519 
Torsâ — esse s um ma ni co efficientium umnium in Deri 
Tata ordinis numero pari • ..... 
i=ij) 2]> f=2p l=i , 
■1,20^ S f, = o = .s .s{-im<+ 
i=:l 1=1 A- 1 ‘ ^ -■ 
at in Derivata ordinis numero impari . 
t/J+I 2;>fl / 2;>+l 3p+l 2;'+>\ 3p+l 
s ^7, = 2 r c\ + c\ + + j + 
seu potius 
i=-ip-\ op-1 {—p-l 2V~t op-x 
;2i) . . . .■ S Ci = 2 S Ci C . 
i~\ i=i 
t 
i 
n n 
2. Quoniam (7,- = ( — aequatio(14)l)a n f 
suppeditat legem ”recursionis” quantitatum C: 
> 
• f ' . 
122) ”c;=.-c,-(„_;+2)C,., . ^ 
5. Ex ista ^consequitur 
- i=n+i ii-l-i t'— re 4-1 re i=n 4 - i n 
S Ci = St Ci — S ti — ^ 
1=1 1=1 i=i 
« 
-- ’ »=n n i=re-f-i n 
= Si Ci — S{tt — , 
* *■ • • 
. - *— l ‘=2 
• «■=» ' n 
= S (2i — n — l) C,., 
' »= 1 
