The general form of a sinusoidal function is: f(x) = a*sin (bx-c) + d, for b > 0, where,
a = |amplitude|
T (period) = 2π/b; T = 1/f(frequency)
phase shift = c/b
vertical shift = d
Thus, given the frequency, the period can be calculated, followed by the value for b. The amplitude is already given. It is assumed that there is no phase shift or vertical shift, thus, c = 0, d = 0. The sine function is then represented by: f(x) = 659*sin(4141x)
