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*Multiply by the complex conjugate |
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*Multiply by the complex conjugate |
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<math> \int_{-T/2}^{T/2} x(t) e^{{-j2\pi mt}/T} dt = \sum_{n=-\infty}^\infty \alpha_n \frac{Te^{{j2\pi (n-m)t}/T}}{{j2\pi (n-m)}} \bigg|_{-T/2}^{T/2} = T\frac{e^{j\pi(n-m)}-e^{-j\pi(n-m)}}{j2\pi(n-m)} = T \frac{\sin\pi(n-m)}{\pi(n-m)} = \begin{Bmatrix} T, n=m \\ 0, n\ne m \end{Bmatrix} = T\delta_{n,m}</math> |
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<math> \int_{-T/2}^{T/2} x(t) e^{{-j2\pi mt}/T} dt = \sum_{n=-\infty}^\infty \alpha_n \frac{Te^{{j2\pi (n-m)t}/T}}{{j2\pi (n-m)}} \bigg|_{-T/2}^{T/2} = \sum_{n=-\infty}^\infty \alpha_n T\frac{e^{j\pi(n-m)}-e^{-j\pi(n-m)}}{j2\pi(n-m)} = \sum_{n=-\infty}^\infty \alpha_n T \frac{\sin\pi(n-m)}{\pi(n-m)} = \sum_{n=-\infty}^\infty \alpha_n \begin{Bmatrix} T, n=m \\ 0, n\ne m \end{Bmatrix} = \sum_{n=-\infty}^\infty \alpha_n T\delta_{n,m}</math> |
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*Using L'Hopitals to evaluate the <math>\frac{T\cdot 0}{0}</math> case. Note that n & m are integers |
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*Using L'Hopitals to evaluate the <math>\frac{T\cdot 0}{0}</math> case. Note that n & m are integers |
Revision as of 21:14, 29 October 2006
Fourier series
The Fourier series is used to analyze arbitrary periodic functions by showing them as a composite of sines and cosines.
A function is considered periodic if 
for 
.
The exponential form of the Fourier series is defined as 
Determining the coefficient 
- The definition of the Fourier series
- Integrating both sides for one period. The range of integration is arbitrary, but using
scales nicely when extending the Fourier series to a non-periodic function
- Multiply by the complex conjugate
- Using L'Hopitals to evaluate the
case. Note that n & m are integers
Notation
Linear Time Invariant Systems
Changing Basis Functions
Identities
