Exponentials

The canonical form of an exponential function, as typically used in signal processing, is

$\displaystyle a(t) = A e^{-t/\tau}, \quad t\geq 0$

where $\tau$ is called the time constant of the exponential.

is the peak amplitude, as before. The time constant is the time it takes to decay by

, i.e.,

$\displaystyle \frac{a(\tau)}{a(0)} = \frac{1}{e}.$

A normalized exponential decay is depicted in Fig. 4.5.

**Figure:** The decaying exponential $Ae^{-t/\tau }$ .
$\includegraphics[scale=0.5]{eps/exponential.eps}$

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