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The total signal energy for a signal can be found by taking the limits for the integral <math>t_1\!</math> and <math>t_2\!</math> as <math>-inf\!</math> and <math>inf\!</math> respectively | The total signal energy for a signal can be found by taking the limits for the integral <math>t_1\!</math> and <math>t_2\!</math> as <math>-inf\!</math> and <math>inf\!</math> respectively | ||
− | For DT signals, the energy is given by the formula <math>E_{inf} = \sum^{inf}_{n=-inf} |x[n]|^2 \!</math> | + | For DT signals, the total energy is given by the formula <math>E_{inf} = \sum^{inf}_{n=-inf} |x[n]|^2 \!</math> |
== Signal Power == | == Signal Power == | ||
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<math>\sum^{N}_{n=-N}</math> | <math>\sum^{N}_{n=-N}</math> | ||
+ | |||
+ | Total signal power for DT signals is given by the formula <math>P_{inf} = \lim_{N->inf} \frac{1}{2N+1}\!</math> |
Revision as of 04:10, 5 September 2008
Signal Energy
Signal Energy expended from $ t_1\! $ to $ t_2\! $ for CT functions is given by the formula $ E = \int_{t_1}^{t_2} \! |x(t)|^2\ dt $
The total signal energy for a signal can be found by taking the limits for the integral $ t_1\! $ and $ t_2\! $ as $ -inf\! $ and $ inf\! $ respectively
For DT signals, the total energy is given by the formula $ E_{inf} = \sum^{inf}_{n=-inf} |x[n]|^2 \! $
Signal Power
For CT functions, the power of a signal from $ t_1\! $ to $ t_2\! $ is given by the function $ P_{avg}=\frac{1}{t_2-t_1} \int_{t_1}^{t_2} |x(t)|^2\ dt \! $
The total signal power is given by the function $ P_{inf}=\lim_{t->inf} \frac{1}{2t} \int_{-t}^{t} |x(t)|^2\ dt \! $
$ \sum^{N}_{n=-N} $
Total signal power for DT signals is given by the formula $ P_{inf} = \lim_{N->inf} \frac{1}{2N+1}\! $