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Link to original content: http://en.wikipedia.org/wiki/File:BorromeanRings.svg
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File:BorromeanRings.svg

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Summary

Description

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 .

SVG version of Image:Borromeanrings.png .
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Converted from the following PostScript code:

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Author AnonMoos
Other versions File:BorromeanRings gray.svg
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ccb80f97721e3b7a9a6b837a13e23d94e5dbe5b0

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600 pixel

626 pixel

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Date/TimeThumbnailDimensionsUserComment
current07:01, 11 April 2013Thumbnail for version as of 07:01, 11 April 2013626 × 600 (861 bytes)AnonMoosadd header, simplify, slightly readjust margins
05:40, 7 July 2006Thumbnail for version as of 05:40, 7 July 2006626 × 600 (1 KB)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

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