Add to ORKGThe Fibonacci and Lucas sequences Fn and Ln are dened by the recurrence relation
Lucas and Gibonacci numbers are two sequences of numbers derived from a welknown numbers, Fibonacc...
We consider the recurrence relation $G_n = G_{n-1} + G_{n-2} + \sum_{j=0}^k \alpha_j n^j$, where $G_...
We consider the recurrence relation $G_n = G_{n-1} + G_{n-2} + \sum_{j=0}^k \alpha_j n^j$, where $G_...
Abstract. We shall improve some results on sums of squares of odd terms of the Fibonacci sequence by...
As usual, the Lucas sequence {Ln} and the Fibonacci sequence {Fn} (11. 0,1,2,...,) are defined by th...
Copyright © 2014 Mamta Singh et al. This is an open access article distributed under the Creative Co...
A brief survey of identities about reciprocal sums of products of elements in a binary recurrence se...
The class of binary recurrence relations is the mother of many important integer sequences. Fibonacc...
The Fibonacci sequence can be used as a starting point for an interesting project or research experi...
AbstractGiven a set of sequences defined by linear recurrence relations 1 method is described for fi...
In this paper, we establish a formula expressing explicitly the general term of a linear recurrent s...
will be produced in a year, beginning with a single pair, if in every month each pair bears a new pa...
The purposes of this paper are; (a) to develop a relationship between subscripts of the symbols of F...
Abstract: Let n be an integer. A set of positive integers is said to have the property D(n) if the p...
The purposes of this paper are; (a) to develop a relationship between subscripts of the symbols of F...
Lucas and Gibonacci numbers are two sequences of numbers derived from a welknown numbers, Fibonacc...
We consider the recurrence relation $G_n = G_{n-1} + G_{n-2} + \sum_{j=0}^k \alpha_j n^j$, where $G_...
We consider the recurrence relation $G_n = G_{n-1} + G_{n-2} + \sum_{j=0}^k \alpha_j n^j$, where $G_...
Abstract. We shall improve some results on sums of squares of odd terms of the Fibonacci sequence by...
As usual, the Lucas sequence {Ln} and the Fibonacci sequence {Fn} (11. 0,1,2,...,) are defined by th...
Copyright © 2014 Mamta Singh et al. This is an open access article distributed under the Creative Co...
A brief survey of identities about reciprocal sums of products of elements in a binary recurrence se...
The class of binary recurrence relations is the mother of many important integer sequences. Fibonacc...
The Fibonacci sequence can be used as a starting point for an interesting project or research experi...
AbstractGiven a set of sequences defined by linear recurrence relations 1 method is described for fi...
In this paper, we establish a formula expressing explicitly the general term of a linear recurrent s...
will be produced in a year, beginning with a single pair, if in every month each pair bears a new pa...
The purposes of this paper are; (a) to develop a relationship between subscripts of the symbols of F...
Abstract: Let n be an integer. A set of positive integers is said to have the property D(n) if the p...
The purposes of this paper are; (a) to develop a relationship between subscripts of the symbols of F...
Lucas and Gibonacci numbers are two sequences of numbers derived from a welknown numbers, Fibonacc...
We consider the recurrence relation $G_n = G_{n-1} + G_{n-2} + \sum_{j=0}^k \alpha_j n^j$, where $G_...
We consider the recurrence relation $G_n = G_{n-1} + G_{n-2} + \sum_{j=0}^k \alpha_j n^j$, where $G_...