( 628 ) 
Cn, == — (Byes 
Cn, ke (2) + (A)2 (25) — (A)s (3/2) m BLS tei A 1)/ (h/P) rns 
whilst we can calculate successively these coefficients, with the aid 
of the general identity 
k=m—h+j _ 
Crs, k = = Ck.j Cn—k, h—j + 
== 
The coefficients, appearing in the first seven terms of the series 
of polynomials, follow here. 
ml. 
m—2. 
ms. 
md. 
Mi, 
m6. 
nd. 
Cr =— 
Cor nn = P (,—1), Cao — A, 
1 
Can =— BBD), Ooa = (8-1), Cs = — A, 
1 1 : 
Car = EPBD DE) Cae = Fp A*(P-INTB-AD), 
Gs == > B (B—1), Cas = BS, 
1 
AET B (8-1) (3-2) (2—8) (2-4), 
i : 
C52 = 13 B (2—1) (8—2) (8 B—5), 
1 
C53 — rn pe (—1) (5 (?—7), C54 =a is (f—1), 
C5 =— fp, 
1 : 
Ca = — 720 B (8—1) (2—2) (2—8) (2—4) (2—5), 
1 
Cap = go BBB (81 2-182 8 + 137), 
1 
Ces = — 8 PS (2—1) (8 B—5) (2-3), 
Ces = 34 (B—1) (13 BIT), Cos = 2p (3-1), 
Ces = fs, 
1 
Cra = — =. 2 (A—1) (8—2) (2-3), (2@—4) (B—5) (F—4), 
5040 
1 
Cia = — B (8—1) (@—2)? (2—3) (38 B—7), 
T 120 
1 
Cis == pop PBD B) 43 #141 + 116), 
Cia = = ps (B — 1) (10 (22—29 2+ 21), 
Cis =— = ABI) (4B—5), Cre =3 (PTI), 
Cr, = — ll. 
