This is a exercise question from Denis Serre, Matrices: Theory and Applications.
Let $M$ and $N$ be two similar matrices in the field $K$. Let $k$ be the subfield spanned by the entries of $M$ and $N$. We have to show that $M$ is similar to $N$ in the subfield $k$ also.
Any hint or complete solution will be really helpful.
$M $ is similar to its rational canonical form $R_M$ over the sub field $F$
$N$ is similar to its rational canonical form $R_N$ over the sub field $F$
now the rational canonical form is unique $\implies$$R_M$ is the rational canonical form of $M$ and $R_N$ for $N$ over the field $K$
now as $M \sim N$ over $K$ $\implies R_M $ =$R_N$ hence $M$ and $N$ have the same rational form over the subfield $F$ $\implies M \sim N$
