näytteenottoteorema

Näytteenottoteorema, also known as the sampling theorem, is a fundamental principle in digital signal processing that describes the conditions under which a continuous-time signal can be perfectly reconstructed from its discrete samples. It states that if a signal has a maximum frequency component (bandwidth) of f_max, then it can be uniquely represented by samples taken at a rate (sampling frequency) f_s, provided that f_s > 2 * f_max. This minimum sampling rate, 2 * f_max, is called the Nyquist rate.

The theorem implies that if the sampling rate is too low, information about the original signal will

Conversely, if the sampling rate is sufficiently high, the original continuous-time signal can be perfectly recovered

The sampling theorem is crucial for the conversion of analog signals, such as audio or video, into