C ii^p ) 
QoroUorium ^"^' 
Si m ponatur sequalis Termioo cuivis, qui nonio limitationes 
prascedentcs cadat, Curva cujus ordioata— ^-•^— 
neque'quadratur esafte,, nec a Circulo aut Hyperbola pendet, 
fed ad Curvam fimpliciorem reducitur, 
Theorema 3''"' 
SitAKmCutvx cujusAbfciffa;v,ordinatimapplicatax^/y^;^ 
fit B area Curvse cujus Abfcifla itidem x, ordinatim applicata 
^ 2 » ^ ri^^ ponatur f^ri^ =y. Erit. A =±i 
y in — — * in in ^ — ' in ^ O^c. = P... 
I ■ m"^ ^ 
m 
+ 2 
rr — I - 3 3 
_ - in in — x ^ — 
w — 2 2 f» 
Corollamm i"'"* 
Si m exponatur per terminum quemvis (equentis ferlei r, j, 
5", 7 9, Sic. Q_jadratura Cur vaz cujus ordinata x'"" j-r-i-^: aut 
x'« y finua evadit, exhibeiur per hoc Theorema. 
QoroU 
