Determine whether it is possible to find the periodicity of the trigonometric function:
f(x) = sin(x)/x
It is not possible to find the periodicity of the trigonometric function f(x) = sin(x)/x, because it is not a periodic function. A function is periodic if there is a positive real number q such that f(x + q) = f(x) for all x in the domain of f1. The smallest possible value for q for which this is true is called the period of f1.

However, the function f(x) = sin(x)/x does not satisfy this property, because for any q > 0, there exists an x such that f(x + q) ≠ f(x). To see this, consider the following argument:

Let q > 0 be any real number. Then, there exists a natural number n such that nπ > q. Now, let x = nπ. Then, f(x) = sin(nπ)/nπ = 0/nπ = 0. But f(x + q) = sin(nπ + q)/(nπ + q) ≠ 0, because sin(nπ + q) ≠ 0 for any q ≠ 0. Therefore, f(x + q) ≠ f(x), and f is not periodic.