Are all highly composite numbers even?

prime-numbers elementary-number-theory prime-factorization

Solution 1:

Yes. Given an odd number $n$, choose any prime factor $p$, and let $k\geq 1$ be the number such that $p^k\mid n$ but $p^{k+1}\not\mid n$. Then $n\times\frac{2^k}{p^k}$ has the same number of factors, and is smaller.

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