THEORIE DES MONDES. KAPITEL IV. 
57 
n 
logflU 
log flu 
logflU 
log SU 
logflU 
U 
Q QQKQQ 
y,oooyo„ 
y,ooy 
0 
y,ooy 
1 
9,88597„ 
9,80873 
9,527 
0,003, 
1 
9,551 
2 
9,88596„ 
9,80877 
9,514 
9,983„ 
3 
9,88594„ 
9,80881 
9,501 
9,963„ 
log<7„, = 9,22819 
4 
9,88593„ 
9,80886 
9,488 
9,942 n 
B 
9,88593„ 
9,80890 
9,474 
9,919„ 
6 
9,80895 
9,459 
9,896„ 
7 
1 
9,871. 
n 
logflU 
log#: 
> n 
logflU M 
log flu 
0 
9,88598 0 
9,80868 3 
0,13,. 4 
0,29 
1 
9,88600 n 
9,80864 5 
0,10„ 6 
0,24 
2 
9,88601 n 
9,80859 
3 
9,88604„ 
n 
log 
log K., 
n 
log?U 
0 
9,336 
9,615 
0 
9,336 
1 
9,337 
9,615 
1 
9,336 
2 
9,337 
9,615 
3 
9,337 
9,615 
4 
9,338 
9,616 
n 
log Ke 
5 
9,338 
9,616 
6 
9,338 
9,616 
4 
9,93„ 
7 
9,616 
6 
9,90, 
logfc„. 0 = 9,934 
_ h nn = 0,09„ 
_ h„. B = 9,99„ 
— h n . b = 9,65 
— h[. t == 0,09„ 
— = 9,99„ 
log = 9)33 
— h = 9,98, 
- 1. = 9,42. 
log& 0 = 9,63 
— \ = 0,39„ 
— fc, = 9,93 
— ä, = 0,16„ — Je, = 
Für negative n erinnern wir an die Formeln: 
f—n.O == fn.01 f-n\ 
9-n.O = flUl SU.1 = 
ä_. 0 = Ä n. 0 ; Km = 
Für p, q,t ergaben sich folgende Werte : 
1 ) 
= fl. 
u. s. w. 
1 } 
flU., 
= flU 
u. s. w. 
■ 1 ) 
= K, 
u. s. w. 
Abhandlungen d. K. Gm. d. Wies, zu Gßttingen. Math.-phys. Kl. N. tf. Band 8,i. 
8 
