Bibliografías temáticas / Numbers

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Literatura académica sobre el tema "Numbers"

Autor: Grafiati
Publicado: 4 de junio de 2021
Última modificación: 25 de julio de 2025

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Artículos de revistas sobre el tema "Numbers"

1

Bisht, Swati, and Anand Singh Uniyal. "A Curious Connection between Fermats Number and Multiple Factoriangular Numbers." International Journal of Science and Research (IJSR) 10, no. 4 (2021): 539–40. https://doi.org/10.21275/sr21310103215.

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Montémont, Véronique. "Roubaud’s number on numbers." Journal of Romance Studies 7, no. 3 (2007): 111–21. http://dx.doi.org/10.3828/jrs.7.3.111.

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Carbó-Dorca, Ramon. "Mersenne Numbers, Recursive Generation of Natural Numbers, and Counting the Number of Prime Numbers." Applied Mathematics 13, no. 06 (2022): 538–43. http://dx.doi.org/10.4236/am.2022.136034.

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Steele, G. Ander. "Carmichael numbers in number rings." Journal of Number Theory 128, no. 4 (2008): 910–17. http://dx.doi.org/10.1016/j.jnt.2007.08.009.

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Hofweber, T. "Number Determiners, Numbers, and Arithmetic." Philosophical Review 114, no. 2 (2005): 179–225. http://dx.doi.org/10.1215/00318108-114-2-179.

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Chandrasekaran, Keerthivasan. "The Sequential Even and Odd Number Identification in Decimal Numbers by Formula." International Journal of Science and Research (IJSR) 11, no. 3 (2022): 1415–16. http://dx.doi.org/10.21275/sr22328213735.

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Sudhakaraiah, A., A. Madhankumar, Pagidi Obulesu, and A. Lakshmi Sowjanya. "73 Is the Only Largest Prime Power Number and Composite Power Numbers." International Journal of Science and Research (IJSR) 12, no. 11 (2023): 1318–23. http://dx.doi.org/10.21275/sr231118184617.

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KÖKEN, Fikri, and Emre KANKAL. "Altered Numbers of Fibonacci Number Squared." Journal of New Theory, no. 45 (December 31, 2023): 73–82. http://dx.doi.org/10.53570/jnt.1368751.

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We investigate two types of altered Fibonacci numbers obtained by adding or subtracting a specific value $\{a\}$ from the square of the $n^{th}$ Fibonacci numbers $G^{(2)}_{F(n)}(a)$ and $H^{(2)}_{F(n)}(a)$. These numbers are significant as they are related to the consecutive products of the Fibonacci numbers. As a result, we establish consecutive sum-subtraction relations of altered Fibonacci numbers and their Binet-like formulas. Moreover, we explore greatest common divisor (GCD) sequences of r-successive terms of altered Fibonacci numbers represented by $\left\{G^{(2)}_{F(n), r}(a)\right\}$
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., Jyoti. "Rational Numbers." Journal of Advances and Scholarly Researches in Allied Education 15, no. 5 (2018): 220–22. http://dx.doi.org/10.29070/15/57856.

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Boast, Carl A., and Paul R. Sanberg. "Locomotor behavior: numbers, numbers, numbers!" Pharmacology Biochemistry and Behavior 27, no. 3 (1987): 543. http://dx.doi.org/10.1016/0091-3057(87)90364-9.

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Tesis sobre el tema "Numbers"

1

Namasivayam, M. "Entropy numbers, s-numbers and embeddings." Thesis, University of Sussex, 1985. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.356519.

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Allagan, Julian Apelete D. Johnson Peter D. "Choice numbers, Ohba numbers and Hall numbers of some complete k-partite graphs." Auburn, Ala, 2009. http://hdl.handle.net/10415/1780.

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Fransson, Jonas. "Generalized Fibonacci Series Considered modulo n." Thesis, Linnéuniversitetet, Institutionen för matematik (MA), 2013. http://urn.kb.se/resolve?urn=urn:nbn:se:lnu:diva-26844.

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In this thesis we are investigating identities regarding Fibonacci sequences. In particular we are examiningthe so called Pisano period, which is the period for the Fibonacci sequence considered modulo n to repeatitself. The theory shows that it suces to compute Pisano periods for primes. We are also looking atthe same problems for the generalized Pisano period, which can be described as the Pisano period forthe generalized Fibonacci sequence.
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Anderson, Crystal Lynn. "An Introduction to Number Theory Prime Numbers and Their Applications." Digital Commons @ East Tennessee State University, 2006. https://dc.etsu.edu/etd/2222.

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The author has found, during her experience teaching students on the fourth grade level, that some concepts of number theory haven't even been introduced to the students. Some of these concepts include prime and composite numbers and their applications. Through personal research, the author has found that prime numbers are vital to the understanding of the grade level curriculum. Prime numbers are used to aide in determining divisibility, finding greatest common factors, least common multiples, and common denominators. Through experimentation, classroom examples, and homework, the author has i
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Chipatala, Overtone. "Polygonal numbers." Kansas State University, 2016. http://hdl.handle.net/2097/32923.

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Master of Science<br>Department of Mathematics<br>Todd Cochrane<br>Polygonal numbers are nonnegative integers constructed and represented by geometrical arrangements of equally spaced points that form regular polygons. These numbers were originally studied by Pythagoras, with their long history dating from 570 B.C, and are often referred to by the Greek mathematicians. During the ancient period, polygonal numbers were described by units which were expressed by dots or pebbles arranged to form geometrical polygons. In his "Introductio Arithmetica", Nicomachus of Gerasa (c. 100 A.D), thoroughly
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Tomasini, Alejandro. "Wittgensteinian Numbers." Pontificia Universidad Católica del Perú - Departamento de Humanidades, 2013. http://repositorio.pucp.edu.pe/index/handle/123456789/112986.

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In this paper I reconstruct the tractarian view of natural numbers. i show how Wittgenstein uses his conceptual apparatus (operatlon, formal concept, internal property, logical form) to elaborate analternative to the logicist definition of number. Finally, I briefly examine sorneof the criticisms that have been raised against it.<br>En este trabajo reconstruyo la concepción tractariana de los números naturales. Muestro cómo Wittgenstein usa su aparato conceptual (operación, conceptoformal, propiedad interna, forma lógica) para elaborar una definición de número alternativa a la logicista. Por ú
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Hostetler, Joshua. "Surreal Numbers." VCU Scholars Compass, 2012. http://scholarscompass.vcu.edu/etd/2935.

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The purpose of this thesis is to explore the Surreal Numbers from an elementary, con- structivist point of view, with the intention of introducing the numbers in a palatable way for a broad audience with minimal background in any specific mathematical field. Created from two recursive definitions, the Surreal Numbers form a class that contains a copy of the real numbers, transfinite ordinals, and infinitesimals, combinations of these, and in- finitely many numbers uniquely Surreal. Together with two binary operations, the surreal numbers form a field. The existence of the Surreal Numbers is pr
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Ho, Kwan-hung, and 何君雄. "On the prime twins conjecture and almost-prime k-tuples." Thesis, The University of Hong Kong (Pokfulam, Hong Kong), 2002. http://hub.hku.hk/bib/B29768421.

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Chan, Ching-yin, and 陳靖然. "On k-tuples of almost primes." Thesis, The University of Hong Kong (Pokfulam, Hong Kong), 2013. http://hdl.handle.net/10722/195967.

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Ketkar, Pallavi S. (Pallavi Subhash). "Primitive Substitutive Numbers are Closed under Rational Multiplication." Thesis, University of North Texas, 1998. https://digital.library.unt.edu/ark:/67531/metadc278637/.

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Lehr (1991) proved that, if M(q, r) denotes the set of real numbers whose expansion in base-r is q-automatic i.e., is recognized by an automaton A = (Aq, Ar, ao, δ, φ) (or is the image under a letter to letter morphism of a fixed point of a substitution of constant length q) then M(q, r) is closed under addition and rational multiplication. Similarly if we let M(r) denote the set of real numbers α whose base-r digit expansion is ultimately primitive substitutive, i.e., contains a tail which is the image (under a letter to letter morphism) of a fixed point of a primitive substitution then in an
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Libros sobre el tema "Numbers"

1

Badiou, Alain. Number and numbers. Polity Press, 2008.

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1934-, Deza M., ed. Figurate numbers. World Scientific, 2012.

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Schleich, Wolfgang. Prime numbers 101: A primer on number theory. Wiley, 2008.

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illustrator, Knight Paula, ed. Numbers. Norwood House Press, 2016.

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Aboff, Marcie. If you were an odd number. Picture Window Books, 2009.

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Glynne-Jones, Tim. The book of numbers. Chartwell Books, 2008.

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Montgomery, Hugh L. Multiplicative number theory I: Classical theory. Cambridge University Press, 2006.

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Parshin, A. N. Number Theory IV: Transcendental Numbers. Springer Berlin Heidelberg, 1998.

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Ming, Nai-Ta. New theory of real numbers especially regarding "infinite" and "zero". Verlag Dr. Kovač, 1996.

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Dave, Hewitt, Wigley Alan, and Association of Teachers of Mathematics., eds. Developing number: Complements, numbers, tables. Association of Teachers of Mathematics, 2000.

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Capítulos de libros sobre el tema "Numbers"

1

Legrand, Pierre. "Numbers' number." In The Negative Turn in Comparative Law. Routledge, 2024. http://dx.doi.org/10.4324/9781003162070-4.

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Hart, F. Mary. "Numbers and Number Systems." In Guide to Analysis. Macmillan Education UK, 1988. http://dx.doi.org/10.1007/978-1-349-09390-8_1.

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Hart, F. Mary. "Numbers and Number Systems." In Guide to Analysis. Macmillan Education UK, 2001. http://dx.doi.org/10.1007/978-1-349-87194-0_2.

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Agarwal, Ravi P. "Numbers and Number Mysticism." In Mathematics Before and After Pythagoras. Springer Nature Switzerland, 2024. http://dx.doi.org/10.1007/978-3-031-74224-8_2.

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Loya, Paul. "Numbers, Numbers, and More Numbers." In Amazing and Aesthetic Aspects of Analysis. Springer New York, 2017. http://dx.doi.org/10.1007/978-1-4939-6795-7_2.

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Vorobiew, Nicolai N. "Number-Theoretic Properties of Fibonacci Numbers." In Fibonacci Numbers. Birkhäuser Basel, 2002. http://dx.doi.org/10.1007/978-3-0348-8107-4_3.

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Cornil, Jack-Michel, and Philippe Testud. "Real Numbers, Complex Numbers." In An Introduction to Maple V. Springer Berlin Heidelberg, 2001. http://dx.doi.org/10.1007/978-3-642-56729-2_4.

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Rassias, Michael Th. "Perfect numbers, Fermat numbers." In Problem-Solving and Selected Topics in Number Theory. Springer New York, 2010. http://dx.doi.org/10.1007/978-1-4419-0495-9_3.

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Pólya, George, and Gabor Szegö. "Complex Numbers and Number Sequences." In Problems and Theorems in Analysis I. Springer Berlin Heidelberg, 1998. http://dx.doi.org/10.1007/978-3-642-61983-0_10.

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Coppel, W. A. "The Number of Prime Numbers." In Number Theory. Springer New York, 2009. http://dx.doi.org/10.1007/978-0-387-89486-7_9.

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Actas de conferencias sobre el tema "Numbers"

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Kogkalidis, Konstantinos, and Stergios Chatzikyriakidis. "On Tables with Numbers, with Numbers." In Proceedings of the 1st Workshop on Language Models for Underserved Communities (LM4UC 2025). Association for Computational Linguistics, 2025. https://doi.org/10.18653/v1/2025.lm4uc-1.12.

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Mahendra, Rahmad, Damiano Spina, Lawrence Cavedon, and Karin Verspoor. "Do Numbers Matter? Types and Prevalence of Numbers in Clinical Texts." In Proceedings of the 23rd Workshop on Biomedical Natural Language Processing. Association for Computational Linguistics, 2024. http://dx.doi.org/10.18653/v1/2024.bionlp-1.32.

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Lim, John T., and Larry C. Thaler. "Numbers, Numbers Everywhere!" In SMPTE Advanced Television and Electronic Imaging Conference. IEEE, 1993. http://dx.doi.org/10.5594/m00684.

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Milinkovic, Luka, Marija Antic, and Zoran Cica. "Pseudo-random number generator based on irrational numbers." In TELSIKS 2011 - 2011 10th International Conference on Telecommunication in Modern Satellite, Cable and Broadcasting Services. IEEE, 2011. http://dx.doi.org/10.1109/telsks.2011.6143212.

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Kochetov, A., and S. Frolov. "CONVERTING NUMBERS FROM ONE NUMBER SYSTEM TO ANOTHER." In CHALLENGING ISSUES IN SYSTEMS MODELING AND PROCESSES. FSBE Institution of Higher Education Voronezh State University of Forestry and Technologies named after G.F. Morozov, 2025. https://doi.org/10.58168/cismp2024_343-348.

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This paper has analyzed in detail various number systems and their applications in computer science. Algorithms for translating numbers between number systems (decimal, binary, octal and hexadecimal) and their use in programming have been considered. Examples of implementation of translation algorithms and program tools illustrate the practical applicability of this knowledge.
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Watanabe, Ricardo Augusto, Estevao Esmi Laureano, and Cibele Cristina Trinca Watanabe. "Fuzzy Octonion Numbers and Fuzzy Hypercomplex Numbers." In 2019 IEEE International Conference on Fuzzy Systems (FUZZ-IEEE). IEEE, 2019. http://dx.doi.org/10.1109/fuzz-ieee.2019.8858970.

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Irmak, Nurettin, and Abdullah Açikel. "On perfect numbers close to Tribonacci numbers." In 1ST INTERNATIONAL CONFERENCE ON MATHEMATICAL AND RELATED SCIENCES (ICMRS 2018). Author(s), 2018. http://dx.doi.org/10.1063/1.5047878.

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Hajime, Kaneko, and Takao Komatsu. "Expansion of real numbers by algebraic numbers." In DIOPHANTINE ANALYSIS AND RELATED FIELDS: DARF 2007/2008. AIP, 2008. http://dx.doi.org/10.1063/1.2841897.

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Berthe, Valerie, and Laurent Imbert. "On converting numbers to the double-base number system." In Optical Science and Technology, the SPIE 49th Annual Meeting, edited by Franklin T. Luk. SPIE, 2004. http://dx.doi.org/10.1117/12.558895.

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Jeong, Young-Seob, Kyojoong Oh, Chung-Ki Cho, and Ho-Jin Choi. "Pseudo Random Number Generation Using LSTMs and Irrational Numbers." In 2018 IEEE International Conference on Big Data and Smart Computing (BigComp). IEEE, 2018. http://dx.doi.org/10.1109/bigcomp.2018.00091.

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Informes sobre el tema "Numbers"

1

Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, 1985. http://dx.doi.org/10.17487/rfc0943.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, 1985. http://dx.doi.org/10.17487/rfc0960.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, 1986. http://dx.doi.org/10.17487/rfc0990.

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Reynolds, J. K., and J. Postel. Internet numbers. RFC Editor, 1987. http://dx.doi.org/10.17487/rfc0997.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, 1987. http://dx.doi.org/10.17487/rfc1010.

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Romano, S., and M. K. Stahl. Internet numbers. RFC Editor, 1987. http://dx.doi.org/10.17487/rfc1020.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, 1990. http://dx.doi.org/10.17487/rfc1060.

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Romano, S., M. K. Stahl, and M. Recker. Internet numbers. RFC Editor, 1988. http://dx.doi.org/10.17487/rfc1062.

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Romano, S., M. K. Stahl, and M. Recker. Internet numbers. RFC Editor, 1989. http://dx.doi.org/10.17487/rfc1117.

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Kirkpatrick, S., M. K. Stahl, and M. Recker. Internet numbers. RFC Editor, 1990. http://dx.doi.org/10.17487/rfc1166.

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