I know this is a very basic question but I am always unsure what exactly is meant by "generating".
For example, consider the polynomial ring $k[x]$, and the ideal generated by $f(x)$, denoted by $\langle f(x) \rangle = k[x] \cdot f(x)$.
Furthermore, in the context of a group it means taking all integral powers of the generator.
However, I am reading about prime subfields which are defined to be the subfield of a field $F$ $\textbf{generated}$ by the multiplicative identity $1_F$ of $F$. In particular, the prime subfield of $\mathbb{R}$ is $\mathbb{Q}$.
What exactly is meant by the subfield $\textbf{generated}$ by $1_F$ in this context?