Here I am using $l^2$ to define the set of complex-sequences which are square summable and $l^{\infty}$ to define the set of bounded complex sequences.
I think not. If we take $x(n) = 1 \;\; n\in \mathbb{N}$ ,which is bounded sequence. Then for any $y\in l^2$ must be a null sequence, so
$$\|x-y\|_{\infty} = \sup|1- y(n)| \geq 1$$