Let `f(x)={{:(-|x-2|, ,x le 3 ),(x^(2)-2x-4,, x gt 3 ):}`
Then the number of critical points on the graph of the function is

let f(x)=-|x-2|,x 3 Then the number of critical points on the graph of the function is

The number of critical points of the function f(x)=|x-1||x-2| is

Let f(x)={:[(x^(3//5", ")ifxle1),(-(x-2)^(3)ifxgt1):},"then the number of" critical points on the graph of the function are……. .

Led a function f be defined as f(x)=[(|x-1|)/(x^(2)+1) if x>-1 and x^(2) if x>=-1 Then the number of critical point(s) on the graph of this function is/are:

Let ={x^((3)/(5)), if x f(x)={x^((3)/(5)), if x Then the number of critical points on the graph of the function is _(-)

If f(x) = int (x^(3) - 2x^(2) + 3)e^(3x) dx then the number of critical points of f are

Find the number of critical points of the function f(x) = |x - 2| + |x +1 | , x in R

Let f(x) = (3)/(4) x^(4) -x^(3) -9x^(2) + 7 , then the number of critical points in [-1, 4] is

f(x){{:(x^(3) - 3"," if x le 2 ),(x^(2) + 1"," if x gt 2 ):}