fjS Opuscula. 
in quibus coefficiens fecundi termini homogenei compara* 
lionis divifus per — p idem eft ac coefficiens primi . Fiat in- 
tegratio, & provenient fummatoriae quxCnx. 
XXf»Hic quoque cafus exceptus habctur, quum^^=4 ^^, 
five^=:t2f, ubi valettheoremaj . (S h.5'(p m 2 S h. ^(p.G h.^^q? 
4-Ch.f(|) =ry, Differentiatio trium quantitatum 
ycp^Sh.q(p^y(pPSh»q(p,Chcq(^yycp^Ch.qcp fufficit tres 
s,*:£y.7(^^i^Sh.f ^ ~-y(^^d:p .Sh.fqj.Ch.^qj 
f.Sh.q^ =- ^^- V ({3 . S h. f 
I.* ^.j^jDVcp .Sh.^q;^ "^T^J^ cp^^qj. Sh.^^Ch.^^H-= 
(p^d (^ .Ch.q(p =Djf(j)^Sh.^(^.Ch.^^—- 
V (|).Sh.f(p.Gh.^(|) 
(p^/ZqjSh. f .Ch . q (p:li^y(p^d (p ,Ch7q^^ 
Dy (p^ Ch.qCp —py (p^-'d(p .Ch .q (p , 
A fecunda divifa per ~-- auferatur aequatio theorematis du« 
cta in cp^d <p . 
r 
±—.Dj(pP 'ih .q(p .Ch.q (p 
^.^y(p^J(p.Sh.q(^.Ch,q(p= 4^ ■ ^rj^^ 
:^^—y(Qp-hi(p.Sh.q(p.Ch.q(p 4 
4 ^ 
Valor jifti'^):^ . S h. ^ .0 h . (^(p modo inventus fubftituatur 
in prima & tertia, completisque opportunis operationibus 
nafcentur 
5.-^(t^//a).bir^=~.( Dy (pKSh. qcp 
4? (-Dy(p^Sh.^cp.Ch.^(|) 
4 (+jicp/'-'^(|3,Sh .^qj.Ch.^^^p 4 
