Add to ORKGWe improve on Melham’s formulas in [10, Section 4] for certain classes of finite sums that involve generalized Fibonacci and Lucas numbers. Here we study the quadratic sums where products of two of these numbers appear. Our results show that most of his formulas are the initial terms of a series of formulas, that the analogous and somewhat simpler identities hold for associated dual numbers and that besides the alternation according to the numbers (-1)^n(n+1)/2 it is possible to get similar formulas for the alternation according to the numbers (-1)^n(n-1)/2. We also consider twelve quadratic sums with binomial coefficients that are products
This paper takes a historical view of some long-standing problems associated with the development of...
It is known that the generating function of the Fibonacci sequence, F(t) =\sum_{k=0}^{\infty} F_k t^...
In Proofs that Really Count [2], Benjamin and Quinn have used “square and domino tiling” interpreta...
We improve on Melham’s formulas in [10, Section 4] for certain classes of finite sums that involve g...
We improve on Melham’s formulas in [10, Section 4] for certain classes of finite sums that involve g...
© 2014 Walter de Gruyter GmbH, Berlin/Boston. In this paper we find closed forms for certain finite ...
In this paper, we present closed forms for certain finite sums in which the summand is a product of ...
© 2018 Fibonacci Association. All rights reserved. The finite sum n 2−iFi−1 = 1 −Fn+2 2n , i=1 occur...
© 2014, University of Waterloo. All rights reserved. In this paper we find closed forms, in terms of...
In this paper, we present closed forms for certain finite sums of weighted products of generalized F...
© 2018 The Fibonacci Association. All rights reserved. In this paper, we present closed forms for 10...
The Problem B-1 in the first issue of the Fibonacci Quarterly is the start- ing point of an extensiv...
Denote by Σn m the sum of the m -th powers of the first n positive integers 1 m +2 m +…+n m . Si...
Simson's identity is a well-known Fibonacci identity in which the difference of certain order 2 prod...
Polynomial representation formulae for power sums of the extended Fibonacci-Lucas numbers are establ...
This paper takes a historical view of some long-standing problems associated with the development of...
It is known that the generating function of the Fibonacci sequence, F(t) =\sum_{k=0}^{\infty} F_k t^...
In Proofs that Really Count [2], Benjamin and Quinn have used “square and domino tiling” interpreta...
We improve on Melham’s formulas in [10, Section 4] for certain classes of finite sums that involve g...
We improve on Melham’s formulas in [10, Section 4] for certain classes of finite sums that involve g...
© 2014 Walter de Gruyter GmbH, Berlin/Boston. In this paper we find closed forms for certain finite ...
In this paper, we present closed forms for certain finite sums in which the summand is a product of ...
© 2018 Fibonacci Association. All rights reserved. The finite sum n 2−iFi−1 = 1 −Fn+2 2n , i=1 occur...
© 2014, University of Waterloo. All rights reserved. In this paper we find closed forms, in terms of...
In this paper, we present closed forms for certain finite sums of weighted products of generalized F...
© 2018 The Fibonacci Association. All rights reserved. In this paper, we present closed forms for 10...
The Problem B-1 in the first issue of the Fibonacci Quarterly is the start- ing point of an extensiv...
Denote by Σn m the sum of the m -th powers of the first n positive integers 1 m +2 m +…+n m . Si...
Simson's identity is a well-known Fibonacci identity in which the difference of certain order 2 prod...
Polynomial representation formulae for power sums of the extended Fibonacci-Lucas numbers are establ...
This paper takes a historical view of some long-standing problems associated with the development of...
It is known that the generating function of the Fibonacci sequence, F(t) =\sum_{k=0}^{\infty} F_k t^...
In Proofs that Really Count [2], Benjamin and Quinn have used “square and domino tiling” interpreta...