jc» METH. FACILIOR ATQTE EXfEDn. WTEG. 



hincqnc coefficicntcs qu:iefiti cmergcnt hoc modo 



5 p\ 



a a * 



C PB (^i-aVM 



a a ' ' a 



S) = i- 



a » ~i~ a ' « ♦ 



etc. 



§.4.. Hoc itjqiic modo , qui diiiifioni adliiali idcm 

 omnino praebitunic antcfcrcndiis vidctur , Cicili ncgotio m- 

 Tcnitur fr:i(ftionis '^ p:m iatcgra 



2f A-^-i-gj.v^^-H- ^x'"-'--^<D.v'"-' -4- H- 59?. 



dcfinicndis fcilicct cocfficicntibus 5I/93,CE/ ctc. 



His autcm dcfinitis fimiil obtincbitur pars intcgnilis quac- 



(iii , cx ifla partc integra oriunda , quippc quac crit ; 



Sl.v'^' 95 v'" ^v'"- . ^ 



denotantc 9^ qu:intiLUcm quamcunquc con(l:uitem. Ne- 

 quc vcro opus clt , qucm:idmodum antc , mcthodo minus 

 gcnuin:! \fi , fccimus , vt fimul p:irtcm fra(fl:im, qu.ic cum 

 partc intcgra iimcuta coniuuifli toLun fnidiaucm propofi- 

 tam N conftiniat , dctcrmincmus ; (cd fufiicict partcm in 

 tcgr.im tantum iuucltigade , ex caquc intcgralis partcm con- 

 vcnicntcm cruifTc. Kcliquas cnim intcgralis partes cx par- 

 tibus fradis fra(flionis '^ oriundas immcdiatc cx ipfa frac- 

 tionc ^ eliccrc doccbimus , ita vt non opus habcamus 

 illa facpcnumcro laboriofi rcdiwflionc fr.i<flioncs ^ ad nliam, 

 in qu.i variabilis x pauciorcs obtineat din cnfioncs iu nu 

 mcraturc M quam in dcnominatorc N ; quac tamcn rc- 



du(flio 



