Show $h(x) in F[x]$

$Q)$ There are fields $mathbb{Q} subset F subset K$ (Here the $mathbb{Q}subset $F and $mathbb{Q}subset $ K are Galois extension)

Say the $f(x) in F[x]$ and $g(x) in mathbb{Q}[x]$ with $f(alpha_1) = g(alpha_1)$ for some $alpha_1 in K$. Plus $f$ has roots $alpha_1, alpha_2$ and $alpha_3$ in $K$

(Here the $f$ is a irreducible over $F$ and the $g$ is a irreducible over $mathbb Q$
)

There is a $phi in G(K/mathbb{Q}) s.t. h(x) = (x-phi(alpha_1))(x-phi(alpha_2))(x-phi(alpha_3))$ with $h neq f$

Show $h(x)$ is a irreducible in $F[x]$

---

I’ve already shown under hypothesis, $h(x) in F[x]$ (I.e. $irr(phi(alpha_1), F) = h(x) $ by using $G(K/F) lhd G(K/mathbb{Q})$)

But the problem is I couldn’t show $h(x) in F[x]$ the hypothesis that I used.

So I checked the answer sheet but it said

$f(x) = (x-alpha_1)(x-alpha_2)(x-alpha_3)$ and $h = phi(f)$

Hence $alpha_1 + alpha_2 + alpha_3 in F $, $alpha_1alpha_2 + alpha_2alpha_3+alpha_1alpha_3 in F$ and $alpha_1alpha_2alpha_3 in F$,

So the $phi(alpha_1 + alpha_2 + alpha_3), phi(alpha_1alpha_2 + alpha_2alpha_3+alpha_1alpha_3), phi(alpha_1alpha_2alpha_3) in F$ (I.e. $h in F[x]$).

Why does those results happening? I can’t understand Why does the $phi$‘s image of those are element in $F$ at all. Any help always welcome. Thanks.