10/3,6 - The Game: Difference between revisions

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|<math>=\left \langle h \mid e^{j \omega_n u} \right \rangle e^{j \omega_n t}</math>
|<math>=\left \langle h(u) \mid e^{j \omega_n u} \right \rangle e^{j \omega_n t}</math>
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|Different notation
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|<math></math>
|<math>=\sum_{n=-\infty}^{\infty} \frac {1}{T} \left \langle x(t) \mid e^{j\omega_n t}\right \rangle
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\left \langle h(u) \mid e^{j \omega_n u}\right \rangle e^{j \omega_n t}</math>
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Latest revision as of 00:04, 14 November 2008

The Game

The idea behind the game is to use linearity (superposition and proportionality) and time invariance to find an output for a given input. An initial input and output are given.

Input LTI System Output Reason
δ(t) h(t) Given
δ(tλ) h(tλ) Time Invarience
x(λ)δ(tλ) x(λ)h(tλ) Proportionality
x(t)=x(λ)δ(tλ)dx x(λ)h(tλ)dxConvolutionIntegral Superposition

With the derived equation, note that you can put in any x(t) to find the given output. Just change your t for a lambda and plug n chug.

Example 1

Let x(t)=ej2πnt/T=ejωnt

ejωnt =ejωnλh(tλ)dλ Let tλ=u thus du=dλ
=ejωn(tu)h(u)du The order of integration switched due to changing from λ=u
=(ejωnuh(u)du)eigenvalueej2πωnteigenfunction
=h(u)ejωnuejωnt Different notation
=H(ωn)ejωnt Different notation

Example 2

Let x(t)=x(t+T)=n=αnej2πnt/T=n=αnejωnt

n=αnejωnt =n=αnH(ωn)ejωnt From Example 1
=n=1Tx(t)ejωnth(u)ejωnuejωnt Different notation

Questions

  • How do eigenfunction and basisfunctions differ?
  • Eigenfunctions will "point" in the same direction after going through the LTI system. It may (probably) have a different coefficient however. Very convenient.
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