[" Let "f(x)={[max||x|,x^(2)|,quad |x|<=2],[8-2|x|,,2<|x|<=4]],[" Let S be the set of points in the interval "],[(-4,4)" at which "f" is not differentiable."],[" Then "S" : "]

Let f(x) = {{:("max"{|x|,x^(2)}", "|x|le2 ),(8-2|x|", "2lt|x|le4):} Let S be the set of points in the interval (-4, 4) at which f is not differentiable. Then, S

Let f(x)={{:("max"{|x|","x^(2)},|x|le3),(12-|x|,3lt|x|le12):} . If S is the set of points in the interval (-12, 12) at which f is not differentiable, then S is

Let f(x)=max{|x^(2)-2|x||,|x|} and g(x)=min{|x^(2)-2|x||,|x|} then prove that f(x) in not differentiable at 5 points and g(x) is not differentiable at 7 points.Also draw the graph of both f(x) and g(x) .

Let f(x)=max*{|x^(2)-2|x||,|x|} then number of points where f(x) is non derivable, is :

Let f(x)=max{x,x^(2)} . Then, equivalent definition of f(x).

Let f(x)=max{x,x^(2)} . Then, equivalent definition of f(x).

Let f(x) = max{|x^2 - 2 |x||,|x|} and g(x) = min{|x^2 - 2|x||, |x|} then

Let f(x)=max.{|x^(^^)2-2|x||,|x|} and g(x)=min.{|x^(^^)2-2|x||,|x|} then