Template:Reg polyhedra db - Revision history

https://www.vigyanwiki.in/index.php?action=history&feed=atom&title=Template%3AReg_polyhedra_db Template:Reg polyhedra db - Revision history 2026-05-10T14:03:56Z Revision history for this page on the wiki MediaWiki 1.39.3 https://www.vigyanwiki.in/index.php?title=Template:Reg_polyhedra_db&diff=150031&oldid=prev Indicwiki: 1 revision imported from :alpha:Template:Reg_polyhedra_db 2023-05-03T06:14:29Z

<p>1 revision imported from <a href="https://alpha.indicwiki.in/index.php?title=Template:Reg_polyhedra_db" class="extiw" title="alpha:Template:Reg polyhedra db">alpha:Template:Reg_polyhedra_db</a></p> <table style="background-color: #fff; color: #202122;" data-mw="interface"> <tr class="diff-title" lang="en-GB"> <td colspan="1" style="background-color: #fff; color: #202122; text-align: center;">← Older revision</td> <td colspan="1" style="background-color: #fff; color: #202122; text-align: center;">Revision as of 11:44, 3 May 2023</td> </tr><tr><td colspan="2" class="diff-notice" lang="en-GB"><div class="mw-diff-empty">(No difference)</div> </td></tr></table>

Indicwiki https://www.vigyanwiki.in/index.php?title=Template:Reg_polyhedra_db&diff=150030&oldid=prev alpha>Sarika: Created page with "{{{{{1}}}|{{{2}}}| |T-name=Tetrahedron|T-sh=3> 2z|T-image=tetrahedron.png|T-image2=tetrahedron.jpg|T-image3=tetrahedron.gif|T-dimage=tetrahedron.png |T-Wythoff=3 | 2 3<B..." 2022-10-14T06:54:23Z

<p>Created page with "{{{{{1}}}|{{{2}}}| |T-name=Tetrahedron|T-sh=3> 2z|T-image=tetrahedron.png|T-image2=tetrahedron.jpg|T-image3=tetrahedron.gif|T-dimage=tetrahedron.png |T-Wythoff=3 | 2 3<B..."</p> <p><b>New page</b></p><div>{{{{{1}}}|{{{2}}}|<br /> <br /> |T-name=Tetrahedron|T-sh=3> 2z|T-image=tetrahedron.png|T-image2=tetrahedron.jpg|T-image3=tetrahedron.gif|T-dimage=tetrahedron.png<br /> |T-Wythoff=3 &#124; 2 3<BR>&#124; 2 2 2<br /> |T-W=1|T-U=01|T-K=06|T-C=15|T-V=4|T-E=6|T-F=4|T-Fdetail=4{3}|T-chi=2<br /> |T-vfig=3.3.3|T-vfigimage=tetrahedron_vertfig.png|T-netimage=Tetrahedron flat.svg<br /> |T-ffig=V3.3.3<br /> |T-conway=T|<br /> |T-group=[[Tetrahedral symmetry|T<sub>d</sub>]], A<sub>3</sub>, [3,3], (*332)<br /> |T-rotgroup=[[Tetrahedral symmetry|T]], [3,3]<sup>+</sup>, (332)<br /> |T-B=Tet|T-dual=Self-dual|T-dihedral=70.528779° = arccos({{frac|1|3}})<br /> |T-special=[[deltahedron]]|T-schl={3,3}|T-schl2=h{4,3}, s{2,4}, sr{2,2}<br /> |T-CD={{Coxeter–Dynkin diagram|node_1|3|node|3|node}} = {{Coxeter–Dynkin diagram|node_h|4|node|3|node}}<BR>{{Coxeter–Dynkin diagram|node_h|2x|node_h|4|node}}<BR>{{Coxeter–Dynkin diagram|node_h|2x|node_h|2x|node_h}}<br /> <br /> |O-name=Octahedron|O-sh=4<> 3z|O-image=Octahedron.png|O-image2=octahedron.jpg|O-image3=octahedron.gif|O-dimage=hexahedron.png<br /> |O-Wythoff=4 &#124; 2 3<br /> |O-W=2|O-U=05|O-K=10|O-C=17|O-V=6|O-E=12|O-F=8|O-Fdetail=8{3}|O-chi=2<br /> |O-vfig=3.3.3.3|O-vfigimage=octahedron_vertfig.png|O-netimage=Octahedron flat.svg<br /> |O-ffig=V4.4.4<br /> |O-conway=O<BR>aT|<br /> |O-group=[[Octahedral symmetry|O<sub>h</sub>]], BC<sub>3</sub>, [4,3], (*432)<br /> |O-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432)<br /> |O-B=Oct|O-dual=Cube|O-dihedral=109.47122° = arccos(−{{frac|1|3}})<br /> |O-special=[[deltahedron]]<br /> |O-schl={3,4}|O-schl2=r{3,3} or <math>\begin{Bmatrix} 3 \\ 3 \end{Bmatrix}</math><br /> |O-CD={{Coxeter–Dynkin diagram|node|4|node|3|node_1}}<br /> <br /> |C-name=Hexahedron|C-sh=4=|C-image=hexahedron.png|C-image2=hexahedron.jpg|C-image3=hexahedron.gif|C-dimage=Octahedron.png<br /> |C-altname=(Hexahedron)<BR>|C-Wythoff=3 &#124; 2 4<br /> |C-W=3|C-U=06|C-K=11|C-C=18|C-V=8|C-E=12|C-F=6|C-Fdetail=6{4}|C-chi=2<br /> |C-group=[[Octahedral symmetry|O<sub>h</sub>]], B<sub>3</sub>, [4,3], (*432)<br /> |C-rotgroup=[[Octahedral symmetry|O]], [4,3]<sup>+</sup>, (432)<br /> |C-vfig=4.4.4|C-vfigimage=Cube_vertfig.png|C-netimage=Hexahedron flat color.svg<br /> |C-ffig=V3.3.3.3<br /> |C-conway=C|<br /> |C-B=Cube|C-dual=Octahedron|C-dihedral=90°<br /> |C-special=[[zonohedron]]|C-schl={4,3}|C-schl2=t{2,4} or {4}×{}<BR>tr{2,2} or {}×{}×{}<br /> |C-CD={{Coxeter–Dynkin diagram|node_1|4|node|3|node}}<br /> <br /> |D-name=Dodecahedron|D-sh=5d|D-image=Dodecahedron.png|D-image2=dodecahedron.jpg|D-image3=dodecahedron.gif|D-dimage=icosahedron.png<br /> |D-Wythoff=3 &#124; 2 5<br /> |D-W=5|D-U=23|D-K=28|D-C=26|D-V=20|D-E=30|D-F=12|D-Fdetail=12{5}|D-chi=2<br /> |D-vfig=5.5.5|D-vfigimage=dodecahedron_vertfig.png|D-netimage=Dodecahedron flat.svg<br /> |D-ffig=V3.3.3.3.3<br /> |D-conway=D|<br /> |D-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532)<br /> |D-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532)<br /> |D-B=Doe|D-dual=Regular icosahedron|D-dihedral=116.56505° = arccos(−{{frac|1|√5}})<br /> |D-special=|D-schl={5,3}|D-schl2=<br /> |D-CD={{Coxeter–Dynkin diagram|node_1|5|node|3|node}}<br /> <br /> |I-name=Icosahedron|I-sh=5<z>|I-image=icosahedron.png|I-image2=icosahedron.jpg|I-image3=icosahedron.gif|I-dimage=dodecahedron.png<br /> |I-Wythoff=5 &#124; 2 3<br /> |I-W=4|I-U=22|I-K=27|I-C=25|I-V=12|I-E=30|I-F=20|I-Fdetail=20{3}|I-chi=2<br /> |I-vfig=3.3.3.3.3|I-vfigimage=icosahedron_vertfig.svg|I-netimage=Icosahedron flat.svg<br /> |I-ffig=V5.5.5<br /> |I-conway=I<BR>sT|<br /> |I-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532)<br /> |I-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532)<br /> |I-B=Ike|I-dual=Regular dodecahedron|I-dihedral=138.189685° = arccos(−{{frac|√5|3}})<br /> |I-special=[[deltahedron]]<br /> |I-schl={3,5}|I-schl2=s{3,4}<BR>sr{3,3} or <math>s\begin{Bmatrix} 3 \\ 3 \end{Bmatrix}</math><br /> |I-CD={{Coxeter–Dynkin diagram|node|5|node|3|node_1}}<br /> <br /> |gI-name=Great icosahedron|gI-image=Great icosahedron.png|gI-image3=GreatIcosahedron.gif|gI-dimage=Great stellated dodecahedron.png<br /> |gI-vfigimage=Great icosahedron vertfig.svg|gI-vfig=(3<sup>5</sup>)/2<br /> |gI-ffig=V(5<sup>3</sup>)/2<br /> |gI-Wythoff={{frac|5|2}} &#124; 2 3<br /> |gI-altname=(16th stellation of icosahedron)<br /> |gI-W=41|gI-U=53|gI-K=58|gI-C=69<br /> |gI-V=12|gI-E=30|gI-F=20|gI-Fdetail=20{3}<br /> |gI-chi=2<br /> |gI-conway=|<br /> |gI-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532)<br /> |gI-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532)<br /> |gI-B=Gike|gI-dual=Great stellated dodecahedron|gI-dihedral=?<br /> |gI-special=[[deltahedron]]|gI-schl={3,{{frac|5|2}}}|gI-schl2=<br /> |gI-CD={{Coxeter–Dynkin diagram|node_1|3|node|5|rat|d2|node}}<br /> |gI-stellation=icosahedron<br /> <br /> |gD-name=Great dodecahedron<br /> |gD-image=Great dodecahedron.png|gD-image3=GreatDodecahedron.gif|gD-dimage=Small stellated dodecahedron.png<br /> |gD-vfigimage=Great dodecahedron_vertfig.png|gD-vfig=(5<sup>5</sup>)/2<br /> |gD-ffig=V({{frac|5|2}})<sup>5</sup><br /> |gD-Wythoff={{frac|5|2}} &#124; 2 5<br /> |gD-W=21|gD-U=35|gD-K=40|gD-C=44<br /> |gD-V=12|gD-E=30|gD-F=12|gD-Fdetail=12{5}<br /> |gD-chi=-6<br /> |gD-conway=|<br /> |gD-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532)<br /> |gD-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532)<br /> |gD-B=Gad|gD-dual=Small stellated dodecahedron|gD-dihedral=?<br /> |gD-special=|gD-schl={5,{{frac|5|2}}}|gD-schl2=<br /> |gD-CD={{Coxeter–Dynkin diagram|node_1|5|node|5|rat|d2|node}}<br /> |gD-stellation=regular dodecahedron<br /> <br /> |lsD-name=Small stellated dodecahedron<br /> |lsD-image=Small stellated dodecahedron.png|lsD-image3=SmallStellatedDodecahedron.gif|lsD-dimage=Great dodecahedron.png<br /> |lsD-vfigimage=Small stellated dodecahedron_vertfig.png|lsD-vfig=({{frac|5|2}})<sup>5</sup><br /> |lsD-ffig=V(5<sup>5</sup>)/2<br /> |lsD-Wythoff=5 &#124; 2 {{frac|5|2}}<br /> |lsD-W=20|lsD-U=34|lsD-K=39|lsD-C=43<br /> |lsD-V=12|lsD-E=30|lsD-F=12|lsD-Fdetail=12 {{{frac|5|2}}}<br /> |lsD-chi=-6<br /> |lsD-conway=|<br /> |lsD-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532)<br /> |lsD-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532)<br /> |lsD-B=Sissid|lsD-dual=Great dodecahedron|lsD-dihedral=?<br /> |lsD-special=|lsD-schl={{{frac|5|2}},5}|lsD-schl2=<br /> |lsD-CD={{Coxeter–Dynkin diagram|node|5|node|5|rat|d2|node_1}}<br /> |lsD-stellation=regular dodecahedron<br /> <br /> |gsD-name=Great stellated dodecahedron<br /> |gsD-image=Great stellated dodecahedron.png|gsD-image3=GreatStellatedDodecahedron.gif|gsD-dimage=Great icosahedron.png<br /> |gsD-vfigimage=Great stellated dodecahedron_vertfig.png|gsD-vfig=({{frac|5|2}})<sup>3</sup><br /> |gsD-ffig=V(3<sup>5</sup>)/2<br /> |gsD-Wythoff=3 &#124; 2 {{frac|5|2}}<br /> |gsD-W=22|gsD-U=52|gsD-K=57|gsD-C=68<br /> |gsD-V=20|gsD-E=30|gsD-F=12|gsD-Fdetail=12 { {{frac|5|2}} }<br /> |gsD-conway=<br /> |gsD-chi=2<br /> |gsD-group=[[Icosahedral symmetry|I<sub>h</sub>]], H<sub>3</sub>, [5,3], (*532)<br /> |gsD-rotgroup=[[Icosahedral symmetry|I]], [5,3]<sup>+</sup>, (532)<br /> |gsD-B=Gissid|gsD-dual=Great icosahedron|gsD-dihedral=?<br /> |gsD-special=|gsD-schl={{{frac|5|2}},3}|gsD-schl2=<br /> |gsD-CD={{Coxeter–Dynkin diagram|node|3|node|5|rat|d2|node_1}}<br /> |gsD-stellation=regular dodecahedron<br /> <br /> }}<noinclude><br /> {{documentation|content=<br /> See [[User:Tomruen/polyhedron database documentation]].<br /> <br /> ==See also==<br /> {{Polyhedron templates}}<br /> <br /> [[Category:Polyhedron templates]]<br /> }}<br /> </noinclude></div>

alpha>Sarika