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- Q3527261 subject Q6770414.
- Q3527261 subject Q7413853.
- Q3527261 abstract "The honeycomb conjecture states that a regular hexagonal grid or honeycomb is the best way to divide a surface into regions of equal area with the least total perimeter. The first record of the conjecture dates back to 36BC, from Marcus Terentius Varro, but is often attributed to Pappus of Alexandria (c. 290 – c. 350). The conjecture was proven in 1999 by mathematician Thomas C. Hales, who mentions in his work that there is reason to believe that the conjecture may have been present in the minds of mathematicians before Varro.It is also related to the densest circle packing of the plane, where every circle is tangent to 6 other circles which fill just over 90% of the area of the plane.".
- Q3527261 thumbnail Hexagons.jpg?width=300.
- Q3527261 wikiPageWikiLink Q122701.
- Q3527261 wikiPageWikiLink Q123339.
- Q3527261 wikiPageWikiLink Q1398901.
- Q3527261 wikiPageWikiLink Q206119.
- Q3527261 wikiPageWikiLink Q211783.
- Q3527261 wikiPageWikiLink Q28474.
- Q3527261 wikiPageWikiLink Q3063631.
- Q3527261 wikiPageWikiLink Q5121501.
- Q3527261 wikiPageWikiLink Q6770414.
- Q3527261 wikiPageWikiLink Q7413853.
- Q3527261 wikiPageWikiLink Q869539.
- Q3527261 comment "The honeycomb conjecture states that a regular hexagonal grid or honeycomb is the best way to divide a surface into regions of equal area with the least total perimeter. The first record of the conjecture dates back to 36BC, from Marcus Terentius Varro, but is often attributed to Pappus of Alexandria (c. 290 – c. 350). The conjecture was proven in 1999 by mathematician Thomas C.".
- Q3527261 label "Honeycomb conjecture".
- Q3527261 depiction Hexagons.jpg.
