If `f(x) = |1 -x|,` then the points where `sin^-1 (f |x|)` is non-differentiable are

Let f(x) = ||x|-1|, then points where, f(x) is not differentiable is/are

The set of points where , f(x) = x|x| is twice differentiable is

Let f(x) = {{:(sgn(x)+x",",-oo lt x lt 0),(-1+sin x",",0 le x le pi//2),(cos x",",pi//2 le x lt oo):} , then number of points, where f(x) is not differentiable, is/are

f(x) = maximum {4, 1 + x^2, x^2-1) AA x in R . Total number of points, where f(x) is non-differentiable,is equal to

Show that f(x) = |x| sin x is differentiable at x=0.

let f: RrarrR be a function defined by f(x)=max{x,x^3} . The set of values where f(x) is differentiable is:

If f(x) = (x)/(1+(log x)(log x)....oo), AA x in [1, 3] is non-differentiable at x = k. Then, the value of [k^(2)] , is (where [*] denotes greatest integer function).

Let f(x) = [ n + p sin x], x in (0,pi), n in Z , p a prime number and [x] = the greatest integer less than or equal to x. The number of points at which f(x) is not differentiable is :