# How to evaluate indefinite integrals $\int\frac{e^{m \arctan x}}{(1+x)^{3/2}}\ dx$. [closed]

$$\int\frac{e^{m \arctan x}}{(1+x)^{3/2}}\ \operatorname{dx}$$

I tried solving with identities and searched around a bit but couldn't find a solution. How do we proceed?

## closed as off-topic by user21820, Saad, I am Back, José Carlos Santos, Omran KoubaDec 1 '18 at 14:23

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• Welcome to MSE. It will be more likely that you will get an answer if you show us that you made an effort. This should be added to the question rather than in the comments. – José Carlos Santos Aug 7 '18 at 14:22
• Are you sure that you made no typo in the integral? For example shouldnt it be: $\int\frac{e^{m \arctan x}}{(1+x^2)^{3/2}}\ \operatorname{dx}?$ – Zacky Aug 9 '18 at 9:47
• yes, I'm sure the denominator has the term (1+x)^3/2 – CJamie Aug 9 '18 at 15:54