472 Chapter 8 • Infinite Series of Real NumbersSince the sum on the left is telescoping, this saysThus, the partial sums of L ak are bounded, so it converges.
(b) Suppose the hypotheses of (b) hold. Then 3 0 < r :::; 1, n 0 E N 3Thus, { kak+ 1 } is monotone increasing for k 2: n 0. Thus, from these in-
equalities,So, 3 c > 0 3
c
k 2: no =? ak+I 2: k.But L ~ diverges, so by the comparison test, L ak diverges. •
Corollary 8.2.21 (Raabe's Test, Limit Form) Suppose 2:ak is a series
of positive terms, and suppose R = lim k (1 -ak+l) exists.
k->oo ak
(a) If R > 1, then L ak converges.
(b) If 0 < R < 1, then L ak diverges.
( c) The test is inconclusive if R = l.Proof. Exercise 42. •Example 8.2.22 Both the ratio test and the root test are inconclusive for the
1
p-series L kP (Exercise 35). To apply Raabe's test to the p-series we first note
that
ak+l (k + 1)-p kP
ak k-P (k+l)P.