Onto-semiotic complexity of the Definite Integral

IF 3.5 2区教育学 Q1 EDUCATION & EDUCATIONAL RESEARCH

Journal for Research in Mathematics Education Pub Date : 2021-02-24 DOI:10.17583/REDIMAT.2021.6778

M. Burgos, Seydel Bueno, Olga Pérez, J. Godino

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引用次数: 4

Abstract

Teaching and learning Calculus concepts and procedures, particularly the definite integral concept, is a challenge to teachers and students in their academic careers. In order to develop an informed plan for improving instructional processes, it is necessary to pay attention to the nature and complexity of the mathematical features of the definite integral, that students are expected to understand and apply. In this research, we supplement the analysis made by different authors, applying the theoretical and methodological tools of the Onto-Semiotic Approach to mathematical knowledge and instruction. The goal is to understand the diverse meanings of the concept of the definite integral and potentials semiotic conflicts based on the given data. We focus attention on a first intuitive meaning, which involves mainly arithmetic knowledge, and the definite integral formal meaning as Riemann’s sums limit predominantly in the curricular guidelines. The recognition of the onto-semiotic complexity of mathematics objects is considered as a key factor in explaining the learning difficulties of concepts, procedures and its application for problem-solving, as well as to make grounded decisions on teaching. The methodology analysis of a mathematical text, which we exemplify in this work applying the tools of Onto-Semiotic Approach, provides a microscopic level of analysis that allows us to identify some semiotic-cognitive facts of didactic interest. This also allows for the identification of some epistemic strata , that is, institutional knowledge that should have been previously studied, which usually goes unnoticed in the teaching process.

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论定积分的符号复杂性

微积分概念和过程，特别是定积分概念的教学，对教师和学生的学术生涯都是一个挑战。为了制定一个改进教学过程的知情计划，有必要注意定积分数学特征的性质和复杂性，期望学生理解和应用定积分。在这项研究中，我们补充了不同作者的分析，将Onto符号学方法的理论和方法论工具应用于数学知识和教学。目的是在给定数据的基础上理解定积分概念的不同含义和潜在的符号冲突。我们将注意力集中在第一直觉意义上，它主要涉及算术知识，以及课程指南中主要涉及的黎曼和极限的定积分形式意义。对数学对象符号复杂性的认识被认为是解释概念、过程及其在解决问题中的应用的学习困难的关键因素，也是做出有根据的教学决策的关键因素。我们在这项工作中应用Onto符号学方法的工具对数学文本进行的方法论分析提供了微观层面的分析，使我们能够识别一些具有教学意义的符号认知事实。这也允许识别一些认识层，即以前应该研究的制度知识，而这些知识在教学过程中通常会被忽视。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal for Research in Mathematics Education EDUCATION & EDUCATIONAL RESEARCH-

CiteScore

5.20

自引率

17.90%

发文量

期刊介绍： An official journal of the National Council of Teachers of Mathematics (NCTM), JRME is the premier research journal in mathematics education and is devoted to the interests of teachers and researchers at all levels--preschool through college. JRME is a forum for disciplined inquiry into the teaching and learning of mathematics. The editors encourage submissions including: -Research reports, addressing important research questions and issues in mathematics education, -Brief reports of research, -Research commentaries on issues pertaining to mathematics education research, and -Book reviews.