrt{{3}}}{{3}}{{\tan}^{{-{{1}}}}{\left(\frac{{{2}{x}-{1}}}{\sqrt{{3}}}\right)}}+{C} ...

Firstly multiply by x^n in Numerator and Denominator now x^n dx/x^n.x(x^n+1) x^(n-1)dx/x^n(x^n+1) let x^n=t after differentiation n.x^(n-1)dx=dt dt/n.t(t+1) after partial fraction integration of ...

\frac{df(x)}{d(x^2)}=\frac{df(x)}{dx}\frac{dx}{d(x^2)}=\frac{df(x)}{dx}\left(\frac{d(x^2)}{dx}\right)^{-1}=\frac{1}{2x}\frac{df(x)}{dx}