For any field $k$, let $\mu(k)$ denote the roots of unity in $k$.  Now let $k$ be a number field and let $v, w$ be non-archimedean primes of $k$ with distinct residual characteristics.  Does there exist a finite Galois extension 
$K/k$, with $v',w'$ primes of $K$ lying over $v,w$, such that $\mu(K)=\mu(K_{v'})=\mu(K_{w'})$?