If g=f^(-1)" and "f'(x)=(1)/(1+x^(3))," ...

If `g=f^(-1)" and "f'(x)=(1)/(1+x^(3))," then "g'(x)=`

A

`1+[g(x)]^(3)`

B

`(1)/(1+[g(x)]^(3))`

C

`[g(x)]^(3)`

D

`1+g(3x)`

Verified by Experts

The correct Answer is:

A

DIFFERENTIATION
MARVEL PUBLICATION|Exercise MULTIPLE CHOICE QUESTIONS (TEST YOUR GRASP - I : CHAPTER 11)|19 Videos
DIFFERENTIATION
MARVEL PUBLICATION|Exercise MULTIPLE CHOICE QUESTIONS (TEST YOUR GRASP - II : CHAPTER 11)|24 Videos
DIFFERENTIAL EQUATIONS
MARVEL PUBLICATION|Exercise TEST YOUR GRASP|14 Videos
INTEGRATION - DEFINITE INTEGRALS
MARVEL PUBLICATION|Exercise TEST YOUR GRASP|20 Videos

Similar Questions

Explore conceptually related problems

If g is the inverse of f and f(x)=(1)/(1+x^(3)) then g'(x)=

If g(x) is the inverse function of f(x) and f'(x)=(1)/(1+x^(4)) , then g'(x) is

Let g(x) be the inverse of the function f(x) and f'(x)=(1)/(1+x^(3)) then g'(x) equals

Let g(x) be the inverse of the function f(x) ,and f'(x) 1/(1+ x^(3)) then g(x) equals

If g is the inverse of f and f'(x)=(1)/(1+x^(n)) prove that g'(x)=1+(g(x))^(n)

If f(x) and.g(x) are two functions with g(x)=x-(1)/(x) and f(g(x))=x^(3)-(1)/(x^(3)) then f(x) is

Let g(x) be the inverse of f(x) and f'(x)=1/(1+x^(3)) .Find g'(x) in terms of g(x).

Let g(x) be the inverse of f(x) and f'(x)=(1)/(3+x^(4)) and g'(x) in terms of g(x) is a+(g(x))^(b), then

If g=f^(-1)" and "f'(x)=(1)/(1+x^(3))," then "g'(x)=
Text Solution
|
If x=t*logt" and "y=t^(t)," then: "(dy)/(dx)=
Text Solution
|
If 2x=y^(1//n)," then: "x^(2)(y(1))^(2)=
Text Solution
|
If y=x^(2)+1" and "u=sqrt(1+x^(2))," then: "(dy)/(dx)=
Text Solution
|
If y=sqrt(cos2x)," then: "yy(2)+2y^(2)=
Text Solution
|
If x=(t+1)/(t),y=(t-1)/(t)," then: "(dy)/(dx)=
Text Solution
|
If d/dx\ ((1+x^2+x^4)/(1+x+x^2)) = ax+b, then (a, b) =
Text Solution
|
If cos x =1/sqrt(1+t^(2)), and sin y = t/sqrt(1+t^(2)), then (dy)/(dx)...
Text Solution
|
If y=(x^(1/3)-x^(-1/3))then (dy)/(dx) is
Text Solution
|
If y=(e^(4logx)-e^(3logx))/(e^(2logx)-e^(logx))," then: "(dy)/(dx)=
Text Solution
|
If y=cos^(2)[tan^(-1)sqrt((1-x)/(1+x)))] then dy/dx=
Text Solution
|
d/(dx)[sin^(- 1)(x-(4x^3)/27)]= 4x327dx
Text Solution
|
(d)/(dx)(sec^(2)x*csc^(2)x)=
Text Solution
|
If y=log((1)/(1-x))," then: "(dy)/(dx)-1=
Text Solution
|
If y=4^(log2(sinx))+9^(log3(cosx)," then "(log2(log3)y(1)=
Text Solution
|
If y=cos((1)/(2)cos^(-1)x)," then "(dx)/(dy)=
Text Solution
|
If y=(1+x^(1/4))(1+x^(1/2))(1-x^(1/4)) , then find (dy)/(dx)dot
Text Solution
|
If x^(2)=1+cosy," then: "(dy)/(dx)=
Text Solution
|
Defferential coefficient of x^(x)w.r.t.x*logx is
Text Solution
|
If x=sqrt(y+sqrt(y+sqrt(y+..."to"oo)))," then: "(dy)/(dx)=
Text Solution
|
If 3x^(2)+4xy-5y^(2)=0," then: "(dy)/(dx)=
Text Solution
|