[{WikipediaArticle oldid='223995453'}]



[{VerifyArticle user='leopold' template='Standard' date='02. Juni 2014' page-date='2014' }]
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| Une permutation de 7 éléments, avec trois cycles dont un point fixe.| Übertragen aus en.wikipedia nach Commons durch Bobamnertiopsis mithilfe des CommonsHelper .| Der ursprünglich hochladende Benutzer war Wzwz in der Wikipedia auf Englisch| [{Image src='https://www.austria-forum.org/cc/images/slim/publicdomain.png' alt='Public domain' align='center' link='https://www.austria-forum.org/cc/public-domain-10.html' target='_blank'}]| Datei:050712 perm 0.png
| The cyclic permutation ( 1 2 3 4 5 7 6 8 3 4 5 7 6 8 1 2 ) \displaystyle \beginpmatrix1&2&3&4&5&7&6&8\\3&4&5&7&6&8&1&2\endpmatrix . This type of cyclic permutation is also called a rotation .| self-made by en:User:Wzwz| en:User:Wzwz| [{Image src='https://www.austria-forum.org/cc/images/slim/publicdomain.png' alt='Public domain' align='center' link='https://www.austria-forum.org/cc/public-domain-10.html' target='_blank'}]| Datei:050712 perm 1.png
| Illustration of the cyclic permutation| Wzwz from en.wikipedia| User:Wzwz| [{Image src='https://www.austria-forum.org/cc/images/slim/publicdomain.png' alt='Public domain' align='center' link='https://www.austria-forum.org/cc/public-domain-10.html' target='_blank'}]| Datei:050712 perm 3.png
| Permutation consisting of 2-cycles and 1-cycles| Eigenes Werk| Quartl| [{Image src='https://www.austria-forum.org/cc/images/slim/publicdomain.png' alt='Public domain' align='center' link='https://www.austria-forum.org/cc/public-domain-10.html' target='_blank'}]| Datei:050712 perm 4.png
| The Wikimedia Commons logo, SVG version.| Original created by Reidab ( PNG version ) SVG version was created by Grunt and cleaned up by 3247 . Re-creation with SVG geometry features by Pumbaa , using a proper partial circle and SVG geometry features. (Former versions used to be slightly warped.)| Reidab , Grunt , 3247 , Pumbaa| [{Image src='https://www.austria-forum.org/cc/images/slim/by-sa.png' alt='CC BY-SA 3.0' align='center' link='https://www.austria-forum.org/cc/by-sa-30.html' target='_blank'}]| Datei:Commons-logo.svg
| Erstellt unter Verwendung der Dateien der Wikimedia-Category:Lulu (opera)| Eigenes Werk| JoaDon| [{Image src='https://www.austria-forum.org/cc/images/slim/by-sa.png' alt='CC BY-SA 4.0' align='center' link='https://www.austria-forum.org/cc/by-sa-40.html' target='_blank'}]| Datei:Lulu-Reihen.tif
| Permutations of 3 balls| Eigenes Werk| Watchduck You can name the author as "T. Piesk", "Tilman Piesk" or "Watchduck".| [{Image src='https://www.austria-forum.org/cc/images/slim/publicdomain.png' alt='Public domain' align='center' link='https://www.austria-forum.org/cc/public-domain-10.html' target='_blank'}]| Datei:Permutations RGB.svg
| Permutations of 4 elements (in lexicographic order) and derived permutations with repetition This SVG was created with Inkscape .| Diese Datei wurde von diesem Werk abgeleitet: Permutations with repetition.svg :| Permutations with repetition.svg : Watchduck You can name the author as "T. Piesk", "Tilman Piesk" or "Watchduck". derivative work: Quartl| [{Image src='https://www.austria-forum.org/cc/images/slim/publicdomain.png' alt='Public domain' align='center' link='https://www.austria-forum.org/cc/public-domain-10.html' target='_blank'}]| Datei:Permutations with repetition cropped.svg
| Cayley graph of S 4 generated by the transpositions that swap neighbouring elements Below the permutations the inversion vectors are shown. Their bitwise-smaller relation corresponds to the edges. This SVG was created with Inkscape .| Eigenes Werk| Watchduck You can name the author as "T. Piesk", "Tilman Piesk" or "Watchduck".| [{Image src='https://www.austria-forum.org/cc/images/slim/publicdomain.png' alt='Public domain' align='center' link='https://www.austria-forum.org/cc/public-domain-10.html' target='_blank'}]| Datei:Symmetric group 4; Cayley graph 1,2,6 (3D).svg
| Wheel diagram of the output of Heap's algorithm to generate all permutations of length n=4, where the permutations are color-coded with 1=red, 2=yellow, 3=green, 4=blue. Created using the permutation generation algorithms on the Combinatorial Object Server .| Eigenes Werk| Torsten Mütze| [{Image src='https://www.austria-forum.org/cc/images/slim/by-sa.png' alt='CC BY-SA 4.0' align='center' link='https://www.austria-forum.org/cc/by-sa-40.html' target='_blank'}]| Datei:Wheel diagram Heap's algorithm.svg
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