Given $(a_n)$ and $(b_n) \in \mathbb{R}$,if we have $|a_n - b_n| < \frac{1}{n} \forall n \in \mathbb{N}$, I think it is possible to find an $N$ such that $\forall n \ge N$, we have $|a_n-b_n| < \frac{\epsilon}{2}$. I think we can definitely find that $N$ where we pick $N= \frac{2}{\epsilon}$. Then we will have for $n>N$, we will have $N> \frac{2}{\epsilon} \Rightarrow |a_n-b_n| <\frac{1}{n}< \frac{1}{N}< \frac{\epsilon}{2}$
I think my argument is correct though, point out if there is any flaw. I need to use it as a lemma for other proof.