Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito

Merli, Renato Francisco

Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito

Detalhes bibliográficos
Ano de defesa:	2022
Autor(a) principal:	Merli, Renato Francisco
Orientador(a):	Nogueira, Clélia Maria Ignatius
Banca de defesa:	Vianna, Carlos Roberto , Tassinari, Ricardo Pereira , Klüber, Tiago Emanuel , Rezende, Veridiana
Tipo de documento:	Tese
Tipo de acesso:	Acesso aberto
Idioma:	por
Instituição de defesa:	Universidade Estadual do Oeste do Paraná Cascavel
Programa de Pós-Graduação:	Programa de Pós-Graduação em Educação em Ciências e Educação Matemática
Departamento:	Centro de Ciências Exatas e Tecnológicas
País:	Brasil
Palavras-chave em Português:	História da Matemática Ideias-base Conceitos organizadores Teoria dos Campos Conceituais History of mathematics Ideas-base Organized Concepts Theory of Conceptual Fields
Área do conhecimento CNPq:	EDUCAÇÃO EM CIÊNCIAS E EDUCAÇÃO MATEMÁTICA
Link de acesso:	https://tede.unioeste.br/handle/tede/6451
Resumo:	The concept of function is essential in Mathematics, as it is a constituent part of a large number of mathematical operations. For this reason, it forms an integral part of the Mathematics curricula of virtually all countries in the world. However, research has shown that students have not correctly appropriated this concept. Several reasons are given, such as: teaching approach based on abstract representations and a lack of clarity about what are the previous concepts that students need to know to conceptualize the concept of function. The practical aspect left aside, together with the lack of structuring of the situations necessary for the teaching of function, have led the Group of Studies and Research in Didactics of Mathematics (GePeDiMa) to establish the possible Conceptual Field of Functions and Affine Function. In this scenario, this thesis aimed to verify the existence of the Conceptual Field of Affine Function and, consequently, of Functions; beyond the Fields of Additive and Multiplicative Structures, already established by Vergnaud. To prove this existence, the organizing concepts, the basic ideas, the representations, and situations that make up this Conceptual Field were mapped. To this end, a bibliographic investigation was carried out, guided by the Theory of Conceptual Fields regarding functions, considering three perspectives: historical, cognitive, and didactic. The investigation was qualitative, with methodological referrals assured in the assumptions of a State-of-the-Art research and analyzes based on the Theory of Conceptual Fields. From a historical perspective, nine stages in the evolution from the functional thinking to the concept of function have been identified. The cognitive perspective provided support to identify that the cognitive structures necessary for the subject to be able to conceive the concept of function start with notions of relations between magnitudes and are established in formalized regularities. Finally, from the didactic perspective, the algebraic focus on function teaching and the difficulties encountered by students with regard to different representations were detected. From these results and associated with the quartet (situation, organizing concept, basic idea, representation) the existence of the Conceptual Field of Functions was confirmed, as well as its basic ideas were identified, namely: dependence, generalization, regularity, and variable.

Metadados do item

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spelling	Nogueira, Clélia Maria IgnatiusCV: http://lattes.cnpq.br/7001703570357441Powell, Arthur Belfordhttp://lattes.cnpq.br/3998471745530201Vianna, Carlos Robertohttp://lattes.cnpq.br/5000796701369816Tassinari, Ricardo Pereirahttp://lattes.cnpq.br/5284741141457630Klüber, Tiago Emanuelhttp://lattes.cnpq.br/5540300916224438Rezende, Veridianahttp://lattes.cnpq.br/5630494004651939CV: http://lattes.cnpq.br/4313837720967509Merli, Renato Francisco2023-02-15T23:53:11Z2022-12-06MERLI, Renato Francisco. Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito. 2022. 215 f. Tese( Doutorado em Educação em Ciências e Educação Matemática) - Universidade Estadual do Oeste do Paraná, Cascavel PR .https://tede.unioeste.br/handle/tede/6451The concept of function is essential in Mathematics, as it is a constituent part of a large number of mathematical operations. For this reason, it forms an integral part of the Mathematics curricula of virtually all countries in the world. However, research has shown that students have not correctly appropriated this concept. Several reasons are given, such as: teaching approach based on abstract representations and a lack of clarity about what are the previous concepts that students need to know to conceptualize the concept of function. The practical aspect left aside, together with the lack of structuring of the situations necessary for the teaching of function, have led the Group of Studies and Research in Didactics of Mathematics (GePeDiMa) to establish the possible Conceptual Field of Functions and Affine Function. In this scenario, this thesis aimed to verify the existence of the Conceptual Field of Affine Function and, consequently, of Functions; beyond the Fields of Additive and Multiplicative Structures, already established by Vergnaud. To prove this existence, the organizing concepts, the basic ideas, the representations, and situations that make up this Conceptual Field were mapped. To this end, a bibliographic investigation was carried out, guided by the Theory of Conceptual Fields regarding functions, considering three perspectives: historical, cognitive, and didactic. The investigation was qualitative, with methodological referrals assured in the assumptions of a State-of-the-Art research and analyzes based on the Theory of Conceptual Fields. From a historical perspective, nine stages in the evolution from the functional thinking to the concept of function have been identified. The cognitive perspective provided support to identify that the cognitive structures necessary for the subject to be able to conceive the concept of function start with notions of relations between magnitudes and are established in formalized regularities. Finally, from the didactic perspective, the algebraic focus on function teaching and the difficulties encountered by students with regard to different representations were detected. From these results and associated with the quartet (situation, organizing concept, basic idea, representation) the existence of the Conceptual Field of Functions was confirmed, as well as its basic ideas were identified, namely: dependence, generalization, regularity, and variable.O conceito de função é essencial na Matemática, pois ela é parte constituinte de um grande número de operações matemáticas. Por esta razão constitui parte integrante dos currículos de Matemática de praticamente todos os países do mundo. Entretanto, pesquisas têm mostrado que os estudantes não têm se apropriado adequadamente deste conceito. Vários são os motivos apontados, tais como: abordagem de ensino pautada em representações abstratas e uma falta de clareza sobre quais são os conceitos anteriores que os estudantes precisam saber para conceitualizar o conceito de função. O aspecto prático deixado de lado aliado à falta de uma estruturação das situações necessárias para o ensino de função, têm levado o Grupo de Estudos e Pesquisa em Didática da Matemática (GePeDiMa) a estabelecer o possível Campo Conceitual de Funções e Função Afim. Nesse cenário, esta tese objetivou verificar a existência do Campo Conceitual de Função Afim e, consequentemente de Funções; para além dos Campos das Estruturas Aditivas e Multiplicativas, já estabelecidos por Vergnaud. Para comprovar esta existência, foram mapeados os conceitos organizadores, as ideias-base, as representações e situações que compõem este Campo Conceitual. Para tal, foi realizada uma investigação bibliográfica, orientada pela Teoria dos Campos Conceituais a respeito de funções, considerando-se três perspectivas: histórica, cognitiva e didática. A investigação foi qualitativa, com encaminhamentos metodológicos assegurados nos pressupostos de uma pesquisa do tipo Estado da Arte e análises baseadas na Teoria dos Campos Conceituais. Da perspectiva histórica, foram identificados nove estágios na evolução de pensamento funcional até o conceito de função. A perspectiva cognitiva forneceu suporte para identificar que as estruturas cognitivas necessárias para que o sujeito possa conceber o conceito de função iniciam com noções de relações entre grandezas e se firmam nas regularidades formalizadas. Da perspectiva didática, detectou-se o enfoque algebrista no ensino de função e as dificuldades encontradas pelos alunos no que se refere às diferentes representações. A partir desses resultados e associados ao quarteto (situação, conceito organizador, ideia-base, representação) foi confirmada a existência do Campo Conceitual de Funções, bem como identificou-se suas ideias base, a saber: dependência, generalização, regularidade e variável.Submitted by Rosangela Silva (rosangela.silva3@unioeste.br) on 2023-02-15T23:53:11Z No. of bitstreams: 2 Renato Francisco Merli.pdf: 5368803 bytes, checksum: f903242ff75a14a5f04155edf108742b (MD5) license_rdf: 0 bytes, checksum: d41d8cd98f00b204e9800998ecf8427e (MD5)Made available in DSpace on 2023-02-15T23:53:11Z (GMT). No. of bitstreams: 2 Renato Francisco Merli.pdf: 5368803 bytes, checksum: f903242ff75a14a5f04155edf108742b (MD5) license_rdf: 0 bytes, checksum: d41d8cd98f00b204e9800998ecf8427e (MD5) Previous issue date: 2022-12-06Coordenação de Aperfeiçoamento de Pessoal de Nível Superior - CAPESapplication/pdfpor6588633818200016417500Universidade Estadual do Oeste do ParanáCascavelPrograma de Pós-Graduação em Educação em Ciências e Educação MatemáticaUNIOESTEBrasilCentro de Ciências Exatas e Tecnológicashttp://creativecommons.org/licenses/by-nc-nd/4.0/info:eu-repo/semantics/openAccessHistória da MatemáticaIdeias-baseConceitos organizadoresTeoria dos Campos ConceituaisHistory of mathematicsIdeas-baseOrganized ConceptsTheory of Conceptual FieldsEDUCAÇÃO EM CIÊNCIAS E EDUCAÇÃO MATEMÁTICADo Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceitoFrom Functional Thinking to the Conceptual Field of Function: the development of a concept.info:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/doctoralThesis-325959922541770290360060060022143744428683820152075167498588264571reponame:Biblioteca Digital de Teses e Dissertações do UNIOESTEinstname:Universidade Estadual do Oeste do Paraná (UNIOESTE)instacron:UNIOESTEORIGINALRenato Francisco Merli.pdfRenato Francisco Merli.pdfapplication/pdf5368803http://tede.unioeste.br:8080/tede/bitstream/tede/6451/5/Renato+Francisco+Merli.pdff903242ff75a14a5f04155edf108742bMD55CC-LICENSElicense_urllicense_urltext/plain; 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dc.title.por.fl_str_mv	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito
dc.title.alternative.eng.fl_str_mv	From Functional Thinking to the Conceptual Field of Function: the development of a concept.
title	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito
spellingShingle	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito Merli, Renato Francisco História da Matemática Ideias-base Conceitos organizadores Teoria dos Campos Conceituais History of mathematics Ideas-base Organized Concepts Theory of Conceptual Fields EDUCAÇÃO EM CIÊNCIAS E EDUCAÇÃO MATEMÁTICA
title_short	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito
title_full	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito
title_fullStr	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito
title_full_unstemmed	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito
title_sort	Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito
author	Merli, Renato Francisco
author_facet	Merli, Renato Francisco
author_role	author
dc.contributor.advisor1.fl_str_mv	Nogueira, Clélia Maria Ignatius
dc.contributor.advisor1Lattes.fl_str_mv	CV: http://lattes.cnpq.br/7001703570357441
dc.contributor.advisor-co1.fl_str_mv	Powell, Arthur Belford
dc.contributor.advisor-co1Lattes.fl_str_mv	http://lattes.cnpq.br/3998471745530201
dc.contributor.referee1.fl_str_mv	Vianna, Carlos Roberto
dc.contributor.referee1Lattes.fl_str_mv	http://lattes.cnpq.br/5000796701369816
dc.contributor.referee2.fl_str_mv	Tassinari, Ricardo Pereira
dc.contributor.referee2Lattes.fl_str_mv	http://lattes.cnpq.br/5284741141457630
dc.contributor.referee3.fl_str_mv	Klüber, Tiago Emanuel
dc.contributor.referee3Lattes.fl_str_mv	http://lattes.cnpq.br/5540300916224438
dc.contributor.referee4.fl_str_mv	Rezende, Veridiana
dc.contributor.referee4Lattes.fl_str_mv	http://lattes.cnpq.br/5630494004651939
dc.contributor.authorLattes.fl_str_mv	CV: http://lattes.cnpq.br/4313837720967509
dc.contributor.author.fl_str_mv	Merli, Renato Francisco
contributor_str_mv	Nogueira, Clélia Maria Ignatius Powell, Arthur Belford Vianna, Carlos Roberto Tassinari, Ricardo Pereira Klüber, Tiago Emanuel Rezende, Veridiana
dc.subject.por.fl_str_mv	História da Matemática Ideias-base Conceitos organizadores Teoria dos Campos Conceituais History of mathematics Ideas-base Organized Concepts Theory of Conceptual Fields
topic	História da Matemática Ideias-base Conceitos organizadores Teoria dos Campos Conceituais History of mathematics Ideas-base Organized Concepts Theory of Conceptual Fields EDUCAÇÃO EM CIÊNCIAS E EDUCAÇÃO MATEMÁTICA
dc.subject.cnpq.fl_str_mv	EDUCAÇÃO EM CIÊNCIAS E EDUCAÇÃO MATEMÁTICA
description	The concept of function is essential in Mathematics, as it is a constituent part of a large number of mathematical operations. For this reason, it forms an integral part of the Mathematics curricula of virtually all countries in the world. However, research has shown that students have not correctly appropriated this concept. Several reasons are given, such as: teaching approach based on abstract representations and a lack of clarity about what are the previous concepts that students need to know to conceptualize the concept of function. The practical aspect left aside, together with the lack of structuring of the situations necessary for the teaching of function, have led the Group of Studies and Research in Didactics of Mathematics (GePeDiMa) to establish the possible Conceptual Field of Functions and Affine Function. In this scenario, this thesis aimed to verify the existence of the Conceptual Field of Affine Function and, consequently, of Functions; beyond the Fields of Additive and Multiplicative Structures, already established by Vergnaud. To prove this existence, the organizing concepts, the basic ideas, the representations, and situations that make up this Conceptual Field were mapped. To this end, a bibliographic investigation was carried out, guided by the Theory of Conceptual Fields regarding functions, considering three perspectives: historical, cognitive, and didactic. The investigation was qualitative, with methodological referrals assured in the assumptions of a State-of-the-Art research and analyzes based on the Theory of Conceptual Fields. From a historical perspective, nine stages in the evolution from the functional thinking to the concept of function have been identified. The cognitive perspective provided support to identify that the cognitive structures necessary for the subject to be able to conceive the concept of function start with notions of relations between magnitudes and are established in formalized regularities. Finally, from the didactic perspective, the algebraic focus on function teaching and the difficulties encountered by students with regard to different representations were detected. From these results and associated with the quartet (situation, organizing concept, basic idea, representation) the existence of the Conceptual Field of Functions was confirmed, as well as its basic ideas were identified, namely: dependence, generalization, regularity, and variable.
publishDate	2022
dc.date.issued.fl_str_mv	2022-12-06
dc.date.accessioned.fl_str_mv	2023-02-15T23:53:11Z
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dc.type.driver.fl_str_mv	info:eu-repo/semantics/doctoralThesis
format	doctoralThesis
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dc.identifier.citation.fl_str_mv	MERLI, Renato Francisco. Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito. 2022. 215 f. Tese( Doutorado em Educação em Ciências e Educação Matemática) - Universidade Estadual do Oeste do Paraná, Cascavel PR .
dc.identifier.uri.fl_str_mv	https://tede.unioeste.br/handle/tede/6451
identifier_str_mv	MERLI, Renato Francisco. Do Pensamento Funcional ao Campo Conceitual de Função: o desenvolvimento de um conceito. 2022. 215 f. Tese( Doutorado em Educação em Ciências e Educação Matemática) - Universidade Estadual do Oeste do Paraná, Cascavel PR .
url	https://tede.unioeste.br/handle/tede/6451
dc.language.iso.fl_str_mv	por
language	por
dc.relation.program.fl_str_mv	-3259599225417702903
dc.relation.confidence.fl_str_mv	600 600 600
dc.relation.department.fl_str_mv	2214374442868382015
dc.relation.sponsorship.fl_str_mv	2075167498588264571
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dc.publisher.none.fl_str_mv	Universidade Estadual do Oeste do Paraná Cascavel
dc.publisher.program.fl_str_mv	Programa de Pós-Graduação em Educação em Ciências e Educação Matemática
dc.publisher.initials.fl_str_mv	UNIOESTE
dc.publisher.country.fl_str_mv	Brasil
dc.publisher.department.fl_str_mv	Centro de Ciências Exatas e Tecnológicas
publisher.none.fl_str_mv	Universidade Estadual do Oeste do Paraná Cascavel
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