So I am stumped by the following problem:
Let $\alpha \in \mathbb{R}$ be an algebraic number of degree $d$. We denote by $\mathbb{Q}[\alpha]$ the subspace of $\mathbb{R}$ consisting of real numbers that can be written as: $$a_0 + a_1\alpha +\dots+ a_{d-1}\alpha^{d-1}$$ for some rational numbers $a_0, ... ,a_{d-1} \in \mathbb{Q}$.
Show that every element $\gamma \in \mathbb{Q[\alpha]}$ is algebraic.
Does anyone have any pointers? I know the definition of an algebraic number.
Hint $\mathbb Q[\gamma]$ is a subspace of $\mathbb Q[\alpha]$. What can you conclude about $$\mbox{dim}_{\mathbb Q} \mathbb Q[\gamma] \,?$$