Let, I=intx^2/sqrt(x^2-4)dx.
We subst. x=2secy," so that, "dx=2secytanydy.
:. I=int(4sec^2y)/sqrt(4sec^2y-4)*2secytanydy,
=int(4sec^2y)/(2tany)*2secytanydy,
=4intsec^3ydy,
=4intsecy*sec^2ydy,
=4intsqrt(tan^2y+1)sec^2ydy.
Next, we use the substn. tany=t :. sec^2ydy=dt.
:. I=4intsqrt(t^2+1)dt,
=4{t/2sqrt(t^2+1)+1/2ln|t+sqrt(t^2+1)|},
=2{tanysecy+ln|tany+secy|}......[because, t=tany].
Returning to secy=x/2," so that, "tany=sqrt(x^2/4-1), we have,
I=2{x/2*sqrt(x^2-4)/2+ln|x/2+sqrt(x^2-4)/2|},
rArr I=x/2sqrt(x^2-4)+2ln|x/2+sqrt(x^2-4)/2|+C, or,
I=x/2sqrt(x^2-4)+2ln|x+sqrt(x^2-4)|+c, c=C-2ln2.
However, the integral can easily be dealt with without
using the substn. as shown below :
I=intx^2/sqrt(x^2-4)dx=int{(x^2-4)+4}/sqrt(x^2-4)dx,
int{(x^2-4)/sqrt(x^2-4)+4/sqrt(x^2-4)}dx,
=intsqrt(x^2-4)dx+4int1/sqrt(x^2-4)dx,
={x/2sqrt(x^2-4)-4/2ln|x+sqrt(x^2-4)|}+4ln|x+sqrt(x^2-4)|.
I=x/2sqrt(x^2-4)+2ln|x+sqrt(x^2-4)|+C_1, as before!
Enjoy Maths.!
