Let X be an infinite dimensional normed linear space. A sequence $(e_n)$ in $X$ is called a **basis** if for every $x \in X$ there is a unique sequence of scalars $(a_n)$ such that $x=\sum_n a_n e_n $ (equality in norm).
We say that $(e_n)$ is a **Weak basis** if for every $x \in X$ there is a unique sequence of scalars $(a_n)$ such that $\sum_{k=1}^n a_k e_k $ converges weakly to x as $n \to \infty$.

I am looking for a reference to the following theorem, which i have seen in several places, yet was not able to find a proof, nor to come up with one myself: if $(e_n)$ is a weak basis, then it is a basis.