http://debianws.lexgopc.com/wiki143/index.php?action=history&feed=atom&title=Associative_magic_squareAssociative magic square - Revision history2026-05-15T18:19:42ZRevision history for this page on the wikiMediaWiki 1.43.1http://debianws.lexgopc.com/wiki143/index.php?title=Associative_magic_square&diff=3674021&oldid=previmported>Ashwanialok26: #suggestededit-add 1.02023-06-01T19:13:27Z<p>#suggestededit-add 1.0</p>
<p><b>New page</b></p><div>{{Short description|Mathematical concept of arrangement of numbers in a square}}<br />
[[File:Magic Square Lo Shu.svg|thumb|upright|In the [[Lo Shu Square]], pairs of opposite numbers sum to&nbsp;10]]<br />
[[File:Albrecht Dürer - Melencolia I (detail).jpg|thumb|Detail from ''[[Melencolia I]]'' showing a 4&thinsp;×&thinsp;4 associative square]]<br />
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''&thinsp;×&thinsp;''n'' square, filled with the numbers from 1 to ''n''<sup>2</sup>, this common sum must equal ''n''<sup>2</sup>&nbsp;+&thinsp;1. These squares are also called '''associated magic squares''', '''regular magic squares''', '''regmagic squares''', or '''symmetric magic squares'''.{{r|andrews|belste|nordgren}}<br />
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==Examples==<br />
For instance, the [[Lo Shu Square]] – the unique 3&thinsp;×&thinsp;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.{{r|llnww}} The 4&thinsp;×&thinsp;4 magic square from [[Albrecht Dürer]]{{'s}} 1514 engraving {{nowrap|''[[Melencolia I]]''}} – also found in a 1765 letter of [[Benjamin Franklin]] – is also associative, with each pair of opposite numbers summing to 17.{{r|pasles}}<br />
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==Existence and enumeration==<br />
The numbers of possible associative ''n''&thinsp;×&thinsp;''n'' magic squares for ''n'' = 3,4,5,..., counting two squares as the same whenever they differ only by a rotation or reflection, are:<br />
:1, 48, 48544, 0, 1125154039419854784, ... {{OEIS|A081262}}<br />
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 [[modular arithmetic|modulo]] 4).{{r|nordgren}} Every associative magic square of [[parity (mathematics)|even]] order forms a [[singular matrix]], but associative magic squares of [[parity (mathematics)|odd]] order can be singular or nonsingular.{{r|llnww}}<br />
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==References==<br />
{{reflist|refs=<br />
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<ref name=andrews>{{citation<br />
| editor-last = Andrews | editor-first = W. S.<br />
| last = Frierson | first = L. S.<br />
| contribution = Notes on pandiagonal and associated magic squares<br />
| contribution-url = https://archive.org/details/MagicSquaresCubesAndrewsEdited/page/n237/mode/2up<br />
| edition = 2nd<br />
| pages = 229–244<br />
| publisher = Open Court<br />
| title = Magic Squares and Cubes<br />
| year = 1917}}</ref><br />
<br />
<ref name=belste>{{citation<br />
| last1 = Bell | first1 = Jordan<br />
| last2 = Stevens | first2 = Brett<br />
| doi = 10.1002/jcd.20143<br />
| issue = 3<br />
| journal = Journal of Combinatorial Designs<br />
| mr = 2311190<br />
| pages = 221–234<br />
| title = Constructing orthogonal pandiagonal Latin squares and panmagic squares from modular <math>n</math>-queens solutions<br />
| volume = 15<br />
| year = 2007| s2cid = 121149492<br />
}}</ref><br />
<br />
<ref name=llnww>{{citation<br />
| last1 = Lee | first1 = Michael Z.<br />
| last2 = Love | first2 = Elizabeth<br />
| last3 = Narayan | first3 = Sivaram K.<br />
| last4 = Wascher | first4 = Elizabeth<br />
| last5 = Webster | first5 = Jordan D.<br />
| doi = 10.1016/j.laa.2012.04.004<br />
| issue = 6<br />
| journal = Linear Algebra and Its Applications<br />
| mr = 2942355<br />
| pages = 1346–1355<br />
| title = On nonsingular regular magic squares of odd order<br />
| volume = 437<br />
| year = 2012| doi-access = free<br />
}}</ref><br />
<br />
<ref name=nordgren>{{citation<br />
| last = Nordgren | first = Ronald P.<br />
| doi = 10.1016/j.laa.2012.05.031<br />
| issue = 8<br />
| journal = Linear Algebra and Its Applications<br />
| mr = 2950468<br />
| pages = 2009–2025<br />
| title = On properties of special magic square matrices<br />
| volume = 437<br />
| year = 2012| doi-access = free<br />
}}</ref><br />
<br />
<ref name=pasles>{{citation<br />
| last = Pasles | first = Paul C.<br />
| doi = 10.1080/00029890.2001.11919777<br />
| issue = 6<br />
| journal = American Mathematical Monthly<br />
| jstor = 2695704<br />
| mr = 1840656<br />
| pages = 489–511<br />
| title = The lost squares of Dr. Franklin: Ben Franklin's missing squares and the secret of the magic circle<br />
| volume = 108<br />
| year = 2001| s2cid = 341378<br />
}}</ref><br />
<br />
}}<br />
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==External links==<br />
*{{mathworld|urlname=AssociativeMagicSquare|title=Associative Magic Square|mode=cs2}}<br />
{{Magic polygons}}<br />
[[Category:Magic squares]]</div>imported>Ashwanialok26