i. 
507 -- 
2:o) Seciiîiîîa dat, ratione habita aequationis (5'"]: 
^ + 4 1-^ A=;j + 2 • k==p+i ' 
(- 0 ’’^ c-- o‘' V + (-irö'+ 
seu r :. 'iii. sDsî - ^roi /?: vnoie>^o‘>aoo £ffn‘>n«oo;» çOnpoo.^i 
h —p + 3 
“■ ‘ ‘ J=A ‘ 
at (5) postulat esse 
{-'i 
I • . A 
,t-i 
“i V * _;p+4 I:=p4-â~V^ 
>+3 * >-^+2 ' 
^ ^ J£ ! V ' ^"'H) V^V'/ ^ 
et qiiidèfri 'jure; 'nani differentia '-** 
aaea Jülnleotf (<5) 3« 
S(-.)'‘-'{Aû>+5] -(p + 2)[;)-h 4] }/i''+’=o csl: 
rC^— l T 1* • Ï . * ' 
f-i-Tt-Hj 
r» J t f-y , y V ' 'Î r . 
'TV-.- (Î — J—J 
scilicet -, 
AO+5] , +3[p+4] , ' I9 
L/' 1 ^p-h+2 « >-r J,,-A+1 2 (/>-Ä+2) ” 
• I i <^ = A 
+ ®' ^ '’•‘■+^ ^+3 = 
îliï') 0 Ä ' '^r +^_J^“rVi~H3 ^‘4“ V. T 
3oaiîîî)« 
^ i “1"" ‘ ' ^ ■ - - ]* “j~ ' j - 3 
*, *■ ' ^4-4 \ *^ 4 . 3 ^-^* 
3:o) Concesso igitur Talere (5) pro ^^+^5 ^^.+ 2 , ^p+ 2 ? 
n 4 A 4 v) (c -{-A> -j-,y,y.-Uy -q) 
^ ^ ^ .-, p4^43 ^ 
probabimus Terim ‘eamr esse yra^jlpj^'. — . 
