( *94 ) 
hanc exterminetur 4 , 8c erit z=l. 
y+i 
cujus Differen- 
« • • 2 v 
tialis eft i= ~ — - j cujus Integrals per Seriem exprefla 
dat z =—2 
) + 3 > J + 5 / + 7 / 
8<c. Unde per Lemma i. . 
x-lb- fa* 
i i 
y 3; 3 5/ If 9J 
8cc. 
, t VdU-\-2d 
Exemplum 2 . Fiat £=v'44+24> undc z—l — — — 
v “p !• 
fumatur etiam ad libitum j>= 24+24, unde z — 
l.^—Vy V a cujus DifFerentialis eft — ^J-SScbu- 
y j j* 2^ 2^ , 
jus Integrals eft 2 =— 2 *^ +^+^rp +"^s See. Unde 
Lemma 1 . 
x~l.b-{- 2 
V 
,4 ^ %y 6 
2 4 2 6 2 * o 
+ — 5 + — ia Sec. 
+ 4/ . 5/ 
Exemplum 2. Fiat *=^44+24, .ut in precedent!, fed 
• jam aflumatur / = 244 +4"+ x * S * P er has duas i*qua- 
tiones exterminentur b 8c * ex Canone generali, erit 
%-l cuius DifFerentialis eft z =yy*y*— 1 | x 5 Sc 
y >; +i 
1 JL 1 
hujns Integralis perSeriem exprefla eft a — —^7 ^ 6 ““^ 10 
— 1 Sec. Unde per Lem. 1 . 
7J 14 
, I !.■«,« 
X— Ib-Y-y-Y — ^ —IO + 
5 /° ' 7/ 4 ' 
u*3 
8cc. 
Notan- 
