Fddd

Number	70
Symmetry Class	orthorhombic
Chiral	N

s-nets

816 records listed.

Image	s-net name	Other names	Space group	Space group number	Symmetry class	Vertex degree(s)	Vertices per primitive unit cell	Transitivity (Vertex, Edge)
	sqc9505		Fddd	70	orthorhombic	{8,8,4}	12	(3,6)
	sqc9506		Fddd	70	orthorhombic	{4,8,4}	16	(3,6)
	sqc9511		Fddd	70	orthorhombic	{4,8,4}	16	(3,6)
	sqc9512		Fddd	70	orthorhombic	{4,8,4}	16	(3,6)
	sqc9527		Fddd	70	orthorhombic	{6,4}	16	(2,7)
	sqc9536		Fddd	70	orthorhombic	{6,4}	16	(2,7)
	sqc9537		Fddd	70	orthorhombic	{6,4}	16	(2,7)
	sqc9538		Fddd	70	orthorhombic	{6,4}	16	(2,7)
	sqc9545		Fddd	70	orthorhombic	{5,5}	16	(2,6)
	sqc9546		Fddd	70	orthorhombic	{5,5}	16	(2,6)
	sqc9549		Fddd	70	orthorhombic	{5,5}	16	(2,6)
	sqc9552		Fddd	70	orthorhombic	{5,5}	16	(2,6)
	sqc9553		Fddd	70	orthorhombic	{5,5}	16	(2,6)
	sqc9559		Fddd	70	orthorhombic	{4,3,6,4}	20	(4,6)
	sqc9561		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9565		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9566		Fddd	70	orthorhombic	{6,3,4,4}	20	(4,6)
	sqc9567		Fddd	70	orthorhombic	{3,3,4,4}	24	(4,6)
	sqc9569		Fddd	70	orthorhombic	{4,4,3,3}	24	(4,6)
	sqc9576		Fddd	70	orthorhombic	{4,6}	16	(2,6)
	sqc9577		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9578		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9583		Fddd	70	orthorhombic	{4,6}	16	(2,6)
	sqc9584		Fddd	70	orthorhombic	{4,6}	16	(2,6)
	sqc9587		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9588		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9590		Fddd	70	orthorhombic	{4,4,4}	20	(3,7)
	sqc9597		Fddd	70	orthorhombic	{4,3,6,4}	20	(4,6)
	sqc9598		Fddd	70	orthorhombic	{4,3,6,4}	20	(4,6)
	sqc9601		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9602		Fddd	70	orthorhombic	{6,3,4,4}	20	(4,6)
	sqc9603		Fddd	70	orthorhombic	{3,3,4,4}	24	(4,6)
	sqc9604		Fddd	70	orthorhombic	{4,4,3,3}	24	(4,6)
	sqc9605		Fddd	70	orthorhombic	{6,3,4,4}	20	(4,6)
	sqc9606		Fddd	70	orthorhombic	{3,3,4,4}	24	(4,6)
	sqc9607		Fddd	70	orthorhombic	{4,4,3,3}	24	(4,6)
	sqc9608		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9609		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9614		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9622		Fddd	70	orthorhombic	{4,4,4}	20	(3,7)
	sqc9623		Fddd	70	orthorhombic	{4,4,4}	20	(3,7)
	sqc9624		Fddd	70	orthorhombic	{4,3,3,4}	24	(4,6)
	sqc9626		Fddd	70	orthorhombic	{4,3,3,4}	24	(4,6)
	sqc9631		Fddd	70	orthorhombic	{4,3,3,4}	24	(4,6)
	sqc9632		Fddd	70	orthorhombic	{4,3,3,4}	24	(4,6)
	sqc9633		Fddd	70	orthorhombic	{4,3,3,4}	24	(4,6)
	sqc9636		Fddd	70	orthorhombic	{4,3,3,4}	24	(4,6)
	sqc9637		Fddd	70	orthorhombic	{3,7}	16	(2,6)
	sqc9638		Fddd	70	orthorhombic	{3,7}	16	(2,6)
	sqc9639		Fddd	70	orthorhombic	{4,6}	16	(2,6)
	sqc9644		Fddd	70	orthorhombic	{8,3,3}	20	(3,6)
	sqc9646		Fddd	70	orthorhombic	{8,4}	12	(2,6)
	sqc9647		Fddd	70	orthorhombic	{8,4}	12	(2,6)
	sqc9651		Fddd	70	orthorhombic	{6,7}	12	(2,6)
	sqc9652		Fddd	70	orthorhombic	{3,7}	16	(2,6)
	sqc9653		Fddd	70	orthorhombic	{6,7}	12	(2,6)
	sqc9654		Fddd	70	orthorhombic	{3,7}	16	(2,6)
	sqc9655		Fddd	70	orthorhombic	{3,7}	16	(2,6)
	sqc9656		Fddd	70	orthorhombic	{3,7}	16	(2,6)
	sqc9672		Fddd	70	orthorhombic	{6,4}	16	(2,7)
	sqc9675		Fddd	70	orthorhombic	{5,5}	16	(2,6)
	sqc9678		Fddd	70	orthorhombic	{5,5}	16	(2,6)
	sqc9683		Fddd	70	orthorhombic	{4,3,3,4}	24	(4,6)
	sqc9694		Fddd	70	orthorhombic	{8,3,3}	20	(3,6)
	sqc9704		Fddd	70	orthorhombic	{6,3,4,4}	20	(4,6)
	sqc9705		Fddd	70	orthorhombic	{6,3,4,4}	20	(4,6)
	sqc9711		Fddd	70	orthorhombic	{4,8,4}	16	(3,6)
	sqc9714		Fddd	70	orthorhombic	{4,8,4}	16	(3,6)
	sqc9778		Fddd	70	orthorhombic	{4,3,6,4}	20	(4,6)
	sqc9779		Fddd	70	orthorhombic	{4,3,6,4}	20	(4,6)
	sqc9780		Fddd	70	orthorhombic	{6,6,4,4}	16	(4,5)
	sqc9782		Fddd	70	orthorhombic	{6,6,4,4}	16	(4,5)
	sqc9813		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9821		Fddd	70	orthorhombic	{4,4,4,4}	20	(4,6)
	sqc9853		Fddd	70	orthorhombic	{3,3,4,4}	24	(4,6)
	sqc9854		Fddd	70	orthorhombic	{4,4,3,3}	24	(4,6)
	sqc9855		Fddd	70	orthorhombic	{4,4,3,3}	24	(4,6)
	sqc9856		Fddd	70	orthorhombic	{3,3,4,4}	24	(4,6)
	sqc9860		Fddd	70	orthorhombic	{4,4,4}	20	(3,7)
	sqc9864		Fddd	70	orthorhombic	{4,4,4}	20	(3,7)
	sqc9892		Fddd	70	orthorhombic	{4,4,4}	20	(3,5)
	sqc9899		Fddd	70	orthorhombic	{4,4,4}	20	(3,5)
	sqc9924		Fddd	70	orthorhombic	{4,3,3}	24	(3,6)
	sqc9925		Fddd	70	orthorhombic	{4,3,3}	24	(3,6)
	sqc10165		Fddd	70	orthorhombic	{10,3,3}	20	(3,6)
	sqc10167		Fddd	70	orthorhombic	{10,3,3}	20	(3,6)
	sqc10195		Fddd	70	orthorhombic	{10,3,3}	20	(3,6)
	sqc10200		Fddd	70	orthorhombic	{10,3,3}	20	(3,6)
	sqc10201		Fddd	70	orthorhombic	{10,3,3}	20	(3,6)
	sqc10247		Fddd	70	orthorhombic	{8,3}	16	(2,7)
	sqc10248		Fddd	70	orthorhombic	{8,3}	16	(2,7)
	sqc10250		Fddd	70	orthorhombic	{7,4}	16	(2,7)
	sqc10257		Fddd	70	orthorhombic	{3,8}	16	(2,7)
	sqc10258		Fddd	70	orthorhombic	{3,8}	16	(2,7)
	sqc10259		Fddd	70	orthorhombic	{8,3}	16	(2,7)
	sqc10261		Fddd	70	orthorhombic	{7,4}	16	(2,7)
	sqc10264		Fddd	70	orthorhombic	{3,8}	16	(2,7)
	sqc10265		Fddd	70	orthorhombic	{3,8}	16	(2,7)
	sqc10266		Fddd	70	orthorhombic	{8,3}	16	(2,7)
	sqc10267		Fddd	70	orthorhombic	{3,8}	16	(2,7)