m ) ° ( & 
»is 
ipfum aequalem esfe fra&loni 
Quum enim 
3 = VI — e 3 ; erit 7 = — .= (1— 
quae quantitas, ope Theorematis Binomialis, inve* 
nitur esfe æqualis toti termino illi primo ( i -f- 4 - e a 
+ | ^ + tV * 6 &c); cujus itaque feriei omnes 
termini in infinitum excurrentes, in calculum in- 
duci funt, adhibita frafUone — : quo fa&o, tota 
s 
Coëfficiens ipfius dy erit — 4 * (— — £e\)Co£y 
s 
4- ( — J e* 4- tV e 6 ) Cof. iy 4- (i tf 3 4- | <4)Cof. g.y 
4- ( — I — xV ^ 6 ) Cof 4j 4- Cof. e? 6 Cof.6y, 
Hoc Parenthefeos vaiore fubftituto, & multi- 
2sdt 
plicatione utrinque facta per s 9 oritur : feli 
i — e 4 
2dt 
= £1 4- (— 4 se* — 4 i-e ? ) Cof. y 4- (— i 
4 - se 6 ) Cof iy 4- (£ se'' -h^se*) Cof 3 J 4“ ( — 
— ïV sg6 ) Cof 4 v 4- 1 Cof 5 j/ — / T Je 6 Cof 6 ^J «Ty. 
2dt 2 
Quia jam — , ob conflantem —, proportionale 
s s 
eft ipfi dz feu fluxioni Anomaliae mediae; habetur 
2 1 
integrando — feu z = y 4- (— i se* — | f ) Si n<jr 
4-C— 4- / 5 Sin. 2 ^ 4 - ^ 5 4 - ïV« 0 Sin. 3 jr 
4- (■— / s ^ 6 ) Sin.^ 4- & se 9 Sin.jj — rfasc? 
Sin. 6 y. Ii 3 U£ 
