Polytopes
Nondegenerate
- {4,6}*1344
- {4,8}*1344e
- {4,8}*1344f
- {4,14}*1344
- {6,4}*1344
- {6,6}*1344
- {6,8}*1344g
- {6,8}*1344h
- {6,8}*1344i
- {6,8}*1344j
- {6,14}*1344b
- {6,14}*1344c
- {8,4}*1344e
- {8,4}*1344f
- {8,6}*1344g
- {8,6}*1344h
- {8,6}*1344i
- {8,6}*1344j
- {8,8}*1344i
- {8,8}*1344j
- {8,14}*1344a
- {8,14}*1344b
- {14,4}*1344
- {14,6}*1344b
- {14,6}*1344c
- {14,8}*1344a
- {14,8}*1344b
- {14,14}*1344
Degenerate
- {2,2,3,7}*1344
- {2,2,3,8}*1344a
- {2,2,3,8}*1344b
- {2,2,4,6}*1344
- {2,2,4,7}*1344
- {2,2,4,8}*1344a
- {2,2,4,8}*1344b
- {2,2,6,4}*1344
- {2,2,6,6}*1344
- {2,2,6,7}*1344
- {2,2,6,8}*1344a
- {2,2,6,8}*1344b
- {2,2,7,3}*1344
- {2,2,7,4}*1344
- {2,2,7,6}*1344
- {2,2,7,7}*1344
- {2,2,7,8}*1344a
- {2,2,7,8}*1344b
- {2,2,8,3}*1344a
- {2,2,8,3}*1344b
- {2,2,8,4}*1344a
- {2,2,8,4}*1344b
- {2,2,8,6}*1344a
- {2,2,8,6}*1344b
- {2,2,8,7}*1344a
- {2,2,8,7}*1344b
- {2,2,8,8}*1344a
- {2,2,8,8}*1344b
- {2,3,7,2}*1344
- {2,3,8}*1344a
- {2,3,8}*1344b
- {2,3,8,2}*1344a
- {2,3,8,2}*1344b
- {2,3,14}*1344
- {2,4,6}*1344a
- {2,4,6}*1344b
- {2,4,6}*1344c
- {2,4,6,2}*1344
- {2,4,7}*1344
- {2,4,7,2}*1344
- {2,4,8}*1344a
- {2,4,8}*1344b
- {2,4,8}*1344c
- {2,4,8}*1344d
- {2,4,8}*1344e
- {2,4,8}*1344f
- {2,4,8,2}*1344a
- {2,4,8,2}*1344b
- {2,4,14}*1344a
- {2,4,14}*1344b
- {2,6,4}*1344a
- {2,6,4}*1344b
- {2,6,4}*1344c
- {2,6,4,2}*1344
- {2,6,6}*1344a
- {2,6,6}*1344b
- {2,6,6}*1344c
- {2,6,6,2}*1344
- {2,6,7}*1344a
- {2,6,7}*1344b
- {2,6,7,2}*1344
- {2,6,8}*1344a
- {2,6,8}*1344b
- {2,6,8}*1344c
- {2,6,8}*1344d
- {2,6,8}*1344e
- {2,6,8}*1344f
- {2,6,8}*1344g
- {2,6,8}*1344h
- {2,6,8}*1344i
- {2,6,8}*1344j
- {2,6,8,2}*1344a
- {2,6,8,2}*1344b
- {2,6,14}*1344a
- {2,6,14}*1344b
- {2,7,3,2}*1344
- {2,7,4}*1344
- {2,7,4,2}*1344
- {2,7,6}*1344a
- {2,7,6}*1344b
- {2,7,6,2}*1344
- {2,7,7,2}*1344
- {2,7,8}*1344a
- {2,7,8}*1344b
- {2,7,8,2}*1344a
- {2,7,8,2}*1344b
- {2,7,14}*1344
- {2,8,3}*1344a
- {2,8,3}*1344b
- {2,8,3,2}*1344a
- {2,8,3,2}*1344b
- {2,8,4}*1344a
- {2,8,4}*1344b
- {2,8,4}*1344c
- {2,8,4}*1344d
- {2,8,4}*1344e
- {2,8,4}*1344f
- {2,8,4,2}*1344a
- {2,8,4,2}*1344b
- {2,8,6}*1344a
- {2,8,6}*1344b
- {2,8,6}*1344c
- {2,8,6}*1344d
- {2,8,6}*1344e
- {2,8,6}*1344f
- {2,8,6}*1344g
- {2,8,6}*1344h
- {2,8,6}*1344i
- {2,8,6}*1344j
- {2,8,6,2}*1344a
- {2,8,6,2}*1344b
- {2,8,7}*1344a
- {2,8,7}*1344b
- {2,8,7,2}*1344a
- {2,8,7,2}*1344b
- {2,8,8}*1344a
- {2,8,8}*1344b
- {2,8,8}*1344c
- {2,8,8}*1344d
- {2,8,8}*1344e
- {2,8,8}*1344f
- {2,8,8,2}*1344a
- {2,8,8,2}*1344b
- {2,8,14}*1344a
- {2,8,14}*1344b
- {2,8,14}*1344c
- {2,8,14}*1344d
- {2,14,3}*1344
- {2,14,4}*1344a
- {2,14,4}*1344b
- {2,14,6}*1344a
- {2,14,6}*1344b
- {2,14,7}*1344
- {2,14,8}*1344a
- {2,14,8}*1344b
- {2,14,8}*1344c
- {2,14,8}*1344d
- {3,7,2,2}*1344
- {3,8,2}*1344a
- {3,8,2}*1344b
- {3,8,2,2}*1344a
- {3,8,2,2}*1344b
- {3,14,2}*1344
- {4,6,2}*1344a
- {4,6,2}*1344b
- {4,6,2}*1344c
- {4,6,2,2}*1344
- {4,7,2}*1344
- {4,7,2,2}*1344
- {4,8,2}*1344a
- {4,8,2}*1344b
- {4,8,2}*1344c
- {4,8,2}*1344d
- {4,8,2}*1344e
- {4,8,2}*1344f
- {4,8,2,2}*1344a
- {4,8,2,2}*1344b
- {4,14,2}*1344a
- {4,14,2}*1344b
- {6,4,2}*1344a
- {6,4,2}*1344b
- {6,4,2}*1344c
- {6,4,2,2}*1344
- {6,6,2}*1344a
- {6,6,2}*1344b
- {6,6,2}*1344c
- {6,6,2,2}*1344
- {6,7,2}*1344a
- {6,7,2}*1344b
- {6,7,2,2}*1344
- {6,8,2}*1344a
- {6,8,2}*1344b
- {6,8,2}*1344c
- {6,8,2}*1344d
- {6,8,2}*1344e
- {6,8,2}*1344f
- {6,8,2}*1344g
- {6,8,2}*1344h
- {6,8,2}*1344i
- {6,8,2}*1344j
- {6,8,2,2}*1344a
- {6,8,2,2}*1344b
- {6,14,2}*1344a
- {6,14,2}*1344b
- {7,3,2,2}*1344
- {7,4,2}*1344
- {7,4,2,2}*1344
- {7,6,2}*1344a
- {7,6,2}*1344b
- {7,6,2,2}*1344
- {7,7,2,2}*1344
- {7,8,2}*1344a
- {7,8,2}*1344b
- {7,8,2,2}*1344a
- {7,8,2,2}*1344b
- {7,14,2}*1344
- {8,3,2}*1344a
- {8,3,2}*1344b
- {8,3,2,2}*1344a
- {8,3,2,2}*1344b
- {8,4,2}*1344a
- {8,4,2}*1344b
- {8,4,2}*1344c
- {8,4,2}*1344d
- {8,4,2}*1344e
- {8,4,2}*1344f
- {8,4,2,2}*1344a
- {8,4,2,2}*1344b
- {8,6,2}*1344a
- {8,6,2}*1344b
- {8,6,2}*1344c
- {8,6,2}*1344d
- {8,6,2}*1344e
- {8,6,2}*1344f
- {8,6,2}*1344g
- {8,6,2}*1344h
- {8,6,2}*1344i
- {8,6,2}*1344j
- {8,6,2,2}*1344a
- {8,6,2,2}*1344b
- {8,7,2}*1344a
- {8,7,2}*1344b
- {8,7,2,2}*1344a
- {8,7,2,2}*1344b
- {8,8,2}*1344a
- {8,8,2}*1344b
- {8,8,2}*1344c
- {8,8,2}*1344d
- {8,8,2}*1344e
- {8,8,2}*1344f
- {8,8,2,2}*1344a
- {8,8,2,2}*1344b
- {8,14,2}*1344a
- {8,14,2}*1344b
- {8,14,2}*1344c
- {8,14,2}*1344d
- {14,3,2}*1344
- {14,4,2}*1344a
- {14,4,2}*1344b
- {14,6,2}*1344a
- {14,6,2}*1344b
- {14,7,2}*1344
- {14,8,2}*1344a
- {14,8,2}*1344b
- {14,8,2}*1344c
- {14,8,2}*1344d
Other Groups of Order 1344
- SmallGroup(1344,642) — 1 nondegenerate, 0 degenerate
- SmallGroup(1344,1483) — 2 nondegenerate, 2 degenerate
- SmallGroup(1344,1488) — 2 nondegenerate, 2 degenerate
- SmallGroup(1344,1805) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,2773) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,2776) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,2917) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,2918) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,5658) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,5667) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,5673) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,5698) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,5748) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,5829) — 0 nondegenerate, 2 degenerate
- SmallGroup(1344,5836) — 2 nondegenerate, 2 degenerate
- SmallGroup(1344,6320) — 4 nondegenerate, 0 degenerate
- SmallGroup(1344,6453) — 4 nondegenerate, 0 degenerate
- SmallGroup(1344,6454) — 4 nondegenerate, 0 degenerate
- SmallGroup(1344,6459) — 4 nondegenerate, 0 degenerate
- SmallGroup(1344,7252) — 0 nondegenerate, 2 degenerate
- SmallGroup(1344,7535) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,7549) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,7764) — 4 nondegenerate, 4 degenerate
- SmallGroup(1344,7765) — 4 nondegenerate, 4 degenerate
- SmallGroup(1344,8472) — 0 nondegenerate, 12 degenerate
- SmallGroup(1344,8483) — 0 nondegenerate, 12 degenerate
- SmallGroup(1344,8561) — 6 nondegenerate, 14 degenerate
- SmallGroup(1344,9160) — 0 nondegenerate, 4 degenerate
- SmallGroup(1344,10867) — 0 nondegenerate, 4 degenerate
- SmallGroup(1344,10931) — 0 nondegenerate, 2 degenerate
- SmallGroup(1344,10968) — 2 nondegenerate, 2 degenerate
- SmallGroup(1344,10970) — 1 nondegenerate, 0 degenerate
- SmallGroup(1344,11119) — 0 nondegenerate, 3 degenerate
- SmallGroup(1344,11133) — 0 nondegenerate, 12 degenerate
- SmallGroup(1344,11289) — 24 nondegenerate, 0 degenerate
- SmallGroup(1344,11291) — 32 nondegenerate, 0 degenerate
- SmallGroup(1344,11295) — 46 nondegenerate, 0 degenerate
- SmallGroup(1344,11327) — 6 nondegenerate, 8 degenerate
- SmallGroup(1344,11328) — 10 nondegenerate, 6 degenerate
- SmallGroup(1344,11334) — 2 nondegenerate, 4 degenerate
- SmallGroup(1344,11343) — 4 nondegenerate, 0 degenerate
- SmallGroup(1344,11355) — 8 nondegenerate, 8 degenerate
- SmallGroup(1344,11370) — 6 nondegenerate, 0 degenerate
- SmallGroup(1344,11397) — 2 nondegenerate, 8 degenerate
- SmallGroup(1344,11399) — 8 nondegenerate, 4 degenerate
- SmallGroup(1344,11408) — 2 nondegenerate, 4 degenerate
- SmallGroup(1344,11412) — 2 nondegenerate, 0 degenerate
- SmallGroup(1344,11516) — 0 nondegenerate, 24 degenerate
- SmallGroup(1344,11517) — 0 nondegenerate, 24 degenerate
- SmallGroup(1344,11527) — 0 nondegenerate, 84 degenerate
- SmallGroup(1344,11659) — 0 nondegenerate, 4 degenerate
- SmallGroup(1344,11661) — 0 nondegenerate, 24 degenerate
- SmallGroup(1344,11684) — 28 nondegenerate, 246 degenerate (this group)
- SmallGroup(1344,11695) — 6 nondegenerate, 156 degenerate
- SmallGroup(1344,11696) — 2 nondegenerate, 2 degenerate
- SmallGroup(1344,11701) — 0 nondegenerate, 30 degenerate
- SmallGroup(1344,11703) — 6 nondegenerate, 2 degenerate
- SmallGroup(1344,11709) — 0 nondegenerate, 90 degenerate
- SmallGroup(1344,11719) — 0 nondegenerate, 11 degenerate