`f(x)=|||x|-2|+a|` has exactly three points of non-differentiability. Then the value of a is

f(x)=|x|-2|+a| has exactly three points of non-differentiability.Then the value of a is

If the function f(x)=| x^2 + a | x | + b | has exactly three points of non-derivability, then

If the function f(x)=| x^2 + a | x | + b | has exactly three points of non-derivability, then

Write the points of non-differentiability of f(x)=|log|x||.

Write the points of non-differentiability of f(x)=|log|x|| .

If the function f(x)=|x^(2)+a|x|+b| has exactly three points of non-derivability,then

f(x)=[2+3|n|sin x],n in N,x in(0,pi) has exactly 11 points of discontinuity Then the value of n is

If f(x) = [2 + 5|n| sin x] , where n in I has exactly 9 points of non-derivability in (0, pi) , then possible values of n are (where [x] dentoes greatest integer function)

If f(x) = [2 + 5|n| sin x] , where n in I has exactly 9 points of non-derivability in (0, pi) , then possible values of n are (where [x] dentoes greatest integer function)

If f(x) = [2 + 5|n| sin x] , where n in I has exactly 9 points of non-derivability in (0, pi) , then possible values of n are (where [x] dentoes greatest integer function)