   Chapter 11.6, Problem 13E

Chapter
Section
Textbook Problem

# Use the Ratio Test to determine whether the series is convergent or divergent.13. ∑ n = 1 ∞ 10 n ( n + 1 ) 4 2 n + 1

To determine

Whether the series is convergent or divergent.

Explanation

Theorem:

If a series an is absolutely convergent, it is convergent.

Result used: The Ratio Test

“(i) If limn|an+1an|=L<1, then the series n=1an is absolutely convergent (and therefore convergent.)

(ii) If limn|an+1an|=L>1 or limn|an+1an|=, then the series n=1an is divergent.

(ii) If limn|an+1an|=1, the Ratio Test inconclusive; that is, no conclusion can be drawn about the convergence or divergence of n=1an.”

Calculation:

The given series n=1an=n=110n(n+1)42n+1.

Here, the nth term is, an=10n(n+1)42n+1.

Thus, the (n+1) th term is, an+1=10n+1(n+2)42n+3.

Obtain the limit of |an+1an|

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