Honeycomb conjecture honeycomb conjectureregular hexagonal grid or honeycomb is the best way to divide a surface into regions of equal area with the least total perimeter . The conjecture was proven in 1999 by mathematician Thomas C. Hales.Theorem Let Γ be a locally finite graph in R 2 , consisting of smooth curves, and such that R 2 \ Γ has infinitely many bounded connected components , all of unit area. Let C be the union of these bounded components.attained for the regular hexagonal tile .History The first record of the conjecture dates back to 36 BC , from Marcus Terentius Varro , but is often attributed to Pappus of Alexandria . 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.circle packing of the plane , in which every circle is tangent to six other circles, which fill just over 90% of the area of the plane.
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