Home
Class 12
MATHS
The integral intcos(log(e)x)dx is equal ...

The integral `intcos(log_(e)x)dx` is equal to: (where C is a constant of integration)

A

`x[cos(log_(e)x)-sin(log_(e)x)]+C`

B

`x/2[sin(log_(e)x)-cos(log_(e)x)]+C`

C

`x[cos(log_(e)x)+sin(log_(e)x)]+C`

D

`x/2[cos(log_(e)x)+sin(log_(e)x)]+C`

Text Solution

Verified by Experts

4
Promotional Banner

Topper's Solved these Questions

  • INDEFINITE INTEGRATION

    RESONANCE|Exercise HIGH LEVEL PROBLEMS (HLP)|29 Videos

  • INDEFINITE INTEGRATION

    RESONANCE|Exercise SELF PRACTIC PROBLEMS|25 Videos

  • INDEFINITE INTEGRATION

    RESONANCE|Exercise Exercise-3 Part I- JEE ADVANCED/ IIT-JEE PROBLEMS|8 Videos

  • GEOMETRY

    RESONANCE|Exercise Exercise-1 (Part-I: Previous Asked Question For Pre RMO)|50 Videos

  • MATRICES & DETERMINANT

    RESONANCE|Exercise HLP|33 Videos

Similar Questions

Explore conceptually related problems

The integral int cos(log_ex)dx is equal to (where C is constant of integration):

The integral int(2)/(e^(2x)-1)dx is equal to (Here C is a constant of integration)

The integral int(2x^(3)-1)/(x^(4)+x)dx is equal to: (Here C is a constant of integration)

The integral int((X)/(xsinx + cosx))^2dx is equal to (where C is a constant integration) :

The integral I=int sec^(3)x tan^(3)xdx is equal to (where, C is the constant of integration)

int(dx)/(1+e^(-x)) is equal to : Where c is the constant of integration.

The integral int((x)/(x sin x+cos x))^(2)" dx is equal to (where C is a constant of integration )

The integral int((x)/(x sin x+cos x))^(2)dx is equal to (where "C" is a constant of integration

The value of int(ln(cotx))/(sin2x)dx is equal to (where, C is the constant of integration)