Berechnung von Archibald Smith’s Näherungswerthen.
A 1.125 A 1.125 A 1.125 | A 1.1%5
DC 7.50 VII 9.922 3 6.491 VIE — 0.748
E 4.0 D 6,25 — — 40 D — 6.25
d% 12.665 da 17.297 d’g 8.616 d%12 — 5.867
2C — 15.08 WN —1984 —9B — 12.982 VIII 1.484
die - 2405 9 — 9547 os — 9.366 ao 4 983
125 1225
4,895 d 1.6638
— 6.086 “X — 4.248
— 0.066 d’13 — 5.781
‚9.970 2VI 5.326
0.856 d’,9 — 0.45
125 A 1.135
Z.a12 IV — 4.482
— 71.207 XVII — 1591
- 2.010 d’14 — 4.948
6,824 21V 8.964
"9034 9’ 4.016
125
LE — 6.129
XVI 1.306
5 — 3.698
— 21 12.258
d’'31 8,560
Nach VI:
Berechnung
12.665
1.204
0.375
4.334
45.080
2,588
2 qua
9%
+
I
%
2C
2G
Je I
dt 1872
XXV 1,071
XXXV 0.265
di 17,208
21 — 17,322
—QXXV — 2.142
d17 — 9 956
0% 1.828
XXXI 0.487
dr 1.810
2VIMl — 18.%00
2XXXI — 0.974
Jı8 — 1.564
d’'3 205
XXXIV — 0.21
—-XXXV — 0.265
d3 17.779
22V — 19.750
OXNXXIV 0.52%
13 a
Berechnung der
Hülfsgrössen,
F sin 561/4° — 0.007
G cos 561/4° 00.719
XXIX 0.712
XXX ___ — 0.726
F sin 672° — 0.008
3 cos 671/2° 0.495
XXXI 0.487
KXXII — 0.508
F sin 78%/4° — 0.009
5 cos 783/4° 0.252
XXX 0.243
KXXIV — 0.21
H cos 45° N
SE 0.265
F sin 11!/4° — 0.002
G cos 11!/4° 1.29
XXI 1.267
XXI — 1.071
F sin 221/2° — 0.008
G cos 221/2° 1.195
XXIII 1.192
XXIV — 1.198
F sin 333 4° — W.005
G cos 333/4° 1.076
XXV 1.orı
XXVI — 1.081
Fsin45%° -- 0.006
G cos 45° 0.915
XXVII 0.909
XXYIN —01
der wahrscheinlichsten Deviationswerthe,
ds 17.297 d’'12 — 5.867
XXVIIE -— 0.921 XXVII 0 909
I — 0.375 —H — 0.375
Js 16.000 Jr — 5.538
WII —1984 WIN 1.484
XXVIII 1.842 "XXVIE — 1'818
® 9.008 "667
3 14.954 3 781
XII — Lan XXIII 1.2438
XXV — 0.265 XXV - 4.865
Ö5 13.418 138 — 808
21X — 19.172 VI . ‚826
{XXI 2.542 “XXIII — 0,486
031 — 3.212 m — U 963
0% 11.598 14 — 4,948
ZXHI — 1.192 XXI — 0.508
GG 10.406 dıg 451
XI —17.764 IV 8.964
“XXIIE 2.384 XXI 1.006
Ra — 4.914 “ "519
‚ «656 en = 698
{XIX — 0.712 M"XVI — 1.081
XXXV 0.265 KXXV 0.265
07 7.209 fi — 4514
2XIII —15.764 211 12,258
DXXIX 1.424 IXXVI 2.162
Yo — 7.01 dar 9.906
