TESSELLATION SIMULATION

▸ Building the prototile…
▸ Fitting edge-to-edge, checking vertex angles = 360°
▸ Regular · semi-regular · Penrose (aperiodic)…
▸ Computing mirror axes & rotation centers (symmetry group)
▸ Growing the tiles outward from the center…
▸ Ready — Online. ✅
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⌂ Mathematics

Simulation room Tessellation & symmetry

Tessellation · Penrose · Wallpaper groups
Online
regular · semi-regular · Penrose · symmetry
Prototile & parameters
🔷 Prototile
the tile repeated to cover the plane
Tile types
Vertex configuration
Fit at vertex
Symmetry group
Periodic?
Tiles · % grown
Tip
Tiles fit edge-to-edge to cover with no gaps. There are only 3 regular tilings (triangle, square, hexagon) because the interior angle must divide 360°. Penrose covers the plane but never repeats — 5-fold symmetry, the golden ratio φ.
Switch the Scenario to see 6 tiling types · click a tile to inspect its fundamental domain · toggle symmetry axes & centers
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Tile types · growth progress · drift phase over time tile types% growndrift