41 
l=2m 2.Hp. ^ 
iS (2m-2t+l)-- — V' - \ Sin(2m-2i+l )— J 
(2 Sin-) 
y \2ni+ 1 
Itaque ex (52) habentur quatuor hæ admodum generales 
1 = 2»«- 1 2 tH- I 
S Sm{m~i)v = o , 
i=i 
i—am-i 2W-1 
S Cos(m-iji; 
1=1 
®2m-i ^2n«-[-i y- ^2m + 5 * 332w^5 f' ^ 
( I, \2m 
2 Sin-) 
V 
2m 
■==— 4 
2m 2 m + 
— . — - -+-■ . 1 . — ■ -4- (Vc. 
2 2! 2m+4 4! 2»i+G 6! ‘ 
1=21» 2m 
V 
S Sin(2Mi-2t+l)— = 0 , 
t = i 2 
1=2 m 2Mi 
S ^,Cos(2»ï-2ï+l)- 
2 r(2wi+l) 
l = I 
(2Sinj 
\ 2Wl -1- 1 
I 
/ 
+ 
^2»i-f-i , ^2m + 3 ^2m-|-5 
^»n+i 2»« + 2 
— . 1 . j- 
2 i: ' 2 mj+4 3! ‘ 
2f/H-6 5! 
quarum prima et tertia idiomata numerorum admodum gene- 
ralia exhibent, reliquarum vero iitraque notandam sistit inlini- 
tam seriem summatam — 
*} Secunda illa et quarta 
quod aequatione (12) Part. I:æ 
praeterea in se continent idiuiua iiuinerorutu id 
I 
exbihetur. Elcnini (ut. supra est observaluo)}, etiamsi 
1) 
