EDB β€” 0F4

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  1. [0F4]Note:Written exam of 4th Apr 2009, exee 1.(Proposed on 2022-12-13) Given a sequence \((a_ n)_{n}\) of strictly positive numbers, it is said that the infinite product \(∏_{n=0}^∞ a_ n\) converges if there exists finite and strictly positive the limit of partial products, i.e.

    \[ \lim _{Nβ†’+∞}∏_{n=0}^ Na_ n ∈ (0,+∞)\quad . \]

    Prove that

    1. if \(∏_{n=0}^∞ a_ n\) converges then \(\lim _{nβ†’+∞}a_ n=1\);

    2. if the series \(βˆ‘_{n=0}^∞|a_ n-1|\) converges, then it also converges \(∏_{n=0}^∞ a_ n\);

    3. find an example where the series \(βˆ‘_{n=0}^∞(a_ n-1)\) converges but \(∏_{n=0}^∞ a_ n=0\).

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