Fourier Epicycles

Rotating circles approximate any periodic path via DFT

Harmonics: 10 Speed:

Each rotating circle (epicycle) represents one Fourier frequency. The DFT decomposes a path into complex exponentials: f(t) = Σ cₙ e^{2πint/T}. Adding more harmonics approximates the original path with increasing precision (Gibbs phenomenon at sharp corners).