Consider the function `f(x) = |cosx|+ |cos2x|` defined on `(0,pi).` Then the number of pointsn `(0,pi).` where is not differentiable is

Let the function f(x) = sin x + cos x , be defined in [0, 2pi] , then f(x)

Consider the function f(x)=max{|sinx|,|cosx|},AA"x"in[0,3pi]. if lamda is the number of points at which f(x) is non - differentiable , then value of (lamda^3)/5 is

Consider the function f(x)=max{|sinx|,|cosx|},AA"x"in[0,3pi]. if lamda is the number of points at which f(x) is non - differentiable , then value of (lamda^3)/5 is

Let the function f(x) = tan^(1-) (sin x + cos x) be defined on [ 0, 2 pi] Then f(x) is

Let f:[-1,1] to R be a function defined by f(x)={x^(2)|cos((pi)/(x))| "for" x ne 0, "for "x=0 , The set of points where f is not differentiable is

Let f: [0,(pi)/(2)]rarr R be a function defined by f(x)=max{sin x, cos x,(3)/(4)} ,then number of points where f(x) in non-differentiable is

Let f:[0,(pi)/(2)]rarr R a function defined by f(x)=max{sin x,cos x,(3)/(4)} ,then number of points where f(x) is non-differentiable is

Consider the functions f(x)=sinx and g(x)=cosx in the interval [0,2pi] Find the x coordinates of the meeting points of the functions.

Prove that the function f(X) = cosx is strictly decreasing (0,pi) and strictly increasing on (pi,2pi)