In this article, a class of convergent series based on Fibonacci sequence is introduced for which there is a golden ratio (i.e. $frac{1+sqrt 5}{2}),$ with respect to convergence analysis. A class of sequences are at first built using two consecutive numbers of Fibonacci sequence and, therefore, new sequences have been used in order to introduce a new class of series. All properties of the sequences and related series are illustrated in the work by providing the details including sequences formula, related theorems, proofs and convergence analysis of the series
The Fibonacci sequence is arguably the most observed sequence not only in mathematics, but also in n...
An example of the power of math can be found in Fibonacci numbers. The Fibonacci numbers are s...
Expansions in the Golden ratio base have been studied since a pioneering paper of Rényi more than si...
The Fibonacci sequence, $F_n = F_{n - 1} + F_{n - 2}$, and its counterpart for $n < 0$, the negaFibo...
In number theory a very famous sequence of numbers is the Fibonacci sequence. It has the form 1, 1,2...
The Fibonacci numbers are sequences of numbers of the form: 0,1,1,2,3,5,8,13,... Among n...
In this paper, I will be exploring the Fibonacci numbers and their applications in the natural world...
The sequence of Fibonacci numbers is given by 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 6...
We have discussed in this elucidation paper about correlation of Fibonacci sequence and golden ratio...
In this paper we study the so-called generalized Fibonacci sequence: $x_{n+2} = \alpha x_{n+1} + \be...
Taking the reciprocal of the golden ratio and summing its non-negative integer powers, we obtain a s...
The familiar Fibonacci sequence 1,1,2,3,5,8,13,... can be described by the recurrence relation x(0)...
This paper formulates a definition of Fibonacci polynomials which is slightly different from the trad...
Fibonaccijev niz je niz brojeva koji je ime dobio po Leonardu Fibonacciju. Niz se sastoji od brojeva...
The existence of an equivalence subset of rational functions with Fibonacci numbers as coefficients ...
The Fibonacci sequence is arguably the most observed sequence not only in mathematics, but also in n...
An example of the power of math can be found in Fibonacci numbers. The Fibonacci numbers are s...
Expansions in the Golden ratio base have been studied since a pioneering paper of Rényi more than si...
The Fibonacci sequence, $F_n = F_{n - 1} + F_{n - 2}$, and its counterpart for $n < 0$, the negaFibo...
In number theory a very famous sequence of numbers is the Fibonacci sequence. It has the form 1, 1,2...
The Fibonacci numbers are sequences of numbers of the form: 0,1,1,2,3,5,8,13,... Among n...
In this paper, I will be exploring the Fibonacci numbers and their applications in the natural world...
The sequence of Fibonacci numbers is given by 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 6...
We have discussed in this elucidation paper about correlation of Fibonacci sequence and golden ratio...
In this paper we study the so-called generalized Fibonacci sequence: $x_{n+2} = \alpha x_{n+1} + \be...
Taking the reciprocal of the golden ratio and summing its non-negative integer powers, we obtain a s...
The familiar Fibonacci sequence 1,1,2,3,5,8,13,... can be described by the recurrence relation x(0)...
This paper formulates a definition of Fibonacci polynomials which is slightly different from the trad...
Fibonaccijev niz je niz brojeva koji je ime dobio po Leonardu Fibonacciju. Niz se sastoji od brojeva...
The existence of an equivalence subset of rational functions with Fibonacci numbers as coefficients ...
The Fibonacci sequence is arguably the most observed sequence not only in mathematics, but also in n...
An example of the power of math can be found in Fibonacci numbers. The Fibonacci numbers are s...
Expansions in the Golden ratio base have been studied since a pioneering paper of Rényi more than si...