r 
Opusculav 13 
pro quanto vero g 
Q^N-f-MM— MP 4- CN X P— M -f-BN x N— Q^+AN x MCL-HFg 
tandem pro quanto / 
X N— Qd-PP— MP -h CQ^x M— P + BQ^x Q— N -f- AQ 
XXIL lam in propofita fradione 6 axxdx -f- aaxdsc 
1 1 
^f'*-^- 9 aaxx -\- ^a^x -4-8 ^^z'*^ 
2 i6 
cuius denominator produdum eft duorum fa^lorum realioni 
— ax aa ^ xx -i- ax -h aa ^ valores coefficientium 
4 4 
conllantium /, l erunt f^o^ h—o^ g^i-^aa^ & 
22 
^ = — S aa y & fradio propofita dividitur in duas , qu^ 
22 
funt i-jaadx , & — %aadx , Ita» 
2 2 X XX -— ax if aa 2 2 x -f- ax -f- 5 
T 4 
jque fi asquatio fit 6 aaxxdx a^xdx 
%% X + Jj' 
1 1 
x^-^ gaaxx 3^% -{- 85 
poft divifionem fradionis Kabentis x ^ ^ dx in duas 
_ I qaadx — 5 aadx 
7~ , =^ & . — 7=9 habebimns 
22 X XX ~ — ax i ']aa iz x xx -r- -^?^ -r- ^^^3 
4 4 , 
aady ■— i^jaadx' —-'^aadx 
%i yi. aa-\- yy 2% xx — ax i'} aa 2 2 x xx -h ax ^ac^^ 
4 4 
omiffo vero communi denominatorum divifore numerico 1% 
(in quem finem allumpfi priraam ^quationis partem ^ & 
ipfam habentem hunc diviforem in denominatore 5 qua af- 
fumptione mirum in modum univeAfa haec fupputatio coa. 
