Add to ORKGEach term of the classical Fibonacci sequence of numbers is the sum of the two previous terms of the sequence. If instead of the sum the third term is an addition or a subtraction of the two previous terms, one of them multiplied by a constant, new and rich sequences are obtained. Some of the properties of these sequences are herein studied by means of numerical procedures, incorporating the condition that each term, including the constant, are complex number
The discoveries of Leonard of Pisa, better known as Fibonacci, are revolutionary contributions to th...
The Fibonacci sequence can be used as a starting point for an interesting project or research experi...
will be produced in a year, beginning with a single pair, if in every month each pair bears a new pa...
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...
This thesis offers a brief background on the life of Fibonacci as well as his discovery of the famou...
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...
Numerous geometric patterns identified in nature, art or science can be generated from recurrent seq...
Let 1, 2, 3, 5, 8, … denote the Fibonacci sequence beginning with 1 and 2, and then setting each sub...
In this paper we study the so-called generalized Fibonacci sequence: $x_{n+2} = \alpha x_{n+1} + \be...
Numerous geometric patterns identified in nature, art or science can be generated from recurrent seq...
The Fibonacci sequence, $F_n = F_{n - 1} + F_{n - 2}$, and its counterpart for $n < 0$, the negaFibo...
The Fibonacci numbers are defined by the recurrence f(n)= f(n-1)+f(n-2). The sequence f(n)mod m is p...
The familiar Fibonacci sequence 1,1,2,3,5,8,13,... can be described by the recurrence relation x(0)...
The discoveries of Leonard of Pisa, better known as Fibonacci, are revolutionary contributions to th...
The Fibonacci sequence can be used as a starting point for an interesting project or research experi...
will be produced in a year, beginning with a single pair, if in every month each pair bears a new pa...
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...
This thesis offers a brief background on the life of Fibonacci as well as his discovery of the famou...
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...
Numerous geometric patterns identified in nature, art or science can be generated from recurrent seq...
Let 1, 2, 3, 5, 8, … denote the Fibonacci sequence beginning with 1 and 2, and then setting each sub...
In this paper we study the so-called generalized Fibonacci sequence: $x_{n+2} = \alpha x_{n+1} + \be...
Numerous geometric patterns identified in nature, art or science can be generated from recurrent seq...
The Fibonacci sequence, $F_n = F_{n - 1} + F_{n - 2}$, and its counterpart for $n < 0$, the negaFibo...
The Fibonacci numbers are defined by the recurrence f(n)= f(n-1)+f(n-2). The sequence f(n)mod m is p...
The familiar Fibonacci sequence 1,1,2,3,5,8,13,... can be described by the recurrence relation x(0)...
The discoveries of Leonard of Pisa, better known as Fibonacci, are revolutionary contributions to th...
The Fibonacci sequence can be used as a starting point for an interesting project or research experi...
will be produced in a year, beginning with a single pair, if in every month each pair bears a new pa...