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HO#2 System Arch 2007 (Fire Tom Wada)
OUTLINE Periodic Signal Fourier series introduction Sinusoids Orthogonality Integration vs inner product 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Consider any wave is sum of simple sin and cosine
Periodic Tc 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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HO#2 System Arch 2007 (Fire Tom Wada)
Periodic signal is composed of DC + same frequency sinusoid + multiple frequency sinusoids Frequency = 0 Hz Basic frequency fc=1/Tc 2 x fc 3 x fc 4 x fc 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Spectrum of periodic signal
frequency f (Hz) -5・fc -4・fc -3・fc -2・fc -fc fc 2・fc 3・fc 4・fc 5・fc There are only n * fc (n=integer) frequencies! 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Another example (even rectangular pulse)
2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Increase the number of sum (1)
2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Increase the number of sum (2)
2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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HO#2 System Arch 2007 (Fire Tom Wada)
Fourier Jean Baptiste Joseph, Baron de Frourier France, 1778/Mar/21 – 1830/May/16 Fourier Series paper is written in 1807 Even discontinue function (such as rectangular pulse) can be composed of many sinusoids. Nobody believed the paper at that time. 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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HO#2 System Arch 2007 (Fire Tom Wada)
Fourier Series If f(t) ‘s period is Tc… If we use complex exponential…, 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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HO#2 System Arch 2007 (Fire Tom Wada)
Anyway, when you see the periodic signal, Please think it is just sum of sinusoids!!! 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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How we can divide f(t) into sinusoids?
Filter Pass nω (Hz) Filter is used an and bn 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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If we integrate in [ 0 to Tc]
2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
![If we integrate in [ 0 to Tc]](http://slideplayer.com/slide/16661567/96/images/12/If+we+integrate+in+%5B+0+to+Tc%5D.jpg "2019/5/6. HO#2 System Arch 2007 (Fire Tom Wada)")
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If we integrate in [ 0 to Tc] (2)
a1 can be computed 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
![If we integrate in [ 0 to Tc] (2)](http://slideplayer.com/slide/16661567/96/images/13/If+we+integrate+in+%5B+0+to+Tc%5D+%282%29.jpg "a1 can be computed. 2019/5/6. HO#2 System Arch 2007 (Fire Tom Wada)")
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If we integrate in [ 0 to Tc] (3)
b1 can be computed 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
![If we integrate in [ 0 to Tc] (3)](http://slideplayer.com/slide/16661567/96/images/14/If+we+integrate+in+%5B+0+to+Tc%5D+%283%29.jpg "b1 can be computed. 2019/5/6. HO#2 System Arch 2007 (Fire Tom Wada)")
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By changing multiplier, each coefficient computed
One coefficient 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Sinusoidal Orthogonality
m,n: integer, Tc=1/f0 Orthogonal Orthogonal Orthogonal 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Another Orthogonality (1)
Vector inner product Orthogonal Θ=90 degree 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Another Orthogonality (2)
n dimensional vector IF THEN A and B are Orthogonal. 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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is same as the N dim inner product
Freq=nω(Hz) sinusoids are Orthogonal each other (n=integer) 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Fourier Series Summary
2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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Complex form Fourier Series
Orthogonal 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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HO#2 System Arch 2007 (Fire Tom Wada)
HW2 [2-1]Compute the complex form Fourier Series coefficient cn for f(x). [2-2]Draw the Spectrum of f(t) when T0=0.04sec. 2.30 2019/5/6 HO#2 System Arch 2007 (Fire Tom Wada)
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