184 
liet adeo r(£) = « o) (r(£) - A?} , 
et inde 
= A 
B = B 
2\p(o) — cc cc 
2 / \p(o) — cc 
sive denique B Jl. W ~ “) : 
1 «W(o) - cc) 5 
atque sic, cum pro singulari ipsius x valore = o, 
T fd£) = ! ra © - -M£) + 
= ç >( 6 ) [ 2 c — 2^5 4- y^ 2 ], 
liet utique 2C =z 2AB — A 2 4 — . 
^ [2^(o)_ a ]3 5 
unde pro valore ipsius 4/(o) E=5 1 5 prodibit 
C = — 0.0167782 , , ; m k 9.2247454 
tum vero terminos Fx 5 , &c. negligendo, ex æqua- 
tioue (45) 
2^C -f 6D = - 0.1055503 . 
atque sic tandem j) — — 0.0204497; . . . . 8.3106869 
qui quidem ipsorum C et Î) valores si adhibeantur in ae- 
quatione (62), prodibit ex bis 
8 A 3 — 4 A 2 B — 2 AC — 3D 
= 1.0573407 * . . , 0.0242159 
SA 2 
4A 3 + 2A 2 B +3 AC— 45 D 
32Æ 
0.1601095 
• • 
L 9.2044171 
