Knowledge

❯

❯

Fourier Series

Fourier's Trick

Aug 12, 20231 min read

Math

The orthogonal basis set for cartesian coordinates

$f (x) = \frac{a _{0}}{2} + n = 1 \sum \infty [a_{n} cos (\frac{nπ}{L} x) + b_{n} sin (\frac{nπ}{L} x)]$

States that any continuous, periodic function on the interval $[- L, L]$ can be expanded as the above

$a_{0} = \frac{1}{L} \int_{x_{0}}^{2 L + x_{0}} f (x) d x$

$a_{n} = \frac{1}{L} \int_{x_{0}}^{2 L + x_{0}} f (x) cos (\frac{nπ}{L} x) d x = \frac{2}{L} \int_{x_{0}}^{L + x_{0}} f (x) cos (\frac{nπ}{L} x) d x$

Called Fourier’s trick
Obtained by multiplying $f (x) = \frac{a _{0}}{2} + n = 1 \sum \infty [a_{n} cos (\frac{nπ}{L} x) + b_{n} sin (\frac{nπ}{L})]$ on both sides by $cos (\frac{n ^{'} π}{L} x)$ and integrating from $x_{0}$ to $2 L + x_{0}$ and noticing that the only contributing terms on the RHS are of the form $\int_{x_{0}}^{2 L + x_{0}} a_{n} cos (\frac{nπ}{L} x) cos (\frac{n ^{'} π}{L} x) d x$ for when $n = n^{'}$ , which evaluates to $\frac{2 L}{2} a_{n}$

$b_{n} = \frac{1}{L} \int_{x_{0}}^{2 L + x_{0}} f (x) sin (\frac{nπ}{L} x) d x = \frac{2}{L} \int_{x_{0}}^{L + x_{0}} f (x) sin (\frac{nπ}{L} x) d x$

Signal Processing

Topics

Fourier Series Coefficients
Parsavel’s Theorem

$x (t) = k = - \infty \sum \infty c_{k} e^{jk ω_{0} t} if x (t) is periodic$

A signal can be decomposed into a series of complex exponentials

Graph View

$f(x) = \frac{a_0}{2} + \displaystyle\sum_{n = 1}^\infty\left[a_n\cos\left(\frac{n\pi}{L}x\right) + b_n\sin\left(\frac{n\pi}{L}x\right)\right]$
$a_0 = \frac{1}{L}\int_{x_{0}}^{2L+x_{0}}f(x)dx$
$a_n = \frac{1}{L}\int_{x_{0}}^{2L+x_{0}} f(x) \cos\left( \frac{n\pi}{L}x \right)dx=\frac{2}{L}\int _{x_{0}}^{L+x_{0}}f(x)\cos\left( \frac{n\pi}{L}x \right) \, \mathrm{d}x$
$b_n = \frac{1}{L}\int_{x_{0}}^{2L+x_{0}} f(x) \sin(\frac{n\pi}{L}x)dx=\frac{2}{L}\int _{x_{0}}^{L+x_{0}}f(x)\sin\left( \frac{n\pi}{L}x \right) \, \mathrm{d}x$
Signal Processing
Topics
$\displaystyle x(t)=\sum_{k = -\infty}^{\infty}c_{k}e^{jk{\omega}_{0}t}\text{ if }x(t)\text{ is periodic}$

Backlinks

Fourier Analysis
Square Wave

Created with Quartz v4.5.2 © 2026

Personal Site
GitHub