Golden Ratio Base Expansions of the Logarithm and Inverse Tangent of Fibonacci and Lucas Numbers
Abstract
Let α=(1+ 5)/2, the golden ratio, and β=-1/α=(1 - 5)/2. Let Fn and Ln be the Fibonacci and Lucas numbers, defined by Fn=(αn -βn)/ 5 and Ln=αn + βn, for all non-negative integers. We derive base~α expansions of Fn, Ln, 1Fn and 1Ln for all positive integers n.
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