Answer
$$\displaystyle{\int\frac{x}{\sqrt{1+x^2}}dx=\sqrt{1+x^2} +C}\\$$
Work Step by Step
$\displaystyle{I=\int\frac{x}{\sqrt{1+x^2}}dx}\\$
$\displaystyle \left[\begin{array}{ll} x=\tan\theta & x^2=\tan^2\theta \\ & \\ \frac{dx}{d\theta}=\sec^2\theta & dx=\sec^2\theta\ d\theta \end{array}\right]$ Integration by substitution
$\displaystyle{I=\int\frac{\tan \theta}{\sqrt{1+\tan^2\theta}}\sec^2\theta\ d\theta}\\
\displaystyle{I=\int\frac{\tan \theta}{\sec\theta}\sec^2\theta\ d\theta}\\
\displaystyle{I=\int\tan\theta\sec\theta\ d\theta}\\
\displaystyle{I=\sec\theta +C}\\
\displaystyle{I=\sqrt{1+x^2} +C}\\
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