De AEQUAT TRIOMIALIBUS ETC. 339 



et eoclem modo inveniunlur cocfficientes subsequentes 

 14 . 42 



. etc. 



/=0 , m=— — ,«=0,r=- 



524288./ V/ 8388G08r7V<7 



Si autem sumilur « = — [/ <] , habcbimus 



111 2 



2'~ 8V,f' ~ ' 1287,7^ '* 2048f/V'7 



5 14 



A=:0,A=: ,/=0,m= 



' 337687 3^f/' ' 5242887 Vy 



n=0,r= — etc. 



' 8388GO87V7 

 Erit igilur 



p p^ p4 2«6 5«8 



ar=^7^-^H- — - —-—-7- H '^ 



2 8|/7 1287^/7 204872^-7 327G87V'7 

 14pio 42pi2. 



■ etc. 



5242887 V 7 8388GO87V9 



p p^ p* 2^96 5^f 



x=: — l/q-i- 



2 8\/7 12871/7 20487^/7 327687 V7 



14pio ^2pi2 

 !- 1 i etc. 



5242887 v/ 838860875^-7 

 Expressa symbulo Pr summa potentiarum n esimarum ra- 

 drcum aequalionis x^ — px — 7 = 0j erit iiti notum est 



V=p 

 P2=;pP H-27 =p^ -4-2/7 



P^z=pP^~^-qV^=p i^4p2q^2q 2 



^5=^^4"+"'5'^3=^ '-»-5/^ ^7-+-5/)72 

 Pg=^P5-+-7P^=p6-t-Cp'i7-H9y9372 ^.273 



P-=^Pg-t-7P5==p ^-f-7/» 57-t-l 4p 3q2^pq 3 

 T^=f}V^-hqV^=pS-^-Sp^q^20p*q^^'i5p2q^-^2q'^ 



etc. etc. etc. 



