Hey, Veeky Forums. I tried evaluating this integral using trig sub, but it didn’t work. Can someone tell me why...

I got this result for your sub:
[math] \sqrt{x}= \tan^2 \theta[/math]
gives you the integral of
[math] \sin^3 \theta \cos \theta~d \theta[/math]

thats the problem, at this point you have to use a u-sub anyway, so why not just use it to begin with instead of a trig sub

just a demonstration of what Grandpa used to say:
>there is more than one way to skin a cat

OP here. That's what I got. The final answer is sin^4 (theta)

It probably sounds weird, but its easier for me this way

>The final answer is sin^4 (theta)
That's not the final answer though. How do you intend to bring this back into terms of [math]x[/math]?

x/((1 + sqrtx)^2)?

You're saying [math] \int \frac{dx}{(1+\sqrt x)^3} = \sin^4 \theta[/math]. Your final answer shouldn't be in terms of [math] \theta [/math] when the question is in terms of [math]x[/math].

I know, I phrased it wrong. My bad.

why the fuck would you simplify with trig?
just use x = u^2 to get it to be 2u/(1+u)^3, then add 0 = 2 - 2, getting (2u + 2)/(1+u)^3 - 2/(1+u)^3, which simplifies to 2/(1+u)^2 - 2/(1+u)^3. Then use the substitution u = w - 1 to get 2/w^2 - 2/w^3, from there, its absolutely basic
i have no idea why anybody would use trig on this problem

See:

>It's not a homework problem because I SAID SO!
Fuck off, nigger.