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Theorem 27

[0DR](Solved on 2022-12-13) Consider the series \(βˆ‘_{n=1}^∞ a_ n\) where the terms are positive: \(a_ n{\gt}0\). Define

\[ z_ n = n\left(\frac{a_ n}{a_{n+1}}-1\right) \]

for convenience.

  • If \(z_ n ≀ 1\) eventually in \(n\), then the series does not converge.

  • If there exists \(L{\gt}1\) such that \( z_ nβ‰₯ L\) eventually in \(n\), i.e. equivalently if

    \[ \liminf _{nβ†’βˆž} z_ n{\gt}1\quad , \]

    then the series converges.

In addition, fixed \(h∈ {\mathbb {Z}}\), we can define

\[ z_ n = (n+h)\left(\frac{a_ n}{a_{n+1}}-1\right) \]

or

\[ z_ n = n\left(\frac{a_{n+h}}{a_{n+h+1}}-1\right) \]

such as

\[ z_ n = n\left(\frac{a_{n-1}}{a_{n}}-1\right) \]

and the criterion applies in the same way.

Solution 1

[0DS]

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