Your work is correct; the only difference between your antiderivative and the one calculated by WolframAlpha is a constant of integration, 1/2. You may verify that \frac{(x-1)^2}{x^2-2 x+2}+\frac{x-1}{2 \left(x^2-2 x+2\right)}-\frac{1}{2} = \frac{x^2-x-1}{2 \left(x^2-2 x+2\right)}, ...

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} ...

\displaystyle\int \frac {x^5 dx}{x^3 - 2 x^2 - 5x + 6} I=\frac {x^5}{x^3 - 2x^2 - 5x + 6} where I is the integral I=x^2+2x+9+\dfrac {22x^2+33x-54}{x^3 - 2 x^2 - 5x + 6} by using long ...

The answer is \displaystyle=-\frac{{22}}{{15}}{\ln{{\left({\left|{x}+{2}\right|}\right)}}}+\frac{{2}}{{3}}{\ln{{\left({\left|{x}-{1}\right|}\right)}}}-\frac{{21}}{{5}}{\ln{{\left({\left|{x}-{3}\right|}\right)}}}+{C} ...

\displaystyle\frac{{2}}{{3}}{x}^{{3}}+{7}{x}+{7}{\ln}{\left|\frac{{{x}-{2}}}{{{x}+{2}}}\right|}+\frac{{1}}{{4}}{\ln}{\left|{x}\right|}-\frac{{1}}{{8}}{\ln}{\left|{x}-{2}\right|}-\frac{{1}}{{8}}{\ln}{\left|{x}+{2}\right|}+{C}, ...

The answer is \displaystyle=\frac{{1}}{\sqrt{{{2}}}}{\arctan{{\left(\frac{{x}}{\sqrt{{2}}}\right)}}}-\frac{{1}}{{{2}{\left({x}^{{2}}+{2}\right)}}}+{C} Explanation: We need \displaystyle\int\frac{{{\left.{d}{x}\right.}}}{{{1}+{x}^{{2}}}}={\arctan{{x}}}+{C} ...