Hexagonal tortoise problem

The hexagonal tortoise problem (Template:Lang-ko, Chinese: 地數龜文圖, a.k.a. jisuguimundo) was invented by Korean aristocrat and mathematician Seok-jeong Choi, who lived from 1646 to 1715. It is a mathematical problem that involves a hexagonal lattice, like the hexagonal pattern on some tortoises' shells, to the (N) vertices of which must be assigned integers (from 1 to N) in such a way that the sum of all integers at the vertices of each hexagon is the same.^[1] The problem is similar to a magic square.^[1]

References

What supports what

^ ^a ^b Choe, Choi & Moon 2003, p. 850. Cite error: The named reference "FOOTNOTEChoeChoiMoon2003850" was defined multiple times with different content (see the help page).

Sources used

Choe, Heemahn; Choi, Sung-Soon; Moon, Byung-Ro (2003). Cantù-Paz, Erick (ed.). A Hybrid Genetic Algorithm for the Hexagonal Tortoise Problem. Proceedings of the Genetic and Evolutionary Computation (GECCO) Conference, Chicago, IL, USA, July 12–16, 2003. Springer. ISBN 9783540406020. {{cite conference}}: Invalid |ref=harv (help)

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[FOOTNOTEChoeChoiMoon2003850-1] Choe, Choi & Moon 2003, p. 850. Cite error: The named reference "FOOTNOTEChoeChoiMoon2003850" was defined multiple times with different content (see the help page).

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