It is likely that I made a mistake but here goes... Also I skipped a few steps (IBP of sec^3theta dtheta) to save some time.
Correct. But you don't need the absolute value.It is likely that I made a mistake but here goes... Also I skipped a few steps (IBP of sec^3theta dtheta) to save some time.
\\\\~~=\sec\theta\tan^3\theta-3\int\sec\theta\tan^2\theta\sec^2\theta~d\theta\\\\~~=\sec\theta\tan^3\theta-3\int\sec\theta\tan^2\theta(1+\tan^2\theta)d\theta)
d\theta\\\\~~~~=\sec\theta\tan^3\theta+3\int\sec\theta~d\theta-3\int\sec^3\theta~d\theta\\\\~~~~=\sec\theta\tan^3\theta+3\ln{\left | \sec\theta+\tan\theta \right |}-\frac{3}{2}(\ln{\left | \sec\theta+\tan\theta \right |}+\sec\theta\tan\theta)+c\\\\8I=2\sec\theta\tan^3\theta+3\ln{\left | \sec\theta+\tan\theta \right |}-3\sec\theta\tan\theta+c\\\\\therefore I=\frac{1}{4}x^3\sqrt{1+x^2}+\frac{3}{8}\ln{\left | x+\sqrt{1+x^2} \right |}-\frac{3}{8}x\sqrt{1+x^2}+c)
In HSC you don't need it. But absolute value is most correct.
yeah i'm pretty sure they accept either in the hsc.
No, I mean you don't need the absolute value in THIS question, whether or not the HSC generally requires it. The thing you are trying to find the absolute value of CANNOT be negative.
Yep nice work.It is likely that I made a mistake but here goes... Also I skipped a few steps (IBP of sec^3theta dtheta) to save some time.
1. Expand denominator:\cos x})
At first I did IBP with
care to share a solution?This is a great integral, a little long and the answer isn't very elegant, but the path towards it is I think.
Ok:care to share a solution?
wowzer haha thanks that's pretty cool.Ok:
Make a right angled triangle, we get that:
Replacing the bottom trig identities with the appropriate forms for u.
Then expand, the middle term can be integrated into something to do with sine inverse.
The first term and the last expanded can be dealt with using a sine substitution.
Very straightforward from there.
EDIT: On hindsight I think I could greatly shorten the length of this solution, perhaps by splitting the fractions of trig integral straight away.
