If f(x)dx=g(x) and f^(-1)(x) is differen...

If `f(x)dx=g(x) and f^(-1)(x)` is differentiable, then `intf^(-1)(x)dx` equal to

A

`g^(-1)x+C`

B

`xf^(-1)(x)-g(f^(-1)(x))+C`

C

`xf^(-1)(x)-g^(-1)(x)+C`

D

`f^(-1)(x)+C`

Text Solution

Verified by Experts

Promotional Banner

Promotional Banner

Topper's Solved these Questions

INTEGRALS
AAKASH INSTITUTE|Exercise Objective Type Questions (Only one answer)|64 Videos
INTEGRALS
AAKASH INSTITUTE|Exercise Objective Type Questions (More than one answer)|29 Videos
INTEGRALS
AAKASH INSTITUTE|Exercise Try yourself|50 Videos
DIFFERENTIAL EQUATIONS
AAKASH INSTITUTE|Exercise Assignment Section - J (Aakash Challengers Questions)|4 Videos
INVERSE TRIGONOMETRIC FUNCTIONS
AAKASH INSTITUTE|Exercise ASSIGNMENT (SECTION - J)(ANKASH CHALLENGERS QUESTIONS)|4 Videos

Similar Questions

Explore conceptually related problems

If int f(x)dx=g(x) then int f^(-1)(x)dx is

If intf(x)dx=g(x), then : intf^(-1)(x)dx=

If intf(x)dx=g(x), then intf(x)g(x)dx is equal to

If intf(x)dx=h(x) and intf(x)dx=g(x) as well, then

If intf(x)dx=g(x),then intx^(11)f(x^(6))dx is equal to

If f(x) and g(x) are differentiable function then show that f(x)+-g(x) are also differentiable such that d(f(x)+-g(x))/(dx)=d(f(x))/(dx)+-d(g(x))/(dx)

If f(x) and g(x) a re differentiate functions, then show that f(x)+-g(x) are also differentiable such that (d)/(dx){f(x)+-g(x)}=(d)/(dx){f(x)}+-(d)/(dx){g(x)}

If intf(x)dx=f(x)+c," then " f(x)=

AAKASH INSTITUTE-INTEGRALS-Competition level Questions

Evaluate : intx^(n)logxdx.
Text Solution
|
int(x-1)e^(3x)dx equals
Text Solution
|
If f(x)dx=g(x) and f^(-1)(x) is differentiable, then intf^(-1)(x)dx eq...
Text Solution
|
int tan^-1(sqrt((1-x)/(1+x)) dx
Text Solution
|
inte^(sqrt(x))dx is equal to
Text Solution
|
int(logx)^(2)dx=?
Text Solution
|
The value of int [f(x)g''(x) - f''(x)g(x)] dx is equal to
Text Solution
|
int(1-x^(2))logxdx equals
Text Solution
|
int(x^(6)+7x^(5)+6x^(4)+5x^(3)+4x^(2)+3x+1)e^(x)dx equals
Text Solution
|
int(dx)/sqrt(2-3x-x^(2))=
Text Solution
|
If intf(x)dx=xcospix+C, then f((1)/(2))=
Text Solution
|
Evaluate: intsqrt(x^(2)+2x+5)dx
Text Solution
|
int(0)^((pi)/(2))(sqrt(cotx)dx)/(sqrt(cotx)+sqrt(tanx))
Text Solution
|
The value of int(0)^(pi//2)(dx)/(1+tan^(3)x) is
Text Solution
|
The value of int(0)^(a)(dx)/(x+sqrt((a^(2)-x^(2))) is equal to
Text Solution
|
int(0)^(pi//2n)(dx)/(1+(tan nx)^(n)) is equal to n in N :
Text Solution
|
int(cos2x)/((sinx+cosx)^(2))dx is equal to
Text Solution
|
int(-1)^(1)x^(17)cos^(4) x dx is equal to
Text Solution
|
int (pi//4)^(pi//2) "cosec"^(2)dx is equal to
Text Solution
|
Let f : R -> R and g : R -> R be continuous functions. Then the value...
Text Solution
|