1. Fourier representation for discrete-time signals And Sampling Theorem
Lecture #05
Fourier representation
for discrete-time signals
And
Sampling Theorem
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2. Fourier series for periodic discrete signals
Fourier Transform for nonperiodic discrete signals
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3. Example 3.2
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5. Example Inverse DTFS
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6. Example 3.17 Find DTFT of the sequence
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8. Example 3.18 Find DTFT of the sequence
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10. Example 3.17 Find DTFT of a unit impulse spectrum
Example Find Inverse DTFT of a unit impulse spectrum
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12. Sampling
Sampling is a process of converting a signal into a numeric sequence (a function of discrete time or space).
The sampling theorem states that exact reconstruction of a continuous time baseband signal from its samples is possible if the signal is bandlimited and the sample frequency is greater than twice the signal bandwidth.
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14. Take Fourier transform
For example
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15. Fourier transform of p(t)
Example 4.2
Fourier series of p(t)
Fourier transform of p(t)
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16. Fourier series Fourier Transform (v) Frequency shifting modulation
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17. Case I:
Case II:
Aliasing
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18. Sampling theorem : Let represent a band-limited signal,
so that for If , where
Is the sampling frequency, then is uniquely determined by its
samples
The minimum sampling frequency, Nyquist sampling rate.
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