Advanced High-School Mathematics

(Tina Meador) #1

SECTION 5.2 Numerical Series 271


nlim→∞

(
√^1
n+ 1

)

( 1

n

) =∞,

showing that the terms of the series


∑∞
n=0

1


n+ 1

are asymptotically

much bigger than the terms of the already divergent series


∑∞
n=1

1

n

. There-


fore, by the Limit Comparison Test,


∑∞
n=0

√^1

n+ 1

diverges.

Example 3. The series


∑∞
n=1

n^2 + 2n+ 3
n^9 /^2

converges. We compare it

with the convergent series


∑∞
n=1

1

n^2

:

nlim→∞

Ñ
n^2 + 2n+ 3
n^9 /^2

é

(
1
n^2

) = limn→∞n

(^2) + 2n+ 3
n^7 /^2


= 0,

proving convergence.


Example 4. The series


∑∞
n=2

1

(lnn)^2

diverges. Watch this:
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