Results 181 to 190 of about 29,133 (216)
Fibration symmetries and cluster synchronization in the Caenorhabditis elegans connectome. [PDF]
PLoS OneAvila B +4 more
europepmc +1 more source
The golden ratio in the pulmonary circulation in patients with heart failure and cardiogenic shock. [PDF]
Physiol RepLim HS, Yim IHW.
europepmc +1 more source
Molecular "Yin-Yang" Machinery of Synthesis of the Second and Third Fullerene C<sub>60</sub> Derivatives. [PDF]
Micromachines (Basel)Koruga DL +4 more
europepmc +1 more source
EXPLORING SUMS OF SQUARES AND CUBES OF FIBONACCI NUMBERS IN DIOPHANTINE EQUATIONS
Ahmet Emin
openalex +1 more source
Nature-Inspired Designs in Wind Energy: A Review. [PDF]
Biomimetics (Basel)Omidvarnia F, Sarhadi A.
europepmc +1 more source
Some of the next articles are maybe not open access.
Related searches:
Related searches:
Factorization of Fibonacci Numbers
The Fibonacci Quarterly, 1970The Fibonacci numbers \(F_n\) may be defined by \(F_0 = 0\), \(F_1= 1\), \(F_{n+1}=F_n +F_{n-1}\) for \(n \geq 1\). If \(F_z\) \(z>0\), is the smallest Fibonacci number divisible by the prime \(p\), then \(z =a(p)\) is defined as the entry point (or rank) of \(p\); moreover \(p\) divides \(F_n\) if and only if \(n\) is divisible by \(z(p)\).
Daykin, D. E., Dresel, L. A. G.
openaire +2 more sources
The College Mathematics Journal, 2008
Ezra (Bud) Brown (ezbrown@math.vt.edu) grew up in New Orleans and has degrees from Rice and LSU. He arrived at Virginia Tech shortly after Hurricane Camille, and has been there ever since, with time out for sabbatical visits to Washington, DC (where he has spent his summers since 1993) and Munich.
Ezra Brown, Jason C. Brunson
openaire +1 more source
Ezra (Bud) Brown (ezbrown@math.vt.edu) grew up in New Orleans and has degrees from Rice and LSU. He arrived at Virginia Tech shortly after Hurricane Camille, and has been there ever since, with time out for sabbatical visits to Washington, DC (where he has spent his summers since 1993) and Munich.
Ezra Brown, Jason C. Brunson
openaire +1 more source
Abstract The Fibonacci numbers are introduced and carefully developed together with a bit of biography of Fibonacci himself. He is best known for promoting the use of Hindu-Arabic numerals in Europe and especially for his “rabbit problem” which introduces the Fibonacci numbers. Of special interest is the decimal expansion for 1/89 having
openaire +1 more source
openaire +1 more source
The American Mathematical Monthly, 1961
where I=2(p-qb), m=2(p-gqa), a= l (1 + \15), b-(1-\/5). The purpose of this article is to find a connection between generalized Fibonacci numbers and Pythagorean number triples. By a Pythagorean (number) triple is meant a set of three mutually prime integers u, v, w for which u2+v2 = w2.
openaire +1 more source
where I=2(p-qb), m=2(p-gqa), a= l (1 + \15), b-(1-\/5). The purpose of this article is to find a connection between generalized Fibonacci numbers and Pythagorean number triples. By a Pythagorean (number) triple is meant a set of three mutually prime integers u, v, w for which u2+v2 = w2.
openaire +1 more source