( to7o ) 
iiutse; quibuS datis, coefficientes literarum in diverfis 
terminis formantur ex multiplicatione continua nume- 
rorum i, — . &c. Ubi pro n Tub- 
fticuendus eft ultimus Fadorum in Denominatore. 
Ultima quantitacum x — 1, zljx — 2, ^ijx — 4, 
— 8, 16, &c. sequalis eft Logarichmo 
numeri x. Pro x fcribe 2. & per repetitam excradio- 
nem radicis quadratse exibunt numeri 
JM= 1, 0000, 0000,0000,0000. 
/.=; 8284,2712,4746,1901. 
/=r 7968,2864,0010,8843. 
7240,6186,1322,0613. 
6 = 7083,8091,8838,6214. 
= 7007,087^,693 1,73 3 7. 
£= 6969,1430,7308,8294. 
V = 6950,2734,2438,7611. 
C =: 6940,8641,2891,8363. 
B =: 69^6,1698,4799,4014. 
6933,8182,9699,9493. 
Dicatur ultimus numerorum penultimus B, & Tic 
retro, atque Logarithmus quxfitus erit ^ -| 1 - 
lA — ^B-+C t^A — .I4B-4-7C— D ,6^A — ■tzoB-4-7oC — rfO+H 
1.3 1.3.7 * . 3 • 7 - 15 
4 -&C. Prirai quinque termini dant 6931,4718,0999, 
9497 pro Logarithm© Hyperbolico Binarii. Et quo- 
modo hsEc Series procedit in infinitum facile colligiturex 
eo quod de priore diximus: eftque etiam univerfalis, ' 
proprietates Hyperbola minime relpiciens. 
Extenditur quoque Methodus h^cce Difierentialis ad 
Refolutionem .^£quationum & alia quamplurima quorum 
hie non fit mentio- Continetque fundamenta Serierum ge- 
neraiiftima; ut inRedueftione ^quationumlrrationalium 
& Fluxionalium brevi forfan mohftrabo. 
ly. 
