In [-1,1], Lagrange's Mean Value theorem...

In [-1,1]`, Lagrange's Mean Value theorem is applicable to

`f(x) = |x|`

`f(x) = {:{(cotx,"," x cancel(=)0),(0,"," x=0):}`

`f(x)= {:{((1)/(x),","x cancel(=)0),(0,"," x =0):}`

`f(x) = x^(2)`

Text Solution

Verified by Experts

The correct Answer is:

Topper's Solved these Questions

MEAN VALUE THEOREMS
AAKASH SERIES|Exercise LECTURE SHEET(EXERCISE-I (MORE THAN ONE CORRECT ANSWER TYPE QUESTIONS)|1 Videos
MEAN VALUE THEOREMS
AAKASH SERIES|Exercise PRACTICE SHEET (EXERCISE-I (LEVEL-I))|41 Videos
MAXIMA AND MINIMA
AAKASH SERIES|Exercise ADDITIONAL PRACTICE EXERCISE (LEVEL - II (PRACTICE SHEET )(ADVANCED)) (INTEGER TYPE QUESTIONS)|3 Videos
MULTIPLE & SUBMULTIPLE
AAKASH SERIES|Exercise PRACTICE SHEET (EXERCISE - II) (LEVEL - II) (Linked Comprehension Type Questions)|5 Videos

Similar Questions

Explore conceptually related problems

In [0,1], Lagrange's mean value theorem is not applicable to

Given f(x) = 4- ((1)/(2) - x)^(2//3) , g(x) = {:{((tan[x])/(x),","x cancel(=)0),(1,","x=0):}" "h(x)={x}, k (x) = 5^(log_(2)(x+3)) Then in [0,1], Lagrange's mean value theorem is not applicable to (where [.] and {.} represents the greatest integer functions and fractions part functions, respectively )

State Lagrange's mean value theorem.

Define Lagrange's Mean value theorem.

Lagrange's mean value theorem cannot be applied for

Lagrange's theorem can not be applicable for

AAKASH SERIES-MEAN VALUE THEOREMS-PRACTICE SHEET (EXERCISE-I (LEVEL-II (MORE THAN ONE CORRECT ANSWER TYPE QUESTIONS ) )

In [-1,1], Lagrange's Mean Value theorem is applicable to
Text Solution
|
Given f(x) = 4- ((1)/(2) - x)^(2//3) , g(x) = {:{((tan[x])/(x),","x ca...
Text Solution
|
If 0 lt a lt b lt ( pi )/(2) and f(a,b) = ( tan b - tan a )/( b-a), th...
Text Solution
|