The value of int ("ln"(x-1)/(x+1))/(x^(2...

The value of `int ("ln"(x-1)/(x+1))/(x^(2)-1)` dx is equal to:

A

`1/2"ln"(x-1)/(x+1)+C`

B

`1/4"ln"^(2)(x-1)/(x+1)+C`

C

`1/2"ln"^(2)(x+1)(x-1)+C`

D

`1/4"ln"^(2)(x+1)/(x-1)+C`

Text Solution

AI Generated Solution

To solve the integral \[ \int \frac{\ln(x-1)}{(x+1)(x^2-1)} \, dx, \] we will use substitution and integration techniques. ...

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