25% 441.5 
ZVTOINAOD RNCONSBEGEVE!D HODtTT 11,7 2% 
Unde ipfius 3 quadratum , nem mpe'#2 ja conficier" primum membrorum, 
que fub vigewlo fung »00r4 127 
Quoad alterummmembrum, quod 1 {ab vinculo eft, quia hie »—g,-.debe- 
bit ultimus numeratoris terminus eff Cubüs ipfi us zn vel ıo, id et 1000, 
m  — m WE 
=E 
Be, illud membram dabit 8464 2164512 F 10008 — "5; 
rt rd I FRONT 36 
—— BIT nd 
ne ehmetr 
‚18 44 5 6 72 zB250 ‚136: 12600... 
Denique terrium ae Sub, zanı® membrum eft jur 
3 ‚30250, 330750, 
1846724250 5463 To ve 22050 „id elt'is, Hine 
totum illud membrum‘ itrationäle evader. ergo VoTrkız. Gr $ Ergo 
extremus quefitus numerus erit, major 7 zZ £vel 6; minorz re — sven. 
Ergo horum extremorum differentia 6—1, vel 5. divifa per n—5.ejus quoti= 
ensı erit differentia Progreflionis; unde ar numeri erunt 1,2.3.4.5. 6. 
Pe No rn 1 f 
IR Exemplum, ” 
e7 
Queruntur nufmerinovemin progrefione Aikkunsite, quorum fumma 
Sie 39. fumma autem Cuborum 927}, _ Hic eft a—39: Bagr7E. ce 9. un- 
'den=e— 18. pfoinde hic producemus in formula terminos usque ad 
a— 16. inclufive, Jmwfn/ me, n rationale fiet > 
4.6%16.47&36.2+ Zr; ar 14442 196.6 75256. 8 
3.364.166, 4#8.0’F 10,4 F 12.166 14.308 16. 64 
> = guod valet u RE FR u Te — 
“9 7266 4 E24 F 40192 HE504F1024%° 9 
= Inn id eft 44 feu - = Unde hujns quadratum , nempe n erit 
_ Jaum membrum fub vinculo. 
su. At 
E. 
3 
. 
