( <J4P ) __ 
tegri Af, ut exi^ lente De nomin atore z.z,-^ff .&c.Z‘\-pH 
xu^ u-\-m, drc.»-\-^f»^y> y-^l ,&c.y ^ rlxx,x ~{- o 
&c. j 0 . ^c. Fr adio a d Integra le revocari pofllc. 
Solutio. Fiat N=z-\-pn Xu -\- q m xy rl x ;c j 
&c. — zuyx &c. atquc Inte grale erit frac^io, cujus 
Den ominator g. . -j- » . &c» ^ -\ -p — \n %u . u-\- m. 
€^c. t4 q — I m y . y I , ^c. y — x — \ l^-x o , 
^c. X ^ s — 10 ^ &c. exiftente i Numeratore. 
Differentia enim hujus fradionis eft fradio cujus nu- 
merator eft ipfius N valor exhibitus, & denominator 
idem eft ac denominator propofitus, ut fier i de buit. 
Ex, 1 . Sit denominator propofitus 
In hoc cafu funt n — 'i^ m=zS> P=^f t; 
adeoqueeft N = -}- 2 x»-|-3 6, 
& per — ^ reprefencatur terminus Seriei 
z,z xy. u . u-\- ^ 
fummabilis, cujus nempe in infinitum continuat^ Turn* 
tna exhibetur per 
Z H 
Sint verbi gratis, ipforum 
primus valor communis i, atque Series fummabilis erit 
I r 
2.3 
+ 
35 
&Ci quip- 
mini cujufvis in h4c Seric, erit p 
1. 3x1. 4 ' 3-5x4. 7 ’ 5.7x710 
pe cujus totius fumma eft i. Per p defignetur ordo ter- 
% — r-f -2 u — 1 4-^ 
2 i * 
adeoque z=^p — i, 8i u — }p — i; quibus valori- 
bus pro z & u icriptis, defignabitur terminus per for- 
mulam itp — t — ===-=. Summa 
2/) — I xzp ^ xSp — ^ X3P -r * 
autem lerminorum omnium ante terminum ilium, hoc 
eft terminorum initialium numero =:p — i, eft 
I i i i i I — > 
