( ^41 ) 
videatur vel difTerentias,vel generatorestriangulr Arithme* 
tid adhib ere,) refolvatur^ in Multino miuno A^-\~ 
C z xz ^ z>-\- ^ 'i- ^ -|- Hoc 
pado (t erminis mu ltinomii ad denominatorem ^ ^ & 4“ ^ 
&C:. -X. z p — n, afpplicatis) terminus quilibec Seriei 
revocabitur ad.formulam 
B 
X -]- » X z. p — I « 
— . 
z-T»'>^&c,xz.-\-p — I » ai.-{-z«x 
Unde Cper Scholium 4 Prop. T.j aggregatum totius 
Seriei, a termino ===■ inclufi-^ 
2, y. X » X ^£, xz. 4- p — I ^ 
ve in infinitum continuarse, eft' 
A 
p — I ZJ4 n X z -\-p — ^n^ 
p — z4~ ft X ^c. p — -2, n 
■ ' ' ' ; ' — “H 
3 X X z, 4- X X X z. p — i » 
re- ft demacur hoc aggregatum ab ejufdem aggregatii 
valore quando zr—a, refiduum erit fumma omnium 
terminorum ante terminum ^ , hoc eft, tot ter-? 
minoEum quot funt unitates in ~ — Q^E. I. 
Sit primum exemplumiaSerie ^ p u i ^ 
