DETERMINATlOKKr 6^ 



a i m cr-\~c \ 7na-\-mc-\~c • m d-^-m^c-^-mc-^-c ; etc. 

 vndb fi indcx quicunque x fit numenis integrus , erit ter-- 



niinus conueniens ~: m*~"a-\ c : Sin autem x (\C 



mimerus non integer , uifinitae aliae form.ulae praeter hanc^ 

 perinde (atisfacient ^ ad q\iasi ihueniendas fit j/ terminus in-- 

 dici X refpondens^, 'et--^'^ (equens feu indici x-h i comi- 

 petens : erit y^zzmy-^-^c : vnde fiet : 



Poiiatur yzz^u- ^L- ; eritque -.: .-{-v>m^. 



»71;— -yn- T:;;-f-77:7r^-i-;7:7rj -i- etCo- Iv iii :,^ 



quae aequatio cum' cong.ruar: cum' ea', quam; in problema«' 

 te praecedcnte ini.ienimus ;, fi" ponatur fin. izxzizr tt coC- 

 Tirv — s- atquc-' (^ fumatur pro' fuoifHone' quacunque prarinmi' 

 dimenfiomim ipfirum r ct j ,, erir 1; — ^«'^Q^i ideoque 

 jiizw^^Q^- :^zrr- Ponatiir a""! , quo cafu fit yr^o ec 

 j:— - I , abentque Q_ in C , oportet efle a lizmQ — 



^- ideoque erit C-:^-i-;^£r.Tji Qiiare' fi pro Q_ fu-- 



inatur qunntitas conft-ansi C ipfa , eriu j^ tjz nf~' a -H«. 



it}f~' i]c' 



— —— pro cafu. fimpliciflimo: Atque fi P fit fundio 



parium dinienfionum ipfirum r et s talis q ae e ;anefcat 

 pofito xm , poni poterit Q_ — C-l-P eritque rcimini 

 gcner.!lis quaefui forma' latilfime patens j zzm'^~'' a -i- 

 Im''-'-!^" • ■' ■\u:>''''Vr :■ -'^ ' frri^ > 

 ^-/«'^P. Q. E. I. ' =■ 



ProbIe*<- 



