A definitive solution to the most visited point problem in both the plane and space

Authors

DOI:

https://doi.org/10.35819/remat2024v10i1id6840

Keywords:

most visited point, lattices in the plane, rectangle, parallelepiped, combinatorial analysis

Abstract

In this article, we will solve the problem of the most visited point within rectangles and parallelepipeds, with the problem already solved for squares in Santos and Castilho (2013). The problem is as follows: considering a rectangle in the first quadrant of the Cartesian plane with the lower-left vertex at the origin (0,0), we seek the integer coordinates through which the most paths pass. These paths are determined by integer steps either upwards or to the right, starting from the origin of the Cartesian system and reaching the upper-right vertex (M,N) of the rectangle. The conclusions we have reached are that the most visited point within the M by N rectangle, with M>N, is the point (1,0); in parallelepipeds of dimensions M by N by P, with M>N>=P, the most visited point is the point (1,0,0); in regular parallelepipeds of dimensions M by M by M, the most visited point is (1,1,1) for M=2, for M>2 the points will be (1,0,0), (0,1,0), and (0,0,1). We used basic tools of Combinatorial Analysis and the Principle of Induction for the calculations.

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Author Biographies

Antônio Luiz de Melo, Universidade de Brasília (UNB), Brasília, DF, Brasil

http://lattes.cnpq.br/7916809389452643

Rogério César dos Santos, Universidade de Brasília (UNB), Brasília, DF, Brasil

http://lattes.cnpq.br/0041767607288381

References

HAZZAN, Samuel. Fundamentos de Matemática Elementar: Combinatória / Probabilidade. v. 5, 8. ed. São Paulo: Atual, 2013.

SANTOS, José Plínio O.; MELLO, Margarida P.; MURARI, Idani T. C. Introdução à Análise Combinatória. 4. ed. Rio de Janeiro: Ciência Moderna, 2007.

SANTOS, Rogério César dos; CASTILHO, José Eduardo. O problema do ponto mais visitado. Revista do Professor de Matemática, São Paulo, v. 82, p. 50-52, 2013. Disponível em: https://rpm.org.br/cdrpm/82/11.html. Acesso em: 14 ago. 2023.

SANTOS, Rogério César dos; MELO, Antônio Luiz de. O problema do ponto mais visitado em retângulos e paralelepípedos: casos particulares e conjecturas. Revista Eletrônica Paulista de Matemática, Bauru, v. 11, p. 89-98, 2017. Disponível em: https://sistemas.fc.unesp.br/ojs/index.php/revistacqd/article/view/159. Acesso em: 14 ago. 2023.

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Published

2024-04-28

How to Cite

MELO, A. L. de; SANTOS, R. C. dos. A definitive solution to the most visited point problem in both the plane and space. REMAT: Revista Eletrônica da Matemática, Bento Gonçalves, RS, v. 10, n. 1, p. e3007, 2024. DOI: 10.35819/remat2024v10i1id6840. Disponível em: https://periodicos.ifrs.edu.br/index.php/REMAT/article/view/6840. Acesso em: 19 may. 2024.

Issue

Vol. 10 No. 1 (2024)

Section

Mathematics

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