470 Atoysii Casinelli 



(3»,1)(3h,1)(3«,1) 

 A"=(9«,3)-(3n1)(G«,2)4-^ '-J^^-^^il -^ 



, (3«,1 )(3n,1)(3n,4) 

 B"=(9«,6)-(3«,1)(G«,5)-i-^ '^ ^ '^ — 



-(3n,4)(Gn,2) 



(37(,1)(3«,1)(3«,7) 

 C"=(9«,9)-(3re,1)(G«,8)-t-'' g 



.•. Astr .. , (3»,1)(3n,4)(3».4) 

 — .(3ra,4)(GR, 5)4- g 



— (3n,7)(6n,2) 



(3«,1)(3«,1 (3«,10) 

 D"=(9n,12)-(3«,1)(G«,11) + ^ ^ - 



— (3«,4)(G7j,8)-+-(3n,1)(3«,4)(3«, 7) 



(3«,4)(3w,4)(3n,4) 

 -(3n,7)(6n,5)-H ^ 2.3 



— (3n,10)(Gn,2) 



etc. etc. etc. 



Isti valores coefficientium A, B^ C, D etc. A', B', C, D', etc. 



A'', B", C", D", etc. sunt ii ipsi , quos directe superius in- 



venimus . 



Pro aequationibus gradus 20«-i-1 radices habentibiis for- 



mae aa-ha'b deduximus aequationes auxiliares ex quibu.s a- 



gnoscimus quantitates 



(4«,1), (8/^,2), (12«,3), (1G«, 4) 

 (4n,5), (8n,G), (12/*,7), ^1G«,8) 

 (4r,9), (8«,10), (12«,11), (1G/7,12) 

 (4n,13), (8«,14), (12«,15), (1G«,1G) 

 etc. etc. 



Cum autem sini 



Coefiicientium Indices 



A 4w4-1 



B 4n-{-5 



C 4n^9 



D 4n4-13 



etc. etc. 



