Solved: a. The Archimedean property for the rational
Chapter 5, Problem 5.187(choose chapter or problem)
a. The Archimedean property for the rational numbers states that for all rational numbers r, there is an integer n such that n > r. Prove this property. b. Prove that given any rational number r, the numberr is also rational. c. Use the results of parts (a) and (b) to prove that given any rational number r, there is an integer m such that m < r.
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