Let $K$ and $L$ be extensions of a finite field $F$ of degrees $n$ and $m$,respectively.
How do I show that $KL$ has degree $\mathrm{lcm}(m,n)$ over $F$ and $K\cap F$ has degree $\gcd(m,n)$ over $F$?
Let $K$ and $L$ be extensions of a finite field $F$ of degrees $n$ and $m$,respectively.
How do I show that $KL$ has degree $\mathrm{lcm}(m,n)$ over $F$ and $K\cap F$ has degree $\gcd(m,n)$ over $F$?
Hint. A field of order $p^n$ is contained in a field of order $p^m$ if and only if $n|m$. $KL$ is the smallest field that contains both $K$ and $L$, and $K\cap F$ is the largest field contained in both $K$ and $L$. Translate the inclusion statements into divisibility statements.