Janice Rachelli, Ana Lúcia Uberti Pinheiro, Leonard Porta
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引用次数: 0
摘要
背景:盖伊·布鲁梭的教学情境理论被认为是在教学情境和教学情境中配置的教学序列的方法论结构工具。目的:探讨教学情境理论对圆体研究的贡献,着重于为学生有意义地巩固知识的实践。设计:我们提出用卡瓦列里原理和帕普斯定理解决有关圆体表面积和体积计算的问题。环境和参与者:该研究是在巴西RS市Júlio de Castilhos市的一所国立教育学院的两个高中三年级班级进行的,共有25名学生参与。数据收集和分析:通过在课堂上开展的活动和谷歌课堂的反馈来进行。它是由学生记录的文件转录资助的。结果:教学顺序的发展有利于智力自主和对知识对象的有意义学习。结论:教学情境理论为涉及圆体研究的教学组织和知识巩固过程的分析提供了重要的资助,表明其在高中和高等教育中其他数学对象的研究中的应用。
Study of Round Bodies: Conceptions and Praxis of a Didactic Sequence in Light of Guy Brousseau’s Theory
Background: Guy Brousseau’s theory of didactic situations has been considered an apparatus for the methodological structuring of didactic sequences configured in didactic and adidactic situations. Objectives: To investigate the contributions of the theory of didactic situations to the study of round bodies, focused on a praxis that meaningfully consolidates knowledge for the students. Design: We propose solving problem situations concerning the calculus of surface areas and volumes of round bodies using Cavalieri’s principle and Pappus’s theorems. Setting and participants: The research was conducted with two high school third-grade classes of a state institute of education located in the municipality of Júlio de Castilhos, RS, Brazil, with the participation of 25 students. Data collection and analysis: It was carried out through activities developed in the classroom and feedback given through Google Classroom. It was subsidised by the documental transcription of students’ records. Results: The research indicated that the didactic sequence development favoured intellectual autonomy and meaningful learning about the object of knowledge. Conclusions: The theory of didactic situations provided important subsidies for didactic organisation and analysis of the knowledge consolidation process involving the study of round bodies, indicating its application in the study of other mathematical objects in high school and higher education.