let ${[{z_{n}}]}$ be sequence of complex numbers with no finite accumulation point, and let $[{w_{n}}]$ be an arbitrary sequence of complex numbers. Prove there is an entire function $f$ such that$f(z_{n})=w_{n}$ for all $n>=1$.
I have a feeling that this is an application of some theorems like Runge's Theorem and Little Picard theorem to which I am totally unconfortable. I was wondering if someone has better way of doing this without referring to the standard results.