The value of `int _(-1)^(1) log ((2-x)/(2+x)) d x ` is equal to

A

`(1)/(2)`

B

1

C

`-1`

D

0

Verified by Experts

The correct Answer is:

D

Similar Questions

Explore conceptually related problems

The value of int_(-1/2)^(1/2) (cosx). log ((1-x)/(1+x)) dx is

The value of int_(-1)^(2) (|x|)/(x) dx is :

The value of int_(0)^(1)(log(1+x))/(1+x^(2))dx is

The value of int_(-1//2)^(1//2)(cosx)[log((1-x)/(1+x))]dx is

The value of int_(-1)^(2)(|x|)/(x) dx is

int_(-1)^(1) log (x+sqrt(x^(2)+1))dx =

int log x dx is equal to :

The value of int_0^(1) tan^(-1) ((2x-1)/(1+x-x^(2))) dx is

The value of int_0^1 (8 log (1 + x))/(1 + x^2) dx is:

The value of int_(-1)^(1) (2|x| - |x|^3)dx is :