Taking the reciprocal of the golden ratio and summing its non-negative integer powers, we obtain a series that converges. We then consider series obtained by striking out terms of this series, proving key theorems about them and the real numbers to which they converge. Finally, we preassign two-parameter families of real numbers related to the Fibonacci numbers and give their series expansions
In this article, a class of convergent series based on Fibonacci sequence is introduced for which th...
The main purpose of this paper is to give many new formulas involving the Fibonacci numbers, the gol...
The Fibonacci number sequence is famous for its connection to the Golden Ratio and its appearance wi...
Expansions in the Golden ratio base have been studied since a pioneering paper of Rényi more than si...
The sequence of Fibonacci numbers is given by 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 6...
The relationship between the golden ratio and continued fractions is commonly known about throughout...
The paper presents, among others, the golden number $\varphi$ as the limit of the quotient of neighb...
When the golden ratio and its conjugate are zeros to a polynomial, two of the coefficients are funct...
The golden ratio and the Fibonacci numbers have a very noticeable presence in many mathematical appl...
The structure of the decimal expansion of the Golden Ratio is examined in decimal and modular forms ...
We consider the well-known characterization of the Golden ratio as limit of the ratio of consecutive...
We consider the well-known characterization of the Golden ratio as limit of the ratio of consecutive...
The original concept of Fibonacci's series is extended to allow more realistic physical conditions (...
The ratio of two successive Fibonacci numbers approaches the value of the golden ratio (1+sqrt(5))/2...
In this article, we illustrate the use of a scientific calculator for exploring the Fibonacci sequen...
In this article, a class of convergent series based on Fibonacci sequence is introduced for which th...
The main purpose of this paper is to give many new formulas involving the Fibonacci numbers, the gol...
The Fibonacci number sequence is famous for its connection to the Golden Ratio and its appearance wi...
Expansions in the Golden ratio base have been studied since a pioneering paper of Rényi more than si...
The sequence of Fibonacci numbers is given by 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 6...
The relationship between the golden ratio and continued fractions is commonly known about throughout...
The paper presents, among others, the golden number $\varphi$ as the limit of the quotient of neighb...
When the golden ratio and its conjugate are zeros to a polynomial, two of the coefficients are funct...
The golden ratio and the Fibonacci numbers have a very noticeable presence in many mathematical appl...
The structure of the decimal expansion of the Golden Ratio is examined in decimal and modular forms ...
We consider the well-known characterization of the Golden ratio as limit of the ratio of consecutive...
We consider the well-known characterization of the Golden ratio as limit of the ratio of consecutive...
The original concept of Fibonacci's series is extended to allow more realistic physical conditions (...
The ratio of two successive Fibonacci numbers approaches the value of the golden ratio (1+sqrt(5))/2...
In this article, we illustrate the use of a scientific calculator for exploring the Fibonacci sequen...
In this article, a class of convergent series based on Fibonacci sequence is introduced for which th...
The main purpose of this paper is to give many new formulas involving the Fibonacci numbers, the gol...
The Fibonacci number sequence is famous for its connection to the Golden Ratio and its appearance wi...