UNTEESUCHTTNeEN UND TAFELN ZUR THEORIE DER KLEINEN PLANETEN VOM HEKÜBATYPÜS. 67 
rj sin V = — 
0.1694 
(1 + 9)-' 9.9415 
lg(") = 
9.9745 
-dBIdv = - 
26 
öB/df 7.5911 
0.4340 
^.ddBßf = + 
1 
-(i^il+Q^dBIdf 8.6823„ 
lgZ = 
0.4085 
rx = - 
0.1719 
Numerus = —0.0481 
ig(") = 
9.2353„ 
r-' Y = + 0.6186 
L-A = 
1768?26 
IgZ = 
9.5903,, 
lg{r-'Y) = 9.7914 
= 
10375 
lg r = 0.3049 
ü-'3I = 
1872*01 
lg? = 
3.2432 
3.2723 
(Özahl 
1.4851 
ra-*cosv = +0.5131 
IgM = 
3.4246 
1.1497 
2Tj = +0.4298 
2i2+m-'cosv = +0.9429 
lg(^^)zah. = 
1.6665. 
Jetzt sind die durch Formel 136) und 137) gegebenen Hilfsgrössen zu rechnen; 
MX = -18.063 
Y = + 1.603 
Y-3IX 1.2937 
aus IX: n 7.4969 
r 0.4135 
M 1.6665 
^sinG^ 3.3833 
^cosG^ 4.1696 
cos G 9.9943 
tgG 9.2137 
G — 9?390 
Igg = 4.1753 
(TJ+Q) 
0.1700 
X{U+Q) 
9.7603„ 
li^dBjdf 
7.6107 
— r f sin jP 
9.7572„ 
fsini^ 
9.3437 
f cosF 
0.1700 
cos F 
9.9952 
tgF 
9.1737 
F = 
8?485 
Igf = 
0.1748 
XU 
XU 
djE+V) 
dt] 
- U 
e{E+ V) 
dri 
Z 
rh' smH' 
diE+7 ) 
jjdn 
rjdn 
I sin V 
rh' siaK' 
h' sin H' 
h' cos H' 
cos H' 
tgH' 
h' sin K' 
l' cos K' 
cos K' 
9.7426„ 
K' = 
212*035 
0.0559 
lg/.' = 
0.2327 
0.1523,, 
Ji. -r lAi — 
O 1 • «JDt: 
T)> 1 ,1 
Jy -]r u — 
A' + u + H' = 
243.174 
0.2862 
A' + u + K' = 
299.999 
B' + u + H' = 
3.064 
0.0086 
B' + u + K' = 
59.889 
9.7512„ 
sin {A' + Ii) 
9.9997 
0.2516„ 
sin {B' + u) 
9.6695„ 
0.3708„ 
sin D' 
9.8898 
9.8727 
0.2082, 
9.9580„ 
— ä' sin i 
sinE' 
e' sin t 
7.3979« 
9.5598 
8.7873 
9.6645„ 
155?210 
0.2502 
a' sin {A' + u) 
— sin i sin D' 
Dj/sin t 
9.9996 
7.2877„ 
9.9988 
9.9573« 
6' sin (5' + ?0 
8.411 9„ 
0.1609„ 
e' sin L sin i"" 
8.3471 
9.9282„ 
i?i/sin i 
7.5536,, 
tgZ' 
9.7964 
IgD 
8.7854 
Ig^:, = 6.3403« 
Für 137) erhält man dann; 
