Albert P. Carpenter

Kepler Braids

Kepler braids are another example of the many geometric and topological structures inspired by Johannes Kepler. These intertwining braids, like Kepler links, Kepler knots, Kepler weaves, and Kepler-Mobius strips, can all be constructed from topological nets, as demonstrated on the topological nets page of this site.

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: hexagons

structure: Kepler braid

components: hexagons

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: pentagons

structure: Kepler braid

components: pentagons

structure: Kepler braid

components: triangles

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, octagons

structure: Kepler braid

components: squares, octagons

structure: Kepler braid

components: triangles, octagons

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, octagons

structure: Kepler braid

components: hexagons

structure: Kepler braid

components: squares, triangles

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, hexagons

structure: Kepler braid

components: squares, hexagons

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