Home
Class 12
MATHS
Find the derivative of f(tanx)wdotrdottg...

Find the derivative of `f(tanx)wdotrdottg(secx)a tx=pi/4,` where `f^(prime)(1)=2a n dg^(prime)(sqrt(2))=4.`

Text Solution

Verified by Experts

`"Let "u=f(tan x) and v=g(sec x).` Therefore,
`(du)/(dv)=f'(tan x) sec^(2)x`
`" and "(dv)/(dx)=g'(sec x) sec x tan x`
`therefore" "(du)/(dv)=(du)/(dx)//(dv)/(dx)=(f'(tan x) sec^(2)x)/(g'(sec x) sec x tan x)`
`"or "[(du)/(dv)]_(x=(pi)/(4))=(f'(tan""(pi)/(4)))/(g'(sec""(pi)/(4))sin""(pi)/(4))=(f'(1)sqrt(2))/(g'(sqrt(2)))`
`=(2sqrt(2))/(4)=(1)/(sqrt(2))`
Promotional Banner

Topper's Solved these Questions

  • DIFFERENTIATION

    CENGAGE|Exercise Exercise 3.1|7 Videos

  • DIFFERENTIATION

    CENGAGE|Exercise Exercise 3.2|38 Videos

  • DIFFERENTIAL EQUATIONS

    CENGAGE|Exercise Question Bank|25 Videos

  • DOT PRODUCT

    CENGAGE|Exercise DPP 2.1|15 Videos

Similar Questions

Explore conceptually related problems

Find the derivative of f(tanx) w.r.t. g(secx) at x=pi/4 , where f^(prime)(1)=2 and g^(prime)(sqrt(2))=4 .

Find the derivative of f(tan x)w*r.tg(sec x) at x=(pi)/(4), where f'(1)=2 and g'(sqrt(2))=4

The derivative of f(tan x)w*r.t.g(sec x) at x=(pi)/(4), where f'(1)=2 and g'(sqrt(2))=4

If f'(1)=-2sqrt(2) and g'(sqrt(2))=4, then the derivative of f(tan x) with respect to g(sec x) at x=(pi)/(4), is 1(b)-1(c)2(d)4

Find the anti derivative F of f defined by f(x)=4x^(3)-6 where F(0)=3

If : f'(1)=2" and "g'(sqrt(2))=4," then: derivative of "f(tanx)w.r.t.g(secx)" at "x=pi//4, is

Find the derivative of the following functions : 2tanx-7secx

What is the derivative of the function f(x) = e^(tanx)+ln(secx)-e^(lnx)at x=(pi)/(4) ?

What is the derivative of the function f(x)=e^(tanx)+ln(secx)-e^(lnx)" at "x=(pi)/(4)?