quae aequatio locum habere nequic, nam C^+p) non esc 

 factor quantitacis a x* -{» b x + c. Nee magis iuvarec 



ret 



ax*^bx + c :r: (^-f- ^ C^+i>)) C^+/3 ec in eundem- 



incideremus cafum, ac fupra. Alia igicur via esc ingre* 

 dienda. Ponamus 



ax^+bX'¥c:=:J+Bx + Bp'i^Cx^'¥2CpX'i'C/j^ 

 Unde elicitur 



jzz c ^ Bp -- Cp^ 



B ^ b -- ii,Cp 



C ^ a 



B ^b'^tpaet^zzc-^bp-hp^a. 



Xh 



Alter cafus obtinet, quando denominator conflat e fiic- 

 loribus aequaiibus et inaequalibus; v. c. Qx-hpy ec 

 (^ + r), tunc, ut vidimus e praecedenti paragrapho , 



ax^ -h^x + c _^ yf 4, ^ 4. C* 



(^■4-/')a (a4->0 "* (a^-+-/';* x^p x+y 



quae aequatio, fi multiplicatio per Qx'^p)^ Qx + r^ 

 esc indituta, fit ^jj a;* + i' .r + d: = ^ (^x -h r) 

 -i- i5 (o;^ •+• (p-i-r) x-i-p r^+C Qx^ + 2px +pp) 



un- 



