Question: Let $x,y$ be independent indeterminates over $\mathbb{Z}_p$, $K=\mathbb{Z}_p(x,y)$ and $F=\mathbb{Z}_p(x^p,y^p)$. Show that $[K:F]=p^2$ and that $K$ is not a simple extension of $F$.
This question (at least the second part) is asked and answered here: $F(x,y)$ over $F$ is not simple, but I thought this was an interesting way of approaching it, by first showing $[K:F]=p^2$. I figured that the minimal polynomial of $x^p$ over $K$ has degree $p$ and same with $y^p$ (I suppose we can say this since the indeterminates are independent of each other), thus we get $[K:F]=p^2$. But, I know that a simple extension has degree of the minimal polynomial, so, and I am not quite sure about this, is the degree of the minimal polynomial $p$, and so we get the contradiction? I am just getting a bit lost, but I figured it was a worthwhile way of showing this.. Any help is greatly appreciated! Thank you.