Figure D.1 shows how a sound is reconstructed from its
samples. Each sample can be considered as specifying the
scaling and location of a sinc function. The
discrete-time signal being interpolated in the figure is
a digital rectangular pulse:
The sinc functions are drawn with dashed lines, and they sum to
produce the solid curve. An isolated sinc function is shown in
Fig.D.2. Note the ``Gibb's overshoot'' near the corners of the
continuous rectangular pulse in
Fig.D.1 due to bandlimiting. (A true continuous rectangular
pulse has infinite bandwidth.)
Figure D.1:
Summation of weighted sinc
functions to create a continuous waveform from discrete-time samples.
Notice that each sinc function passes through zero at every sample
instant but the one it is centered on, where it passes through 1.
![$\displaystyle x = [\dots, 0, 0, 0, 1, 1, 1, 1, 1, 0, 0, 0, \dots]
$](img1726.png){kind=small}
![\includegraphics[width=\textwidth]{eps/SincSum}](img1727.png)
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