38 
H. Buchholz, 
In toto erhält man so die folgenden der numerischen Rechnung zu Grunde zu legenden 
Formen, in denen sämtliche Größen außer ß 7 bis ß, 9 bekannt sind: 
I. j 28,+8 3 + 2 — p^+ | ß 7 — — 
' 8.1 
1+8! 
"F Po,. 1 ^7 
A _«(9) 
9 r 10 
II. {2 8, + S 3 —pf ^) ß 8 + 
III. {28,+8 3 -/, 9 >jß 9 H 
IV. j 28, +8*+2 <)-<)+ yÄ} ß : 
1 
■Ä ß 
w-'/’Sf+jÄ P 
2 (ff9.1 + ^4) ■ ß — J 
J_j_g *TFl0.1 •+ 2 ^21.1 Pl ^8 
2 (ffl0.1 +^ 9 ) , „_ß —J 
1 + 8 , 
2 (ffn.i -F -^ 10 ) 
1 ■+• 8j_ 
+ Pl2.1 ~^V 
V. { 28j-8?+^)-iV lT (y)} ß u + [2q^+p^+2N t } ß 14 + 
+ | 2 <$P+pW- V ii i ßi 
~P 14.1 
_ 2 (ffl2.1 + ^ 11 ) 
1-§1 
1 a ß + +^ 14 )^ + (0) + J 
2 ?15 -i Pl+ 2(8,+ 5) WlTl4+Ju 
VI. {28,-8 3 +^>-A^ 2 >} ß 12 + {2q^+p^) + 2N 1 } ß 15 
r (18) 1 
,7 15 9 
1 _AI *(18) ' ß - - 2 + n AÜ 
o 61 iV löl5 \ Pl8 — J_§ 
1 - (ff 16.1 ~F-^ls) ^ 
2 + ^ + 
+ -^lT ( 15 ) + *4 
VII. {28, -8?+;4 3 )-iV, T d 3 )} ß 13 + { 2^8)+;4 6 >+21V 1 } ß, 6 + 
^i-AI lT a«)}ß 19 = _ 2 ^!:1 ±^ b) -^ 16 . 1 + 
(ff 17.1 + ffff^ic) ^ 
+ 2 ‘ /:v ; ß ; 2(8, + ;,) 
+ « + ^13 
n( 17 )- 
l \1 
1 
2 ^ 
i 
-4+'- 
J M 1 ^ 
7(0) _ 
«’ ! e„ 
11 
8,+ 5 ' h? 
+ 1) 
8, + ? 1 
Hir 
!X. {1 — 48 3 +pg )} ß, 5 + j^ 8 2 >-y qf)- 
Miöa + H^G 
2 fffl? 
-~Pn.\ -TT (ffl2.1 ffis.l) ßi+*A, 
2 -f- c ■+■ 
1 2^ß 8 ^ ( o (#16.1 +^15)^ 1 f \Q I T 
•#-2S,+ ? ^( ßl8 == "28 1 +^?r^ 1_ ^ (?13 ' 1-?19 l)ßl+ 16 
2 
1 
+13) 
x. { 1.-48*+jS$»}ß, fi + p^-yfff- 
< n ( — —- n\ 
\t l!> 2 ^ 
j(1Ö) 
r( 0 )- ^ 17 
8, + ?, 
XI. {6 8, + 9 S?—/7G7) + iV 2T (y)} ß„ + 
ßl9 — — 1( ?^ — /’lö.l- 0 (ffl-t.l— ff20.l) ßi++i 
2(8i + c,) 2 
2 ff ( iV ) 
-pW+ 
1+38, 
^ä+wSp„+ { rßis t -iC-2»4(u = 
2(q ls .i+H 17 ) 1 p (q\5A + H ul )F (Q) 
~ 1+38,' “ + ^ 20 - ,+ *2 ^ 18 ' lßl -2(8; + ?)- jV 2 
(46) 
