SFHAEROIDICO-ELLIFTICORFM 105 



i~xx) 1 . 



XX 



X^ 



..6 



^ aCY (bb-\-cc) " ac 3 V' (bb-^-ccY^ ac 5 V (bb-\-cc) ac 7 V( bb-\-cc) 

 \(aa—bb)xx i(aa—bb)x* 1 (aa—bbx 6 



\a z c(bb-\-cc"% 



ia 3 c z (bb-\-cc)\ za 3 c 5 (bb-\-cc)\ 

 1 . 3 (aa—bb fx* 1 . 3 .(aa-bb) 2 x 



-f-etc. 

 t-etc. 



L 



Siue iequente fbrma ftccincliori adhiblta , 



"2 .4.« 5 ^-+-^)| 2. 4^ 5 ^ 3 (bb-\-cc)\ 

 i.^. $(aa-b byx 6 



H.6a 7 c(bb-\-cc)l 

 habebitiu' 



et«. 



etc 



_t vVvV . vV -i/V 



(I- — h — r 



<CC C^ <£T 



X s 



— ect. ) 



•*y» »p vvV-f ti*6 ■» »8 



♦•v 1A» ^v vl< „ -vv 



acY(Jbb^t-cc) 



3. aa — bb)c 



_ i — f _ — _i_— . — —4 — .— etc . ) 



2a 3 (bb-hccv s cc^c* c* c< 

 1 ."%(a a—bj^ 



'V 



•vv ^v ■ 



X' 



■-.^(bb-^-cc)^** c^c" etC '^ 



itdxy^Jaa-ax) 



.3.$(aa—bb) 3 c 5 



-+-■ 



2.4.6a 7 (bb-\-cc)l 

 i.^.S."j.{aa—bbYc 7 



2.+.6.Sa 9 (bb-\-cc% 

 1.3.5.7.9 (tftf—W/ 5 - 9 



, x* . x 9 



«/18 »1*1 



/ - »>V »/V 



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 ;4-etc.) 



«.10 



-(--^— t-etc. 



.10 



2.4.6 .^.loa^ibb-^-cc)^ c l 

 Si nunc huius -expreiTionis iinguli termini feorfim Inte- 

 grentur per formulas datas pro hypothefi xzzza. attractio 

 quaefita habebitur j at commode hic accidit , vt poft inte- 

 grationem fingulae leries fummationem admittant ; quod quo 

 melius pateat confideremus cuiusque feriei integrale feorfim, 

 eritque integrale huius ^bdxV (aa—xx)( 1- ^7$r% ~ %-\-^» -etc) 

 quod reperietur-ZTrC^ g +^~^V^ c ¥-etc.) 



Simili modo erit J\bdx~Y (aa-xx). p|?HrfM^H-etc-J 

 Tom. X. O 



