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1	The Greek Method of Exhaustion: Leading the Way to Modern Integration DeSouza, Chelsea E. 27 June 2012 (has links) No description available. Mathematics archimedes quadrature of the parabola method of exhaustion constructing regular polygons
2	Επίλυση ελλειπτικών προβλημάτων σε κανονικά πολύγωνα με χρήση γνωστών μεθόδων, καθώς και μεθόδων που προκύπτουν από νέες μαθηματικές αναλύσεις του προβλήματος. / Numerical solution of elliptic boundery value problems in regular polygons using well established methods as well as new thansformations recently developed. Κανδύλη, Αναστασία 16 May 2007 (has links) Η παρούσα διπλωματική αναφέρεται σε ελλειπτικά προβλήματα συνοριακών συνθηκών σε κανονικά πολύγωνα, εστιάζοντας στην αρκετά γενική εξίσωση Helmholtz. Θα εφαρμοσθούν οι γνωστές υπολογιστικές μέθοδοι επίλυσης ελλειπτικών προβλημάτων (όπως η παρεμβολή με τμηματικά κυβικά πολυώνυμα) και θα αναπτυχθούν και μέθοδοι που προκύπτουν από νέες μαθηματικές αναλύσεις του προβλήματος. / In this work we deal with elliptic boundary value problems which are defined in regular polygons. The numerical results presented in the defence are derived using well established methods, such as the finite differemces and the 2d collocation, as well as a new method introduced recently which appears to yield nice results. Κανονικά πολύγωνα 515.353 Elliptic problems Boundary value problems Regular polygons
3	A construção do pentágono regular segundo Euclides Silva, Alex Cristophe Cruz da 16 July 2013 (has links) Submitted by Clebson Anjos (clebson.leandro54@gmail.com) on 2015-05-19T19:39:45Z No. of bitstreams: 1 arquivototal.pdf: 2901630 bytes, checksum: d49c78ad5c7d463bdc9e8f53c093d865 (MD5) / Approved for entry into archive by Clebson Anjos (clebson.leandro54@gmail.com) on 2015-05-19T19:39:55Z (GMT) No. of bitstreams: 1 arquivototal.pdf: 2901630 bytes, checksum: d49c78ad5c7d463bdc9e8f53c093d865 (MD5) / Made available in DSpace on 2015-05-19T19:39:55Z (GMT). No. of bitstreams: 1 arquivototal.pdf: 2901630 bytes, checksum: d49c78ad5c7d463bdc9e8f53c093d865 (MD5) Previous issue date: 2013-07-16 / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior - CAPES / In this work we present some constructions of the regular pentagon, the main one is a construction of Euclid found in his book The Elements. We also present some applications of this construction. / Neste trabalho, apresentamos algumas construções do pentágono regular, sendo a principal delas uma construção de Euclides encontrada no seu livro Os Elementos. Apresentamos, também, algumas aplicações desta construção. Polígonos regulares Pentágono Euclides Segmento Áureo Pentagon Euclid Golden Mean Regular Polygons MATEMATICA::MATEMATICA APLICADA
4	CritÃrio para a construtibilidade de polÃgonos regulares por rÃgua e compasso e nÃmeros construtÃveis / Criterion for constructibility of regular polygons by ruler and compass and constructible numbers Aislan Sirino Lopes 17 May 2014 (has links) CoordenaÃÃo de AperfeiÃoamento de Pessoal de NÃvel Superior / Este trabalho aborda construÃÃes geomÃtricas elementares e de polÃgonos regulares realizadas com rÃgua nÃo graduada e compasso respeitando as regras ou operaÃÃes elementares usadas na Antiguidade pelos gregos. Tais construÃÃes serÃo inicialmente tratadas de uma forma puramente geomÃtrica e, a fim de encontrar um critÃrio que possa determinar a possibilidade de construÃÃo de polÃgonos regulares, passarÃo a ser discutidas por um viÃs algÃbrico. Este tratamento algÃbrico evidenciarÃ uma relaÃÃo entre a geometria e a Ãlgebra, em especial, a relaÃÃo entre os vÃrtices de um polÃgono regular e as raÃzes de polinÃmios de uma variÃvel com coeficientes racionais. Este tratamento algÃbrico nos levarÃ naturalmente ao conceito de construtibilidade de nÃmeros e pontos no plano de um corpo, o que exigirÃ o uso de extensÃes algÃbricas de corpos, e os critÃrios para a construtibi- lidade destes nos levarÃ a um critÃrio de construtibilidade dos polÃgonos pretendidos. / This work discusses basic geometric constructions and constructions of regular polygons with ruler and compass made respecting the rules or elementary operations used by the ancient Greeks. Such constructs are initially treated in a purely geometric form and, in order to find a criterion that can determine the possibility of construction of regular polygons, will be discussed by an algebraic bias. This algebraic treatment will show a relationship between geometry and algebra, in particular, the relationship between the vertices of a regular polygon and the roots of polynomials in a variable with rational coefficients. This algebraic treatment leads us naturally to the concept of constructibility of numbers and points in a field, which will require the use of algebraic field extensions, and the criteria for the constructibility of these leads to a criterion for constructibility of polygons. polÃgonos regulares nÃmeros construtÃveis extensÃes algÃbricas regular polygons constructible numbers polynomials algebraic fields extensions ALGEBRA
5	Poliedros de Platão como estratégia no ensino da geometria espacial Nogueira, Simone Paes Gonçalves January 2014 (has links) Orientador: Prof. Dr. André Ricardo Oliveira da Fonseca / Dissertação (mestrado) - Universidade Federal do ABC, Programa de Pós-Graduação em Mestrado Profissional em Matemática em Rede Nacional, 2014. / Our work aims to make a brief study on polyhedrons, focusing specially on solid platonics. First, we will present the historical moment in which this topic was discussed, as well as mention the mathematicians who contributed to the first studies about it. Then, we will explain what are regular polygons, dihedral angle and regular polyhedron. We will also discuss the reasons why there are only five solid platonics and we will demonstrate the Euler Characteristics, through induction. We will provide sample activities, which can be used in classrooms, in order to in uence positivetly the learning process of students. Therefore, such students will be able to better learn and understand the content, rather than just decorating the \formulas". We will also show an intuitive idea of calculating the area and volumes of solid platonics, which is something rarely demonstrated in textbooks. Further on, we will demonstrate how this topic is presented by the National Curriculum Parameters \Parâmetros Curriculares Nacionais (PCN)", and relate it to how it is developed and and taught since the first years of schools until the second year of High School, time in which this topic is more deeply studied. There are sample questions, which can be found in national examinations, such as Saresp (São Paulo's government exam) and ENEM (Federal government exam). Throughout this work you will be able to see imagens that were taken during a project envolving students from a second High School year, which was taken place a public school. GEOMETRIA ESPACIAL POLÍGONOS REGULARES FILOSOFIA GREGA SPATIAL GEOMETRY REGULAR POLYGONS PLATONIC SOLIDS
6	Ladrilhamentos irregulares, discos extremos e grafos de balão / Irregular tiling, extremes discs and graphs of balloon Batista, Frederico Ventura 28 February 2012 (has links) Made available in DSpace on 2015-03-26T13:45:34Z (GMT). No. of bitstreams: 1 texto completo.pdf: 1893968 bytes, checksum: ce37a1814e775a74aa222b17583fdc19 (MD5) Previous issue date: 2012-02-28 / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior / This dissertation aims to study two topics related to modern topology and geometry. The first of these themes is dedicated to the study of packaging and record covering spheres in the hyperbolic plane, in which we treat the study results due to Bavard (1996) [3]. The second issue that was addressed refers to the study of edges pairing for irregular polygons. In this part we try to expose an example, created during our studies, for a pairing that generates a tiling of the hyperbolic plane by an irregular polygon. Also use the techniques developed by Mercio Botelho Faria, Catarina Mendes de Jesus and Panteleón D. R. Sanchez in [14] to obtain matching of edges of regular polygons through surgeries in surfaces associated with trivalent graphs. / Esta dissertação tem como objetivo o estudo de dois temas ligados a topologia e a geometria moderna. O primeiro destes temas é dedicado ao estudo de empacotamento e coberturas de discos do plano hiperbólico, no qual tratamos de estudar resultados devidos a Bavard (1996) [3]. Já o segundo tema que foi abordado se refere ao estudo de emparelhamento de arestas para polígonos irregulares. Nesta parte tratamos de expor um exemplo, criado durante nossos estudos, para um emparelhamento que gera um ladrilhamento do plano hiperbólico por um polígono irregular. Além disso utilizamos as técnicas desenvolvidas por Mercio Botelho Faria, Catarina Mendes de Jesus e Panteleón D. R. Sanchez em [14] para obtermos emparelhamentos de arestas de polígonos regulares por meio de cirurgias em superfícies associadas a grafos trivalentes. Plano hiperbólico Polígonos irregulares Polígonos regulares Hyperbolic plane Irregular polygons Regular polygons
7	[en] COMPLEXITY IN EUCLIDEAN PLANE GEOMETRY / [pt] COMPLEXIDADE EM GEOMETRIA EUCLIDIANA PLANA SILVANA MARINI RODRIGUES LOPES 25 February 2003 (has links) [pt] Consideramos duas formas de complexidade em geometria euclidiana plana.Na primeira, problemas são descritos algebricamente, e a complexidade é cotada essencialmente pelo grau de um polinômio. Como consequência, mostramos que vários resultados gerais e familiares em geometria podem ser demonstrados a partir da simples verificação de dois ou três casos particulares. A segunda forma faz uso da descrição sintática dos teoremas, que permite uma quantificação da complexidade em termos lógicos (número de quantificadores e átomos de uma fórmula). Inspirados por esta última abordagem, são descritos alguns procedimentos de demonstração automática. Alguns grupos habituais de operções em geometria são apresentados com a intenção de simplificar as duas abordagens.Através do estudo de técnicas mais avançadas em matemática trazemos novos pontos de vista a assuntos estudados no ensino médio. / [en] Two forms of complexity in Euclidean plane geometry are considered. In the first one, problems are described algebraically, and the complexity level is measured essentially by the degree of a polynomial. As a consequence, many familiar and general results in geometry can be proved by inspecting two or three special cases. The second form uses the syntactic description of a theorem allowing for a quanti.cation of the complexity in logic terms (number of quantifiers and atoms in the formula). Inspired by this approach, some procedures in mechanized proofs are described. We also present some traditional groups of operations in geometry which simplify the two approaches. The study of more advanced techniques in mathematics sheds new light on standard high school topics. [pt] MATEMATICA [en] MATHEMATICS [pt] GEOMETRIA EUCLIDIANA [en] EUCLIDEAN GEOMETRY [pt] NUMEROS COMPLEXOS [en] COMPLEX NUMBERS [pt] COMPLEXIDADE ALGEBRICA [en] ALGEBRAIC COMPLEXITY [pt] AUTOMATIZACAO EM GEOMETRIA [en] GEOMETRY AUTOMATIZATION [pt] POLIGONOS REGULARES [en] REGULAR POLYGONS [pt] INVERSOES [en] INVERSION
8	Émergence et évolution des objets mathématiques en Situation Didactique de Recherche de Problème : le cas des pavages archimédiens du plan / Emergence and evolution of mathematical objects, during a “ Didactical Situation of a Problem Solving ” : the Case of Archimedean tilings of the plane Front, Mathias 27 November 2015 (has links) Étudier l'émergence de savoirs lors de situations didactiques non finalisées par un savoir préfabriqué et pré-pensé nécessite un bouleversement des points de vue, aussi bien épistémologique que didactique. C'est pourquoi, pour l'étude de situations didactiques pour lesquelles le problème est l'essence, nous développons une nouvelle approche historique et repensons des outils pour les analyses didactiques. Nous proposons alors, pour un problème particulier, l'exploration des pavages archimédiens du plan, une enquête historique centrée sur l'activité du savant cherchant et sur l'influence de la relation aux objets dans la recherche. De ce point de vue, l'étude des travaux de Johannes Kepler à la recherche d'une harmonie du monde est particulièrement instructive. Nous proposons également, pour l'analyse des savoirs émergents en situation didactique, une utilisation d'outils liés à la sémiotique qui permet de mettre en évidence la dynamique de l'évolution des objets mathématiques. Nous pouvons finalement conclure quant à la possibilité de construire et mettre en œuvre des ≪ Situations Didactiques de Recherche de Problème ≫ assurant l'engagement du sujet dans la recherche, l'émergence et le développement d'objets mathématiques, la genèse de savoirs. L'étude nous conforte dans la nécessité d'une approche pragmatique des situations et la pertinence d'un regard différent sur les savoirs à l'école / The study of the emergence of knowledges in teaching situations not finalized by a prefabricated and pre-thought knowledge requires an upheaval of point of view, epistemological as well as didactic. For the study of learning situations in which the problem is the essence, we develop a new historical approach and we rethink the tools for didactic analyzes. We propose, then, for a particular problem, exploration of Archimedean tilings of the plane, a historical inquiry centered on the activity of the scientist in the process of research and on the influence of the relationship with objects. From this perspective, the study of Johannes Kepler’s work in search of a world harmony is particularly instructive. We also propose, for the analysis of the emerging knowledge in teaching situations, to use tools related to semiotics, which allows to highlight the dynamic of evolution of mathematical objects. We can finally conclude on the opportunity to build and implement “Didactic Situations of Problem Solving”, which ensure the commitment of the subject in the research, the emergence and development of mathematical objects, the genesis of knowledges. The study reinforces the necessity of a pragmatic approach of situations and the relevance of a different look at the knowledge at school Problème Savoirs mathématiques Épistémologie scolaire Objets mathématiques Polygones réguliers Pavages archimédiens Kepler Problem Mathematical knowledges School epistemology Mathematical objects Didactic Situation of a Problem Solving Regular polygons Archimedean tilings Kepler 370.7
9	Visualisation, navigation and mathematical perception: a visual notation for rational numbers mod1 Tolmie, Julie, julie.tolmie@techbc.ca January 2000 (has links) There are three main results in this dissertation. The first result is the construction of an abstract visual space for rational numbers mod1, based on the visual primitives, colour, and rational radial direction. Mathematics is performed in this visual notation by defining increasingly refined visual objects from these primitives. In particular, the existence of the Farey tree enumeration of rational numbers mod1 is identified in the texture of a two-dimensional animation. ¶ The second result is a new enumeration of the rational numbers mod1, obtained, and expressed, in abstract visual space, as the visual object coset waves of coset fans on the torus. Its geometry is shown to encode a countably infinite tree structure, whose branches are cosets, nZ+m, where n, m (and k) are integers. These cosets are in geometrical 1-1 correspondence with sequences kn+m, (of denominators) of rational numbers, and with visual subobjects of the torus called coset fans. ¶ The third result is an enumeration in time of the visual hierarchy of the discrete buds of the Mandelbrot boundary by coset waves of coset fans. It is constructed by embedding the circular Farey tree geometrically into the empty internal region of the Mandelbrot set. In particular, coset fans attached to points of the (internal) binary tree index countably infinite sequences of buds on the (external) Mandelbrot boundary. mathematical visualisation visual mathematics visual notation visual object visual abstraction visual abstraction in time visual representation visual argument visual and time-based digitalthesis thesis by animation pattern perception mathematical perception abstract choreography visualisation of rational numbers Farey tree Farey sequence Mandelbrot buds torus rational flowson the torus rational lattice on the torus cyclic groups and regular polygons.

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