The number of critical points of `f(x)=max{sinx,cosx},AAx in[-2pi,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

Discuss the differentiability of f(x)=m a x{2sinx ,1-cosx}AAx in (0,pi)dot

Sketch the graph of y = max (sinx, cosx), AA x in (-pi,(3pi)/(2)).

The number of points of intersection of 2y-1=0 and y = sinx,-2 pi lexle 2 pi , is :

Number of solutions 2^(sin(|x|))=4^(|cosx|) in [-pi,pi] is equal to

Find the number of solutions of sin^2x-sinx-1=0in[-2pi,2pi]

Verify Rolle's theorem for the following functions in the given intervals and find a point (or point) in the interval where the derivative vanishes : f(x) = e^(x)(sinx - cosx ) in [pi/4,(5pi)/4]

Number of critical points of the function. f(x)=(2)/(3)sqrt(x^(3))-(x)/(2)+int_(1)^(x)((1)/(2)+(1)/(2)cos2t-sqrt(t)) dt which lie in the interval [-2pi,2pi] is………. .

Let f(x)=max{1+sinx,1,1-cosx}, x in [0,2pi], and g(x)=max{1,|x-1|}, x in R. Then