Let `f(x)=sinx+cos(sqrt(4-a^(2)))x`. Then, the integral values of 'a' for which f(x) is a periodic function, are given by

Let f(x)= sqrt(1+x^(2)) then,

lf the fundamental period of function f(x)=sinx + cos(sqrt(4-a^2))x is 4pi , then the value of a is/are (a) sqrt(15)/2 (b) -sqrt(15)/2 (c)-sqrt(7)/2 (d) sqrt(7)/2

if: f(x)=(sinx)/(sqrt(1+tan^2x))-(cosx)/(sqrt(1+cot^2x)), then find the range of f(x)

Let f(x) = {((1-cos 4x)/(x^(2))",",x lt 0),(a",",x = 0),((sqrt(x))/(sqrt(16+sqrt(x))-4))",", x gt 0):} Then, the value of a if possible, so that the function is continuous at x = 0, is……….

Period of f(x) = sin^4 x + cos^4 x

Let f(x) be a real valued function such that f(0)=1/2 and f(x+y)=f(x)f(a-y)+f(y)f(a-x), forall x,y in R , then for some real a, (a)f(x) is a periodic function (b)f(x) is a constant function (c) f(x)=1/2 (d) f(x)=(cosx)/2

Let f(x, y) be a periodic function satisfying f(x, y) = f(2x + 2y, 2y-2x) for all x, y; Define g(x) = f(2^x,0) . Show that g(x) is a periodic function with period 12.

Find the maximum and the minimum values, if any, of the function f given by f(x)=x^(2), x in R .

Integrate the functions e^(2x)sinx

Find the domain of each of the following functions given by f(x)= (1)/(sqrt(1-cos x))