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| Time Shifting & Frequency Shifting || 1) <math>x[n - n_{o}] → e^{-j\omega n_{o}}\chi(\omega)</math><br />
 
| Time Shifting & Frequency Shifting || 1) <math>x[n - n_{o}] → e^{-j\omega n_{o}}\chi(\omega)</math><br />
2) <math>e^{-j/omega _{o}n}x[n] → \chi[\omega - \omega_{o}]</math><br />
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2) <math>e^{-j/omega _{o}n}x[n] → \chi[\omega - \omega_{o}]</math><br />
 
|| Example
 
|| Example
 
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Revision as of 22:07, 18 March 2018

Discrete-Time Fourier Transform Properties with Proofs


Property Name Property Proof
Periodicity $ \chi(\omega + 2\pi) = \chi(\omega) $ Example
Linearity $ ax_{1}[n] + bx_{2}[n] → a\chi_{1}(\omega) + b\chi_{2}(\omega) $ Example
Time Shifting & Frequency Shifting 1) $ x[n - n_{o}] → e^{-j\omega n_{o}}\chi(\omega) $

2) $ e^{-j/omega _{o}n}x[n] → \chi[\omega - \omega_{o}] $

Example
Conjugate & Conjugate Symmetry x[n] → X*(-ω)
Parversal Relation $ \sum_{n=-\infty}^{\infty }\left | x[n] \right |^{2} = \frac{1}{2\pi }\int_{0}^{2\pi}\left | \chi (\omega) \right |^{2}d\omega $
Convolution $ x[n]*y[n] \rightarrow \chi(\omega)\gamma (\omega) $
Multiplication
Duality
Differentiation in Frequency

Alumni Liaison

Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

Francisco Blanco-Silva