530 



Ab- 

 leitungs- 

 form 



Sym- 

 metrie- 

 art 



Sym- 

 metrie- 

 grösse 



Nr. 



Typus 

 I. Ordnung 



Charakteristische Zahlen 



Explicite 

 Symmetrie 



Verbandsymmetrie 



Symbol 

 des Systems 



III. Rhombische Syngonie. 



lab 

 lab 

 lab 

 lab 

 abb 

 abb 

 abb 

 abc 

 abc 

 abc 



"ll 

 a 



"öl 

 a 



" 7 7 



—,bb 

 a 



ab b 



abb 



ab b 



a 



^,bb 

 a 



b_b_ 

 ^b'b' 



b b 

 "b'b- 

 lab 

 lab 

 lab 

 lab 

 alb 

 alb 

 alb 

 alb 

 alb 

 alb 

 abb 

 abb 

 abb 

 aab 

 aab 

 aab 

 aab 

 aab 

 aab 

 abc 

 abc 

 abc 

 abc 

 b 



b 



6 



4 



1 



6 



4 



2 



6 



4 



3 



6 



4 



4 



6 



4 



5 



6 



4 



6 



. 6 



4 



7 



6 



4 



8 



6 



4 



9 



6 



4. 



10 



6 



4 



11 



6 



4 



12 



6 



4 



13 



6 



4 



14 



6 



4 



16 



6 



4 



16 



6 



4 



17 



6 



4 



18 



6 



4 



19 



6 



4 



20 



7 



4 



1 



7 



4 



2 



7 



4 



3 



7 



4 



4 



7 



4 



B 



7 



4 



6 



7 



4 



7 



7 



4 



8 



7 



4 



9 



7 



4 



10 



7 



4 



11 



7 



4 



12 



7 



4 



13 



7 



4 



14 



7 



4 



15 



7 



4 



16 



7 



4 



17 



7 



4 



18 



7 



4 



19 



7 



4 



20 



7 



4 



21 



7 



4 



22 



7 



4 



23 



7 



4 



24 



7 



4 



25 



4 III 



5 III 



2 will 



a = h 



& = 2' 



(2) (1 IILiK 



a = b 



fe = 6' 



(3) (1 III4K 



a = 2' 



b = & 



4 (1 III4K 



(1 = 6' 



b = 2' 



(2) (1 1114)'^' 



a = 5 



b = 2' 



(4) (1 III4) 



a = 2' 



.6 = 5 



5 (1 III4) 



a = 2' 



b = Q' 



(4)(1III4)' 



a = 6 



b = Q' c = 2' 



6 (1 III4) 



a = b 



ö = 2' c = 6' 



6 (1 III4)' 



a = 2' 



ö = 5 c = 6' 



(5) (1 III4) 



a _2' 

 a'~ 6' 





(3) (1 IIl4f2'6' 



a 2' 

 a'~Q' 



= 5 



BdlllJk' 



a _2' 



& = 5 



7 (1 IIl4),,6. 



a = 5 



& = 4' 



(14)(1III5) 



a = 4' 



6 = 5 



(3) (1 III,) 



a = 4' 



& = 8' 



(2) (1 III5) 



a 4' 



^~8^ 





(4) (1 Ill^.g, 



a _4' 

 a' ~ 8' 



&=5 



(5) (1 III,)4,8, 



b 4' 

 b' 5 





(2) (1 III,)4,5 



b 4' 

 &'~5 



a = 8' 



(4) (1 IUJi-s 



a = 6 



ö = 2 



2q5 5(lIIIiK 



a = 6 



b = b 



2 9'5(1III4K 



a^b 



b = 6 



2 95 2 (1 llh¥ 



a = 2 



b = 6 



2<p(lIIU« 



= 5 



b = 2 



1(9.3)(1III4K 



a = 5 



b = 6 



l(<p2)(lIIl4K 



a = 2 



b = b 



2 ?; 1(1 1114)^ 



a = 2 



b = 6 



1 ((?> 1) {1 III4K 



a = 6 



b = b 



2 <p 3(11114)« 



a = 6 



b = 2 



1(<P3)(1III4)« 



a = 5 



b = 2 



1(?'5){1III4) 



a = 2 



b = b 



2 9p'l(lIIl4) 



a = 2 



b = 6 



1(9P5)(1III4) 



a = b 



b = 2 



3<p3(lIIl4) 



a = 5 



b = e 



3 99 2 (1 III4) 



a = 2 



b = b 



3 ?> 1(11114) 



a = 2 



b = Q 



3 <? (1 III4) 



a = 6 



b = b 



3 <p 1(11114) 



a = 6 



& = 2 



3 9^ 3 (1 III4)' 



a = 5 



b=2 c=6 



3<p'(lIIl4) 



a = 5 



= 6 c = 2 



39^'2(1III4) 



a = 2 



b=b c=6 



39'] (1 iiy 



a = 2 

 & 5 

 fc' 2 



6 = 6 c = 5 



3 9^' 2(11114) 





2<p2(lIIl4)|5 



b _5 



c = 6 



a?'' (11114)25 



