Ohtsuka H,Nakamura S.On the sum of reciprocal Fibonacci numbers.The Fibonacci Quarterly. 2008 /2009H. Ohtsuka, S. Nakamura, On the sum of reciprocal Fibonacci numbers, The Fibonacci Quarterly 46/47 (2008/2009) 153-159.H. Ohtsuka and S. Nakamura, On the sum of reciprocal Fibonacci num- ...
In this paper, using some properties of Fibonacci numbers, reciprocal polynomials for Fibonacci polynomials, and Legendre symbol, we... R Boumahdi,M Mihoubi,L Khaldi - 《Mathematica Montisnigri》 被引量: 0发表: 2023年 ON SOME CONGRUENCES OF BINOMIAL COEFFICIENTS MODULO p 3 WITH APPLICATIONS ...
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Komatsu.On the sum of reciprocal generalized Fibonacci numbers.Integers. 2011S. H. Holliday and T. Komatsu, "On the sum of reciprocal generalized Fibonacci numbers," Integers, vol. 11, no. 4, pp. 441-455, 2011Holiday S., Komatsu, T.: On the sum of reciprocal generalized Fibonacci ...
On the sum of reciprocal generalized Fibonacci numbers. Integers, 11(4):441-455, 2011.S. Holliday, T. Komatsu, On the sum of reciprocal generalized Fibonacci numbers, Integers 11A (2011) Article 11.Holliday, S.H., Komatsu, T.: On the sum of reciprocal generalized Fibonacci numbers. ...
Applying the greatest integer function to these sums, we obtain some equalities involving the generalized Fibonacci numbers.doi:10.1142/S179355712250053XYücel Türker UlutaGkhan KuzuoluWorld Scientific Publishing CompanyAsian-European Journal of Mathematics...
Fibonacci numbersLucas numbersPell numbersPell-Lucas numbersgeneralized Fibonacci numbersreciprocal sumfloor functionIn this paper we derive quite general identities for the reciprocal sums of products of two generalized Fibonacci numbers.doi:10.12988/IJMA.2019.91059Younseok Choo...
Arikan, "More on the infinite sum of reciprocal usual Fibonacci, Pell and higher order recurrences," Applied Mathematics and Computation, vol. 219, pp. 7783-7788, 2013, doi: 10.1016/j.amc.2013.02.003.Kilic, E, Arikan, T: More on the infinite sum of reciprocal usual Fibonacci, Pell and ...
On Reciprocal Series of Generalized Fibonacci Numbers with Subscripts in Arithmetic ProgressionDiscrete Mathematics and CombinatoricsWe investigate formulas for closely related series of the forms: ??? n = 0 ??? 1 / ( U a n + b + c ) , ??? n = 0 ??? ( - 1 ) n U a n + b /...
infinite sumreciprocal sumThe Fibonacci sequence has been generalized in many ways. One of them is defined by the relation u n = a u n 1 + u n 2 if n is even, u n = b u n 1 + u n 2 if n is odd, with initial values u 0 = 0 and u 1 = 1 , where a and b are ...