520 Aloysh Casinelli 



B— ^313 -+-D 

 /^7= 2 



Ponatur m^-i-n^=:k, p^-h(f^=/i, aec[nOiiiones 2." et 4." redu- 

 cuntur ad 



A(B^pX3B-'-HD) _^ /<B-t/3B-^D) ^^^c^gE , 



hiac 



, 3BC-4-4E-4-C|/3B^H-D 



_ — 3BC— 4E-hC|X3B^ -hD 



"" 2t/3B--f-D 



1 • 1 , • M B-+-1/3B2D , 3 ,, , 

 liinc ULUibus aequatioinbus mn= , ??i -<-7i =A- halie- 



Ijimus m et ?j idest 



3BC-h4E-hC|/3BV1) /(315(:-4-4E-t-Ct/3B^-f-D)^ — (B-4-|X3B-^D)3 



_ /3EC -h4E-hC|X3Bh -1)^ / 

 f A, /rnEiLn r 



V3B^D y 1ti,3B'-HU) 



3 



3 r, C _H4E-t-Ci/ 3B --t-D /(3BC-f-41i;-HCi/3 13-h-Uj- —(B-hi/SB "-hD)3 



/3r,C-H4E-t-Ct/3B--t-D /i 



"=i/ = =^1/ 



4i/3BM:D ""^ 1li(3B^-4-D) 



a I que ex duabus 



B_^3bCd , 



^"7= 2 ,p^^q=h 



habebimus p et (j scilicet 



3 , 



_ /_3BC_4E^Ci/3B-VD _^ / (3BC-t-4E— Ct/3B^- HD-— (B— ^/ 3BM-D)^ 

 ^~V 4i/3B-'^D "^K iG(3B^-hD) 8 



/_3BC— 4i:-i-Ci/3B'-+-D A3BC-t-4E— (V3B^-4-D)-^— (B — t/SB'^-nP )^ 



l/- 



Y 4\/Z\i--i-D V 1G,3B'-|-D) ^ 



Ex valoribus aulem ni,n,p,q dedaccinus eos elemcntorura a, 

 b ,c,d. 



