The total number of points of non-differentiability of `f(x) = min[|sin x|,|cos x|, (1)/(4)]"in"(0, 2pi)` 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

Number of points of non-differentiability of the function g(x) = [x^2]{cos^2 4x} + {x^2}[cos^2 4x] +x^2 sin^2 4x + [x^2][cos^2 4x] + {x^2}{cos^2 4x} in (-50, 50) where [x] and {x} denotes the greatest integer function and fractional part function of x respectively, is equal to :

Number points of discontinuity of f(x)=tan^2x- sec^2 x in (0,2pi) is

Differentiate the functions x^(sin x) + (sin x)^(cos x)

The total number of solutions of cos x= sqrt(1- sin 2x) in [0, 2pi] is equal to

Discuss the continuity and differentiability for f(x) = [sin x] when x in [0, 2pi] , where [*] denotes the greatest integer function x.

Derivative of f(x) = sin x at point x = 0 is 1.

Differentiate cos^(-1) ((sin x + cos x)/(sqrt2)), - (pi)/(4) lt x lt (pi)/(4)

If f(x)= |cos x- sin x| , then f'((pi)/(3)) is equal to …….

The total number of solution of sin {x}= cos {x} (where {.} denotes the fractional part) in [0, 2pi] is equal to