Latest revision as of 13:25, 2 December 2011

Discrete Fourier Transform

Definition: let x[n] be a discrete-time signal with Period N. Then the Discrete Fourier Transform X[k] of x[n] is the discrete-time signal defined by

$X [k] = \sum_{k=0}^{N-1} x[n].e^{-J.2pi.kn/N}.$

Conversely, the Inverse Discrete Fourier transform is

$x [n] = (1/N) \sum_{k=0}^{N-1} X[k].e^{J.2pi.kn/N}$

Some pages discussing or using Discrete Fourier Transform

Click here to view all the pages in the discrete Fourier transform category.

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 Some pages discussing or using Discrete Fourier Transform
+*[[My_use_for_the_DFT!|Digital Signal Processing Project by A. Kumar using DFT]]
 *[[Student_summary_Discrete_Fourier_transform_ECE438F09|A summary page about the DFT written by a student]] from [[ECE438]]
+*[[Notes_on_Discrete_Fourier_Transform|Course notes on DFT]]
+*[[Exercise_effect_of_zero_padding_on_DFT_ECE438F11|What is the effect of zero padding a signal on its DFT?]]
 *[[Practice_question_1_eECE439F10|Practice Question on DFT computation]] from [[ECE438]]
 *[[Compute DFT practice no1 ECE438F11|Practice Question on DFT computation]] from [[ECE438]]