The Borromean rings -- no two circles are directly linked, but the three are collectively interlinked. Cutting one ring frees the other two. In terms of knot theory, a "Brunnian link".
For a monochrome version of this graphic, see File:Borromean-rings-BW.svg .
For a version of the Borromean rings depicted in triangular form, see Image:Valknut-Symbol-borromean.svg .
For extended Borromean patterns, see Image:Borromean-cross.png / Image:Borromean-cross.svg and Image:Borromean-chainmail-tile.png .
For other (more complex) three-component Brunnian links which are not equivalent to the Borromean rings, see Image:Brunnian-3-not-Borromean.png and Image:Three-triang-18crossings-Brunnian.png .
== Summary == Borromean rings (knot) -- no two circles are directly linked, but the three are collectively interlinked. Cutting one ring frees the other two. In terms of knot theory, a "Brunnian link". For a version of the Borro
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graphic see File Borromean rings BW svg For a version of the Borromean rings depicted in triangular form see Image Valknut Symbol borromean svg For extended Borromean patterns see Image Borromean cross png Image Borromean cross svg and Image Borromean chainmail tile png For other more complex three component Brunnian links which are not equivalent to the Borromean rings see Image Brunnian 3 not Borromean png and Image Three triang 18crossings Brunnian png SVG version of Image Borromeanrings png wnthi ph s 2549aehlngthima Converted from the following PostScript code 77 110 translate 75 dup scale y 240 120 3 sqrt mul add def 20 setlinewidth 426 y 240 0 360 arc closepath gsave 30 setlinewidth 0 setgray stroke grestore 0 0 1 setrgbcolor stroke 186 y 240 0 360 arc closepath gsave 30 setlinewidth 0 setgray stroke grestore 1 1 0 setrgbcolor stroke 306 240 240 0 360 arc closepath gsave 30 setlinewidth 0 setgray stroke grestore 1 0 0 setrgbcolor stroke 30 setlinewidth 0 setgray 426 y 240 65 55 arc stroke 426 y 240 175 185 arc stroke 20 setlinewidth 0 0 1 setrgbcolor 426 y 240 66 54 arc stroke 426 y 240 174 186 arc stroke EOFphusrangsrrkh AnonMoosewxrchnxun File BorromeanRings gray svgSVG genesisInfoField sxrsokhdkhxng SVG nitrwcsxbthuktxngaelw iflphaphewketxrni srangkhunodyichopraekrmaekikhkhxkhwam karxnuyatichsiththi Public domain Public domain false falsekhapheca phuthuxlikhsiththiinnganni khxmxbnganihepnsatharnsmbti prakasnimiphlthwolkinbangpraeths karkrathadngklawxacimsamarththaidtamkdhmaykhaphecaxnuyatihthukkhnmisiththiinkarichiflniinthukehtuphlkarich odyimmimienguxnikh ewnaetkdhmayimxnuyatihthaechnnnkhabrryayodyyxithyephimkhabrryaythrrthdediywephuxkhyaykhwamwaiflnimixairixethmthiaesdngxyuiniflniprakxbdwysthanalikhsiththicopyrighted dedicated to the public domain by copyright holder xngkvssyyaxnuyatreleased into the public domain by the copyright holder xngkvswnthisrang wnkxtng2006 prawtiifl khlikwnthi ewlaephuxduiflthipraktinkhnann wnthi ewlarupyxkhnadphuichkhwamehn pccubn14 01 11 emsayn 2556626 600 861 ibt AnonMoosadd header simplify slightly readjust margins 12 40 7 krkdakhm 2549626 600 1 kiolibt AnonMoos Summary Borromean rings knot no two circles are directly linked but the three are collectively interlinked Cutting one ring frees the other two In terms of knot theory a Brunnian link For a version of the Borro hnathimiphaphni hnatxipni oyngmathiphaphni hwngbxrormin karichiflswnklang wikixuntxipniichiflni karichbn ca wikipedia org Jacques Lacan karichbn de wikipedia org Jacques Lacan Sinthom Verschlingung karichbn el wikipedia org 8ewria kombwn karichbn en wikipedia org Knot theory Linking number Cup product 3 manifold Homotopy groups of spheres Link knot theory Hyperbolic link Brunnian link Massey product Christopher Deninger karichbn en wikiquote org Wikiquote Quote of the day December 2013 Wikiquote Quote of the day December 27 2013 karichbn es wikipedia org Jacques Lacan Usuario Santiago Pla Casuriaga Jacques Lacan Ligadura teoria de nudos karichbn et wikipedia org Borromeo rongad karichbn fa wikipedia org ژاک لاکان karichbn fr wikipedia org Projet Psychologie Projet Psychologie Modeles Wikipedia Boites utilisateur de fans Anneaux borromeens Entrelacs brunnien Jacques Lacan Discussion utilisateur Windreaver Modele Utilisateur Lacan Utilisateur Nihil iri Projet Boite Utilisateur Demandes Archive6 Utilisateur ZuraGuerra Entrelacs theorie des nœuds Utilisateur Hiro Heremoana Utilisateur Phbme Utilisateur P tit goos Discussion Jacques Lacan Reamenagements karichbn he wikipedia org טבעות בורומאיות אינדקס שזירה karichbn hu wikipedia org Szerkeszto 05storm26 Csomoelmelet karichbn it wikipedia org Utente Wento Babel Utente Wento Sabbiera2 karichbn ja wikipedia org 結び目理論 カップ積 karichbn ko wikipedia org 매시 곱 karichbn nl wikipedia org Schakel knopentheorie karichbn pt wikipedia org Teoria dos nos Enlace de Brunn No hiperbolico dukarichthwolkephimetimkhxngiflnikhxmulekiywkbphaph phaphnimikhxmulephimetim 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