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Polytopes of Type {6,8}

This page is part of the Atlas of Small Regular Polytopes
(See Other Polytopes of Rank 3)

There are 66 polytopes of this type in this atlas. They are :
  1. {6,8}*96 (SmallGroup(96,117))
  2. {6,8}*192a (SmallGroup(192,956))
  3. {6,8}*192b (SmallGroup(192,1481))
  4. {6,8}*192c (SmallGroup(192,1485))
  5. {6,8}*288 (SmallGroup(288,873))
  6. {6,8}*336a (SmallGroup(336,208))
  7. {6,8}*336b (SmallGroup(336,208))
  8. {6,8}*384a (SmallGroup(384,5573))
  9. {6,8}*384b (SmallGroup(384,5602))
  10. {6,8}*384c (SmallGroup(384,5602))
  11. {6,8}*384d (SmallGroup(384,17949))
  12. {6,8}*384e (SmallGroup(384,17949))
  13. {6,8}*384f (SmallGroup(384,17958))
  14. {6,8}*384g (SmallGroup(384,18032))
  15. {6,8}*480a (SmallGroup(480,948))
  16. {6,8}*480b (SmallGroup(480,948))
  17. {6,8}*672a (SmallGroup(672,1254))
  18. {6,8}*672b (SmallGroup(672,1254))
  19. {6,8}*672c (SmallGroup(672,1254))
  20. {6,8}*672d (SmallGroup(672,1254))
  21. {6,8}*672e (SmallGroup(672,1254))
  22. {6,8}*672f (SmallGroup(672,1254))
  23. {6,8}*672g (SmallGroup(672,1254))
  24. {6,8}*672h (SmallGroup(672,1254))
  25. {6,8}*672i (SmallGroup(672,1254))
  26. {6,8}*672j (SmallGroup(672,1254))
  27. {6,8}*768a (SmallGroup(768,1086051))
  28. {6,8}*768b (SmallGroup(768,1086052))
  29. {6,8}*768c (SmallGroup(768,1086052))
  30. {6,8}*768d (SmallGroup(768,1086301))
  31. {6,8}*768e (SmallGroup(768,1086320))
  32. {6,8}*768f (SmallGroup(768,1086324))
  33. {6,8}*768g (SmallGroup(768,1086329))
  34. {6,8}*768h (SmallGroup(768,1086333))
  35. {6,8}*768i (SmallGroup(768,1086333))
  36. {6,8}*768j (SmallGroup(768,1086649))
  37. {6,8}*768k (SmallGroup(768,1087795))
  38. {6,8}*768l (SmallGroup(768,1088009))
  39. {6,8}*768m (SmallGroup(768,1088539))
  40. {6,8}*768n (SmallGroup(768,1088551))
  41. {6,8}*864a (SmallGroup(864,2265))
  42. {6,8}*864b (SmallGroup(864,4094))
  43. {6,8}*960a (SmallGroup(960,10869))
  44. {6,8}*960b (SmallGroup(960,10877))
  45. {6,8}*1152a (SmallGroup(1152,157849))
  46. {6,8}*1152b (SmallGroup(1152,157849))
  47. {6,8}*1152c (SmallGroup(1152,157849))
  48. {6,8}*1296 (SmallGroup(1296,3509))
  49. {6,8}*1344a (SmallGroup(1344,11291))
  50. {6,8}*1344b (SmallGroup(1344,11291))
  51. {6,8}*1344c (SmallGroup(1344,11295))
  52. {6,8}*1344d (SmallGroup(1344,11295))
  53. {6,8}*1344e (SmallGroup(1344,11295))
  54. {6,8}*1344f (SmallGroup(1344,11295))
  55. {6,8}*1344g (SmallGroup(1344,11684))
  56. {6,8}*1344h (SmallGroup(1344,11684))
  57. {6,8}*1344i (SmallGroup(1344,11684))
  58. {6,8}*1344j (SmallGroup(1344,11684))
  59. {6,8}*1440a (SmallGroup(1440,4612))
  60. {6,8}*1440b (SmallGroup(1440,4612))
  61. {6,8}*1440c (SmallGroup(1440,5841))
  62. {6,8}*1440d (SmallGroup(1440,5843))
  63. {6,8}*1440e (SmallGroup(1440,5843))
  64. {6,8}*1920a (SmallGroup(1920,240560))
  65. {6,8}*1920b (SmallGroup(1920,240844))
  66. {6,8}*1920c (SmallGroup(1920,240996))