211 
113 
113 
111  :  |Pdö  102 
ooP     110  :  AP 
2Pob  021  :  £P 
P 
2Pdb  021 
2Pob  021 
Poo  TOI 
ocP3  ISO 
Pöü  103 
4P 
4P 
T12 
112 
TT2 
|Pöö  203, 
J-P  112, 
113, 
Iii, 
fPoö  203  : 
ocP  110, 
iPöö  T03. 
*  , 
4P4 
P  111  :  oüP3  130, 
Aus  dem  F.  OßERMÄYER'schen  Axenverhältniss  erhält  man 
durch  Kückrechnung  folgende  Angulardimensionen  für  die  ein- 
zelnen Gestalten. 
Für  T  =  ooP  (110): 
X  ----  59°  17'  45" 
Y  =  30°  42'  15" 
Z  =  68°  12'  30" 
6  =  56°  38'  22" 
z  =  ooP3  (130): 
X  =  29°  18'  19" 
Y  =  60°  41'  41" 
Z  =  77°  47'  59" 
6  =  26°  51'  8" 
x  =  Pöb  (TOI): 
Y  =  65°  47'  43" 
Z  —  49°  47'  2" 
y  =  2Pöö  (201): 
Y  =  35°  58'  28" 
Z  =  79°  36'  17" 
co  =  f  Pöü  (302): 
Y  =  47ü35'  8" 
Z  =  67°  59'  37" 
X  —  f  Pöö  (605) : 
Y  =  57°  34'  44" 
Z  =  58°   0'  1" 
q  =  |Pöc  (203): 
Y  =  820  i<  27" 
Z  =  33°  33'  18" 
cp  =  4Pöü  (102) : 
Y  =  90°  50'  8" 
Z  —  24°  44'  37" 
5  =  £Pöö  (103) : 
Y  =  99°  36'  27" 
Z  =  15°  58'  18" 
o  =  P(T11): 
X  =  63°  18'  31" 
Y  =  68°  30'  43" 
Z  =  54°  46'  10" 
;/  =  65°  47'  43" 
v  =  49°  47'  2" 
er  =  56°  38'  22" 
p  =  61°  8'  9" 
e  =  \V  (775): 
X  =  59°ll'  3" 
Y  =  56°  58'  58" 
Z  =  68°  41'  5" 
H  =  50°  37'  11" 
v  =  64°  57'  34" 
6  =  56°  38'  22" 
p  =  52°  20'  34" 
a  =  AP  (112): 
X  =  74°  35'  35" 
Y  =  90°  48'  20" 
Z  =  28°  53'  22" 
=  90°  50'  8" 
v  =  24°  44'  37" 
6  =  56°  38'  22" 
p  =  74u  35'  29" 
p  =  |P  (113): 
X  =  79°  43'  53" 
Y  =  99°  27'  8" 
Z  =  18°  54'  56" 
fi  =  99°  36'  27" 
v  =  15°  58'  18" 
6  =  56°  38'  22" 
p  =  79°  35'  20" 
14 
