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  • About
  • The Global ETD Search service is a free service for researchers to find electronic theses and dissertations. This service is provided by the Networked Digital Library of Theses and Dissertations.
    Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
1

A criatividade matem?tica de John Wallis na obra Arithmetica Infinitorum: contribui??es para ensino de c?lculo diferencial e integral na licenciatura em matem?tica

Lopes, Gabriela Lucheze de Oliveira 24 February 2017 (has links)
Submitted by Automa??o e Estat?stica (sst@bczm.ufrn.br) on 2017-04-17T22:47:12Z No. of bitstreams: 1 GabrielaLuchezeDeOliveiraLopes_TESE.pdf: 6049374 bytes, checksum: 3515f5da06487f76c77ce277db17c307 (MD5) / Approved for entry into archive by Arlan Eloi Leite Silva (eloihistoriador@yahoo.com.br) on 2017-04-19T23:33:36Z (GMT) No. of bitstreams: 1 GabrielaLuchezeDeOliveiraLopes_TESE.pdf: 6049374 bytes, checksum: 3515f5da06487f76c77ce277db17c307 (MD5) / Made available in DSpace on 2017-04-19T23:33:36Z (GMT). No. of bitstreams: 1 GabrielaLuchezeDeOliveiraLopes_TESE.pdf: 6049374 bytes, checksum: 3515f5da06487f76c77ce277db17c307 (MD5) Previous issue date: 2017-02-24 / A pesquisa que originou este texto de tese de doutorado teve como objetivo examinar de que forma as ideias de John Wallis, emergentes na obra Arithmetica Infinitorum, datada de 1656, apresentou inova??es que podem contribuir para o encaminhamento conceitual e did?tico de no??es b?sicas da componente curricular de C?lculo Diferencial e Integral, no curso de Licenciatura em Matem?tica. Nesse sentido, avaliamos o potencial pedag?gico da referida obra para subsidiar o ensino de conceitos matem?ticos, em particular as no??es de integrais, com vistas ao melhoramento do entendimento dos estudantes acerca dessas ideias matem?ticas, tratadas nos Cursos de Forma??o de Professores de Matem?tica. Por admitirmos que os alunos necessitam ampliar o n?mero de trajet?rias que levam ao desenvolvimento de uma ideia Matem?tica ? que, neste trabalho, nos propusemos a responder a seguinte quest?o: como a explora??o did?tica do exerc?cio criativo de um matem?tico na hist?ria pode contribuir na abordagem pedag?gica para o ensino de conte?dos de C?lculo e An?lise na Licenciatura em Matem?tica? Para tal, apoiamo-nos em princ?pios de criatividade elaborados por Mihaly Csikszentmihalyi, que prop?s um modelo para criatividade que leva em considera??o o contexto social e cultural. Por considerarmos fundamental a explica??o do ciclo do pensamento referente ? inven??o matem?tica, associamos a esses princ?pios os processos do Pensamento Matem?tico Avan?ado, proposto por Tommy Dreyfus, de modo que destacamos como esses processos se conectam com as no??es de criatividade. Assim, formulamos um modelo para examinarmos a obra Arithmetica Infinitorum, indicando seus potenciais pedag?gicos para subsidiar o ensino de conceitos matem?ticos baseado em um car?ter investigativo. De maneira que foi poss?vel estabelecermos uma proposta de conex?o entre conhecimento matem?tico desenvolvido historicamente por diferentes matem?ticos e seus potenciais conceituais epistemol?gicos, com a possibilidade de ser implementada na a??o do professor de Matem?tica formador de professores de Matem?tica, com vistas a desenvolver compet?ncias e habilidades para uma futura atua??o do professor em forma??o. / The research which arose this doctorate?s thesis had as purpose examining in which ways John Wallis? ideas, emerging in Arithmetica Infinitorum, dated 1656, has presented contributing innovations for the didactic and conceptual guiding of Differential and Integral Calculus? curricular components basic notions, in Mathematics Licentiate course. For that matter, we evaluated the production?s pedagogical potential to subsidize mathematical concepts? teaching, mainly integral notions, aiming theim provement of students? understanding about these mathematical ideas, which are contemplated in the Mathematics Teachers training course. Acknowledging that the students need to expand the number of paths which lead to the development of a Mathematical idea, in this study we propose to answer the following question: how can the didactic exploration of a mathematician?s creative exercise contribute to the pedagogical approach for the Calculus and Analysis teaching, in Mathematics Licentiate course? For that we leaned on the creativity criteria discussed by Mihaly Csikszentmihalyi, due to considering it substantial in the thinking cycle explanation regarding the Mathematics creation. We relate to these principles the processes developed by Advanced Mathematical Thinking, suggested by Tommy Dreyfus, in order to highlight how these processes attach to creativity notions. Therefore, we formulated a model to examine the writing Arithmetica Infinitorum pointing its pedagogical potential to subsidize mathematical concepts? teaching, based on aninvestigative character. This way, it was possible to establish a connection proposal between mathematical knowledge historically developed by different mathematicians and their conceptual and epistemological potentials, with a possibility of being implemented in Mathematics teacher?s actions, Mathematics teacher?s trainer, in order to grow expertise and abilities for a forthcoming actuation of the training teacher.

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