Difference between revisions of "Spring 2020 Assignment 8"
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==Fourier transform table== | ==Fourier transform table== | ||
The two tables below show important properties of the Fourier transform and several useful transform pairs. You can use the tables of pairs and properties to figure out the transforms of an endless number of functions. | The two tables below show important properties of the Fourier transform and several useful transform pairs. You can use the tables of pairs and properties to figure out the transforms of an endless number of functions. | ||
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{{Template:Assignment Turn In|message= | {{Template:Assignment Turn In|message= | ||
<ol type="A"> | <ol type="A"> | ||
− | <li> | + | <li>For each of the named functions in the ''Table of Common Functions and their Fourier Transforms'', sketch the function in the time domain as well as the magnitude of its Fourier transform. Show relevant constants (for example: ''a'', <math>\alpha</math>, and <math>f_0</math>).</li> |
<li>Sketch the transform of <math>\cos^4(\omega_0 t)</math>.</li> | <li>Sketch the transform of <math>\cos^4(\omega_0 t)</math>.</li> | ||
− | <li>Sketch the fourier transform of <math>e^{-\alpha t} u(t) \times \cos(\omega_0 t)</math>. Assume <math>\alpha\ll\omega_0</math>.</li> | + | <li>Sketch the magnitude of the fourier transform of <math>e^{-\alpha t} u(t) \times \cos(\omega_0 t)</math>. Assume <math>\alpha\ll\omega_0</math>.</li> |
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− | + | <center> | |
− | + | [[Image: FourierTransformsTable.png|500 px|<caption>Short table of Fourier transform properties</caption>]] | |
− | [[Image: | + | [[Image: TimeFrequencyDomains_MoreTransformPairsTable.png|500 px|<caption>Short table of Fourier transform pairs</caption>]] |
− | + | </center> | |
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Latest revision as of 19:09, 27 April 2020
Circuit analogies
For each of the systems below, find an analogous circuit. |
Convolution practice
For each of the pairs of functions below, plot the convolution of the two functions, $ Y=A*B $ |
$ A $ | $ B $ | $ Y=A*B $ |
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Fourier transform table
The two tables below show important properties of the Fourier transform and several useful transform pairs. You can use the tables of pairs and properties to figure out the transforms of an endless number of functions.