The period of function `2^({x})+sin pi x + 3^({x//2})+ cos 2 pi x` ( where {x} denote the fractional part of x) is

The period of function f(x) = {x} + tan^(2) pi x+ | sin 3pix| is

The period of the function f(x) =[6x + 7] + cos pi x - 6x , where [.] denotes the greatest integer function, is

The period of f(x) = sin x + [x] , where [x] is fractional part of x is

Statement 1 : The period of the function f(x)=sin {x} is 1, where {.} represents fractional part function. Statement 2 : g(x)={x} has period 1.

Find the period of the function sin^(2)x + 2cos^(2)x .

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

Find the period of cos x sin (x - (2pi)/(3))

The period of the function f(x) = p|sin x| + p^(2)|cos x| + g(p) is (pi)/(2) , if p is