Given a series ∑k=1∞ak, in general the divergence test is inconclusive when ak→0. For a geometric series, however, if the limit of the terms of the series is zero, the series converges. Explain why.

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Q. 5

Question

Given a series $\sum_{k = 1}^{\infty} a_{k}$ , in general the divergence test is inconclusive when $a_{k} \to 0$ . For a geometric series, however, if the limit of the terms of the series is zero, the series converges. Explain why.

Step-by-Step Solution

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Answer

Geometric series are convergent only when the ratio holds $|r| < 1$ .

1Step 1. Given Information.

The series:

$\sum_{k = 1}^{\infty} a_{k}$

$a_{k} \to 0$

2Step 2. Consider the series.

Consider the geometric series,

$\sum_{k = 1}^{\infty} c r^{4}$

The value of the series is $0$ only when the ratio is less thatn one.

3Step 3. Geometric series are convergent.

Geometric series are convergent only when the ratio holds $|r| < 1$ .

So, for a geometric series, if the limit of the terms of the series is zero, the series converges.

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