37 
(28)....( et 
(- 1 
2m+2/> (2/>-l)! 
(- 1 ) 
m-i 
A""* 
r 
p=^ 
-.S3 
2in^2jj-i 
(2m-])!L 2m 
Jamque adhibita relatione illa 
1 
2m+2p {2p-l) 
(29) 
lim. — 
ir -\- 1 
(2r+I)(2r-f2) ( 27 ^)^ ’ 
res est in aprico. — 
Quae ciiin ita sint, ex (27) habentur 
(.50> 
/ /t \2m^iy=2m^rn , /»=» 
I I C ^ 1 o Q /o f Q, V~^<^2tn^2n-\ *1 
/' (2m^rz:(-l) A S{-\) ^ ■- ^ - — 
77 = 1 
2m+2p {2p - 1 ) ! ’ 
7>=co 
2 m-l C’ / . ^ 7 >-l«^ 2 »n- 4 - 27 >- 
S(-i; 
li 1 
7 ( 2 ») ! J 
/ /t \2m ;>=2m-i2^_, - p. 
In— I . S -1.2.3...(2m-I)=:(-I)V”‘. 
Ve'‘-V ;,=x ^ ; L 2m ^ 2m+2p (2p) 
quæ quidem ambæ pro h = o in formulam (12) Part. I:æ abeunt 
atque praeterea, a* quolibet cujus modulus < 2:1 sit, no- 
tandam hanc induunt formam {m num. int.): 
( 51 ). . .. 
i— 2 m-i 2 m - 1 . 
S 
i=i 
r( 2 m) 
_J 82 m-l 
(e-"— 1)^»‘ 
2m 
i=2m 2m 
S J.e " 
i=i 
•- 
r^2m+l) 
S52m 1 
(g-v_j)2m+i 
2»l f 1 
2m+2 
2m-t-i «02m-(-5 , 
. — ; . H (VC. 
2m+2 2! 2m+4 l! 2f7i+G 6! 
2m-l-.î *'' . 
— “7 * t: “r 
2 m 4- 5 a 
.5 
2/71+6 5 1 
— dc. 
8 
