56 
MARTIN BRENDEL, 
log e 0 
= 9,22819 
log e' 0 
= 9,934 
log eö 
= 9,63 
— e i 
Q QQXQQ 
== V.OÖOVo n 
— e 'i 
Ann 
— yjjVVn 
= u,oy„ 
— e i 
= 9,80877 
— e a 
— 9,337 
— 9,93 
= 9,501 
— e' 
= 9,99„ 
3 
= 0,16. 
4 
= 9,942,, 
— h 
= 9,616 
— e'I 
4 
= 9,33 
— e„ 
6 
= 0,1 0„ 
a 
= 9,65 
— ß'k 
5 
= 9,98„ 
— e. 
= 0,24 
= 9,90„ 
8 
- 9,42; 
log c\ 
= 0,210 
log c'[ 
= 8,790„ 
log < 
= 9,61„ 
— *s 
== 9,96182,, 
= 9,196 ■ 
— < 
= 9,31. 
— 4 
= 9,721,, 
— C"b 
= 0,24 
— c 's 
= 9,58.. 
- c 4 
= 0,207 
= 9,769. 
— C 6 
- 0,31 
— % 
= 9,77,, 
— c. 
= 0,53,, 
— c' n 
= 0,13 
n 
log < ) 
log 
log <> 
log 
0 
9,81999 
9,887. 
9,888,, 
0,217 
± 1 
9,81997 
9,887,, 
9,889„ 
0,217 
logö' n) = 9,91039„ 
+ 2 
9,81992 
9,886 n 
9,890. 
0,219 
— a f = 0,477 
±3 
9,81984 
9,884. 
9,891,, 
0,222 
— a%\ = 0,545,, 
±4 
9,81972 
9,882,, 
9,894,, 
0,227 
±5 
9,81956 
9,879. 
9,897,, 
0,232 1 
± 6 | 
9,81937 
9,875,, 
9,900,, 
0,238 
Endlich gebe ich die Koeffizienten f, g, h, /,-, welche zur Berechnung der p und q 
nicht nur hier, sondern auch für die Glieder höherer Grade gebraucht werden. 
11 
log/l.o 
log/1., 
iog/;,. 2 
iog/;,. s 
iog/:,. 4 
0 
0,0016025 
9,931 
9,97797. 
0,953. 
0,336 
1 
0,0016024 
9,887,, 
9,94547,, 
9,932,, 
0,307 
2 
0,0016022 
0,379,, 
9,91035,, 
9,910. 
0,278 
3 
0,0016019 
0,604. 
9,87213,, 
9,888. 
0,248 
4 
0,0016015 
0,751„ 
9,83022,, 
9,866. 
0,217 
5 
0,0016009 
0,861. 
9,78384. 
9,843. 
0,185 
6 
0,0016002 
0,948. 
9,73189,. 
9,820. 
0,151 
7 
0,115 
n 
log/:., 
log/1.. 
ii 
log/U 
n 
iog/;,. 8 
n 
log/:., 
0 
9,931 
9,97797. 
3 
0,52 
4 
1 0,60. 
0 
9,953. 
1 
0,394 
0.00820. 
5 
0,48 
6 
0,54., 
1 
9,973. 
2 
0,613 
0,03647. 
