( '350 ) 
E^emp. 2. Sit +ay3 =:b?:y% ubimte;, n== j, 
ers: I, r = 2-, qui faciunt 1= 2 -, fdco ( juxra Not. 4. ) 
tres primi Seriei termini dabunt qu^ficam 
7 b 2 b » 
AREAM z y — • 2» z» y-. 
10 15a I § a* 
f^^;»/?. 3. Sit 7J + k y^ = h z y * ^ ubi m = r, 
n=55 6 = 2, r=: II i at quia hi non faciunt 1 numerum 
integrutn &: affirmativum ideo (per Regulam fecundatn) 
libero terminum h z y a quantitate z 5 & fic acquatio 
^fft 2:^ — h y = — k z* y ^ ; ubi a = — h, b = ^ k ^ 
8c m=: 5, n = II, ti=2, r=re ^ qui faciunt lr=i : Unde 
5 k 
ARE A=: -~^^y — • z' y..^ 
16 1(5 h 
Exemp, Sic z* — ii = — • It z^. y^ ubi m = 2, 
n=: 2,^6=2-2, r = 2 ^ qui ribn fafriunt 1 numerum inte- 
grum &: affirmativum ; ideo libcro terminum — k z* y* a 
quantitatez; & turn z"* k y* h z y* ubi a=:k, 
.b=li J &: m=05 n=2, e == — 2; r-=:2, qui faciunt 1=1, ideo 
• ^ '^i ' ' 
A RE A^: .-- z y 
■ 4g'' ■ g 
Exemp. 5. Sit z* — —1 y« rr; ^ z' y* ^ ubi mz=2, 
U li 
n^<5, e=:2, r=4.; qui non faciunt I numerum integrum 
Si affirm'ativum:^ idemque contingit liberato ^ Ca 'quantitate 
z > utrolibet ex reliquis : Ideo juxra regulam Tertiam qua^ro 
Complementum ^ * qu^re ( ut jam pra^monui) pono z 3= Yif 
y Z j unde ^quatio data erir. . , 
Y-T- Z^ = -ir Y" 
quae (juxta Reg, i.) reduQia ad formamgeneralem erithnjus 
modi 
