I was looking for the proof is this theorem, but I couldn't find it anywhere.
the theorem is stated formally:
If $f_m$ is a sequence of continuous functions defined on $D$ (subset of $R$) such that $f_m$$\to$$f$ uniformly on $D$ then $f$ is continuous.
can someone give the stepwise proof?
Hint
To prove that $f$ is continuous at $a\in D$,
use the fact that, for great enough $n$, and $x\in D$,
$$|f(x)-f(a)|\le $$ $$|f_n(x)-f(x)|+|f_n(x)-f(a)|$$