THE HYPERGEOMETRIC FUNCTION
235
in — xP n it is
The coefficient of x n in x 2 F" is
n(n-Y)P n ,
n(a+ w)(/3 + ri)
in (a + /3 + 1) xF' it is
in — 7F' it is
7 + n
w (a + /3 + T) P n ,
in a/3F it is
(a+'n)(£ + №)
7 7 + n Fn ’
a/3P n .
Adding all these gives the coefficient of x n in the left side of 1).
We find it is 0.
191. Expression of F( K afi r yx') as an Integral.
We show that for | x | < 1,
B(J3, 7 — /3) • F(a/3'yx) = Ç 1 vP- 1 (t — u)y-P- 1 (l — xu)- a du (1
where B(p, q) is the Beta function of I, 692,
B(p, q) = uv-'O- — uf^du.
For by the Binomial Theorem
a • a + 1 «
a • a 1 • a + 2
i .a . a • « -t~ x 9 o , « • «*.-t* x T ^ s i
(1 — xu)~ a =1 + - xu-\ ——— x 2 u 2 H —-— xru d +
1 • 2
1-2-3
for \xu\ <1. Hence
J= f u^~ 1 (l — u)^-^ 1 (l — xu)- a du
Jo
= V- 1 (1 - uy-P-'du + £ ufi 0 -
+ “• “ +1 • rr 2 fwVi(l - up-P-'du + ...
1-2 «/o
= B (J3, 7 — /8) + «zi? (/3 + 1, 7 — /3)
+ ^^±I^5(/3 + 2, 7 -/3)+- (2
