SCULA. , 
Q.*yd&},Sh.q(P= -3 
r . — ^ — 2 
^4 \ a 
quae ex integrandis eft prima . Demum o^ava, raulciplieata 
per™ auferatur a quarta , peradifque x>pportonis operationi» 
bus nafcetur 
ic^j^cp. Ch. g 
( — 5^^3 .DjSh . q <p 
STT."^ .Ch 
^ <b -ry^2 ^ -^^^.^^^^^DjShj^^h.^q) 
^ ex integrandis ukima eit » Fada itaque integratione je« 
quationum leptimx, odavx $ non5?e 5 & dtcim^ ^ habebirous 
fummatorias formularum ^ quae pfopofna^ funt. 
XI, Integrationes nix deliciont, quotiefcumque 
^4 ,o ^2 ^ p ^4 _ 0 ^ Formuia hxc refolubiiis eft in duas 
gg — 9qq \ gg — qq'> ergo tum deficiunt mtegrationes j & 
quum^=:1:^^, & quum^ — Ut hos quoque cafus 
abfoivam , fptito primum ^ — it 3 f . hoc cafu ajo 
mDj^Sh.^cpH-^ ShTTi^Ch.f ^pz^il DjSh.^^Ch.^cp 
H- Djy C h.^ 19 — 0 . Hoc tibi ex a^uali differentiatione confta» 
bit ; jgitur integrando m j S h , f i' 4- 3^ b h . f G h . f 
5:3jSho^(p.oh.^(p 4-^Ch.fcp — Fada (|) = 0 , erit 
I, Sh.^q3rro,Ch.fa: = r; ergo A^r^ . Igitor valet 
theoremajy.(^:S h . ^ cp^-l-g S h.f 9 .Cb.^ (fqig S h.f (p. G h f <p 
4- C h , ^ (p = five jy . (zp: 5 h . ^ f G. h . <^ <p =r , 
In aitero cafu , ubi g—^X.^^ videbis per differentiatio- 
nem efle di Dj; . S hTqlp — Dj^ ShTT? C h . ^ (]3 
^ii D S h . ^ ^ . C h , ^ cp -i- Djf C h . ^ 9 = <? i unde coUiges 
vakre theoremaj.( i!iSh=/j(p — Sh.fcp « 
