## anonymous 5 years ago solve this integral

1. anonymous

$\int\limits_{}\sqrt{tanx}dx$

2. anonymous

DAMNNNNN!!! that would be a great joke on a test

3. anonymous

Yeah it would...you would need to use Gamma functions/hyper geometric functions to solve it

4. anonymous

Yea I just joined this site today thinking I was all that in math cuz im the best in my calc 3 and differential equations class but ive come to realize that I have soo much more to learn before I can even concider myself the calculus stud lol

5. anonymous

Your not the only one...... but this online study forum is pretty bad retrice I learned two new trick to integrating problems yeaterday

6. anonymous

Yea dude i plan on getting really involved its the only place ive been able to find people that actually want my help.... i just started spring break at my school and on my facebook i said that i would give free tutoring to anyone that was interested during the break...i have a lot of "friends" at school and only a couple agreed but they didnt seem to care that much...its actually quite frightening

7. anonymous

That's how it is dude

8. anonymous

Hey solve this $\int\limits_{}e^xcos(x)dx$

9. anonymous

i got [(e^x)(sinx-cosx)]/2

10. anonymous

yeah that's it by the way I just figured out how to solve $\int\limits_{}\sqrt{tanx}dx$

11. anonymous

it's going to take me while though

12. anonymous

Yea idk if you looked up the solution...dont if you think you can solve it but its very long...are you saying that solving it like the way i assume we both solved the integral you gave me wont require knowledge of gamma functions etc....

13. anonymous

yeah without gamma or hypergeometric functions

14. anonymous

but it looks ugly and long

15. anonymous

Yeaaaa.... I'm going to finish this tomorrow but here's a hint start with u substitution I'm out, good luck

16. anonymous

lol good looks i think ill just sit on thins one for a few weeks while im learning

17. anonymous

and after the u sub your going to have to find x in terms of u and back substitute back into the integral and then it gets crazy....try it,have fun