The integral int(dx)/(x^(2)(x^(4)+1)^(3/...

The integral `int(dx)/(x^(2)(x^(4)+1)^(3//4))` equal

A

`((x^4 +1)/(x^4))^(1/4)+c`

B

`(x^4 +1)^(1/4)+c`

C

`-(x^4 +1)^(1/4) +C`

D

`-((x^4 +1)/(x^4))^(1/4)+c`

Verified by Experts

The correct Answer is:

D

Similar Questions

Explore conceptually related problems

The integral int(dx)/((x^(4)-1)^((1)/(4))) equal:

The integral int(dx)/((x+4)^(8//7)(x-3)^(6//7)) is equal to : (where C is constant of integration)

The integral I = int (dx)/((x+1)^(3//4)(x-2)^(5//4)) is equal to

(a) Integrate :int(dx)/(x^(1/2)+x^((1)/(3)))

The value of the integral int(1+x^(2))/(1+x^(4))dx is equal to

The integral int(dx)/(sqrt(2-3x-x^(2))) is equal to

The integral int(2x^(3)-1)/(x^(4)+x)dx is equal to: (Here C is a constant of integration)

The integral int(2x^(3)-1)/(x^(4)+x)dx is equal to (here C is a constant of intergration)

The value of the definite integral int_(-1)^(1)(1+x)^(1//2)(1-x)^(3//2)dx equals

Integrate: int(3 x^2)/(x^(3)-1)dx