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| | Wilber Berryhill is what his wife enjoys to call him and he totally loves this name. The favorite pastime for him and his children is to perform lacross and he would by no means give it up. Mississippi is the only location I've been residing in but I will have online free tarot readings - [http://cspl.postech.ac.kr/zboard/Membersonly/144571 best site], psychics ([http://medialab.zendesk.com/entries/54181460-Will-You-Often-End-Up-Bored-Try-One-Of-These-Hobby-Ideas- http://medialab.zendesk.com/]) to move in a yr or two. Invoicing is what I do for a living but I've always wanted my own company.<br><br>my blog post ... good psychic; [http://www.zavodpm.ru/blogs/glennmusserrvji/14565-great-hobby-advice-assist-allow-you-get-going visit the next web site], |
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| |tT-name=Truncated tetrahedron|
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| |tT-image=Truncated tetrahedron.png|
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| |tT-image2=Truncatedtetrahedron.jpg|
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| |tT-image3=Truncatedtetrahedron.gif|
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| |tT-dimage=Triakistetrahedron.jpg|
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| |tT-vfigimage=Truncated tetrahedron vertfig.png|tT-netimage=Truncated tetrahedron flat.svg|
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| |tT-vfig=3.6.6|
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| |tT-Wythoff=2 3 | 3|
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| |tT-W=6|tT-U=02|tT-K=07|tT-C=16|
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| |tT-V=12|tT-E=18|tT-F=8|tT-Fdetail=4{3}+4{6}|
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| |tT-chi=2
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| |tT-group=[[Tetrahedral symmetry|T<sub>d</sub>]], A<sub>3</sub>, [3,3], (*332), order 24|
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| |tT-rotgroup=[[Tetrahedral symmetry|T]], [3,3]<sup>+</sup>, (332), order 12|
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| |tT-B=Tut|tT-special=|tT-schl=t{3,3} = h<sub>2</sub>{4,3}|tT-schl2=t<sub>0,1</sub>{3,3}
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| |tT-dual=Triakis tetrahedron|
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| |tT-dihedral=3-6:109°28'16"<BR>6-6:70°31'44"|
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| |tT-CD={{CDD|node_1|3|node_1|3|node}} = {{CDD|node_h1|4|node|3|node_1}}
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| | |
| |tO-name=Truncated octahedron|
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| |tO-image=Truncated octahedron.png|
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| |tO-image2=Truncatedoctahedron.jpg|
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| |tO-image3=Truncatedoctahedron.gif|
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| |tO-dimage=Tetrakishexahedron.jpg|
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| |tO-vfigimage=Truncated octahedron vertfig.png|tO-netimage=Truncated Octahedron Net.svg|
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| |tO-vfig=4.6.6|
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| |tO-Wythoff=2 4 | 3<BR>3 3 2 ||
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| |tO-W=7|tO-U=08|tO-K=13|tO-C=20|
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| |tO-V=24|tO-E=36|tO-F=14|tO-Fdetail=6{4}+8{6}|
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| |tO-chi=2
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| |tO-group=[[Octahedral symmetry|O<sub>h</sub>]], BC<sub>3</sub>, [4,3], (*432), order 48<BR>[[Tetrahedral symmetry|T<sub>h</sub>]], [3,3] and (*332), order 24|
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| |tO-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432), order 24|
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| |tO-B=Toe|
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| |tO-special=[[zonohedron]]<BR>[[permutohedron]]|
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| |tO-schl=t{3,4}, tr{3,3}|tO-schl2=t<sub>0,1</sub>{3,4} or t<sub>0,1,2</sub>{3,3}|
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| |tO-dual=Tetrakis hexahedron|
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| |tO-dihedral=4-6:cos(-1/sqrt(3))=125°15'51"<BR>6-6:cos(-1/3)=109°28'16"|
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| |tO-CD={{CDD|node|4|node_1|3|node_1}}<BR>{{CDD|node_1|3|node_1|3|node_1}}
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| |tC-name=Truncated cube|
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| |tC-altname1=Truncated hexahedron|
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| |tC-image=Truncated hexahedron.png|
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| |tC-image2=Truncatedhexahedron.jpg|
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| |tC-image3=Truncatedhexahedron.gif|
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| |tC-dimage=Triakisoctahedron.jpg|
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| |tC-vfigimage=Truncated cube vertfig.png|tC-netimage=Truncated hexahedron flat.svg|
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| |tC-vfig=3.8.8|
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| |tC-Wythoff=2 3 | 4|
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| |tC-W=8|tC-U=09|tC-K=14|tC-C=21|
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| |tC-V=24|tC-E=36|tC-F=14|tC-Fdetail=8{3}+6{8}|
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| |tC-chi=2
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| |tC-group=[[Octahedral symmetry|O<sub>h</sub>]], BC<sub>3</sub>, [4,3], (*432), order 48|
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| |tC-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432), order 24|
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| |tC-B=Tic|
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| |tC-dual=Triakis octahedron|tC-schl=t{4,3}|tC-schl2=t<sub>0,1</sub>{4,3}|
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| |tC-dihedral=3-8:125°15'51"<BR>8-8:90°|
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| |tC-special=|
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| |tC-CD={{CDD|node_1|4|node_1|3|node}}
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| |tI-name=Truncated icosahedron|
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| |tI-image=Truncated icosahedron.png|
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| |tI-image2=Truncatedicosahedron.jpg|
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| |tI-image3=Truncatedicosahedron.gif|
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| |tI-dimage=Pentakisdodecahedron.jpg|
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| |tI-vfigimage=Truncated icosahedron vertfig.png|tI-netimage=Truncated icosahedron flat-2.svg|
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| |tI-vfig=5.6.6|
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| |tI-Wythoff=2 5 | 3|
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| |tI-W=9|tI-U=25|tI-K=30|tI-C=27|
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| |tI-V=60|tI-E=90|tI-F=32|tI-Fdetail=12{5}+20{6}|
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| |tI-chi=2
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| |tI-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532), order 120|
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| |tI-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532), order 60|
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| |tI-B=Ti|
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| |tI-dual=Pentakis dodecahedron|tI-schl=t{3,5}|tI-schl2=t<sub>0,1</sub>{3,5}|
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| |tI-dihedral=6-6:138.189685°<BR>6-5:142.62°
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| |tI-special=|
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| |tI-CD={{CDD|node|5|node_1|3|node_1}}
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| |tD-name=Truncated dodecahedron|
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| |tD-image=Truncated dodecahedron.png|
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| |tD-image2=Truncateddodecahedron.jpg|
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| |tD-image3=Truncateddodecahedron.gif|
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| |tD-dimage=Triakisicosahedron.jpg|
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| |tD-vfigimage=Truncated dodecahedron vertfig.png|tD-netimage=Truncated dodecahedron flat.png|
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| |tD-vfig=3.10.10|
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| |tD-Wythoff=2 3 | 5|
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| |tD-W=10|tD-U=26|tD-K=31|tD-C=29|
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| |tD-V=60|tD-E=90|tD-F=32|tD-Fdetail=20{3}+12{10}|
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| |tD-chi=2
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| |tD-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532), order 120|
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| |tD-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532), order 60|
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| |tD-B=Tid|
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| |tD-dual=Triakis icosahedron|tD-schl=t{5,3}|tD-schl2=t<sub>0,1</sub>{5,3}|
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| |tD-dihedral=10-10:116.57<BR>3-10:142.62|
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| |tD-special=|
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| |tD-CD={{CDD|node_1|5|node_1|3|node}}
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| |CO-name=Cuboctahedron|
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| |CO-image=Cuboctahedron.png|
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| |CO-image2=Cuboctahedron.jpg|
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| |CO-image3=Cuboctahedron.gif|
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| |CO-dimage=Rhombicdodecahedron.jpg|
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| |CO-vfigimage=Cuboctahedron_vertfig.png|CO-netimage=Cuboctahedron flat.svg|
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| |CO-vfig=3.4.3.4|
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| |CO-Wythoff=2 | 3 4<BR>3 3 | 2|
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| |CO-W=11|CO-U=07|CO-K=12|CO-C=19|
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| |CO-V=12|CO-E=24|CO-F=14|CO-Fdetail=8{3}+6{4}|
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| |CO-chi=2
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| |CO-group=[[Octahedral symmetry|O<sub>h</sub>]], BC<sub>3</sub>, [4,3], (*432), order 48<BR>[[Tetrahedral symmetry|T<sub>d</sub>]], [3,3], (*332), order 24|
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| |CO-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432), order 24|
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| |CO-B=Co|CO-special=[[Quasiregular polyhedron|quasiregular]]|
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| |CO-dual=Rhombic dodecahedron|CO-schl=r{4,3} or rr{3,3}|CO-schl2=t<sub>1</sub>{4,3} or t<sub>0,2</sub>{3,3}
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| |CO-dihedral=125.26°<BR><math> \sec^{-1} \left(-\sqrt{3}\right)</math>|
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| |CO-CD={{CDD|node|4|node_1|3|node}}<BR>{{CDD|node_1|3|node|3|node_1}}
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| |ID-name=Icosidodecahedron|
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| |ID-image=Icosidodecahedron.png|
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| |ID-image2=Icosidodecahedron.jpg|
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| |ID-image3=Icosidodecahedron.gif|
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| |ID-dimage=Rhombictriacontahedron.svg|
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| |ID-vfigimage=Icosidodecahedron_vertfig.png|ID-netimage=Icosidodecahedron flat.svg|
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| |ID-vfig=3.5.3.5|
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| |ID-Wythoff=2 | 3 5|
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| |ID-W=12|ID-U=24|ID-K=29|ID-C=28|
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| |ID-V=30|ID-E=60|ID-F=32|ID-Fdetail=20{3}+12{5}|
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| |ID-chi=2
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| |ID-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532), order 120|
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| |ID-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532), order 60|
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| |ID-B=Id||ID-special=[[Quasiregular polyhedron|quasiregular]]|
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| |ID-dual=Rhombic triacontahedron|ID-schl=r{5,3}|ID-schl2=t<sub>1</sub>{5,3}|
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| |ID-dihedral=142.62°<BR><math> \cos^{-1} \left(-\sqrt{\frac{1}{15}\left(5+2\sqrt{5}\right)}\right)</math>|
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| |ID-CD={{CDD|node|5|node_1|3|node}}
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| |grCO-name=Truncated cuboctahedron|
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| |grCO-image=Great rhombicuboctahedron.png|
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| |grCO-image2=Truncatedcuboctahedron.jpg|
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| |grCO-image3=Truncatedcuboctahedron.gif|
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| |grCO-dimage=Disdyakisdodecahedron.jpg|
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| |grCO-vfigimage=Great rhombicuboctahedron vertfig.png|grCO-netimage=Truncated cuboctahedron flat.svg|
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| |grCO-vfig=4.6.8|
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| |grCO-altname1=Rhombitruncated cuboctahedron|
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| |grCO-altname2=Truncated cuboctahedron|
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| |grCO-Wythoff=2 3 4 | |
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| |grCO-W=15|grCO-U=11|grCO-K=16|grCO-C=23|
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| |grCO-V=48|grCO-E=72|grCO-F=26|grCO-Fdetail=12{4}+8{6}+6{8}|
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| |grCO-chi=2
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| |grCO-group=[[Octahedral symmetry|O<sub>h</sub>]], BC<sub>3</sub>, [4,3], (*432), order 48|
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| |grCO-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432), order 24|
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| |grCO-B=Girco|grCO-special=[[zonohedron]]|grCO-schl=tr{4,3}|grCO-schl2=t<sub>0,1,2</sub>{4,3}|
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| |grCO-dual=Disdyakis dodecahedron|
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| |grCO-dihedral=4-6:cos(-sqrt(6)/3)=144°44'08"<BR>4-8:cos(-sqrt(2)/3)=135°<BR>6-8:cos(-sqrt(3)/3)=125°15'51"|
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| |grCO-CD={{CDD|node_1|4|node_1|3|node_1}}
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| | |
| |grID-name=Truncated icosidodecahedron|
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| |grID-image=Great rhombicosidodecahedron.png|
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| |grID-image2=Truncatedicosidodecahedron.jpg|
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| |grID-image3=Truncatedicosidodecahedron.gif|
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| |grID-dimage=Disdyakistriacontahedron.jpg|
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| |grID-vfigimage=Great rhombicosidodecahedron vertfig.png|grID-netimage=Truncated icosidodecahedron flat.svg|
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| |grID-vfig=4.6.10|
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| |grID-altname1=Rhombitruncated icosidodecahedron|
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| |grID-altname2=Truncated icosidodecahedron|
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| |grID-Wythoff=2 3 5 | |
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| |grID-W=16|grID-U=28|grID-K=33|grID-C=31|
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| |grID-V=120|grID-E=180|grID-F=62|grID-Fdetail=30{4}+20{6}+12{10}|
| |
| |grID-chi=2
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| |grID-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532), order 120|
| |
| |grID-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532), order 60|
| |
| |grID-B=Grid|grID-special=[[zonohedron]]||grID-schl=tr{5,3}|grID-schl2=t<sub>0,1,2</sub>{5,3}|
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| |grID-dual=Disdyakis triacontahedron|
| |
| |grID-dihedral=6-10:142.62°<BR>4-10:148.28°<BR>4-6:159.095°|
| |
| |grID-CD={{CDD|node_1|5|node_1|3|node_1}}
| |
| | |
| |lrCO-name=Rhombicuboctahedron|
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| |lrCO-altname1=Rhombicuboctahedron|
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| |lrCO-image=Small rhombicuboctahedron.png|
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| |lrCO-image2=Rhombicuboctahedron.jpg|
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| |lrCO-image3=Rhombicuboctahedron.gif|
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| |lrCO-dimage=Deltoidalicositetrahedron.jpg|
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| |lrCO-vfigimage=Small rhombicuboctahedron vertfig.png|lrCO-netimage=Rhombicuboctahedron flat.png|
| |
| |lrCO-vfig=3.4.4.4|
| |
| |lrCO-Wythoff=3 4 | 2|
| |
| |lrCO-W=13|lrCO-U=10|lrCO-K=15|lrCO-C=22|
| |
| |lrCO-V=24|lrCO-E=48|lrCO-F=26|lrCO-Fdetail=8{3}+(6+12){4}|lrCO-chi=2|
| |
| |lrCO-group=[[Octahedral symmetry|O<sub>h</sub>]], BC<sub>3</sub>, [4,3], (*432), order 48|
| |
| |lrCO-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432), order 24|
| |
| |lrCO-B=Sirco|
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| |lrCO-dual=Deltoidal icositetrahedron|
| |
| |lrCO-dihedral=3-4:144°44'08" (144.74°)<BR>4-4:135°|
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| |lrCO-special=|lrCO-schl=rr{4,3}|lrCO-schl2=t<sub>0,2</sub>{4,3}|
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| |lrCO-CD={{CDD|node_1|4|node|3|node_1}}
| |
| | |
| |lrID-name=Rhombicosidodecahedron|
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| |lrID-image=Small rhombicosidodecahedron.png|
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| |lrID-image2=Rhombicosidodecahedron.jpg|
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| |lrID-image3=Rhombicosidodecahedron.gif|
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| |lrID-dimage=Deltoidalhexecontahedron.jpg|
| |
| |lrID-altname1=Rhombicosidodecahedron|lrID-netimage=Rhombicosidodecahedron flat.png|
| |
| |lrID-vfig=3.4.5.4|
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| |lrID-vfigimage=Small rhombicosidodecahedron vertfig.png|
| |
| |lrID-Wythoff=3 5 | 2|
| |
| |lrID-W=14|lrID-U=27|lrID-K=32|lrID-C=30|
| |
| |lrID-V=60|lrID-E=120|lrID-F=62|lrID-Fdetail=20{3}+30{4}+12{5}|
| |
| |lrID-chi=2
| |
| |lrID-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532), order 120|
| |
| |lrID-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532), order 60|
| |
| |lrID-B=Srid|
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| |lrID-dual=Deltoidal hexecontahedron|
| |
| |lrID-dihedral=3-4:159°05'41" (159.09°)<BR>4-5:148°16'57" (148.28°)|
| |
| |lrID-special=|lrID-schl=rr{5,3}|lrID-schl2=t<sub>0,2</sub>{5,3}|
| |
| |lrID-CD={{CDD|node_1|5|node|3|node_1}}
| |
| | |
| |nCO-name=Snub cube|
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| |nCO-image=Snub hexahedron.png|
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| |nCO-image2=Snubhexahedroncw.jpg|
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| |nCO-image3=Snubhexahedroncw.gif|
| |
| |nCO-dimage=Pentagonalicositetrahedronccw.jpg|
| |
| |nCO-vfigimage=Snub cube vertfig.png|nCO-netimage=Snub cube flat.svg|
| |
| |nCO-vfig=3.3.3.3.4|
| |
| |nCO-Wythoff=| 2 3 4|
| |
| |nCO-W=17|nCO-U=12|nCO-K=17|nCO-C=24|
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| |nCO-V=24|nCO-E=60|nCO-F=38|
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| |nCO-Fdetail=(8+24){3}+6{4}|
| |
| |nCO-chi=2
| |
| |nCO-group=[[Octahedral symmetry|O]], ½BC<sub>3</sub>, [4,3]<sup>+</sup>, (432), order 24|
| |
| |nCO-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432), order 24|
| |
| |nCO-B=Snic|nCO-special=[[chirality (mathematics)|chiral]]|
| |
| |nCO-dual=Pentagonal icositetrahedron|
| |
| |nCO-dihedral=3-3:153°14'04" (153.23°)<BR>3-4:142°59'00" (142.98°)|
| |
| |nCO-special=[[chirality (mathematics)|chiral]]|nCO-schl=sr{4,3}|nCO-schl2=ht<sub>0,1,2</sub>{4,3}|
| |
| |nCO-CD={{CDD|node_h|4|node_h|3|node_h}}
| |
| | |
| |nID-name=Snub dodecahedron|
| |
| |nID-image=Snub dodecahedron ccw.png|
| |
| |nID-image2=Snubdodecahedronccw.jpg|
| |
| |nID-image3=Snubdodecahedronccw.gif|
| |
| |nID-dimage=Pentagonalhexecontahedronccw.jpg|
| |
| |nID-vfigimage=Snub dodecahedron vertfig.png|nID-netimage=Snub dodecahedron flat.svg|
| |
| |nID-vfig=3.3.3.3.5|
| |
| |nID-Wythoff=| 2 3 5|
| |
| |nID-W=18|nID-U=29|nID-K=34|nID-C=32|
| |
| |nID-V=60|nID-E=150|nID-F=92|
| |
| |nID-Fdetail=(20+60){3}+12{5}|
| |
| |nID-chi=2
| |
| |nID-group=[[Icosahedral symmetry|I]], ½H<sub>3</sub>, [5,3]<sup>+</sup>, (532), order 60|
| |
| |nID-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532), order 60|
| |
| |nID-B=Snid|nID-special=[[chirality (mathematics)|chiral]]|nID-schl=sr{5,3}|nID-schl2=ht<sub>0,1,2</sub>{5,3}|
| |
| |nID-dual=Pentagonal hexecontahedron|
| |
| |nID-dihedral=3-3:164°10'31" (164.18°)<BR>3-5:152°55'53" (152.93°)|
| |
| |nID-CD={{CDD|node_h|5|node_h|3|node_h}}
| |
| | |
| }}<noinclude>[[Category:Polyhedra templates]]
| |
| </noinclude>
| |