HYPERGEOMETRICA. $t 



Eodem modo pro littera R 



fi m — o, i, 2, 3 4 , 5 <y 



z\ 3-7R~o, 3, 48, 205, 54-4-, ii35, 204S 

 Diff. I. 3, 45, 157, 339, 591, 913 

 Diff II. 42, 112, 182, 252, 322 

 Diff. III. 70, 70, 70 



rnde concluditur 2 6 . 3. 7 R z= 3 m -4- mm(m— 1) 



~-\-\ 5 m(m—i) [m— 2) 



atque R == 2 6;i^7 1 



quos eosdem \alores iam fupra fumus na&i , hinc 

 igitur eandem operationem ad litteras fequentes ac- 

 • commodemus. 



XXIII. Pro Iit^era igitur S habebimus : 



fi fuerit w — o, 1, 2, 3, 4, 5) 6 



2 8 .5.9S~o, 5, 256,2013,7936,22085,49920 



Diff I. 5,251,1757,5923,14149,27835 

 Diff. II. 246, 1506, 4166, 8226, 13686 



III. 1260,2660,4060,5460 

 IV. 1400, 1400, 1400 

 vnde flt 2 ' 5 . 9 S zi 5 m + 1 i%m (m- 1 )-{- 2 1 om(m 1 )(m- 2) 



•4 l \ 5 m\tn-i)\?n-z)[m-i) 



e *. c m(i75'm ? — 420 m- -4- n^ m — n<) 



Nunc porro pro littera T habebimus : 



G 2 fi fuc- 



