int [(log x-1)/(1+(logx)^(2))]^(2) dx=...

`int [(log x-1)/(1+(logx)^(2))]^(2) dx=`

A

`(xe^x)/(1+x^2)+C`

B

`x/((logx)^2+1)+C`

C

`logx/((logx)^2+C)`

D

`x/(x^2+1)+C`

Verified by Experts

The correct Answer is:

B

int [(log x-1)/(1+(logx)^(2))]^(2) dx=
Text Solution
|
"F i n d"int[log(logx)+1/((logx)^2)]dx Find log (log x)+ |dx 2 (log x)
Text Solution
|
Evaluate int((log x-1)/(1+(logx)^(2)))^(2)dx
Text Solution
|
Evaluate the following integrals: int{log(logx)+(1)/((logx)^(2))}dx
Text Solution
|
सिद्ध कीजिए कि - int(1)/(x[6(logx)^(2)+7 logx+2])dx=log|(1+logx^(2))...
Text Solution
|
int(1+logx)/(x(2+log x)(3+logx))dx
Text Solution
|
सिद्ध कीजिएः int (log(1-x))/(x^(2))dx=(1-(1)/(x))log(1-x)-logx+c
Text Solution
|
int[log(logx)+(1)/((logx)^(2))]dx
Text Solution
|
int {((log x-1))/((1+(logx)^(2)))}^(2)dx=
Text Solution
|

Similar Questions