De FOIVMIS UADICUM AEQUA.T. ALGEBR. 3 I 9 



deslgnala, quaeque in acquationibus quarli gradus quacumqne 

 alia melhodo soluli.s oblliielnr. 



Dciiule in siiljsequenli §. G.° , posiia 2 = j/< eruit ex piae- 

 cedenli aequaiionc 



quanique ipse respicit veliui acqiiationem resolvenlem. Ergo 

 si ejus radices denoniinantur E, E, G juxla Euleruni eruiil ra- 

 dices aequulioni propositac 



«l/E-HaVF-+-aVG 



yi/E-f-yVE-t-yVG 

 sen, cum sila=: — 1 , /? = j/ — \,y= — ^/ — 1, 



l/E-iVF-f-i/G 



4 4 4 



— l/E-4-p/F— j/G 

 i/E^—1 _^>F— i>G,/— 1 



_l/E^/_1 _i/F-+-^>G|/— 1 



Sed est 2; = |/f^ ideo radices aequationis reduclae erunt 

 [/E, |/Ej |/G 5 quapropter radices aequationis propositae , uti 

 notus est , erunt 



l>£-l-|/F-HiXG 

 — V/E-t-i/F_i/G 

 l/E— i/F-i>G 



4 4 4 



— l/E— i/F-H^G 



