342 Aloysii Casinelli 



C 8.9 10 .11 .12 12.13.14.15 



etc 



Ei'it igilur x = 



etc. 



2^2. :i' 2.3.4 ' 2.3.4.5 

 lur X=: 



.J q^ Gq^ 8.9 <7^ 10.11 .12 q^ 12.13.14.15 ?" 



'p~P~"2p'~2T^'p^ 2.3.4 /ji3"" 2.3.4.5 ^'^ 

 Caetcri valorcs ipsius x invcnirenliir posito (i-=.^/q ,a=z — \/q. 

 Seel calculus qui in hiscc posilionibus insiiiuendus esset nimis 

 esset prolixus el coinplicalus; series ipsae neqiie elegantes ne- 

 que simplices essenl, et permulti termini assent dcducendi, ad 

 (letegendani legem qua ipsi proceduutj quapropter de eis ser- 

 monem facere penilus ommittam . 



Calculo eodeni subjectis aequationibus trinomialibus quarli 

 gradus nempe a:* — px — ^ = iaveniemus 



_ q q'^ 87' 11.12 ^10 14.15.16 7" 

 * """'■/Ta'"" 2^"^ "2.3 JT^ 2.3.4 ■^^"^'^ 



Item pro aequationibus quinti gradus x^ — px — ^=0 

 _ q q^ 1079 14.15 (713 18.19.20 71^ 

 ^~~~^~"^~ 2^ 2.3 ^ 2.3.4 ^i ^^*^ 



Quapropter cum sit 



Pro aequationibus secundi gradus . 



q f/2 4r/3 S.Gfl" G.7.8 r/5 7.6.9.10^6 



T — ~->e- ' I — — - t- — etc 



P p^ 2/jS 2.3/j^ 2.3.4/J9 1.2.4.5/?" 



pro aequationibus tertii gradus 



_ q_ q^ C75 8.9 q"^ 10.11 .12 q"^ 

 ^~~~'p~ J'^~'zy 273^ 2.3.4 pi~^ 



12.13.14.15 7" 



^" ■ - — ■■—■■■ — — Pf C 



2.3.4.5 /ji6 • 

 pro aequationibus quarti gradus 



_ <7 q"^ 8 qj_ 11.12 7IO 14.15.1G y" 



'^~'~7~^/^~2>9"^ TT3~ ^ 2.3.4 /TT? "^ 



17 .18.19.20 7I6 



3.3.4.5 p2i 



etc. 



