(→Periodic Functions) |
(→Periodic Functions) |
||
| Line 5: | Line 5: | ||
A CT signal x(t) is called periodic if there exists an integer T > 0 such that x(t+T) = x(t). | A CT signal x(t) is called periodic if there exists an integer T > 0 such that x(t+T) = x(t). | ||
| + | |||
| + | x(t) = <math>e^{j*w*t}</math> can be a periodic function. The period is <math>(2 * pi) / w</math>. If <math>w / (2 * pi)</math> is a rational number then the exponential function is periodic. | ||
| + | |||
| + | |||
| + | |||
| + | Periodic Function: | ||
| + | |||
| + | <math>e^{(j * pi / 6)}</math> , has w =<math> pi / 6 </math> therefore: <math>w/(2*pi) = 1/12</math> with is a rational number, thus proving that the function is periodic. | ||
| + | |||
| + | |||
| + | Nonperiodic Function: | ||
Revision as of 08:14, 5 September 2008
Periodic Functions
A DT signal x[n] is called periodic if there exists an integer N such that x[n+N] = x[n] for all n.
A CT signal x(t) is called periodic if there exists an integer T > 0 such that x(t+T) = x(t).
x(t) = $ e^{j*w*t} $ can be a periodic function. The period is $ (2 * pi) / w $. If $ w / (2 * pi) $ is a rational number then the exponential function is periodic.
Periodic Function:
$ e^{(j * pi / 6)} $ , has w =$ pi / 6 $ therefore: $ w/(2*pi) = 1/12 $ with is a rational number, thus proving that the function is periodic.
Nonperiodic Function:
