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    The saturation principle applies to the hyperreal line — Carmelics
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    Supports→An infinite (nonstandard) hyperreal exists

    The saturation principle applies to the hyperreal line

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    An infinite (nonstandard) hyperreal existsThe saturation principle implies the existence of a hyperreal a such that a > n ...

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    The saturation principle implies the existence of a hyperreal a such t...87%The hyperreals include all standard reals plus additional elements ent...86%The hyperreal line (the inflate of the reals) is an ordered field76%Robinson's hyperreals satisfy a transfer principle75%

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    Now suppose that the set \(\bbN\) of natural numbers is a member of \(U\). Then so is the set \(\Re\) of real numbers, since each real number may be identified with a set of natural numbers. \(\Re\) may be regarded as an ordered field, and the same is therefore true of its inflate \(\hat{\Re}\), since the latter has precisely the same first-order properties as \(\Re\). \(\hat{\Re}\) is called the hyperreal line, and its members hyperreals. A standard hyperreal is then just a real, to which we sh

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