( I 1 2 I ) 
^ ^ in — - i» ' — - 5= P. 
m m — 2 »^ — ^^4 »? — ^ 
*- ^ ; = — ^ 
rr — I 
m -^.2 m 
fy^^ ^ m m ^ 2 
y 6 — I m I m — 5" ^-r 7 
. in • in * ■ :v j = ~ T, 
^ 6 m m ~ 2 w — 4 
Corollamm t"^' 
Si exponatur per terminum quemvis ftquentis feriei 
h 5s 7» 9' Qi^^dratura Curvx cujus ordinata 
— . , per hoc Theorenia habetur in finitis 
Terminis 
Qorollarium 2 
Svn exponatur per terminum quemlibet fequentis ferici i, 
X 3» 4j Curva cujus ordinatim applicata 
— — ^at — ' exade quadratur per hoc Theorema 
Mmrammmm Co 
