Let `g(x)=|4x^(3)-x|cos(pi x)` then number of points where `g(x)` is non-differentiable in `(-oo,oo)` ,is equal to

Let f:[0,(pi)/(2)]rarr R a function defined by f(x)=max{sin x,cos x,(3)/(4)} ,then number of points where f(x) is non-differentiable is

Let f: [0,(pi)/(2)]rarr R be a function defined by f(x)=max{sin x, cos x,(3)/(4)} ,then number of points where f(x) in non-differentiable is

Let f(x)=sin x,g(x)={{max f(t),0 pi Then number of point in (0,oo) where f(x) is not differentiable is

If f(x)=max{tanx, sin x, cos x} where x in [-(pi)/(2),(3pi)/(2)) then the number of points, where f(x) is non -differentiable, is

f:(0,oo)rArr R f(x)= max(x^(2),|x|) then the number of points where function is non- 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

Consider the function f defined as f(x)=||x|-1| forallxepsilonR and another function g(x) such that g(x)=fof(x) . Find the number of points where g(x) is non differentiable

In f (x)= [{:(cos x ^(3),, x lt 0), ( sin x ^(3) -|x ^(3)-1|,, x ge 0):} then find the number of points where g (x) =f (|x|) is non-differentiable.

Using graph find the number of points where g(x) is non differentiable.f(x)=x-3;x 0 or x=0g(x)=f(|x|)+|f(x)