Question

Evaluate the integral with hyperbolic or trigonometric substitution. ?

Answer 1

`sqrt(6)/144sin(2sec^-1sqrt(6)x/6)+V/72sec^-1(sqrt(6)x/6)+C`

Explanation:

by applying the trigonometric substitution:
`x=sqrt(6)sec(u)`
`dx=sqrt(6)sec(u)*tan(u)du`
`int((sqrt(6)secu*tanudu)/(6*sqrt(6)*sec^2u*sqrt(6)tanu))`

after simplification
`sqrt(6)/36int(1/sec^2(u)du)`=`sqrt(6)/36int(cos^2(u)du)`

by using double-angle formulae: `cos^2u=1/2(1+cos2u)`

`sqrt(6)/72int(1+cos2u)du`

=`sqrt(6)/72(u+1/2sin2u)`
by substituting back `u=sec^-1(x/sqrt(6))`
you get:
`intdx/(x^3*sqrt(x^2-6))=sqrt(6)/144sin(2sec^-1sqrt(6)x/6)+V/72sec^-1(sqrt(6)x/6)+C`

I hope this was helpful