The number of points at which the function,
`f (x)={{:(min {|x|"," x ^(2)}),(min (2x -1"," x^(2)}):}if x in (-oo,1)` otherwise is not differentiable is:

The number of points at which the function f(x) = (x-|x|)^(2)(1-x + |x|)^(2) is not differentiable in the interval (-3, 4) is ___

The function f(x)=min{x-[x],-x-[-x]} is a

Consider the function f(x)=min{|x^(2)-9|,|x^(2)-1|} , then the number of points where f(x) is non - differentiable is/are

Consider the function f(x)=min{|x^(2)-4|,|x^(2)-1|} , then the number of points where f(x) is non - differentiable is/are

Find the number of integral vaues of 'a' for which the range of function f (x) = (x ^(2) -ax +1)/(x ^(2) -3x+2) is (-oo,oo),

Let f (x) = {{:(min (x"," x ^(2)), x ge 0),( max (2x "," x-1), x lt 0):}, then which of the following is not true ?

The number of non differentiability of point of function f (x) = min ([x] , {x}, |x - (3)/(2)|) for x in (0,2), where [.] and {.} denote greatest integer function and fractional part function respectively.

The number of points that the functions f(x)= |2x+ 1|+|2x-1| , " for all x " in R is not differentiable is

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

Check the differentiability if f(x) = min. {1, x^(2), x^(3)} .