Let $K$ be some field extension of $\mathbb{Q}$ containing some complex number $c=a+bi$ with $a,b\in \mathbb{R}$ and $b\neq 0$. Is it possible that $K\cong \mathbb{R}$ as fields?
I tried to disprove this. We can define an order on $K$ by defining $a\geq b$ if and only if $\sigma(a)\geq \sigma(b)$. In this way, $(K,\leq)$ is a totally ordered field. Hence either $c>0$ or $c<0$. In both cases we have that $(a^2-b^2)+2abi=c^2>0$. This could lead to a contradiction if I could assume $a=0$ and $b\in \mathbb{Q}$, however I don't even manage to get a purely complex number in $K$ (real part zero).
Another approach is to look at polynomials. We have that $c$ is a solution of the polynomial $x^2+2ax+a^2-b^2\in \mathbb{R}[X]$, however we cannot necessarily view this as a polynomial over $K$.
I tried to construct an example of such a field $K$ (which I don't believe exits), this leads to nowhere either. I feel there should be some easy argument to solve this problem, but I can't find it.
