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

`int(ln(ln(x e^x))(x+1)dx)/x` is equal to

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

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

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

int e^(x)(x+ln x)(x+1)dx

int(log(x+1)-log x)/(x(x+1))dx is equal to :

int(ln(e^(x)+1))/(e^(x))dx

int e^(x log a) e^(x) dx is equal to

Column I, a) int(e^(2x)-1)/(e^(2x)+1)dx is equal to b) int1/((e^x+e^(-x))^2)dx is equal to c) int(e^(-x))/(1+e^x)dx is equal to d) int1/(sqrt(1-e^(2x)))dx is equal to COLUMN II p) x-log[1+sqrt(1-e^(2x)]+c q) log(e^x+1)-x-e^(-x)+c r) log(e^(2x)+1)-x+c s) -1/(2(e^(2x)+1))+c

Column I, a) int(e^(2x)-1)/(e^(2x)+1)dx is equal to b) int1/((e^x+e^(-x))^2)dx is equal to c) int(e^(-x))/(1+e^x)dx is equal to d) int1/(sqrt(1-e^(2x)))dx is equal to COLUMN II p) x-log[1+sqrt(1-e^(2x)]+c q) log(e^x+1)-x-e^(-x)+c r) log(e^(2x)+1)-x+c s) -1/(2(e^(2x)+1))+c

Column I, a) int(e^(2x)-1)/(e^(2x)+1)dx is equal to b) int1/((e^x+e^(-x))^2)dx is equal to c) int(e^(-x))/(1+e^x)dx is equal to d) int1/(sqrt(1-e^(2x)))dx is equal to COLUMN II p) x-log[1+sqrt(1-e^(2x)]+c q) log(e^x+1)-x-e^(-x)+c r) log(e^(2x)+1)-x+c s) -1/(2(e^(2x)+1))+c

Recommended Questions

int(ln(ln(x e^x))(x+1)dx)/x is equal to
Text Solution
|
If I=int e^(-x) log(e^x+1) dx, then equal
Text Solution
|
int((1+(log)e x)^2)/(1+(log)e x^(x+1)+((log)e x^(sqrt(x)))^2)dx=
Text Solution
|
int(e^x(xlogx+1))/x dx is equal to
Text Solution
|
int(ln(ln(xe^(x)))(x+1)dx)/(x) is equal to
Text Solution
|
inte^(-x)log(e^x+1)dx
Text Solution
|
सिद्ध कीजिएः int (e^(x))/(x)(x log x+1)dx=e^(x)log x+c
Text Solution
|
The value of int x log x (log x - 1) dx is equal to
Text Solution
|
int(e^(x log a)+e^(a log x)+e^(a log a))dx
Text Solution
|