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Consider a CT cosine signal (a pure frequency), and sample that signal with a rate above or below Nyquist rate. In this | Consider a CT cosine signal (a pure frequency), and sample that signal with a rate above or below Nyquist rate. In this | ||
slecture, I will talk about how does the discrete-time Fourier transform of the sampling of this signal look like. Suppose | slecture, I will talk about how does the discrete-time Fourier transform of the sampling of this signal look like. Suppose | ||
− | the cosine signal is <math>x(t)=cos( | + | the cosine signal is <math>x(t)=cos(2\pi 440 t)</math>. |
== Sampling rate above Nyquist rate == | == Sampling rate above Nyquist rate == | ||
− | The Nyquist sampling rate <math> | + | The Nyquist sampling rate <math>f_s=2f_M=880</math>,so we pick a sample frequency 1000 which is above the Nyquist rate. |
<math> \begin{align} \\ | <math> \begin{align} \\ | ||
x_1[n] & =x(\frac{n}{1000}) \\ | x_1[n] & =x(\frac{n}{1000}) \\ | ||
− | & =cos(\frac{2\pi440 | + | & =cos(\frac{2\pi440 n}{1000}) \\ |
− | & =\frac{1}{2}(e^{\frac{j2\pi440 | + | & =\frac{1}{2}(e^{\frac{j2\pi440 n}{1000}}+e^{\frac{-j2\pi440 n}{1000}})\\ |
\end{align} | \end{align} | ||
</math> | </math> | ||
− | since <math>\frac{2\pi | + | since <math>\frac{2\pi 440}{1000}</math> is between <math>-\pi</math> and <math>\pi</math>, so for <math>\omega \isin [-\pi,\pi]</math> |
<math> \begin{align} \\ | <math> \begin{align} \\ | ||
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</math> | </math> | ||
− | since <math>\frac{2\pi* | + | since <math>\frac{2\pi*360}{800}</math> is between <math>-\pi</math> and <math>\pi</math>, so for <math>\omega \isin [-\pi,\pi]</math> |
<math> \begin{align} \\ | <math> \begin{align} \\ | ||
− | \mathcal{X} | + | \mathcal{X}_2(\omega) & =\frac{1}{2}[2\pi\delta(\omega-2\pi\frac{360}{800})+2\pi\delta(\omega+2\pi\frac{360}{800})] \\ |
− | & = \frac{ | + | & = \frac{800}{2}[\delta(\frac{800}{2\pi}\omega-360)+\delta(\frac{800}{2\pi}\omega+360)] |
\end{align} | \end{align} | ||
</math> | </math> | ||
− | for all w | + | for all w, |
− | <math>\mathcal{X} | + | <math>\mathcal{X}_2(\omega) = rep_{2\pi}{\frac{800}{2}[\delta(\frac{800}{2\pi}\omega-360)+\delta(\frac{800}{2\pi}\omega+360)]}</math> |
== Conclusion == | == Conclusion == | ||
Revision as of 13:13, 27 September 2014
Discrete-time Fourier transform (DTFT) of a sampled cosine
A slecture by ECE student Yijun Han
Partly based on the ECE438 Fall 2014 lecture material of Prof. Mireille Boutin.
Contents
outline
- Introduction
- Sampling rate above Nyquist rate
- Sampling rate below Nyquist rate
- Conclusion
- References
Introduction
Consider a CT cosine signal (a pure frequency), and sample that signal with a rate above or below Nyquist rate. In this slecture, I will talk about how does the discrete-time Fourier transform of the sampling of this signal look like. Suppose the cosine signal is $ x(t)=cos(2\pi 440 t) $.
Sampling rate above Nyquist rate
The Nyquist sampling rate $ f_s=2f_M=880 $,so we pick a sample frequency 1000 which is above the Nyquist rate.
$ \begin{align} \\ x_1[n] & =x(\frac{n}{1000}) \\ & =cos(\frac{2\pi440 n}{1000}) \\ & =\frac{1}{2}(e^{\frac{j2\pi440 n}{1000}}+e^{\frac{-j2\pi440 n}{1000}})\\ \end{align} $
since $ \frac{2\pi 440}{1000} $ is between $ -\pi $ and $ \pi $, so for $ \omega \isin [-\pi,\pi] $
$ \begin{align} \\ \mathcal{X}_1(\omega) & =\frac{1}{2}[2\pi\delta(\omega-2\pi\frac{440}{1000})+2\pi\delta(\omega+2\pi\frac{440}{1000})] \\ & = \frac{1000}{2}[\delta(\frac{1000}{2\pi}\omega-440)+\delta(\frac{1000}{2\pi}\omega+440)] \end{align} $
for all w
$ \mathcal{X}_1(\omega) = rep_{2\pi}{\frac{1000}{2}[\delta(\frac{1000}{2\pi}\omega-440)+\delta(\frac{1000}{2\pi}\omega+440)]} $
Sampling rate below Nyquist rate
we pick a sample frequency 800 which is above the Nyquist rate.
$ \begin{align} \\ x_2[n] & =x(\frac{n}{800}) \\ & =cos(\frac{2\pi440 n}{800}) \\ & =cos(\frac{2\pi440 n}{800}-2\pi n) \\ & =cos(2\pi n \frac{-360}{800}) \\ & =cos(\frac{2\pi360 n}{800}) \\ & =\frac{1}{2}(e^{\frac{j2\pi360*n}{800}}+e^{\frac{-j2\pi360*n}{800}})\\ \end{align} $
since $ \frac{2\pi*360}{800} $ is between $ -\pi $ and $ \pi $, so for $ \omega \isin [-\pi,\pi] $
$ \begin{align} \\ \mathcal{X}_2(\omega) & =\frac{1}{2}[2\pi\delta(\omega-2\pi\frac{360}{800})+2\pi\delta(\omega+2\pi\frac{360}{800})] \\ & = \frac{800}{2}[\delta(\frac{800}{2\pi}\omega-360)+\delta(\frac{800}{2\pi}\omega+360)] \end{align} $
for all w,
$ \mathcal{X}_2(\omega) = rep_{2\pi}{\frac{800}{2}[\delta(\frac{800}{2\pi}\omega-360)+\delta(\frac{800}{2\pi}\omega+360)]} $
Conclusion
References
[1].Mireille Boutin, "ECE438 Digital Signal Processing with Applications," Purdue University August 26,2009
Questions and comments
If you have any questions, comments, etc. please post them on this page.