The period of the function `|sin^3x/2|+|cos^5x/5|` is `2pi` (b) `10pi` (c) `8pi` (d) `5pi`

Period of the function f(x) = sin((pi x)/(2)) cos((pi x)/(2)) is

The period of the function f(x)=4sin^4((4x-3pi)/(6pi^2))+2cos((4x-3pi)/(3pi^2)) is

The period of the function f(x)=c^((sin^2x) +sin^2 (x+pi/3)+cosxcos(x+pi/3)) is (where c is constant)

The period of the function f(x)=c^((sin^2x+sin^(2(x+pi/3))+cosxcos(x+pi/3)) is (where c is constant) 1 (b) pi/2 (c) pi (d) cannot be determined

Statement-1: The period of the function f(x)=cos[2pi]^(2)x+cos[-2pi^(2)]x+[x] is pi, [x] being greatest integer function and [x] is a fractional part of x, is pi . Statement-2: The cosine function is periodic with period 2pi

The values of x_1 between 0 and 2pi , satisfying the equation cos3x+cos2x=sin(3x)/2+sinx/2 are pi/7 (b) (5pi)/7 (c) (9pi)/7 (d) (13pi)/7

The period of sin(pi/4)x+cos(pi/2)x+cos(pi/3)x is

The angle of intersection of the curves y=2\ sin^2x and y=cos2\ x at x=pi/6 is (a) pi//4 (b) pi//2 (c) pi//3 (d) pi//6

The period of the function f(x)=cos2pi{2x}-sin2 pi {2x} , is ( where {x} denotes the functional part of x)

The period of the function f(x)=cos2pi{2x}+ sin2 pi {2x} , is ( where {x} denotes the functional part of x)