C88) == 

 V = pfx^'' a .V (i — A-*;V^ 



— (p-^9) fx^ ^'^~' a .V (i -^ x''y^ » 



Quoniirn igirur quantitas V pro vtroquc intcgfationis tcrmino 

 cuauclcit , hinc adipifcimur illan'» rcduaioncm : 



/A-f "^'^-' a A- (i - a:")^* ~ -^- fx^"dK{i-x*)^^ 



ciiius ergo rcducliotiis opc cxponcns ipfiui x continuo quaii- 

 citate n ilimiuui potcrit, doncc tandcm infra n dcprimatur. 



- -n • , r I 5V />?5a- — (6-4-^) AT^S.V 



§. 4.. Deinde formula pro ^^ :^ '. 1 — 1- 



V ^" t.1 — x') 



inuenta hoc modo rcferri potcrit : 



^ V _ (p -h r/) 3 r (r — A-") —qd x 



T J ' ," -»— ' '■.11,111 >'• " ' I ■ ■ i a 



V jf(,_.v'') 



quae forma pcr V mulriphcata ac dcnuo pcr partcs intcgrata 

 dabit 



V = (p-^q)fx^^' ^x(i -A-v — qfx^-' d x (I .^A-")^^' , 



Ynde quia pofito a- — i fit V =: o, oritur hncc rcdu<fiio : 

 fx^-' dx(i -.v")'» — _?-- /A-f-' a .V (i — a")^""^, 



cuius rcdu(ftionis opc cxponcns Binomii i — .v** vnirntc minui- 

 tur , fuic quod codcm rcdit , numcrus q numcro n imminui- 

 tur. TaH igitiir rcduclionc, quotics opus fucrit, rcpciita, cx- 

 poncns q tandcm infra ;; dcprimi potcrit. 



§. 5« Quoniam igitur pro quoui^ numcro n nmho^ 

 exponcnics p ct q tanquam minorcs qu.im n fpcdarc hcct , 



for- 



