\displaystyle\int\ {\ln{{\left({1}-{x}^{{9}}\right)}}}\ {\left.{d}{x}\right.}=-\frac{{x}^{{10}}}{{10}}-\frac{{1}}{{2}}\frac{{x}^{{19}}}{{19}}-\frac{{1}}{{3}}\frac{{x}^{{28}}}{{28}}-\frac{{1}}{{4}}\frac{{x}^{{37}}}{{37}}-\ldots. ...

It is \displaystyle\int{\ln{{\left({1}+{x}^{{3}}\right)}}}{\left.{d}{x}\right.}={x}{\ln{{\left({x}^{{3}}+{1}\right)}}}-\frac{{1}}{{2}}{\ln{{\left({x}^{{2}}-{x}+{1}\right)}}}-{3}{x}+{\ln{{\left({x}+{1}\right)}}}+\sqrt{{{3}}}{{\tan}^{{-{1}}}{\left(\frac{{{2}{x}-{1}}}{\sqrt{{{3}}}}\right)}}+{c} ...

reading this as : \displaystyle\int\ {\ln{{\left({2}{x}^{{2}}\right)}}}\ {\left.{d}{x}\right.} then \displaystyle={x}{\left({\ln{{2}}}{x}^{{2}}-{2}\right)}+{C} Explanation: \displaystyle\int\ {\ln{{\left({2}{x}^{{2}}\right)}}}\ {\left.{d}{x}\right.} ...

Gió Jan 31, 2015 Using Integration by substitution I set: \displaystyle{\ln{{\left({3}{x}\right)}}}={t} so: \displaystyle{3}{x}={e}^{{t}} \displaystyle{x}=\frac{{e}^{{t}}}{{3}} ...

I tried this: Explanation: I used some properties of logs first to manipulate the integrand:

Use integration by parts and integration by partial fractions to find that the integral evaluates to \displaystyle{x}{\ln{{\left({x}^{{2}}-{1}\right)}}}-{2}{x}-{\ln}{\left|{x}-{1}\right|}+{\ln}{\left|{x}+{1}\right|}+{C} ...