Question

What is the period of `f(t)=sin( t / 30 )+ cos( (t)/ 12 )`?

Answer 1

`120 pi`

Explanation:

The period for both `sin kpi and cos kpi is`(2pi)/k#.

Here, the separate periods for terms in f(t) are `60pi and 24pi`

So, the period P for the compounded oscillation is given by

P = 60 L = 24 M, where L and M together form the least possible pair

of positive integers. L= 2 and M = 10 and the compounded period

`P = 120pi`.

See how it works.

`f(t+P)`

`=f(t+120pi)`

`=sin (t/30 + 4pi) + cos (t/12 + 10pi)`

`=sin(t/30)+cos(t/12)`

#=f(t).

Note that `P/20 = 50pi` is not a period, for the cosine term.