On the Interval [n,2n]: Primes, Composites and Perfect Powers
Abstract
In this paper we show that for every positive integer n there exists a prime number in the interval [n,9(n+3)/8]. Based on this result, we prove that if a is an integer greater than 1, then for every integer n>14.4a there are at least four prime numbers p, q, r, and s such that n<ap<3n/2<aq<2n and n<r<3n/2<s<2n. Moreover, we also prove that if m is a positive integer, then for every positive integer n>14.4/(|[m]1.5|-1)m there exist a positive integer a and a prime number s such that n<am<3n/2<s<2n, as well as the fact that for every positive integer n>14.4/(|[m]2|-|[m]1.5|)m there exist a prime number r and a positive integer a such that n<r<3n/2<am<2n.
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