Abstract
It is shown that for any three distinct collinear complex numbers p,q,t, the statement “An enite function which misses the values p and q but assumes the value t, at a preassigned point, is a constant function” is equivalent to Picard's Little Theorem. It is hoped that this particular version of Picard's Little Theorem could be used to give a simpler proof of Picard's Little Theorem.
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