Prove that $\sqrt{3\pm\sqrt{7}} \not\in \mathbb{Q}(\sqrt{3\mp\sqrt{7}})$.
Let $x_{\pm}=\sqrt{3 \pm \sqrt{7}}$.
It is easy to see that we have the following quadratic extensions:
$\mathbb{Q} \subset \mathbb{Q}(\sqrt{7}) \subset \mathbb{Q}(x_+)$,
$\mathbb{Q} \subset \mathbb{Q}(\sqrt{7}) \subset \mathbb{Q}(x_-)$.
Assume that $x_+ \in K=\mathbb{Q}(x_-)$. Then $\sqrt{2} = x_+x_- \in K$, thus $L=\mathbb{Q}(\sqrt{2},\sqrt{7}) \subset K$.
Since these fields have the same degree over $\mathbb{Q}$, $K \subset L$, ie $x_+=a+b\sqrt{2}+c\sqrt{7}+d\sqrt{14}$ for rationals $a,b,c,d$.
Taking squares, we get $3+\sqrt{7}=(a^2+2b^2+7c^2+14d^2) + (2ab+14cd)\sqrt{2} + (2da+2bc)\sqrt{14} + (2ca+4bd)\sqrt{7}$.
Thus $ab=-7cd$, $ad=-bc$, $2ca+4bd=1$, $a^2+2b^2+7c^2+14d^2=3$.
Assume $a=0$: then $d \neq 0$ thus $c=0$ and $bd=1/4$, $2b^2+14d^2=3$. Usual quadratic theory yields then a contradiction.
Thus $b=-7cd/a$, and $ad=7c^2d/a$ thus $a^2=7c^2$ hence $a=0$. A contradiction, hence the result.
HINT: Show that both have minimal polynomial $f:=X^4-6X^2+2$ over $\Bbb{Q}$, and hence that $[\Bbb{Q}(\sqrt{3\pm\sqrt{7}}):\Bbb{Q}]=4$, but that the splitting field of $f$ over $\Bbb{Q}$ has degree greater than $4$.
In general, in this kind of problem, it is better not to mix the two operations + and $\times$. Let me give an illustration here, using only $\times$. Introduce the quadratic field $k=\mathbf Q(\sqrt 7)$. Adopting the notation $x_{\pm}=\sqrt {3 \pm \sqrt 7}$ suggested by @Mindlack, let us write $K_{\pm}=k(x_{\pm})$. These are two extensions of $k$ of degree at most $2$ :
if $K_{+}$ or $K_{-} =k$, i.e. $(3 \pm\sqrt 7)\in {k^*}^2$, norming down to $\mathbf Q$ shows that $N(3\pm\sqrt 7)=2$ is a square in $\mathbf Q^*$: impossible
if both degrees are 2, $K_{\pm}\subset K_{\mp}$ iff $K_{\pm}= K_{\mp}$, iff $k(x_{+})= k(x_{-})$, iff $2=(3+\sqrt 7)(3-\sqrt 7)\in {k^*}^2$ (no specific calculation, this is rudimentary Kummer theory over $k$), iff $\mathbf Q(\sqrt 2)=\mathbf Q(\sqrt 7)$, iff $2.7$ is a square in $\mathbf Q^*$(again by Kummer): impossible because $\mathbf Z$ is a UFD ./.