The paper presents, among others, the golden number $\varphi$ as the limit of the quotient of neighboring terms of the Fibonacci and Fibonacci type sequence by means of a fixed point of a mapping of a certain interval with the help of Edelstein's theorem. To demonstrate the equality , where $f_n$ is $n$-th Fibonacci number also the formula from Corollary \ref{cor1} has been applied. It was obtained using some relationships between Fibonacci and Lucas numbers, which were previously justified
Ovaj diplomski rad govori o Fibonaccijevim brojevima. U prvom poglavlju definira se Fibonaccijev niz...
In number theory a very famous sequence of numbers is the Fibonacci sequence. It has the form 1, 1,2...
The purposes of this paper are; (a) to develop a relationship between subscripts of the symbols of F...
The paper presents, among others, the golden number $\varphi$ as the limit of the quotient of neighb...
The sequence of Fibonacci numbers is given by 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 6...
We consider thewell-known characterization of theGolden ratio as limit of the ratio of consecutive t...
We consider the well-known characterization of the Golden ratio as limit of the ratio of consecutive...
Taking the reciprocal of the golden ratio and summing its non-negative integer powers, we obtain a s...
The Fibonacci number sequence is famous for its connection to the Golden Ratio and its appearance wi...
In the present paper we give some condensation type inequalities connected with Fibonacci numbers. C...
Expansions in the Golden ratio base have been studied since a pioneering paper of Rényi more than si...
The main purpose of this paper is to give many new formulas involving the Fibonacci numbers, the gol...
Abstract. By defining the non-adjacent number, p(G, k), and topological index, ZG, for a graph G, se...
The golden section is one of many mathematical discoveries which originated simply as the solution t...
The original concept of Fibonacci's series is extended to allow more realistic physical conditions (...
Ovaj diplomski rad govori o Fibonaccijevim brojevima. U prvom poglavlju definira se Fibonaccijev niz...
In number theory a very famous sequence of numbers is the Fibonacci sequence. It has the form 1, 1,2...
The purposes of this paper are; (a) to develop a relationship between subscripts of the symbols of F...
The paper presents, among others, the golden number $\varphi$ as the limit of the quotient of neighb...
The sequence of Fibonacci numbers is given by 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 6...
We consider thewell-known characterization of theGolden ratio as limit of the ratio of consecutive t...
We consider the well-known characterization of the Golden ratio as limit of the ratio of consecutive...
Taking the reciprocal of the golden ratio and summing its non-negative integer powers, we obtain a s...
The Fibonacci number sequence is famous for its connection to the Golden Ratio and its appearance wi...
In the present paper we give some condensation type inequalities connected with Fibonacci numbers. C...
Expansions in the Golden ratio base have been studied since a pioneering paper of Rényi more than si...
The main purpose of this paper is to give many new formulas involving the Fibonacci numbers, the gol...
Abstract. By defining the non-adjacent number, p(G, k), and topological index, ZG, for a graph G, se...
The golden section is one of many mathematical discoveries which originated simply as the solution t...
The original concept of Fibonacci's series is extended to allow more realistic physical conditions (...
Ovaj diplomski rad govori o Fibonaccijevim brojevima. U prvom poglavlju definira se Fibonaccijev niz...
In number theory a very famous sequence of numbers is the Fibonacci sequence. It has the form 1, 1,2...
The purposes of this paper are; (a) to develop a relationship between subscripts of the symbols of F...