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Associative magic square

Mathematical concept of arrangement of numbers in a square

Summary

Mathematical concept of arrangement of numbers in a square

In the [[Lo Shu Square]], pairs of opposite numbers sum to 10

Detail from ''[[Melencolia I]]'' showing a 4 × 4 associative square

An associative magic square is a magic square for which each pair of numbers symmetrically opposite to the center sum up to the same value. For an n × n square, filled with the numbers from 1 to n2, this common sum must equal n2 + 1. These squares are also called associated magic squares, regular magic squares, regmagic squares, or symmetric magic squares.

Examples

For instance, the Lo Shu Square – the unique 3 × 3 magic square – is associative, because each pair of opposite points form a line of the square together with the center point, so the sum of the two opposite points equals the sum of a line minus the value of the center point regardless of which two opposite points are chosen. The 4 × 4 magic square from Albrecht Dürer 1514 engraving Melencolia I – also found in a 1765 letter of Benjamin Franklin – is also associative, with each pair of opposite numbers summing to 17.

Existence and enumeration

The numbers of possible associative n × n magic squares for n = 3,4,5,..., counting two squares as the same whenever they differ only by a rotation or reflection, are: :1, 48, 48544, 0, 1125154039419854784, ... The number zero for n = 6 is an example of a more general phenomenon: associative magic squares do not exist for values of n that are singly even (equal to 2 modulo 4). Every associative magic square of even order forms a singular matrix, but associative magic squares of odd order can be singular or nonsingular.

References

| editor-last = Andrews | editor-first = W. S. | contribution-url = https://archive.org/details/MagicSquaresCubesAndrewsEdited/page/n237/mode/2up

Wikipedia Source

This article was imported from Wikipedia and is available under the Creative Commons Attribution-ShareAlike 4.0 License. Content has been adapted to SurfDoc format. Original contributors can be found on the article history page.

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