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) =

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

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

The value of 'c' for which Lagrange's Mean value Theorem is applicable to f (x) = x^(1//2) in [0,4] is

Show that Lagrange's mean-value theorem is not applicable to f(x) = |x| " on " [-1, 1]

Let f(x)=1+|x-2|+sin x, then lagrange's means value theorem is applicable for f(x) in.

Let f(x)={{:((x^p)/((sinx)q')),(0):}" if " 0ltxle(pi)/(2),(p,qinR) if x=0. Then Lagrange's mean value theorem is applicable to f(x) in closed interval [0,x].

Show that Lagrange's mean-value theorem is not applicable to f(x) = (1)/(x) " on " [-1, 1]

Show that the lagranges mean value theorem is not applicable to the function f(x)=1/x on [-1,\ 1] .