[" 10.Number of points of non-differentiability of function "f(x)=max(sin^(-1)|sin x|,cos^(-1)|sin x|},],[0

The number of points of non- differentiability of function f(x) = max { sin ^(-1)|sin x|, cos ^(-1) |sin x|} ,0 lt x lt 2 pi , is ________.

The function, f(x) =sin^(-1) (sin x) , is

The number of points of non-differentiability of the function f(x)=(x^(2)-1)|x^(2)-x-2|+sin(|x|)+[(x^(2))/(2x^(2)+1)] is (where [.] is greatest integer function)

The total number of points of non- differentiability of f(x)=max{sin^(2)x,cos^(2)x,(3)/(4)} in [0,10 pi] is

The function f(x) = sin ^(-1)(cos x) is

The total number of points of non-differentiability of f(x)=max{sin^2 x,cos^2 x,3/4} in [0,10 pi], is

The total number of points of non-differentiability of f(x)=max{sin^2 x,cos^2 x,3/4} in [0,10 pi], is