< 46 ) 



Scilicet fi per TJf, ^S" atqne M' ot S'' indicamus 

 valores, quos pofico x ^=: - a -i^ Va^ - // accipinnc M en 5*. 

 Ex his aequationibus flicili ncgotio deducunciir A ec B. 

 Hos valores eciam alio modo confequi posfumus. Sic 

 nempe h ^=^ a^ -^ g^" tunc 'erunt: '- a -¥ g vZ'i radices 

 aeqnarionis x'^ j^ "i a x ^ h. His qiiancicacibus pro Xi 

 arque m + ;;/ VT"i ec s ±_s' V~7i pro M et S ^ pofiu^ 

 in aeqiiatione M -^ S C^x+B)^ qriiincur aequaciones 



m^77i'V'ri^ Cs+s'V-i) (^B ^AQa^gVZi^^zzo 



His aequationibus addicis et fubftraccis, erit 



2 m — z s (B — A a) — 2 A g s' zz o 

 cm' VTi^^s'VTi aA — zs'V^i B'^2sgAyn:z:o 

 vel 



m[—sCB — Aa^-^y^gs'^o 

 m' '-s\B-'Ad)-' Ag s z= o 

 Ira invenimus A ec B, Quod accinet ad s ec s; eorura 

 valores direcce inveniri fic posfunc 



S (x'^ '\' "i a X ~^h^ zi V 

 ^S(x''+2ax'{'l^) + C2X+2a)S(ix = f^f^ 

 tel quando x^ -i-^zax-^i? zz o 



Si 



