The integral int (1+x-(1)/(x))e^(x+(1)/(...

The integral `int (1+x-(1)/(x))e^(x+(1)/(x))dx` is equal to :

A

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

B

`x e^(x+1/x)+C`

C

`(x+1)e^(x+1/x)+C`

D

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

Verified by Experts

The correct Answer is:

B

Similar Questions

Explore conceptually related problems

int1/(1+e^x)dx is equal to

int (x-1)e^(-x) dx is equal to :

int1/(1+e^(x))dx is equal to

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

int x^(3)/(x+1) dx is equal to

int 1/(x(x^(7)+1)) dx is equal to

int_(0)^(1)x(1-x)''dx is equal to

int (tan^(-1)x)^(3)/(1+x^(2)) dx is equal to

int e^(e^(e^(x)))e^(e^(x))dx is equal to :

int (x+1)^(2)e^(x)dx =