The number of points at which the function
`f(x)="max"{a-x,a+x,b},-ooltxltoo,0ltaltb` cannot be differentiable

Plot the function f(x)= max{x, x^2, x^3}

The number of critical points of the function f(x)=|x|e^(-x) must be

The function f(x) = "max"{(1-x), (1+x), 2}, x in (-oo, oo) is

Find the number of points where the function f(x) = max(|tanx|,cos|x|) is non-differentiable in the interval (-pi,pi) .

The minimum value of the function defined by f(x)=max {x,x+1,2-x} is

Find the range of the following function f(x)=max{sinx, cosx}

Find the number of points of maxima and minima of the function. f(x)=1/8"In"x-bx+x^2,xgt0 where bge0 is a constant.

The set of all points where the function f(x)= frac(x)(1+|x| is differentiable is :

Number of points at which f(x) = |x^2+x|+|x-1| is non-differentiable is

The set of all points , where the function f(x)=(x)/((1+|x|)) is differentiable are -