(New page: == Energy == The formula for the energy of this signal is given by: <math>(t_1, t_2)\int</math> == Power == The power of this signal is) |
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The formula for the energy of this signal is given by: | The formula for the energy of this signal is given by: | ||
| − | <math>( | + | <math>E=\int_{0}^{\infty}{e^{-4t}u(t)dt}</math> |
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| + | Which has the solution of <math>1/4</math> | ||
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== Power == | == Power == | ||
| − | The power of this signal is | + | The power of this signal is 0 because the energy of the signal is not <math>\infty</math> |
Latest revision as of 07:53, 5 September 2008
Energy
The formula for the energy of this signal is given by:
$ E=\int_{0}^{\infty}{e^{-4t}u(t)dt} $
Which has the solution of $ 1/4 $
Power
The power of this signal is 0 because the energy of the signal is not $ \infty $
