An explicit formula generating the non-Fibonacci numbers
Abstract
We show among others that the formula: n + \5((5n) + n) -5 + 3n\ - 2 (n ≥ 2), (where denotes the golden ratio and denotes the integer part) generates the non-Fibonacci numbers.
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We show among others that the formula: n + \5((5n) + n) -5 + 3n\ - 2 (n ≥ 2), (where denotes the golden ratio and denotes the integer part) generates the non-Fibonacci numbers.