*»• 



) 57 ( 



//t-p,4^3772 4 



U— 0,2909192 hinc /7=9,7090808 ergo 7=^,51177 

 ///=0,1142873 



//</=9, 8 23 36 Si 



ld-o,665$zi3 hinc /£=9,33416*27 ergo <5=0,2I585 

 ///=0,1142573 



//^9,4484500 



/^=0,2808342 hinc 6=9,7191558 crgo £=0,52380 

 ///=0,1142873 



///=9,8334531 



//=0,68x4800 hinc £=9,3185200 ergo £=0,20821 



///=0,1142873 



//g=9,43^8043 



/£=0,2708988 hinc ^=9,7291012 ergo ^=0,53592 

 etc. etc. 



§. 35. Hinc ergo clare perfpicitur, terminos huius pro- 

 greflionis continuo longius a fe inuicem recedere atque alter- 

 natiin ad duos valorcs fixos appropinquare , quorum maior 

 erit "> o, 53592, minor vero erit <^o, 20821. Hoc ergo fin- 

 gulare phoenomenon finc vllo calculo in hoc fimplici exem- 



plo, quo r= ; 5 et «-*, confidcremus ; tum enim erit pz^y f =jj 

 y—ir — \, S~r y — ' % etc. omnes igitur termini altematim 

 erunt \ c.t l v \ t igitnr hos duos limites fixos inueftigemus, 

 quoties quidem tales occurrunt , defignemus eos littcris (J) et 

 vj/, ita vt fit r^ — \\j et )•* — $, fiue fi ponamus r — \, <$ — x et 

 v|/ -' y , pro dato valore / requiruntur bini numeri x et/, vt fiat 

 S — .v y et s—j x . 



Acla Acad. Imp. ,SY. Tom. I. P. I. H §• 3<>. 



