aliasing and the sampling theorem simpli ed...key concepts 1)three key facts for understanding...
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Aliasing and the Sampling Theorem Simplified
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Copyright c© Barry Van Veen 2014
Feel free to pass this ebook around the web... but please do not modify
any of its contents. Thanks!
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Key Concepts
1) Three key facts for understanding sampling and aliasing:
a) Arbitrary signals can be expressed as a sum of sinusoids
using the Fourier transform.
b) A continuous-time sinusoid with frequency Ω maps to a
discrete-time sinusoid of frequency ω = ΩT where T is the
sampling interval.
c) Discrete-time sinusoids are only unique over a 2π interval
of ω. We will use −π < ω ≤ π.
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2) The range −π < ω ≤ π corresponds to −πT < Ω ≤ πT . Aliasing
results because frequencies Ω > πT or Ω ≤ −πT map into the same
discrete-time frequency range −π < ω ≤ π.
3) We cannot uniquely determine the continuous-time frequency Ω
given the discrete-time frequency ω unless we have prior knowledge
about the range of the continuous-time frequency, such as |Ω| < πT .
4) The sampling theorem states that if x(t) is band limited with max-
imum frequency W rads/sec, then x(t) is uniquely described by its
samples x(nT ) provided W < πT .
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5) The Fourier transform Xs(Ω) of a sampled signal x[n] = x(nT ) is
obtained by defining Xs(Ω) = X(ejω)∣∣∣ω=ΩT
where X(ejω) is the
discrete-time Fourier transform of x[n]. If X(Ω) is the Fourier
transform of x(t) and Ωs = 2πT , then
Xs(Ω) =1
T
∞∑k=−∞
X(Ω− kΩs)
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Copyright 2013Barry Van Veen
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