# Conjecture that most finite groups are nilpotent

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For any natural number $n$, define $g(n)$ as the number of Finite group (?)s whose order is at most $n$, and let $g_{nil}(n)$ be the number of Finite nilpotent group (?)s whose order is at most $n$. The conjecture is that:
$\lim_{n \to \infty} \frac{g_{nil}(n)}{g(n)} = 1$