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    The set of infinitesimal hyperreals is bounded but has no... — Carmelics
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    Supports→The hyperreals and standard reals satisfy the transfer principle for first-order logical results, but behave differently for results about sets.

    The set of infinitesimal hyperreals is bounded but has no least upper bound.

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    The set of infinitesimal hyperreals has no least upper bound.

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    Every bounded set of standard reals has a least upper bound.

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    The hyperreals and standard reals satisfy the transfer principle for first-order...
    The set of infinitesimal hyperreals has no least upper bound.

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    The set of infinitesimal hyperreals has no least upper bound.97%An infinitesimal hyperreal exists84%Nonstandard infinitesimal hyperreals exist in substantial number83%Any hyperreal whose absolute value is less than 1/(n+1) for every natu...83%

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    For results stated in a first-order logical language, the hyperreals and the standard reals satisfy the transfer principle. But for results about sets, they behave differently. Every bounded set of standard reals has a least upper bound. However, for instance, the set of infinitesimal hyperreals is bounded (every member is less than .00001, among other bounds), but there is no least upper bound (no infinitesimal is an upper bound for all of the others, and every finitely large upper bound can be

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