34^ Opuscula, 
Sylpiicp—y. -^ — ^, qux dat integrationem fecundx. 
o o o 
II Pati fadis duabus fornrulis generalem aggredior , nem- 
y<^^^(Jp> Hanc ob rem diiferentio formuJam j^^p^inhunc 
modum -^yc^fdcp-i-pyc^f- ' J^— Dj> cj.^. Multiplico per-; 
transfero fecundum terminum , & integro Sy(f.^^cp~-^ 
j (|p^ ^ £1 5»^ qjf - V :p . Simili ratione oftendam Sy(p^~^ 
1~ Sy<^~"^ dcp: atque ita deinceps, donec exponens 
S 
q) fiat ~<?5&ultiraa fummatoria evadat ^jy //o? , quac exnum. 
lo sequat . Quareregrediendoobtinebimus »yjK|:^//^=:j> X. 
(r ^ p r r 
g gg 
qux prodocenda eft donec exponens cp~o» 
Quoniam ex fuperion analyfi evidenter conftat, S y %^ d(p 
«quare dudam in plures terminos continentes (p- ^ 
9^ in quibus exponens continuo decrefcic ufque ad 
0 j facile erit per notam methodum eorum coefficientes de- 
terminare. Supponatur itaque S yc^)^ dcp—y , {A (s^^ ~\- A' (p^~ '^ 
H- (p^ * ^ -j- (pf-^-^ A''' (pp ~ &c. . Capiatur differentia , 
& ita locentur termini, ut qui eofdem habent exponentes, 
iint in eadem columna verticaii jy //4; rr ^ ^/O} 
0. A A (p^-'-\- ^ A cp^-'-^ ^ r ^'-'-^r ^ (^^-^ &c. 
-M-P^ ^ ({^-^- -\--p^A' cpp-i &c. 
Fada terminorum comparatione invenies =— , A — — 
TElll A , r = A' , A- = A^^ ; at. 
g g \ g 
que ita deinceps progrelTu fatis facili . 
lil. Progredior ad integrandas formulas y . S c . ^ (l», 
y dcpC qcp, Sumo differentiam duarum quantitacum y Sc.qcpy 
yCc.^cp 
