CVWARVM ALGEBRAICAWM. 19S 



ergo e m -\- nr—mn — ^^ adeoque a— 1^> (3~— ^;^ 



vj-^-O-l. Hinc A(=z^)-4,B(i=V^,^;^^=: 



jjj^ p. ( 1— vij Ba , 2(?^+ Y^ f (2 — v ilCa . -^8.7^6 



Etrr^-^i^^^jzi^^ilr^;^, Fi^o, etc. Item M(=:: 



X 55=p7j a^-P7 ) — a— ' j 9 , et N ( zz ^ -4- ^ M) — ^' 2-H 

 /)+ a:— ' j5> c propter j' "^ —/)'•■ .v H- ^' ^xxj s» ) ~ jt— 2j, i +. 



^-'J' -f-TTpTB , quare >^.v(=rN«T )= i xy-^ |^ 



V V v-8 -J-—^'* V 3 1/- n _!_!'''-?- v+ ly-2 6 , iAiii- V 1 V- 3 ? 

 -»'-*/ -r- f)8 '^ J -T~ 3 f> 1 2 •'^ J -t-i ? f,i6-^ J 



prorfus vt habet Cel. Craige iii Exempl. 111. Seft.lV. 



Exemplum 5. 



IX. Silt y^ — ax'^-px'^j''^ ^ vel quia fub hac for- 

 mi quadratui-a non fuccedit, ducatur aequatio inj'"""', 



— I 6 \ j 



eaque mutabitur inj 3 —ax^y^^^—px'^^ quare tnzr—^^, 

 72— I, ^— -^) r — — 7; a — —py et bz=za^ adeoque 



=i,0(-p-|-^)--5|zi-|,X(=ry-f-<^)--^°.in- 

 de_vero A(z=,-i-,)_= - , B(=:^S^^^)=:/3^, M(z=: 



A-^^^j^^P^v)— .V "^j-^NC^a-hbM^zzz-p-^-a 



.v'"^j--' rzx ^^"V ,etT( = AM^H-BM^-'-^etc.) 



— I o V Tj.-T H- _if^ ^ ^^ jeoque // ^a' ( = N^ T ) zr ( || 



Bb 2 8/)A' 



