Home
Class 12
MATHS
If f(x)=(log(cotx)tan x)(log(tan x)cotx)...

If `f(x)=(log_(cotx)tan x)(log_(tan x)cotx)+"tan"^(-1)(4x)/(4-x^(2))` then 2f'(2) is equal to -

Text Solution

Verified by Experts

The correct Answer is:
1
Promotional Banner

Topper's Solved these Questions

  • DIFFERENTIATION

    CHHAYA PUBLICATION|Exercise Sample Questions for Competitive Examination (Matrix Match Type)|2 Videos

  • DIFFERENTIATION

    CHHAYA PUBLICATION|Exercise Sample Questions for Competitive Examination (Comprehension Type)|6 Videos

  • DIFFERENTIATION

    CHHAYA PUBLICATION|Exercise Sample Questions for Competitive Examination (Multiple Correct Answers Type)|5 Videos

  • DIFFERENTIAL EQUATIONS OF THE FIRST ORDER AND FIRST DEGREE

    CHHAYA PUBLICATION|Exercise E ASSERTION-REASON TYPE|2 Videos

  • DIRECTION COSINES AND DIRECTION RATIOS

    CHHAYA PUBLICATION|Exercise Assertion-Reason Type|2 Videos

Similar Questions

Explore conceptually related problems

If intcosxlog(tan""(x)/(2))=sinxlog(tan""(x)/(2))+f(x) then f(x) is equal to

If f(x)=log|2x|,x!=0 then f'(x) is equal to

int (tan x)/(log (cos x))dx

If log_(4)((2f(x))/(1-f(x)))=x, " then "(f(2010)+f(-2009)) is equal to

2"tan"(tan^(-1)(x)+tan^(-1)(x^3)) ,where x in R-{-1,1}, is equal to

If f(x)=log_(5)log_(3)x , then f'(e ) is equal to

If f(x) = 4^x then f(log_(4)x) =

If f(x)=log("tan"(x)/(2)) , then the value of f'(x) is -

If int cos x log (tan""(x)/(2))dx = sin x log (tan""(x)/(2)) + f(x) then f(x) is equal to, (assuming c is a arbitrary real constant)

If f(x) =tan ^(-1)x-(1)/(2)log x . Then -