32 
= ^ (v) . c-" f 1 — ^ j y — y '+ ÿ"— 
I / , {»«) I 
+(-i) y + 
w=m Qt^ 
+S(-'r'Srf(y+[2f'-'l.y'+[2/>-iLy"+....+[2/)-i],„ÿ‘'”’j+ 
P= 
+ ( 
(2p)! 
-l)Vr///,/.^"+\a/''”"+-' +//,/.“'•+* +d.c.^, 
\ 
SÎ modo series ilia (8), I. e. heic 
/.(2«+0 ^(2n-h2) ^,(2»» + 3 
— ff/ , — af 
• 1 lx O » / , 
> « / 5 / Î 
•’t 2! 'a 3! 'a 
sen secundum (22) ista 
^ T ’ )l ‘^(^■'■'/0+ + (2” + 1 > 
— j^a(e-'-|/)+(2« + 2)^o(e-'y')+ +(2n-f 2)„^a(e-^i/("'))j , 
— j^a;e-ry)-^(2n+3),o(e^y')+ +(2« + 3),„o(e^i/("‘))j , 
&c. 
:C.| 
convergens sit: talem vero eam esse ex eo liquet, quod con- 
vergens est unaquæque (numero m+l finito) serieruin verticali- 
um, ut per se patet. — 
In æqu. (25) t7 (.v) = o erit. — Scilicet secundum defini- 
tionem Tr(Ar) heic eadem manebit x quolibet, quemcumque 
ipsi h tribuis valorem, cujus modulus infra 27 t sit. At pro 
