544 Petri Calt.egari 



evolvi posse ia fraclioncm coniinuam, quam ita clenotabimus 



1 



eruentur aequationes, quaruin radices inter radices aequatio- 

 nls proposltae comprehendentur . 



ni — 1 



13. Aequalio iV) per [1-+-/*,] dividatur; positis 



r ni— 2 1 r "1—3 -i r m — 4 -, 



Bi=— ;3r-v^'' ^^=p;:r7T- ^2, B3=— — .A3, 

 Li^/i,J Li-f-/uJ Li-j-/iJ 



scribi poterit 



m— 1 m — 2 m— 3 



(</) X ^-Bia: -hEjo: -h • • • -t-Bm— i = q . 

 Quando hujus aequationis termini ordlnalini multiplicantur per 

 terminos seriei 



Ki] , \\^h^ , [l'^/'2] , . . . . [l-f-^^i] , [I-I-A2] , , 

 ac deioceps per x dividantur , emerget 



t"" — 2 -, _ r "'—3 -1 , 



lH_/;,Jx'"-2-4-L1-t-/22jB,a:'"-^-t- . . . -t-Bm-2=0 , 



sive (resiituiis loco Bj, B^, B3 suis valoribus) 



[m—\ -. r m — 2 -1 r m — 2 -i (" m — 3 n 



-^-[1-^-/^JA„_2=0. 



Radices posilivae, ac reales aequationis (d) ex litteris a' , , a',, 



