f: `RrarrR ` be a function defined by `y=min(|x|, x^(2), x)` then :
O Not differentiable at `2` points
O (Not differentiable at `3` points
O Not differentiable at `1` point
O Always continuous but not differentiable at `3` point

Give an example of a function which is continuous but not differentiable at a point.

If the function is defined by f(x)=(x)/(1+|x|) then at what points is f differentiable

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

The function f(x)=|x|+|x-1| is Continuous at x=1, but not differentiable at x=1 Both continuous and differentiable at x=1 Not continuous at x=1 Not differentiable at x=1

If f(x)=|3-x|+(3+x), where (x) denotes the least integer greater than or equal to x, then f(x) is continuous and differentiable at x=3 continuous but not differentiable at x=3 differentiable but not continuous at x=3 neither differentiable nor continuous at x=3

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

If f(x)=||x|-1| ,then the number of points where f(x) is not differentiable is

The function f(x)=max{|x|^(3),1),x>=0 and f(x)=min{|x|^(3),1),x<0 is non differentiable at n points then n=