calculus: evaluate int[(x^9)cos(x^5)dx

[thebenji]

How to evaluate the indefinite integral:

. . .int[(x^9)cos(x^5)dx

I couldn't think of any possible u substitutions and substituting for trig functions didn't work for me either. Any help?

 

[pka]

Try this web site.
http://integrals.wolfram.com/index.jsp

 

[thebenji]

Hmm...well I want to know HOW to do it, not just an answer.

 

[pka]

One way to see how ‘they got it’ is the take the answer, differentiate it, and work with it until you get back to where you began.

 

[skeeter]

How to evaluate the indefinite integral:

. . .int[(x^9)cos(x^5)dx

I couldn't think of any possible u substitutions and substituting for trig functions didn't work for me either. Any help?

u = x^5
du = 5x^4 dx

INT x^9*cos(x^5) dx =
(1/5)INT 5x^4*x^5*cos(x^5) dx =
(1/5)INT u*cos(u) du

integration by parts performed by tabular integration ...

+ ... u ... cos(u)
- ... 1 ... sin(u)
+ ... 0 ... -cos(u)

(1/5)INT u*cos(u) du = (1/5)[u*sin(u) + cos(u)] + C

back substitute x^5 for u and you're there.