On the possible quantities of Fibonacci numbers that occur in some type of intervals
Abstract
In this paper, we show that for any integer a ≥ 2, each of the intervals [ak , ak + 1) (k ∈ N) contains either a or a Fibonacci numbers. In addition, the density (in N) of the set of the all natural numbers k for which the interval [ak , ak + 1) contains exactly a Fibonacci numbers is equal to (1 - a) and the density of the set of the all natural numbers k for which the interval [ak , ak + 1) contains exactly a Fibonacci numbers is equal to a.
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