C V R V A R V M. 4-9 



viide definiemus § et e ita \t fit : 

 At I et V coniundae dant : 



ynde eruitur p^^h^^^<}l^--^\ 



qui v;ilor in alterutra lubftitutus prnebet 



(A^-Ea)^'Anr— BBE) XX-+--BIXA'f-Eg X-f-ABB^^— DPEaa:) 



y — (BBf — DD.«;» 



12. Supercll igitur III. aequatio , quae ob 

 $ — y -h X tranfit in 



2 yX-i- XX— a<^— c ?£ — Cp. 



Cum nunc fubftituto valorc ipfius p fit 



p f A ^ — E g' (D g -4- B X ) (A ^— E_aKB f - 4- D X) 



° — BB^— DDa ^'^ £ — BB?' — DD« 



fi i(ti valores pro v, S, s et p fubftituantur , tota 

 aequat pcr XX— a^ diuidi poterit , quo fado re- 

 perictur 



^ Cn^I—Ea) BB^ — D D g) — 2 BP (A f — E aT — (B Bg'— DDa)^ 



^ ::a^— Ea:(ADD-BBE} 



Quoniam igitiir nunc omnibus conditionibus eft fa- 

 tisfivTtum , arbitrio noHro adhuc rclinquuntur duo 

 cocfficicntes a'et ^, (cu potius eorum ratio mutua, 

 quam ergo pro lub'tu dcfinirc licct. Ex quo ma- 

 nifcftum cfl, in a.quationc intcgrali feu ipfi canoni- 

 ca incflc conflAntcm arbitrariam ab acquationc oifie- 

 rentiali non pcndentem. 



Tom.XII.Nou.Comm. G Alia 



