🔬
Fourier Series
★★★★☆Undergraduate
📖Definition
Fourier series represents periodic functions as infinite sums of sines and cosines. Any periodic function can be decomposed into oscillatory components.
📐Formulas
f(x) = (a₀)/(2) + ∑_n=1^∈fty (aₙ cos nx + bₙ sin nx)
Fourier series
aₙ = (1)/(π) ∈t_-π^π f(x) cos(nx) dx
Fourier coefficient (cosine)
bₙ = (1)/(π) ∈t_-π^π f(x) sin(nx) dx
Fourier coefficient (sine)
✏️Examples
예제 1
Find the Fourier series of f(x) = x for -π < x < π.
📜History
Discovered by: Joseph Fourier (1822)
Fourier developed this to solve the heat equation.
⚡Applications
Signal Processing
Frequency analysis
Acoustics
Sound analysis, speech recognition
Image Processing
JPEG compression
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