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[[Category:Fourier series]]
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= [[:Category:Problem_solving|Practice Question]] on Computing the Fourier Series continuous-time signal=
 
= [[:Category:Problem_solving|Practice Question]] on Computing the Fourier Series continuous-time signal=
 
Obtain the Fourier series the CT signal
 
Obtain the Fourier series the CT signal

Latest revision as of 11:59, 16 September 2013


Practice Question on Computing the Fourier Series continuous-time signal

Obtain the Fourier series the CT signal

$ x(t) = \left\{ \begin{array}{ll} 1, & \text{ for } -5\leq t \leq 5,\\ 0, & \text{ for } 5< |t| \leq 10, \end{array} \right. \ $

x(t) periodic with period 20.


Share your answers below

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Answer 1

$ k=0\, $

$ a_0=\frac{1}{20}\int_{-10}^{10}x(t)e^{-0}dt=\frac{1}{20}\int_{-5}^{5}1dt=\frac{1}{2} $

$ k\ne0 $

$ a_k=\frac{1}{20}\int_{-10}^{10}x(t)e^{-jkw_0t}dt=\frac{1}{20}\int_{-5}^{5}e^{-jk\frac{\pi}{10}t}dt=\frac{1}{20}\Bigg[\frac{e^{-jk\frac{\pi}{2}}-e^{jk\frac{\pi}{2}}}{-jk\frac{\pi}{10}}\Bigg]=\frac{1}{-jk2\pi}\Bigg(e^{-jk\frac{\pi}{2}}-e^{jk\frac{\pi}{2}}\Bigg) $

$ x(t)=\frac{1}{2}e^{-jk\frac{\pi}{10}t}+\sum_{k=-\infty}^-1\frac{1}{-jk2\pi}\Bigg(e^{-jk\frac{\pi}{2}}-e^{jk\frac{\pi}{2}}\Bigg)e^{-jk\frac{\pi}{10}t}+\sum_{k=1}^\infty\frac{1}{-jk2\pi}\Bigg(e^{-jk\frac{\pi}{2}}-e^{jk\frac{\pi}{2}}\Bigg)e^{-jk\frac{\pi}{10}t} $

--Cmcmican 21:35, 7 February 2011 (UTC)

TA's comment: That looks fine. The expression for $ a_k $ is better written in terms of a sin function, though. Regarding the synthesis of $ x(t) $, you got it wrong actually. The complex exponentials should not have a minus sign in their exponents and for $ k=0 $ the complex exponential has a frequency of zero (DC).
Another thing is that you may also further simplify $ x(t) $ and write it in terms of sin waves only. You will actually notice some pattern in the frequencies of these sin waves.

Answer 2

First I plotted it out, thanks to WolframAlpha EthanHall ECE301 S11 Wolframalpha-20110215211454118.gif

Then I used the equation $ a_{k} = \frac{1}{T}\int_{0}^{20}x(t)e^{-jk(\frac{2\pi}{T})t}dt $ where T = 20. You can change the limits of the integral to -10 and 10 since the function is periodic. We just need it over one period.

Solving for $ a_{0} $ first we get $ a_{0} = \frac{1}{20} \int_{-10}^{10}x(t)e^{-j(0)(\frac{2\pi}{20})t}dt $. We know that x(t) = 0 except for -5 < t < 5 where it is 1.

$ a_{0} = \frac{1}{20} \int_{-5}^{5}(1)e^{(0)}dt = \frac{1}{20}x \bigg|_{-5}^{5} = \frac{1}{2} $

$ a_{k} = \frac{1}{20}\int_{-5}^{5}(1)e^{-jk(\frac{2\pi}{20})t}dt; \text{ where } -5 < k <5 \text{ and }k \neq 0 $

$ a_{k} = \frac{1}{20} \left[ \frac{e^{-jk(\frac{\pi}{10})t}}{-jk(\frac{\pi}{10})}\right]_{-5}^{5} $

$ a_{k} = \frac{1}{20}\left(\frac{1}{-jk\frac{\pi}{10}}\right) \left[ e^{-jk(\frac{\pi}{10})5} - e^{-jk(\frac{\pi}{10})(-5)} \right] $

$ a_{k}= \frac{-1}{2jk}\left[ e^{-\frac{jk\pi}{2}} - e^{\frac{jk\pi}{2}} \right]\text{ for }-5 < k < 5\text{ and }k \neq 0\text{, all others }0 $

$ x(t) = \sum_{k=-\infty}^{\infty}a_{k}e^{jk\frac{2\pi}{T}t} $

$ x(t) = \sum_{k=-5}^{-5} a_{k}e^{jk\frac{ \pi}{10}t} $ I changed the limits of the sum because $ a_{k} $ is 0 for anything outside that range.

Answer 3

Write it here.


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