The answer is \displaystyle=\frac{{x}^{{2}}}{{2}}-\frac{{3}}{{4}}{\ln{{\left({\left|{x}+{1}\right|}\right)}}}+\frac{{5}}{{4}}{\ln{{\left({\left|{x}-{1}\right|}\right)}}}-\frac{{1}}{{4}}{\ln{{\left({x}^{{2}}+{1}\right)}}}+{\arctan{{x}}}+{C} ...

Partial fractions are the way to go. The fraction is already reduced, and the denominator is fully factored over the reals, so your setup is \frac{2x^2+x}{(x+1)(x^2+1)}=\frac{A}{x+1}+\frac{Bx+C}{x^2+1}=\frac{A(x^2+1)+(Bx+C)(x+1)}{(x+1)(x^2+1)}\;, ...

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

\displaystyle\int\ \frac{{{x}^{{2}}+{x}+{1}}}{{{x}^{{2}}{\left({x}+{2}\right)}}}\ {\left.{d}{x}\right.}=\frac{{1}}{{4}}{\ln}{\left|{x}\right|}-\frac{{1}}{{{2}{x}}}+\frac{{3}}{{4}}{\ln}{\left|{x}+{2}\right|}+{C} ...

\displaystyle I = \int \frac {2x+1}{(x^2+x+1)^2} dx + 2 \int_{}^{} \frac {dx}{(x^2+x+1)^2} \displaystyle I_1 = \int \frac {2x+1}{(x^2+x+1)^2} dx \displaystyle \Rightarrow (x^2+x+1) = t ...

\displaystyle\int\ \frac{{{x}-{2}}}{{{x}{\left({x}^{{2}}-{4}{x}+{5}\right)}^{{2}}}}\ {\left.{d}{x}\right.}=-\frac{{2}}{{25}}{\ln}{\left|{x}\right|}+\frac{{1}}{{25}}{\ln}{\left|{x}^{{2}}-{4}{x}+{5}\right|}-\frac{{3}}{{50}}{\arctan{{\left({x}-{2}\right)}}}+\frac{{{x}-{4}}}{{{10}{\left({x}^{{2}}-{4}{x}+{5}\right)}}}+{c} ...