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== Problem 3 == | == Problem 3 == | ||
| − | [[ | + | Add your contributions to the [[Fourier Properties]] page. |
| − | + | == Problem 4 == | |
| + | Hint: You may run into troubles when computing <math>a_0</math> using the general formula <math>a_k = \frac1T\int_{T}x(t)e^{-jk\omega_0t}dt</math>. Instead compute <math>a_0 = \frac1T\int_{T}x(t)dt</math>, then make sure that your Matlab code is not computing <math>a_0</math> as something infinite (Inf) or nonexistent (NaN)- Landis | ||
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| − | + | Who ever submits their code with the fewest number of commands gets a cookie. ---Adam Frey | |
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Back to [[Homework]] | Back to [[Homework]] | ||
Latest revision as of 13:35, 8 July 2009
Contents
Problem 1
Problem 2
Problem 3
Add your contributions to the Fourier Properties page.
Problem 4
Hint: You may run into troubles when computing $ a_0 $ using the general formula $ a_k = \frac1T\int_{T}x(t)e^{-jk\omega_0t}dt $. Instead compute $ a_0 = \frac1T\int_{T}x(t)dt $, then make sure that your Matlab code is not computing $ a_0 $ as something infinite (Inf) or nonexistent (NaN)- Landis
Who ever submits their code with the fewest number of commands gets a cookie. ---Adam Frey
Back to Homework
