Modèle:Polyèdres uniformes bd

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|OhO-name=Octahémioctaèdre| |OhO-image=Octahemioctahedron.png| |OhO-vfigimage=Octahemioctahedron vertfig.png|OhO-vfig=3.6.³/₂.6| |OhO-Wythoff=³/₂3 | 3| |OhO-W=68|OhO-U=03|OhO-K=08|OhO-C=37| |OhO-V=12|OhO-E=24|OhO-F=12|OhO-Fdetail=8{3}+4{6}| |OhO-chi=0|OhO-group=O_h| |OhO-B=Oho|OhO-dual=Octahemioctacron |OhO-dimage=Wideblank.png

|ThH-name=Tétrahémihexaèdre| |ThH-image=Tetrahemihexahedron.png| |ThH-vfigimage=Tetrahemihexahedron vertfig.png| |ThH-vfig=3.4.³/₂.4| |ThH-Wythoff=³/₂3 | 2| |ThH-W=67|ThH-U=04|ThH-K=09|ThH-C=36| |ThH-V=6|ThH-E=12|ThH-F=7|ThH-Fdetail=4{3}+3{4}| |ThH-chi=1|ThH-group=T_d| |ThH-B=Thah|ThH-dual=Tétrahémihexacron |ThH-dimage=Wideblank.png

|lCCO-name=Petit cubicuboctaèdre| |lCCO-image=Small cubicuboctahedron.png| |lCCO-vfigimage=Small cubicuboctahedron vertfig.png|lCCO-vfig=4.8.³/₂.8| |lCCO-Wythoff=³/₂4 | 4| |lCCO-W=69|lCCO-U=13|lCCO-K=18|lCCO-C=38| |lCCO-V=24|lCCO-E=48|lCCO-F=20|lCCO-Fdetail=8{3}+6{4}+6{8}| |lCCO-chi=-4|lCCO-group=O_h| |lCCO-B=Socco|lCCO-dual=Petit icositétraèdre hexacronique|lCCO-dimage=DU13 small hexacronic icositetrahedron.png

|gCCO-name=Grand cubicuboctaèdre| |gCCO-image=Great cubicuboctahedron.png| |gCCO-vfigimage=Great cubicuboctahedron vertfig.png|gCCO-vfig=3.⁸/₃.4.⁸/₃| |gCCO-Wythoff=3 4 | ⁴/₃| |gCCO-W=77|gCCO-U=14|gCCO-K=19|gCCO-C=50| |gCCO-V=24|gCCO-E=48|gCCO-F=20| |gCCO-Fdetail=8{3}+6{4}+6{⁸/₃}| |gCCO-chi=-4|gCCO-group=O_h| |gCCO-B=Gocco|gCCO-dual=Grand icositétraèdre hexacronique |gCCO-dimage=DU14 great hexacronic icositetrahedron.png

|ChO-name=Cubohémioctaèdre| |ChO-image=Cubohemioctahedron.png| |ChO-vfigimage=Cubohemioctahedron vertfig.png|ChO-vfig=4.6.⁴/₃.6| |ChO-Wythoff=⁴/₃4 | 3| |ChO-W=78|ChO-U=15|ChO-K=20|ChO-C=51| |ChO-V=12|ChO-E=24|ChO-F=10|ChO-Fdetail=6{4}+4{6}| |ChO-chi=-2|ChO-group=O_h| |ChO-B=Cho|ChO-dual=Hexahémioctacron |ChO-dimage=Wideblank.png

|ctCO-name=Cuboctaèdre cubitronqué| |ctCO-image=Cubitruncated cuboctahedron.png| |ctCO-vfigimage=Cubitruncated cuboctahedron vertfig.png|ctCO-vfig=6.8.⁸/₃| |ctCO-altname1=Cuboctatruncated cuboctahedron| |ctCO-Wythoff=3 4⁴/₃ | | |ctCO-W=79|ctCO-U=16|ctCO-K=21|ctCO-C=52| |ctCO-V=48|ctCO-E=72|ctCO-F=20|ctCO-Fdetail=8{6}+6{8}+6{⁸/₃}| |ctCO-chi=-4|ctCO-group=O_h| |ctCO-B=Cotco|ctCO-dual=Hexaèdre tétradyakis |ctCO-dimage=DU16 tetradyakishexahedron.png

|ugrCO-name=Grand rhombicuboctaèdre uniforme| |ugrCO-image=Uniform great rhombicuboctahedron.png| |ugrCO-vfigimage=Uniform great rhombicuboctahedron vertfig.png|ugrCO-vfig=4.4.4.³/₂| |ugrCO-altname1=Quasirhombicuboctahedron| |ugrCO-Wythoff=³/₂4 | 2| |ugrCO-W=85|ugrCO-U=17|ugrCO-K=22|ugrCO-C=59| |ugrCO-V=24|ugrCO-E=48|ugrCO-F=26|ugrCO-Fdetail=8{3}+(6+12){4}| |ugrCO-chi=2|ugrCO-group=O_h| |ugrCO-B=Querco|ugrCO-dual=Grand icositétraèdre deltoïdal |ugrCO-dimage=DU17 great strombic icositetrahedron.png

|lrH-name=Petit rhombihexaèdre| |lrH-image=Small rhombihexahedron.png| |lrH-vfigimage=Small rhombihexahedron vertfig.png|lrH-vfig=4.8.⁴/₃.8| |lrH-Wythoff=2 4 (³/₂ ⁴/₂) || |lrH-W=86|lrH-U=18|lrH-K=23|lrH-C=60| |lrH-V=24|lrH-E=48|lrH-F=18|lrH-Fdetail=12{4}+6{8}| |lrH-chi=-6|lrH-group=O_h| |lrH-B=Sroh|lrH-dual=Petit rhombihexacron |lrH-dimage=DU18 small rhombihexacron.png

|stH-name=Hexaèdre tronqué étoilé| |stH-image=Stellated truncated hexahedron.png| |stH-vfigimage=Stellated truncated hexahedron vertfig.png|stH-vfig=3.⁸/₃.⁸/₃| |stH-altname1=Quasitruncated hexahedron| |stH-altname2=stellatruncated cube| |stH-Wythoff=2 3 | ⁴/₃| |stH-W=92|stH-U=19|stH-K=24|stH-C=66| |stH-V=24|stH-E=36|stH-F=14|stH-Fdetail=8{3}+6{⁸/₃}| |stH-chi=2|stH-group=O_h| |stH-B=Quith|stH-dual=Grand triakioctaèdre |stH-dimage=DU19 great triakisoctahedron.png

|gtCO-name=Grand cuboctaèdre tronqué| |gtCO-image=Great truncated cuboctahedron.png| |gtCO-vfigimage=Great truncated cuboctahedron vertfig.png|gtCO-vfig=4.6.⁸/₃| |gtCO-altname1=Quasitruncated cuboctahedron| |gtCO-Wythoff=2 3⁴/₃ | | |gtCO-W=93|gtCO-U=20|gtCO-K=25|gtCO-C=67| |gtCO-V=48|gtCO-E=72|gtCO-F=26|gtCO-Fdetail=12{4}+8{6}+6{⁸/₃}| |gtCO-chi=2|gtCO-group=O_h| |gtCO-B=Quitco|gtCO-dual=Grand disdyakidodécaèdre |gtCO-dimage=DU20 great disdyakisdodecahedron.png

|grH-name=Grand rhombihexaèdre| |grH-image=Great rhombihexahedron.png| |grH-vfigimage=Great rhombihexahedron vertfig.png|grH-vfig=4.⁸/₃.⁴/₃.⁸/₅| |grH-Wythoff=2 ⁴/₃ (³/₂ ⁴/₂) || |grH-W=103|grH-U=21|grH-K=26|grH-C=82| |grH-V=24|grH-E=48|grH-F=18|grH-Fdetail=12{4}+6{⁸/₃}| |grH-chi=-6|grH-group=O_h| |grH-B=Groh|grH-dual=Grand rhombihexacron |grH-dimage=DU21 great rhombihexacron.png

|ldID-name=Petit icosidodécaèdre ditrigonal| |ldID-image=Small ditrigonal icosidodecahedron.png| |ldID-vfigimage=Small ditrigonal icosidodecahedron vertfig.png|ldID-vfig=(3.⁵/₂)³| |ldID-Wythoff=3 | ⁵/₂3| |ldID-W=70|ldID-U=30|ldID-K=35|ldID-C=39| |ldID-V=20|ldID-E=60|ldID-F=32|ldID-Fdetail=20{3}+12{⁵/₂}| |ldID-chi=-8|ldID-group=I_h| |ldID-B=Sidtid|ldID-dual=Petit icosaèdre triambique |ldID-dimage=DU30 small triambic icosahedron.png

|lIID-name=Petit icosicosidodécaèdre| |lIID-image=Small icosicosidodecahedron.png| |lIID-vfigimage=Small icosicosidodecahedron vertfig.png| |lIID-vfig=6.⁵/₂.6.3| |lIID-Wythoff=⁵/₂ 3 | 3| |lIID-W=71|lIID-U=31|lIID-K=36|lIID-C=40| |lIID-V=60|lIID-E=120|lIID-F=52| |lIID-Fdetail=20{3}+12{⁵/₂}+20{6}| |lIID-chi=-8|lIID-group=I_h| |lIID-B=Siid|lIID-dual=Petit hexacontaèdre icosacronique |lIID-dimage=DU31 small icosacronic hexecontahedron.png

|Seside-name=Petit icosicosidodécaèdre adouci| |Seside-image=Small snub icosicosidodecahedron.png| |Seside-vfigimage=Small snub icosicosidodecahedron vertfig.png| |Seside-solid=S+| |Seside-Wythoff=|⁵/₂ 3 3| |Seside-vfig=3⁵.⁵/₂| |Seside-B=Seside|Seside-group=I_h| |Seside-W=110|Seside-U=32|Seside-K=37|Seside-C=41| |Seside-V=60|Seside-E=180|Seside-F=112|Seside-chi=-8|Seside-Fdetail=(40+60){3}+12{⁵/₂}| |Seside-dual=Petit hexacontaèdre hexagonal |Seside-dimage=DU32 small hexagonal hexecontahedron.png

|lDID-name=Petit dodécicosidodécaèdre| |lDID-image=Small dodecicosidodecahedron.png| |lDID-vfigimage=Small dodecicosidodecahedron vertfig.png|lDID-vfig=5.10.³/₂.10| |lDID-Wythoff=³/₂5 | 5| |lDID-W=72|lDID-U=33|lDID-K=38|lDID-C=42| |lDID-V=60|lDID-E=120|lDID-F=44|lDID-Fdetail=20{3}+12{5}+12{10}| |lDID-chi=-16|lDID-group=I_h| |lDID-B=Saddid|lDID-dual=Petit hexacontaèdre dodécacronique |lDID-dimage=DU33 small dodecacronic hexecontahedron.png

|DD-name=Dodécadodécaèdre| |DD-image=Dodecadodecahedron.png| |DD-vfigimage=Dodecadodecahedron vertfig.png|DD-vfig=5.⁵/₂.5.⁵/₂| |DD-Wythoff=2 | 5 ⁵/₂| |DD-W=73|DD-U=36|DD-K=41|DD-C=45| |DD-V=30|DD-E=60|DD-F=24|DD-Fdetail=12{5}+12{⁵/₂}| |DD-chi=-6|DD-group=I_h| |DD-B=Did|DD-dual=Triacontaèdre rhombique médial |DD-dimage=DU36 medial rhombic triacontahedron.png

|tgD-name=Grand dodécaèdre tronqué| |tgD-image=Great truncated dodecahedron.png| |tgD-vfigimage=Truncated great dodecahedron vertfig.png|tgD-vfig=10.10.⁵/₂| |tgD-Wythoff=2⁵/₂ | 5| |tgD-W=75|tgD-U=37|tgD-K=42|tgD-C=47| |tgD-V=60|tgD-E=90|tgD-F=24|tgD-Fdetail=12{⁵/₂}+12{10}| |tgD-chi=-6|tgD-group=I_h| |tgD-B=Tigid|tgD-dual=Petit stellapentakidodécaèdre |tgD-dimage=DU37 small stellapentakisdodecahedron.png

|rDD-name=Rhombidodécadodécaèdre| |rDD-image=Rhombidodecadodecahedron.png| |rDD-vfigimage=Rhombidodecadodecahedron vertfig.png| |rDD-vfig=4.⁵/₂.4.5| |rDD-Wythoff=⁵/₂ 5 | 2| |rDD-W=76|rDD-U=38|rDD-K=43|rDD-C=48| |rDD-V=60|rDD-E=120|rDD-F=54| |rDD-Fdetail=30{4}+12{5}+12{⁵/₂}| |rDD-chi=-6|rDD-group=I_h| |rDD-B=Raded|rDD-dual=Hexacontaèdre deltoïdal médial |rDD-dimage=DU38 medial trapezoidal hexecontahedron.png

|lrD-name=Petit rhombidodécaèdre| |lrD-image=Small rhombidodecahedron.png| |lrD-vfigimage=Small rhombidodecahedron vertfig.png|lrD-vfig=4.10.⁴/₃.¹⁰/₉| |lrD-Wythoff=2 5 (³/₂ ⁵/₂) | | |lrD-W=74|lrD-U=39|lrD-K=44|lrD-C=46| |lrD-V=60|lrD-E=120|lrD-F=42|lrD-Fdetail=30{4}+12{10}| |lrD-chi=-18|lrD-group=I_h| |lrD-B=Sird|lrD-dual=Petit rhombidodécacron |lrD-dimage=DU39 small rhombidodecacron.png

|Siddid-name=Dodécadodécaèdre adouci| |Siddid-image=Snub dodecadodecahedron.png| |Siddid-vfigimage=Snub dodecadodecahedron vertfig.png| |Siddid-solid=S+| |Siddid-Wythoff=|2 ⁵/₂ 5| |Siddid-vfig=3.3.⁵/₂.3.5| |Siddid-B=Siddid|Siddid-group=I |Siddid-W=111|Siddid-U=40|Siddid-K=45|Siddid-C=49| |Siddid-V=60|Siddid-E=150|Siddid-F=84|Siddid-chi=-6|Siddid-Fdetail=60{3}+12{5}+12{⁵/₂}| |Siddid-dual=Hexacontaèdre pentagonal médial |Siddid-dimage=DU40 medial pentagonal hexecontahedron.png

|dDD-name=Dodécadodécaèdre ditrigonal| |dDD-image=Ditrigonal dodecadodecahedron.png| |dDD-vfigimage=Ditrigonal dodecadodecahedron vertfig.png|dDD-vfig=(5.⁵/₃)³| |dDD-Wythoff=3 | ⁵/₃5| |dDD-W=80|dDD-U=41|dDD-K=46|dDD-C=53| |dDD-V=20|dDD-E=60|dDD-F=24|dDD-Fdetail=12{5}+12{⁵/₂}| |dDD-chi=-16|dDD-group=I_h| |dDD-B=Ditdid|dDD-dual=Icosaèdre triambique médial |dDD-dimage=DU41 medial triambic icosahedron.png

|gdDID-name=Grand dodécicosidodécaèdre ditrigonal| |gdDID-image=Great ditrigonal dodecicosidodecahedron.png| |gdDID-vfigimage=Great ditrigonal dodecicosidodecahedron vertfig.png| |gdDID-vfig=3.¹⁰/₃.5.¹⁰/₃| |gdDID-Wythoff=3 5 | ⁵/₃| |gdDID-W=81|gdDID-U=42|gdDID-K=47|gdDID-C=54| |gdDID-V=60|gdDID-E=120|gdDID-F=44| |gdDID-Fdetail=20{3}+12{5}+12{¹⁰/₃}| |gdDID-chi=-16|gdDID-group=I_h| |gdDID-B=Gidditdid|gdDID-dual=Grand hexacontaèdre dodécacronique ditrigonal |gdDID-dimage=DU42 great ditrigonal dodecacronic hexecontahedron.png

|ldDID-name=Petit dodécicosidodécaèdre ditrigonal| |ldDID-image=Small ditrigonal dodecicosidodecahedron.png| |ldDID-vfigimage=Small ditrigonal dodecicosidodecahedron vertfig.png|ldDID-vfig=3.10.⁵/₃.10| |ldDID-Wythoff=⁵/₃3 | 5| |ldDID-W=82|ldDID-U=43|ldDID-K=48|ldDID-C=55| |ldDID-V=60|ldDID-E=120|ldDID-F=44|ldDID-Fdetail=20{3}+12{⁵/₂}+12{10}| |ldDID-chi=-16|ldDID-group=I_h| |ldDID-B=Sidditdid|ldDID-dual=Petit hexacontaèdre dodécacronique ditrigonal |ldDID-dimage=DU43 Small ditrigonal dodecacronic hexecontahedron.png

|IDD-name=Icosidodécadodécaèdre| |IDD-image=Icosidodecadodecahedron.png| |IDD-vfigimage=Icosidodecadodecahedron vertfig.png|IDD-vfig=5.6.⁵/₃.6| |IDD-Wythoff=⁵/₃5 | 3| |IDD-W=83|IDD-U=44|IDD-K=49|IDD-C=56| |IDD-V=60|IDD-E=120|IDD-F=44|IDD-Fdetail=12{5}+12{⁵/₂}+20{6}| |IDD-chi=-16|IDD-group=I_h| |IDD-B=Ided|IDD-dual=Hexacontaèdre icosacronique médial |IDD-dimage=DU44 medial icosacronic hexecontahedron.png

|itDD-name=Dodécadodécaèdre icositronqué| |itDD-image=Icositruncated dodecadodecahedron.png| |itDD-vfigimage=Icositruncated dodecadodecahedron vertfig.png|itDD-vfig=6.10.¹⁰/₃| |itDD-altname1=Icosidodecatruncated icosidodecahedron| |itDD-Wythoff=3 5⁵/₃ | | |itDD-W=84|itDD-U=45|itDD-K=50|itDD-C=57| |itDD-V=120|itDD-E=180|itDD-F=44|itDD-Fdetail=20{6}+12{10}+12{¹⁰/₃}| |itDD-chi=-16|itDD-group=I_h| |itDD-B=Idtid|itDD-dual=Tridyaki-icosaèdre |itDD-dimage=DU45 tridyakisicosahedron.png

|Sided-name=Icosidodécadodécaèdre adouci| |Sided-image=Snub icosidodecadodecahedron.png| |Sided-vfigimage=Snub icosidodecadodecahedron vertfig.png| |Sided-solid=S+| |Sided-Wythoff=|⁵/₃ 3 5| |Sided-vfig=3.3.3.5.3.⁵/₃| |Sided-B=Sided|Sided-group=I |Sided-W=112|Sided-U=46|Sided-K=51|Sided-C=58| |Sided-V=60|Sided-E=180|Sided-F=104|Sided-chi=-16|Sided-Fdetail=(20+60){3}+12{5}+12{⁵/₂}| |Sided-dual=Hexacontaèdre hexagonal médial |Sided-dimage=DU46 medial hexagonal hexecontahedron.png

|gdID-name=Grand icosidodécaèdre ditrigonal| |gdID-image=Great ditrigonal icosidodecahedron.png| |gdID-vfigimage=Great ditrigonal icosidodecahedron vertfig.png|gdID-vfig=((3.5)³)/2| |gdID-Wythoff=³/₂ | 3 5| |gdID-W=87|gdID-U=47|gdID-K=52|gdID-C=61| |gdID-V=20|gdID-E=60|gdID-F=32|gdID-Fdetail=20{3}+12{5}| |gdID-chi=-8|gdID-group=I_h| |gdID-B=Gidtid|gdID-dual=Grand icosaèdre triambique |gdID-dimage=DU47 great triambic icosahedron.png

|gIID-name=Grand icosicosidodécaèdre| |gIID-image=Great icosicosidodecahedron.png| |gIID-vfigimage=Great icosicosidodecahedron vertfig.png|gIID-vfig=5.6.³/₂.6| |gIID-Wythoff=³/₂5 | 3| |gIID-W=88|gIID-U=48|gIID-K=53|gIID-C=62| |gIID-V=60|gIID-E=120|gIID-F=52|gIID-Fdetail=20{3}+12{5}+20{6}| |gIID-chi=-8|gIID-group=I_h| |gIID-B=Giid|gIID-dual=Grand hexacontaèdre icosacronique |gIID-dimage=DU48 great icosacronic hexecontahedron.png

|lIhD-name=Petit icosihémidodécaèdre| |lIhD-image=Small icosihemidodecahedron.png| |lIhD-vfigimage=Small icosihemidodecahedron vertfig.png|lIhD-vfig=3.10.³/₂.10| |lIhD-Wythoff=³/₂3 | 5| |lIhD-W=89|lIhD-U=49|lIhD-K=54|lIhD-C=63| |lIhD-V=30|lIhD-E=60|lIhD-F=26|lIhD-Fdetail=20{3}+6{10}| |lIhD-chi=-4|lIhD-group=I_h| |lIhD-B=Seihid|lIhD-dual=Petit icosihémidodécacron |lIhD-dimage=Wideblank.png

|lDI-name=Petit dodécicosaèdre| |lDI-image=Small dodecicosahedron.png| |lDI-vfigimage=Small dodecicosahedron vertfig.png|lDI-vfig=6.10.⁶/₅.¹⁰/₉| |lDI-Wythoff=3 5 (³/₂ ⁵/₄) | | |lDI-W=90|lDI-U=50|lDI-K=55|lDI-C=64| |lDI-V=60|lDI-E=120|lDI-F=32|lDI-Fdetail=20{6}+12{10}| |lDI-chi=-28|lDI-group=I_h| |lDI-B=Siddy|lDI-dual=Petit dodécicosacron |lDI-dimage=DU50 small dodecicosacron.png

|lDhD-name=Petit dodécahémidodécaèdre| |lDhD-image=Small dodecahemidodecahedron.png| |lDhD-vfigimage=Small dodecahemidodecahedron vertfig.png|lDhD-vfig=5.10.⁵/₄.10| |lDhD-Wythoff=⁵/₄5 | 5| |lDhD-W=91|lDhD-U=51|lDhD-K=56|lDhD-C=65| |lDhD-V=30|lDhD-E=60|lDhD-F=18|lDhD-Fdetail=12{5}+6{10}| |lDhD-chi=-12|lDhD-group=I_h| |lDhD-B=Sidhid|lDhD-dual=Petit dodécahémidodécacron |lDhD-dimage=Wideblank.png

|gID-name=Grand icosidodécaèdre| |gID-image=Great icosidodecahedron.png| |gID-vfigimage=Great icosidodecahedron vertfig.png|gID-vfig=3.⁵/₂.3.⁵/₂| |gID-Wythoff=2 | 3 ⁵/₂| |gID-W=94|gID-U=54|gID-K=59|gID-C=70| |gID-V=30|gID-E=60|gID-F=32|gID-Fdetail=20{3}+12{⁵/₂}| |gID-chi=2|gID-group=I_h| |gID-B=Gid|gID-dual=Grand triacontaèdre rhombique |gID-dimage=DU54 great rhombic triacontahedron.png

|gtI-name=Grand icosaèdre tronqué| |gtI-image=Great truncated icosahedron.png| |gtI-vfigimage=Great truncated icosahedron vertfig.png|gtI-vfig=6.6.⁵/₂| |gtI-Wythoff=2⁵/₂ | 3| |gtI-W=95|gtI-U=55|gtI-K=60|gtI-C=71| |gtI-V=60|gtI-E=90|gtI-F=32|gtI-Fdetail=12{⁵/₂}+20{6}| |gtI-chi=2|gtI-group=I_h| |gtI-B=Tiggy|gtI-dual=Grand stellapentakidodécaèdre |gtI-dimage=DU55 great stellapentakisdodecahedron.png

|rI-name=Rhombicosaèdre| |rI-image=Rhombicosahedron.png| |rI-vfigimage=Rhombicosahedron vertfig.png|rI-vfig=4.6.⁴/₃.⁶/₅| |rI-Wythoff=2 3 (⁵/₄ ⁵/₂) | | |rI-W=96|rI-U=56|rI-K=61|rI-C=72| |rI-V=60|rI-E=120|rI-F=50|rI-Fdetail=30{4}+20{6}| |rI-chi=-10|rI-group=I_h| |rI-B=Ri|rI-dual=Rhombicosacron |rI-dimage=DU56 rhombicosacron.png

|Gosid-name=Grand icosidodécaèdre adouci| |Gosid-image=Great snub icosidodecahedron.png| |Gosid-vfigimage=Great snub icosidodecahedron vertfig.png| |Gosid-solid=S+| |Gosid-Wythoff=|2 ⁵/₂ 3| |Gosid-vfig=3⁴.⁵/₂| |Gosid-B=Gosid|Gosid-group=I |Gosid-W=116|Gosid-U=57|Gosid-K=62|Gosid-C=88| |Gosid-V=60|Gosid-E=150|Gosid-F=92|Gosid-chi=2|Gosid-Fdetail=(20+60){3}+12{⁵/₂}| |Gosid-dual=Grand hexacontaèdre pentagonal |Gosid-dimage=DU57 great pentagonal hexecontahedron.png

|lstD-name=Petit dodécaèdre étoilé tronqué| |lstD-image=Small stellated truncated dodecahedron.png| |lstD-vfigimage=Small stellated truncated dodecahedron vertfig.png|lstD-vfig=5.¹⁰/₃.¹⁰/₃| |lstD-altname1=Quasitruncated small stellated dodecahedron| |lstD-altname2=Small stellatruncated dodecahedron| |lstD-Wythoff=2 5 | ⁵/₃| |lstD-W=97|lstD-U=58|lstD-K=63|lstD-C=74| |lstD-V=60|lstD-E=90|lstD-F=24|lstD-Fdetail=12{5}+12{¹⁰/₃}| |lstD-chi=-6|lstD-group=I_h| |lstD-B=Quitsissid|lstD-dual=Grand pentakidodécaèdre |lstD-dimage=DU58 great pentakisdodecahedron.png

|tDD-name=Dodécadodécaèdre tronqué| |tDD-image=Truncated dodecadodecahedron.png| |tDD-vfigimage=Truncated dodecadodecahedron vertfig.png|tDD-vfig=4.10.¹⁰/₃| |tDD-altname1=Quasitruncated dodecahedron| |tDD-Wythoff=2 5⁵/₃ | | |tDD-W=98|tDD-U=59|tDD-K=64|tDD-C=75| |tDD-V=120|tDD-E=180|tDD-F=54|tDD-Fdetail=30{4}+12{10}+12{¹⁰/₃}| |tDD-chi=-6|tDD-group=I_h| |tDD-B=Quitdid|tDD-dual=Disdyakitriacontaèdre médial |tDD-dimage=DU59 medial disdyakistriacontahedron.png

|Isdid-name=Dodécadodécaèdre inversé adouci| |Isdid-image=Inverted snub dodecadodecahedron.png| |Isdid-vfigimage=Inverted snub dodecadodecahedron vertfig.png|Isdid-vfig=3.3.5.3.⁵/₃| |Isdid-Wythoff=|⁵/₃ 2 5| |Isdid-B=Isdid|Isdid-group=I |Isdid-W=114|Isdid-U=60|Isdid-K=65|Isdid-C=76| |Isdid-V=60|Isdid-E=150|Isdid-F=84|Isdid-chi=-6|Isdid-Fdetail=60{3}+12{5}+12{⁵/₂}| |Isdid-dual=Hexacontaèdre pentagonal médial inversé |Isdid-dimage=DU60 medial inverted pentagonal hexecontahedron.png

|gDID-name=Grand dodécicosidodécaèdre| |gDID-image=Great dodecicosidodecahedron.png| |gDID-vfigimage=Great dodecicosidodecahedron vertfig.png|gDID-vfig=3.¹⁰/₃.⁶/₅.¹⁰/₇| |gDID-Wythoff=⁵/₂ 3 | ⁵/₃| |gDID-W=99|gDID-U=61|gDID-K=66|gDID-C=77| |gDID-V=60|gDID-E=120|gDID-F=44| |gDID-Fdetail=20{3}+12{⁵/₂}+12{¹⁰/₃}| |gDID-chi=-16|gDID-group=I_h| |gDID-B=Gaddid|gDID-dual=Grand hexacontaèdre dodécacronique |gDID-dimage=DU61 great dodecacronic hexecontahedron.png

|lDhI-name=Petit dodécahémicosaèdre| |lDhI-image=Small dodecahemicosahedron.png| |lDhI-vfigimage=Small dodecahemicosahedron vertfig.png|lDhI-vfig=6.⁵/₂.6.⁵/₃| |lDhI-Wythoff=⁵/₃⁵/₂ | 3| |lDhI-W=100|lDhI-U=62|lDhI-K=67|lDhI-C=78| |lDhI-V=30|lDhI-E=60|lDhI-F=22|lDhI-Fdetail=12{⁵/₂}+10{6}| |lDhI-chi=-8|lDhI-group=I_h| |lDhI-B=Sidhei|lDhI-dual=Petit dodécahémicosacron |lDhI-dimage=Wideblank.png

|gDI-name=Grand dodécicosaèdre| |gDI-image=Great dodecicosahedron.png| |gDI-vfigimage=Great dodecicosahedron vertfig.png|gDI-vfig=6.¹⁰/₃.⁶/₅.¹⁰/₇| |gDI-Wythoff=3 ⁵/₃ (³/₂ ⁵/₂) | | |gDI-W=101|gDI-U=63|gDI-K=68|gDI-C=79| |gDI-V=60|gDI-E=120|gDI-F=32|gDI-Fdetail=20{6}+12{¹⁰/₃}| |gDI-chi=-28|gDI-group=I_h| |gDI-B=Giddy|gDI-dual=Grand dodécicosacron |gDI-dimage=DU63 great dodecicosacron.png

|Gisdid-name=Grand dodécicosidodécaèdre adouci| |Gisdid-image=Great snub dodecicosidodecahedron.png| |Gisdid-vfigimage=Great snub dodecicosidodecahedron vertfig.png|Gisdid-vfig=3.3.3.⁵/₂.3.⁵/₃| |Gisdid-Wythoff=| ⁵/₃ ⁵/₂ 3| |Gisdid-B=Gisdid|Gisdid-group=I| |Gisdid-W=115|Gisdid-U=64|Gisdid-K=69|Gisdid-C=80| |Gisdid-V=60|Gisdid-E=180|Gisdid-F=104|Gisdid-chi=-16| |Gisdid-Fdetail=(20+60){3}+(12+12){⁵/₂}| |Gisdid-dual=Grand hexacontaèdre hexagonal |Gisdid-dimage=DU64 great hexagonal hexecontahedron.png

|gDhI-name=Grand dodécahémicosaèdre| |gDhI-image=Great dodecahemicosahedron.png| |gDhI-vfigimage=Great dodecahemicosahedron vertfig.png|gDhI-vfig=5.6.⁵/₄.6| |gDhI-Wythoff=⁵/₄5 | 3| |gDhI-W=102|gDhI-U=65|gDhI-K=70|gDhI-C=81| |gDhI-V=30|gDhI-E=60|gDhI-F=22|gDhI-Fdetail=12{5}+10{6}| |gDhI-chi=-8|gDhI-group=I_h| |gDhI-B=Gidhei|gDhI-dual=Grand dodécahémicosacron |gDhI-dimage=Wideblank.png

|gstD-name=Grand dodécaèdre étoilé tronqué| |gstD-image=Great stellated truncated dodecahedron.png| |gstD-vfigimage=Great stellated truncated dodecahedron vertfig.png|gstD-vfig=3.¹⁰/₃.¹⁰/₃| |gstD-altname1=Quasitruncated great stellated dodecahedron| |gstD-altname2=Great stellatruncated dodecahedron| |gstD-Wythoff=2 3 | ⁵/₃| |gstD-W=104|gstD-U=66|gstD-K=71|gstD-C=83| |gstD-V=60|gstD-E=90|gstD-F=32|gstD-Fdetail=20{3}+12{¹⁰/₃}| |gstD-chi=2|gstD-group=I_h| |gstD-B=Quitgissid|gstD-dual=Grand triaki-icosaèdre |gstD-dimage=DU66 great triakisicosahedron.png

|ugrID-name=Grand rhombicosidodécaèdre uniforme| |ugrID-image=Uniform great rhombicosidodecahedron.png| |ugrID-vfigimage=Uniform great rhombicosidodecahedron vertfig.png|ugrID-vfig=3.4.⁵/₃.4| |ugrID-altname1=Quasirhombicosidodecahedron| |ugrID-Wythoff=⁵/₃3 | 2| |ugrID-W=105|ugrID-U=67|ugrID-K=72|ugrID-C=84| |ugrID-V=60|ugrID-E=120|ugrID-F=62|ugrID-Fdetail=20{3}+30{4}+12{⁵/₂}| |ugrID-chi=2|ugrID-group=I_h| |ugrID-B=Qrid|ugrID-dual=Grand hexacontaèdre deltoïdal |ugrID-dimage=DU67 great strombic hexecontahedron.png

|gtID-name=Grand icosidodécaèdre tronqué| |gtID-image=Great truncated icosidodecahedron.png| |gtID-vfigimage=Great truncated icosidodecahedron vertfig.png|gtID-vfig=4.6.¹⁰/₃| |gtID-altname1=Great quasitruncated icosidodecahedron| |gtID-Wythoff=2 3⁵/₃ | | |gtID-W=108|gtID-U=68|gtID-K=73|gtID-C=87| |gtID-V=120|gtID-E=180|gtID-F=62|gtID-Fdetail=30{4}+20{6}+12{¹⁰/₃}| |gtID-chi=2|gtID-group=I_h| |gtID-B=Gaquatid|gtID-dual=Grand disdyakitriacontaèdre |gtID-dimage=DU68 great disdyakistriacontahedron.png

|Gisid-name=Grand icosidodécaèdre inversé adouci| |Gisid-image=Great inverted snub icosidodecahedron.png| |Gisid-vfigimage=Great inverted snub icosidodecahedron vertfig.png| |Gisid-Wythoff=|⁵/₃ 2 3| |Gisid-vfig=3⁴.⁵/₃| |Gisid-B=Gisid|Gisid-group=I| |Gisid-W=113|Gisid-U=69|Gisid-K=74|Gisid-C=73| |Gisid-V=60|Gisid-E=150|Gisid-F=92|Gisid-chi=2|Gisid-Fdetail=(20+60){3}+12{⁵/₂}| |Gisid-dual=Grand hexacontaèdre pentagonal inversé |Gisid-dimage=DU69 great inverted pentagonal hexecontahedron.png

|gDhD-name=Grand dodécahémidodécaèdre| |gDhD-image=Great dodecahemidodecahedron.png| |gDhD-vfigimage=Great dodecahemidodecahedron vertfig.png|gDhD-vfig=⁵/₂.¹⁰/₃.⁵/₃.¹⁰/₃| |gDhD-Wythoff=⁵/₃⁵/₂ | ⁵/₃| |gDhD-W=107|gDhD-U=70|gDhD-K=75|gDhD-C=86| |gDhD-V=30|gDhD-E=60|gDhD-F=18|gDhD-Fdetail=12{⁵/₂}+6{¹⁰/₃}| |gDhD-chi=-12|gDhD-group=I_h| |gDhD-B=Gidhid|gDhD-dual=Grand dodécahémidodécracon |gDhD-dimage=Wideblank.png

|gIhD-name=Grand icosihémidodécaèdre| |gIhD-image=Great icosihemidodecahedron.png| |gIhD-vfigimage=Great icosihemidodecahedron vertfig.png|gIhD-vfig=3.¹⁰/₃.3.¹⁰/₃| |gIhD-Wythoff=3 3 | ⁵/₃| |gIhD-W=106|gIhD-U=71|gIhD-K=76|gIhD-C=85| |gIhD-V=30|gIhD-E=60|gIhD-F=26|gIhD-Fdetail=20{3}+6{¹⁰/₃}| |gIhD-chi=-4|gIhD-group=I_h| |gIhD-B=Geihid|gIhD-dual=Grand icosihémidodécacron |gIhD-dimage=Wideblank.png

|Sirsid-name=Petit icosicosidodécaèdre rétroadouci| |Sirsid-image=Small retrosnub icosicosidodecahedron.png| |Sirsid-vfigimage=Small retrosnub icosicosidodecahedron vertfig.png| |Sirsid-Wythoff=|³/₂ ³/₂ ⁵/₂| |Sirsid-vfig=(3⁵.⁵/₃)/2| |Sirsid-B=Sirsid|Sirsid-group=I_h| |Sirsid-W=118|Sirsid-U=72|Sirsid-K=77|Sirsid-C=91| |Sirsid-V=60|Sirsid-E=180|Sirsid-F=112|Sirsid-chi=-8|Sirsid-Fdetail=(40+60){3}+12{⁵/₂}| |Sirsid-altname1=Small inverted retrosnub icosicosidodecahedron| |Sirsid-dual=Petit hexacontaèdre hexagrammique |Sirsid-dimage=DU72 small hexagrammic hexecontahedron.png

|grD-name=Grand rhombidodécaèdre| |grD-image=Great rhombidodecahedron.png| |grD-vfigimage=Great rhombidodecahedron vertfig.png|grD-vfig=4.¹⁰/₃.⁴/₃.¹⁰/₇| |grD-Wythoff=2 ⁵/₃ (³/₂ ⁵/₄) | | |grD-W=109|grD-U=73|grD-K=78|grD-C=89| |grD-V=60|grD-E=120|grD-F=42|grD-Fdetail=30{4}+12{¹⁰/₃}| |grD-chi=-18|grD-group=I_h| |grD-B=Gird|grD-dual=Grand rhombidodécacron |grD-dimage=DU73 great rhombidodecacron.png

|Girsid-name=Grand icosidodécaèdre rétroadouci| |Girsid-image=Great retrosnub icosidodecahedron.png| |Girsid-vfigimage=Great retrosnub icosidodecahedron vertfig.png| |Girsid-Wythoff=|³/₂ ⁵/₃ 2| |Girsid-vfig=(3⁴.⁵/₂)/2| |Girsid-B=Girsid|Girsid-group=I |Girsid-W=117|Girsid-U=74|Girsid-K=79|Girsid-C=90| |Girsid-V=60|Girsid-E=150|Girsid-F=92|Girsid-chi=2|Girsid-Fdetail=(20+60){3}+12{⁵/₂}| |Girsid-altname1=Great inverted retrosnub icosidodecahedron| |Girsid-dual=Grand hexacontaèdre pentagrammique Girsid-dimage=DU74 great pentagrammic hexecontahedron.png

|Gidrid-name=Grand dirhombicosidodécaèdre| |Gidrid-image=Great dirhombicosidodecahedron.png| |Gidrid-vfigimage=Great dirhombicosidodecahedron vertfig.png| |Gidrid-Wythoff=|³/₂ ⁵/₃ 3 ⁵/₂| |Gidrid-vfig=(4.⁵/₃.4.3.4.
⁵/₂.4.³/₂)/2| |Gidrid-B=Gidrid|Gidrid-group=I_h |Gidrid-W=119|Gidrid-U=75|Gidrid-K=80|Gidrid-C=92| |Gidrid-V=60|Gidrid-E=240|Gidrid-F=124|Gidrid-chi=-56|Gidrid-Fdetail=40{3}+60{4}+24{⁵/₂}| |Gidrid-dual=Grand dirhombicosadodécacron |Gidrid-dimage=Wideblank.png

|Skilling-name=Grand dirhombidodécaèdre disadouci| |Skilling-image=Great disnub dirhombidodecahedron.png| |Skilling-vfigimage=Great disnub dirhombidodecahedron vertfig.png| |Skilling-Wythoff=| (³/₂) ⁵/₃ (3) ⁵/₂| |Skilling-vfig=(⁵/₂.4.3.3.3.4. ⁵/₃.4.³/₂.³/₂.³/₂.4)/₂| |Skilling-B=-|Skilling-group=I_h |Skilling-W=-|Skilling-U=-|Skilling-K=-|Skilling-C=-| |Skilling-V=60|Skilling-E=240|Skilling-F=204|Skilling-chi=32|Skilling-Fdetail=120{3}+60{4}+24{⁵/₂}| |Skilling-dual=Grand dirhombidodécacron disadouci|Skilling-dimage=Wideblank.png

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