(9+) 



c]ucm ergo cxponentcm ;/ quoiiis cafii cxctdcrc non oportet, 

 qiiamobrcm ciioliitionem formnc gcncraliij in thcoicmatc con- 

 tentac ita in cladcs dilhilniamus , qiiac intcr fc pcr maximum 

 Aalorcm tcrmini a -\- h dillin^uantur. Cum igitur nulla littc- 

 rarum a^b^c nihilo acqualis fumi queat, ac cl!c dcbcat b^^c^ 

 minimus valor, qiiem tcrminus a -\- b rccipcrc potcll, crit 3, 

 in quo crgo primam clalfcm conllituemus; fcqucutcs vcro clas- 

 lcs conllitiientur, dum tcrmino a -i- b valorcs +, 5, 6, 7, ctc. 

 tribuantur. 



T. Euolutio claflis 



qua a-hb — :i. 



§. 12. Hic crgo ncccHario crit j~i, Z'nz2 et f~i, 

 ita vt hic niilla varictas locum inucniat , vndc thcorema no- 

 ilrum fuppcditat hanc vnicam relationcm : (i, 2) (3, 1) ir: 

 (i , i) (2, 2). Dummodo igitur cxponcns ;; non fucrit mi- 

 nor quam 3 , fcmpcr hncc infignis rclatio locuni habet : 

 r d X r X X d X _ f (i X r xrix 



I li ■ / n / "n ' ' J 'n"- "» 



»^/(i_^Y-= /(i^.v")"-' /(i-.v"/-' /(i_.vY— 



quac forma, quia in quolibct charactcrc tcrminos inter fc pcr- 

 niutarc licct, ctiam hoc modo rcpraclcntari poterit : 



/x^d x r ^) .V _ r r) v f ^ ^ ^ 



II. Euolutlo claflis 

 qua a -\- b ~ 4. 



§. 13. Oiioniam b binario minor effc ncqnit, liic crit 

 tcl Z'm2, Ycl ^~3. Sit igitur primo /> ~ 2, critquc a zz:2. 



cc 



