Teaching and Learning of Mathematics and its Technologies through Video Lessons and Interactions on Social Networks
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In this work we present teaching and learning alternatives, through a set of video lessons on Mathematics and its Technologies present in the tests of the National High School Exam (ENEM). The objective was to mobilize, from video lessons, skills and competences in mathematical concepts present in the High School curriculum, pointed out by the students from a diagnosis as difficult to understand. The videos were produced by students of the Degree in Mathematics, scholarship holders of the Tutorial Education Program (PET): Knowledge Connections and posted on the YouTube channel, with a suggestion of individual interaction of the participants through WhatsApp and other social networks. After a period of one year of posting the videos, it was possible to observe a considerable number of shares with requests for clarification on mathematical concepts, especially related to solving problems involving algebra and geometry, enabling a favorable interaction to the learning process.
ANASTASIOU, Léa das Graças C.; ALVES, Leonir P. Teaching processes at the university: Assumptions for classroom work strategies; P. 67-100; 3rd edition. Joinville, SC: UNIVILLE, 2004.
BORDENAVE, Juan E.D.; PEREIRA, Adair Martins. Teaching-learning strategies. In: Teaching-learning strategies. Voices, 1985.
COSTA, A.P. (2020). Geometric Thought: in search of a characterization in the light of Fischbein, Duval and Pais. Paranaense Magazine of Mathematics Education, 9(18), 152-179.
DUVAL, R. (2011). Seeing and teaching mathematics in another way: entering the mathematical way of thinking about the registers of semiotic representations. Translation by Marlene Alves Dias. Sao Paulo: PROEM.
FISCHBEIN, E. (1993). The Theory of Figural Concepts. Educational Studies in Mathematics, 24(2), 139-162. Retrieved May 5, 2021, from: http://www.jstor.org/stable/3482943.
MANFREDO, Elizabeth Cardoso Gerhardt. Project methodology and teacher training: a significant experience in the practice of teaching natural sciences. Experiences in Science Teaching - V1(3), pp. 45-57, 2006.
MELO, Jose Ronaldo. Mathematics teacher training courses. Edufac Publisher. Rio Branco – Acre, 2016.
MELO, Jose Ronaldo. Research and extension projects: contributions to the training of mathematics teachers through supervised training. CONJECTURES, v. 22, p. 1308-1317, 2022.
MELO, Jose Ronaldo. Teacher training practices that train Mathematics teachers for basic education. CONJECTURES, v. 22, p. 444-457, 2022.
MELO, Jose Ronaldo. Curriculum development through teacher training practices. Brazilian Journal of Development, v. 07, p. 7704-7717, 2021.
MELO, Jose Ronaldo. Teaching and learning of mathematics, its philosophical-scientific foundations, its strategies and possibilities. Brazilian Journal of Development, v. 07, p. 7680-7691, 2021.
MELO, Jose Ronaldo; NICACIO, R. L. Teaching of measurement units, register of semiotic representation and injunctive texts. South American Journal of Basic Education, Technical and Technological, v. v. 7, p. 37-70, 2020.
MELO, Jose Ronaldo; BASTOS, Elisabeth Machado. Teaching rational numbers from manipulable subjects and learning objects. Magazine of Mathematics, Teaching and Culture, v. 15, p. 46-62, 2020.
MOREIRA, Marco Antonio. The theory of meaningful learning: and its implementation in the classroom. Brasília: Editora UnB, 2006.
POLYA, George. (1995). The art of problem solving: a new aspect of the mathematical method. trans. Heitor Lisboa de Araújo. 2nd reprint. Rio de Janeiro.
SILVA, Sandro Ricardo Pinto. Videos of mathematical content in the initial training of mathematics teachers in the distance modality (Universidade Estadual Paulista (UNESP), 2018) [Doctoral Thesis]
SILVA, Daniela Mendes Vieira; Andrade, Fabiana and Nascimento, Isabela Alcantara. https://educacaopublica.cecierj.edu.br/artigos/19/11/ideia-intuitiva-de-limite-usando-o-circulo-e-a-circunferencia. ISSN: 1984-6290 B3 in teaching - Qualis, Capes DOI: 10.18264/REP
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