I am stuck on this problem. Let $E$ be a holomorphic vector bundle on a complex manifold $M$, and $N$ a complex submanifold of codimension at least two. Prove that every section of $E$ on $M\backslash N$ extends to a section of $E$ over $M$. If $F$ is another holomorphic vector bundle over $M$ that is isomorphic to $E$ over $M\backslash N$, then prove that $F$ is isomorphic to $E$ over $M$.
I appreciate any suggestion.
Thank you.