#rhombusrosette — Public Fediverse posts
Live and recent posts from across the Fediverse tagged #rhombusrosette, aggregated by home.social.
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Here is a close view of some of the #rhombusRosette bit.
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Here is a close view of some of the #rhombusRosette bit.
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Here is a close view of some of the #rhombusRosette bit.
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Related to the rotating 2n-fold polygons to get rhombus rosettes-thing, here is a picture involving rotating partial rings of polygons to get…well…something.
It is from about 3 years ago. #rhombusRosette #polygons
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Related to the rotating 2n-fold polygons to get rhombus rosettes-thing, here is a picture involving rotating partial rings of polygons to get…well…something.
It is from about 3 years ago. #rhombusRosette #polygons
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Related to the rotating 2n-fold polygons to get rhombus rosettes-thing, here is a picture involving rotating partial rings of polygons to get…well…something.
It is from about 3 years ago. #rhombusRosette #polygons
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Related to the rotating 2n-fold polygons to get rhombus rosettes-thing, here is a picture involving rotating partial rings of polygons to get…well…something.
It is from about 3 years ago. #rhombusRosette #polygons
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A 22-fold rotationally-symmetric thing with most of a 22-fold rhombus rosette in it.
#mathart #mathsart #rhombuses #rhombi #rhombusRosette #symmetry
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A 22-fold rotationally-symmetric thing with most of a 22-fold rhombus rosette in it.
#mathart #mathsart #rhombuses #rhombi #rhombusRosette #symmetry
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An 11-fold rotationally-symmetric thing with a 22-fold rhombus rosette in it.
#mathart #mathsart #rhombuses #rhombi #rhombusRosette #symmetry
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An 11-fold rotationally-symmetric thing with a 22-fold rhombus rosette in it.
#mathart #mathsart #rhombuses #rhombi #rhombusRosette #symmetry
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This one may be a bit more interesting. It is an attempt to decompose simple n-fold rhombus rosettes into smaller rosettes in a way that is related to the factors of n.
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This one may be a bit more interesting. It is an attempt to decompose simple n-fold rhombus rosettes into smaller rosettes in a way that is related to the factors of n.
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This one may be a bit more interesting. It is an attempt to decompose simple n-fold rhombus rosettes into smaller rosettes in a way that is related to the factors of n.
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This one may be a bit more interesting. It is an attempt to decompose simple n-fold rhombus rosettes into smaller rosettes in a way that is related to the factors of n.
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Clips from the rhombusworm video.
The first shows equilateral (but not necessarily equiangular) polygons rotating to form n-fold rhombus rosettes. In particular, if n is even, then they can be generated by rotating regular n-gons around a point, but if n is odd, it can work with somewhat squished (n+1)-gons formed by merging two equilateral n-gons in a particular way.
The second shows rhombusworms rotating to form the same rosettes.
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Clips from the rhombusworm video.
The first shows equilateral (but not necessarily equiangular) polygons rotating to form n-fold rhombus rosettes. In particular, if n is even, then they can be generated by rotating regular n-gons around a point, but if n is odd, it can work with somewhat squished (n+1)-gons formed by merging two equilateral n-gons in a particular way.
The second shows rhombusworms rotating to form the same rosettes.
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Clips from the rhombusworm video.
The first shows equilateral (but not necessarily equiangular) polygons rotating to form n-fold rhombus rosettes. In particular, if n is even, then they can be generated by rotating regular n-gons around a point, but if n is odd, it can work with somewhat squished (n+1)-gons formed by merging two equilateral n-gons in a particular way.
The second shows rhombusworms rotating to form the same rosettes.
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Clips from the rhombusworm video.
The first shows equilateral (but not necessarily equiangular) polygons rotating to form n-fold rhombus rosettes. In particular, if n is even, then they can be generated by rotating regular n-gons around a point, but if n is odd, it can work with somewhat squished (n+1)-gons formed by merging two equilateral n-gons in a particular way.
The second shows rhombusworms rotating to form the same rosettes.