Home
Class 12
MATHS
The solution(s) of the equation cos^(-1)...

The solution(s) of the equation `cos^(-1)x=tan^(-1)x` satisfy

A

`x^(2)=(sqrt(5)-1)/(2)`

B

`x^(2)=(sqrt(5)+1)/(2)`

C

`sin(cos^(-1)x)=(sqrt(5)-1)/(2)`

D

`tan(cos^(-1)x)=(sqrt(5)-1)/(2)`

Text Solution

Verified by Experts

The correct Answer is:
A, C
Promotional Banner

Topper's Solved these Questions

  • INVERSE TRIGONOMETRIC FUNTIONS

    VK JAISWAL|Exercise Exercise-3 : Comprehension Type Problems|2 Videos

  • INVERSE TRIGONOMETRIC FUNTIONS

    VK JAISWAL|Exercise Exercise-4 : Matching Type Problems|4 Videos

  • INVERSE TRIGONOMETRIC FUNTIONS

    VK JAISWAL|Exercise Exercise-5 : Subjective Type Problems|6 Videos

  • INDEFINITE AND DEFINITE INTEGRATION

    VK JAISWAL|Exercise EXERCISE (SUBJECTIVE TYPE PROBLEMS)|29 Videos

  • LIMIT

    VK JAISWAL|Exercise EXERCISE (SUBJECTIVE TYPE PROBLEMS)|7 Videos

Similar Questions

Explore conceptually related problems

The solution set of the equation sin^(-1)x=2 tan^(-1)x is

Number of solution(s) of the equation 2tan^(-1)(2x-1)=cos^(-1)(x) is :

Number of solution(s) of the equation f(x)=tan^(-1)x, is not correct

If p_(0) is the solution of the equation [sin cos^(-1)(cos(tan^(-1)x))]=cos^(-1)p, then

Number of solution (s) of the equations cos^(-1) ( cos x) = x^(2) is

The solution of the equation (tan^(2)x-1)^(-1)=1+2cos 2x is

Find the solution of the equation tan^(-1)x-cot^(-1)x=tan^(-1)((1)/(sqrt(3)))

The number of solutions of the equation sin^(-1)|x|=|cos^(-1)x| are