Write the number of points where `f(x)=|x|+|x-1|` is continuous but not differentiable.

f(x)={(max(sint), 0letlex , x in [0,pi]),(2+cosx,,xgtpi):} Find number of points where f(X) is not continuous and differentiable

The total number of points where the function f(x)=|x+2|+|x-1| is not differentiable is

Let f(x)=|2x^(2)+5|x|-3|,x in R .If "m" and "n" denote the number of points where "f" is not continuous and not differentiable respectively,then "m+n" is equal to:

" 6.Write the number of points where "f(x)=|x+2|+|x-3|" is not differentiable."

If f(x) is continuous at x=0 then xf(x) is differentiable at x=0 . By changing origin we can say that if f(x-a) is continuous at x=a then (x-a)f(x-a) is differentiable at x=a The number of points where f(x)=(x-3)|x^2-7x+12|+"cos"|x-3| is not differentiable is 1 (b) 2 (c) 3 (d) infinite

Let f(x)=sgn(x) and g(x)=x(1-x^(2)) The number of points at which f(g(x)) is not continuous and non-differentiable is

If f(x)=|x^(2)-3x+2|+|sinx| then number of points where f(x) is not differentiable in [-pi,pi] is

The number of points in (1,3) , where f(x) = a(([x^2]),a>1 is not differential is

Write the points where f(x)=|(log)_(e)x| is not differentiable.