First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence

Detalhes bibliográficos
Autor(a) principal: Oliveira, Rannyelly Rodrigues de
Data de Publicação: 2020
Outros Autores: Andrade, Maria Helena de, Alves, Francisco Régis Vieira
Tipo de documento: Artigo
Idioma: por
Título da fonte: Research, Society and Development
Texto Completo: https://rsdjournal.org/index.php/rsd/article/view/1767
Resumo: This paper reflects on the dissertation developed; in the Graduate Program in Science and Mathematics Teaching of the Federal Institute of Education, Science and Technology of the State of Ceará; SEDUC / CE teacher Arlem Atanazio dos Santos. In this sense, this work aims to perform an analysis of the Didactic Engineering stages that Santos (2017) built in Higher Education. Thus, there are two specific objectives: (i) to highlight the methodological potential (of this engineering) of didactic transposition of nontrivial mathematical models; (ii) provide the reader with the opportunity to develop an epistemological conception of the teaching of history of mathematics with emphasis on the historical-evolutionary process of the Fibonacci model. This dissertation assumed Didactic Engineering as a research methodology in complementarity with Didactical Situation Theory. In a panoramic view, definitions and mathematical relations arising from the generalization and extension of the Fibonacci Sequence were approached. However, for the classroom, the Binet Formula was considered as a model of generalization and extension of this sequence. Thus, following the paradigm of this engineering, it is understood that a didactic transposition of the generalized Fibonaccian model was performed, in which the didactic experience was carried out in Higher Education. This can lead to the development of an epistemological conception of the teaching of history of mathematics during the initial formation of mathematics teachers. Moreover, given the historical-evolutionary process that involves the Fibonacci model, it can be concluded that the emergence of new definitions and properties contribute to broaden the repertoire of the history of mathematics.
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spelling First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequenceIngeniería didáctica de primera generación en Educación Superior: generalización y extensión de la secuencia de FibonacciEngenharia didática de primeira geração no Ensino Superior: generalização e extensão da sequência de FibonacciDidactic Engineering. Fibonacci Sequence. Binet's Formula. Didactic Situations Theory.Engenharia Didática. Sequência de Fibonacci. Fórmula de Binet. Teoria das Situações Didáticas.This paper reflects on the dissertation developed; in the Graduate Program in Science and Mathematics Teaching of the Federal Institute of Education, Science and Technology of the State of Ceará; SEDUC / CE teacher Arlem Atanazio dos Santos. In this sense, this work aims to perform an analysis of the Didactic Engineering stages that Santos (2017) built in Higher Education. Thus, there are two specific objectives: (i) to highlight the methodological potential (of this engineering) of didactic transposition of nontrivial mathematical models; (ii) provide the reader with the opportunity to develop an epistemological conception of the teaching of history of mathematics with emphasis on the historical-evolutionary process of the Fibonacci model. This dissertation assumed Didactic Engineering as a research methodology in complementarity with Didactical Situation Theory. In a panoramic view, definitions and mathematical relations arising from the generalization and extension of the Fibonacci Sequence were approached. However, for the classroom, the Binet Formula was considered as a model of generalization and extension of this sequence. Thus, following the paradigm of this engineering, it is understood that a didactic transposition of the generalized Fibonaccian model was performed, in which the didactic experience was carried out in Higher Education. This can lead to the development of an epistemological conception of the teaching of history of mathematics during the initial formation of mathematics teachers. Moreover, given the historical-evolutionary process that involves the Fibonacci model, it can be concluded that the emergence of new definitions and properties contribute to broaden the repertoire of the history of mathematics.Este artículo reflexiona sobre la disertación desarrollada; en el Programa de Posgrado en Enseñanza de Ciencias y Matemáticas del Instituto Federal de Educación, Ciencia y Tecnología del Estado de Ceará; Profesor SEDUC / CE Arlem Atanazio dos Santos. En este sentido, este trabajo tiene como objetivo realizar un análisis de las etapas de Ingeniería Didáctica que Santos (2017) construyó en Educación Superior. Por lo tanto, hay dos objetivos específicos: (i) resaltar el potencial metodológico (de esta ingeniería) de la transposición didáctica de modelos matemáticos no triviales; (ii) brinde al lector la oportunidad de desarrollar una concepción epistemológica de la enseñanza de la historia de las matemáticas con énfasis en el proceso histórico-evolutivo del modelo de Fibonacci. Esta disertación asumió la Ingeniería Didáctica como una metodología de investigación en complementariedad con la Teoría de la Situación Didáctica. En una vista panorámica, se abordaron definiciones y relaciones matemáticas derivadas de la generalización y extensión de la secuencia de Fibonacci. Sin embargo, para el aula, la Fórmula Binet se consideró como un modelo de generalización y extensión de esta secuencia. Así, siguiendo el paradigma de esta ingeniería, se entiende que se realizó una transposición didáctica del modelo generalizado de Fibonacci, en el que la experiencia didáctica se realizó en la Educación Superior. Esto puede conducir al desarrollo de una concepción epistemológica de la enseñanza de la historia de las matemáticas durante la formación inicial de los profesores de matemáticas. Además, dado el proceso histórico-evolutivo que involucra el modelo de Fibonacci, se puede concluir que la aparición de nuevas definiciones y propiedades contribuyen a ampliar el repertorio de la historia de las matemáticas.Este trabalho faz uma reflexão sobre a Dissertação desenvolvida; no programa de Pós-Graduação em Ensino de Ciências e Matemática do Instituto Federal de Educação, Ciências e Tecnologia do Estado do Ceará; pelo docente da SEDUC/CE Arlem Atanazio dos Santos. Nesse sentido, este trabalho tem o objetivo de realizar uma análise das etapas da Engenharia Didática que Santos (2017) construiu no Ensino Superior. Assim, tem-se dois objetivos específicos: (i) evidenciar o potencial metodológico (dessa engenharia) de transposição didática de modelos matemáticos não triviais; (ii) oportunizar ao leitor o desenvolvimento de uma concepção epistemológica sobre o ensino de História da Matemática com ênfase no processo histórico-evolutivo do modelo de Fibonacci. Essa dissertação assumiu a Engenharia Didática como metodologia de pesquisa em complementaridade com a Teoria das Situações Didáticas. Numa visão panorâmica, foram abordadas definições e relações matemáticas oriundas da generalização e extensão da Sequência de Fibonacci. Contudo, para a sala de aula, foi considerada a Fórmula de Binet como modelo de generalização e extensão dessa sequência. Assim sendo, seguindo o paradigma dessa engenharia, compreende-se que foi realizada uma transposição didática do modelo Fibonacciano generalizado, em que a experiência didática foi efetivada no Ensino Superior. O que pode oportunizar o desenvolvimento de uma concepção epistemológica do ensino de História da Matemática durante a formação inicial de professores de Matemática. Além do mais, diante do processo histórico-evolutivo que envolve o modelo de Fibonacci, pode-se concluir que o surgimento de novas definições e propriedades contribuem para ampliar o repertório da História da Matemática.Research, Society and Development2020-01-01info:eu-repo/semantics/articleinfo:eu-repo/semantics/publishedVersionapplication/pdfhttps://rsdjournal.org/index.php/rsd/article/view/176710.33448/rsd-v9i1.1767Research, Society and Development; Vol. 9 No. 1; e165911767Research, Society and Development; Vol. 9 Núm. 1; e165911767Research, Society and Development; v. 9 n. 1; e1659117672525-3409reponame:Research, Society and Developmentinstname:Universidade Federal de Itajubá (UNIFEI)instacron:UNIFEIporhttps://rsdjournal.org/index.php/rsd/article/view/1767/1561Copyright (c) 2020 Rannyelly Rodrigues de Oliveira, Francisco Régis Vieira Alvesinfo:eu-repo/semantics/openAccessOliveira, Rannyelly Rodrigues deAndrade, Maria Helena deAlves, Francisco Régis Vieira2020-08-19T03:04:08Zoai:ojs.pkp.sfu.ca:article/1767Revistahttps://rsdjournal.org/index.php/rsd/indexPUBhttps://rsdjournal.org/index.php/rsd/oairsd.articles@gmail.com2525-34092525-3409opendoar:2024-01-17T09:26:40.836013Research, Society and Development - Universidade Federal de Itajubá (UNIFEI)false
dc.title.none.fl_str_mv First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
Ingeniería didáctica de primera generación en Educación Superior: generalización y extensión de la secuencia de Fibonacci
Engenharia didática de primeira geração no Ensino Superior: generalização e extensão da sequência de Fibonacci
title First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
spellingShingle First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
Oliveira, Rannyelly Rodrigues de
Didactic Engineering. Fibonacci Sequence. Binet's Formula. Didactic Situations Theory.
Engenharia Didática. Sequência de Fibonacci. Fórmula de Binet. Teoria das Situações Didáticas.
title_short First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
title_full First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
title_fullStr First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
title_full_unstemmed First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
title_sort First generation didactic engineering in Higher Education: generalization and extension of the Fibonacci sequence
author Oliveira, Rannyelly Rodrigues de
author_facet Oliveira, Rannyelly Rodrigues de
Andrade, Maria Helena de
Alves, Francisco Régis Vieira
author_role author
author2 Andrade, Maria Helena de
Alves, Francisco Régis Vieira
author2_role author
author
dc.contributor.author.fl_str_mv Oliveira, Rannyelly Rodrigues de
Andrade, Maria Helena de
Alves, Francisco Régis Vieira
dc.subject.por.fl_str_mv Didactic Engineering. Fibonacci Sequence. Binet's Formula. Didactic Situations Theory.
Engenharia Didática. Sequência de Fibonacci. Fórmula de Binet. Teoria das Situações Didáticas.
topic Didactic Engineering. Fibonacci Sequence. Binet's Formula. Didactic Situations Theory.
Engenharia Didática. Sequência de Fibonacci. Fórmula de Binet. Teoria das Situações Didáticas.
description This paper reflects on the dissertation developed; in the Graduate Program in Science and Mathematics Teaching of the Federal Institute of Education, Science and Technology of the State of Ceará; SEDUC / CE teacher Arlem Atanazio dos Santos. In this sense, this work aims to perform an analysis of the Didactic Engineering stages that Santos (2017) built in Higher Education. Thus, there are two specific objectives: (i) to highlight the methodological potential (of this engineering) of didactic transposition of nontrivial mathematical models; (ii) provide the reader with the opportunity to develop an epistemological conception of the teaching of history of mathematics with emphasis on the historical-evolutionary process of the Fibonacci model. This dissertation assumed Didactic Engineering as a research methodology in complementarity with Didactical Situation Theory. In a panoramic view, definitions and mathematical relations arising from the generalization and extension of the Fibonacci Sequence were approached. However, for the classroom, the Binet Formula was considered as a model of generalization and extension of this sequence. Thus, following the paradigm of this engineering, it is understood that a didactic transposition of the generalized Fibonaccian model was performed, in which the didactic experience was carried out in Higher Education. This can lead to the development of an epistemological conception of the teaching of history of mathematics during the initial formation of mathematics teachers. Moreover, given the historical-evolutionary process that involves the Fibonacci model, it can be concluded that the emergence of new definitions and properties contribute to broaden the repertoire of the history of mathematics.
publishDate 2020
dc.date.none.fl_str_mv 2020-01-01
dc.type.driver.fl_str_mv info:eu-repo/semantics/article
info:eu-repo/semantics/publishedVersion
format article
status_str publishedVersion
dc.identifier.uri.fl_str_mv https://rsdjournal.org/index.php/rsd/article/view/1767
10.33448/rsd-v9i1.1767
url https://rsdjournal.org/index.php/rsd/article/view/1767
identifier_str_mv 10.33448/rsd-v9i1.1767
dc.language.iso.fl_str_mv por
language por
dc.relation.none.fl_str_mv https://rsdjournal.org/index.php/rsd/article/view/1767/1561
dc.rights.driver.fl_str_mv Copyright (c) 2020 Rannyelly Rodrigues de Oliveira, Francisco Régis Vieira Alves
info:eu-repo/semantics/openAccess
rights_invalid_str_mv Copyright (c) 2020 Rannyelly Rodrigues de Oliveira, Francisco Régis Vieira Alves
eu_rights_str_mv openAccess
dc.format.none.fl_str_mv application/pdf
dc.publisher.none.fl_str_mv Research, Society and Development
publisher.none.fl_str_mv Research, Society and Development
dc.source.none.fl_str_mv Research, Society and Development; Vol. 9 No. 1; e165911767
Research, Society and Development; Vol. 9 Núm. 1; e165911767
Research, Society and Development; v. 9 n. 1; e165911767
2525-3409
reponame:Research, Society and Development
instname:Universidade Federal de Itajubá (UNIFEI)
instacron:UNIFEI
instname_str Universidade Federal de Itajubá (UNIFEI)
instacron_str UNIFEI
institution UNIFEI
reponame_str Research, Society and Development
collection Research, Society and Development
repository.name.fl_str_mv Research, Society and Development - Universidade Federal de Itajubá (UNIFEI)
repository.mail.fl_str_mv rsd.articles@gmail.com
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