Home
Class 12
MATHS
int((ln x-1)/((ln x)^(2)+1))^(2)dx" is e...

int((ln x-1)/((ln x)^(2)+1))^(2)dx" is equal to (C is the constant of "

Promotional Banner

Similar Questions

Explore conceptually related problems

int{((ln x-1))/(1+(ln x)^(2))}^(2)dx is equal to

int{((log x-1)/(1+(log x)^(2))}^(2)dx is equal to

int(1)/(x(1+log x)^(2))dx is equal to

int x ^(x)((ln x )^(2) -1/x) dx is equal to:

int x.2^(ln(x^(2)+1))dx is equal to

int x.2^(ln(x^(2)+1))dx is equal to

int [ln (ln x)+(1)/((ln x)^(2))] dx

int (1)/(log x)-(1)/((log x)^(2))dx=

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