rum, &c. 14-4"^ } ^4~^ l % 
i-\-z\\ i+z-f, &c. sequidiftantium, 
hinc inde excurrente in infinitum- Adeoquc Arex ab 
hifce Ofdinatis genitas conftituent feriem confimilem, 
cujus medius terminus eric Area quaefica; quse proinde 
obtinebitur per Seriem modo expofitam. Quando z eft 
unitas, ut in cafu prsefente, arex curvarum evadunt 
&c. a. K f, & I, r, h r. Hinc eft i + 
* i n — 5 1? — 15 rmL_L2.r=” D — ’J I »5 — i?s 
r==r» ^r“r“r« — ^ *> ^ 4~r«4 «4» 
&c. Hifce in Serie fubftitutis, prod it P, id eft, area 
Hyperboix, | + <Sic. id eft, — 
4^ 4^ 5^ o ¥ Tl- - • A 
— &c. Ubi jam A 
4-3 4-5 4-7 4-9 4 -” 
JB, C D, &c. more Mewtoniano, defignant terminos in (uo 
ordine ab initio. Calculum appono. 
AffirmatWi 
7 yoo,oooo,oooo, 0000,0 
61,5:000,0000,0000,0 
7440,47^^j9047>^ 
97.5'58<^,9I30»8 
3 90.4086,1 
i 88,774S'.5 
2,7085,0 
393 j 4 
5.7 
Negathi. 
o 6 i 5 <oooo,oooo, 0000,0 
6,6964,2857,1428,5 
845,5086,5800,8 
11.3818,4731,9 
^585,7062,8 
22,5708,7 
3260,2 
47.5 
7 
’+ 7563 >^ 539 » 3930 , 7494 ‘I — 0631,7821,3370,8041,1 
Summam negacivam fubducens ab aftirmativ^, babeo 
pro Arei, id eft, pro Logarichmo Hyperbolico Binarii, 
numerum 6931,4718,0559,9453, 
Pro 
