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Theorem 2.19 (Archimedean Property). For any given real number x, there is some natural number n such that n > x. | Theorem 2.19 (Archimedean Property). For any given real number x, there is some natural number n such that n > x. | ||
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| + | == MA453Spring2009Walther == | ||
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| + | In MA 341 we used the Archimedean Property all of the time. My professor showed us its usefullness and I think that it is a very good theorem. | ||
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| + | Theorem (Archimedean Property). For any given real number x, there is some natural number n such that n > x. | ||
Latest revision as of 05:22, 16 January 2009
In MA 341 we used the Archimedean Property all of the time. My professor showed us its usefullness and for that I would like to list it here.
Theorem 2.19 (Archimedean Property). For any given real number x, there is some natural number n such that n > x.
MA453Spring2009Walther
In MA 341 we used the Archimedean Property all of the time. My professor showed us its usefullness and I think that it is a very good theorem.
Theorem (Archimedean Property). For any given real number x, there is some natural number n such that n > x.
