Let $\alpha$ be a unit of degree d in an algebraic number field, and
assume that $\alpha$ is not a root of unity. We conduct a
numerical investigation that suggests that if $\alpha$ has small Mahler
measure, there are many values of n for which $1-\alpha^n$
is a unit and also many values of m for which $\Phi_m(\alpha)$ is a unit,
where $\Phi_m$ is the m-th cyclotomic polynomial.
We prove that the number of such values of n and m is bounded above by
$O(d^{\;1+0.7/\log\log d})$, and we describe a construction of Boyd that
gives a lower bound of $\Omega(d^{\;0.6/\log\log d})$.