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Holomorphic functions and limits of a sequence
Let $\Omega$ a domain and $f,g$ holomorphic function in $\Omega$. Suposse that $\exists$ a sequence $\{a_n\}$ in $\Omega$ convergent to a point $a$ of $\Omega$: $$a_n\neq a, \forall n, \\\\\\f'(a_n)g(a_n)=g'(a_n)f(a_n), \forall n, $$ with $g(a)\neq0$.
Probe that $f$, $g$ are linearly dependent.