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!=0 1,x=0 , h(x)={x}, k(x)=5^((log)_2(x+3)). Then in [0,1], lagranges mean value theorem is not applicable to (a) f (b) g (c) k (d) h (where [.] and {.} represents the greatest integer functions and fractional part functions, respectively).

In [0, 1] the Lagrange's Mean Value Theorem is not applicable to: (a) f(x)={1/2-x ,x<1/2 (1/2-x)^2, xgeq1/2 (b) f(x)=|x| (C) f(x)=x|x| (d) none of these

In [0,1] , lagrange mean value theorem is NOT applicable to

For which of the following function 9s) Lagrange's mean value theorem is not applicable in [1,2] ?

The Lagrange's mean value theorem is not applicable to f(x) in [2, 4], if f(x) is

Lagrange's mean value theorem is not applicable to f(x) in [1,4] where f(x) =

Let for function f (x)= [{:(cos ^(-1)x ,,, -1 le x le 0),( mx +c ,,, 0 lt x le 1):}, Lagrange's mean value theorem is applicable in [-1,1] then ordered pair (m,c ) is:

Rolle’s theorem can not applicable for :

Work energy theorem is applicable

Using Lagranges mean value theorem, show that sinx 0.