A function is said to be periodic (or, when emphasizing the presence
of a single period instead of multiple periods, singly
periodic) with period if
for ,
2, .... For example, the sine function , illustrated above, is periodic with least
period (often simply called "the" period)
(as well as with period , , , etc.).
The constant function is periodic with any period for all nonzeroreal
numbers ,
so there is no concept analogous to the least period
for constant functions. The following table summarizes the names given to periodic
functions based on the number of independent periods they posses.