a) How many two-factor unordered factorizations, where each factor is greater than 1, are there for 156,009?
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b) In how many ways can 156,009 be factored into two or more factors, each greater than 1, with no regard to the order of the factors?
c) Let p1, p2, p3, . .. , pn be n distinct primes. In how many ways can one factor the product
Into two or more factors, each greater than I, where the order of the factors is not relevant?
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Related Book For
Discrete and Combinatorial Mathematics An Applied Introduction
ISBN: 978-0201726343
5th edition
Authors: Ralph P. Grimaldi
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