H YP E R G E O M E T R I C A. 21 



X 



o =Hr O, 577" 5<T*4-9 -.+;§— J5h*) 



• o, 077056-9032 #• — O, 39^934-0668 X 

 0,0056777551^ — o, 0198232337 x* 

 o, 0005367774.*' —0,0017180620 X* 



• o,. 0000 55 267 Sx s — o, 000171 1062 x 7 

 ■ o, 0000059074* 10 — o, 0000180126 x° 

 -o, oooooo6530*' 2 — o, 00000194.60 je" 

 ■o, 0000000706 x ,+ — o, 0000002130 x xz 

 ■o,,oooooooo78* 16 — o, 0000000235 x 15 . 



Hinc proxime reperitur #~~1, verum haec applica- 

 ta minima facilius ope fequentis quaeftionis defi- 

 nietur. 



Qjiaeftio tertia. 



Pro dato quouis curuae hypergeometricae punffio, 

 indolem portionis minimae iftius curuae circa idpun&um 

 Jhae inw lligare: 



1 S. Pro abfcififa ergo data xznp inuenta fit 

 jrpplicata y~q\ et nunc quaeri oportet applicatam r 

 quae abfciflae parumper ab illa difcrepanti p+w re- 

 fpondeat ,- qoae applicata ftatuatur rry-f-vj/. Cum 

 igitur frt fecundum formulam V 

 lq—-Ap-i-p -\-\p -\-\p -\-\p -f-etc 

 -i{i+p)-l{i+lp)-/( < i+#)-l(i+->p)- etc. 



fi hic loco p fcnbatur p-\-u , loco lq prodibit va- 

 lor ipfius /(f-4-v|/), quo ipfo quaeftio refoluetur. 

 At fi ponamns lq=-? y fcrrbendo p-4-co loeo p no- 

 tum eft prodire 



'-i M-Tdp-^r-i.^d^ 2- ^ i.:.jjp3-r-i. s.3.4««f+ H~ etc 

 C 3, Efl: 



