I think there is a problem there, considering the upper limit and the denominator.
Ah upper limit is supposed to be 1/2, not 1 sorry about that.
I can only turn this into a recurrence relation leading to (ln3)/2 minus a sum of n terms, each term being 1/[(2k-1).2^k]. Is this correct, and is it possible to sum this series?
Interesting method, nice work.
Then just integrate this which is straight forward.
Yep that is the simplest form one can get it at HSC level, I think it might have something to do with harmonic numbers however if we were to evaluate it in terms of those terms.
I don't think that is correct, some of your logarithms look similar to my ones so you may have made a mistake somwhere.Keeping all the logs separate gives:
 + \frac{1}{4}\ln(\sqrt{x^4+1}+1) - \frac{1}{4}\ln(\sqrt{x^4+1}-1))
Yep this is what I was aiming at, divide both top and bottom by x^2, then substiute u=x+1/x, it dissolves into a standard integral.
Thing is though, by dividing by x at the bottom and bottom then applying x=sqrt(x^2) we are assuming that x>0. So we've restricted the integrand to x>0 I think.
Originally STEP 200(something)!
Just checking - should there be a proviso that cos alpha is not equal to +/- 1 ?
