Abstract algebra students’ conceptual metaphors for isomorphism and homomorphism

IF 1 Q3 EDUCATION & EDUCATIONAL RESEARCH
Rachel Rupnow , Brooke Randazzo
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引用次数: 0

Abstract

Group isomorphism and homomorphism are core concepts in abstract algebra, and student understanding of isomorphism has received extensive attention in line with the centrality of this topic. However, limited work has directly examined student conceptions of homomorphism or what metaphors students use to express their thought processes while problem solving. Based on interviews with four students, we contrast two students who used predominantly formal definition and mapping-centered metaphors for homomorphism with two who additionally used sameness-centered metaphors and note that the usage or non-usage of sameness-centered metaphors was not indicative of successful problem solving. Implications include the alignment between students’ metaphors and those used in instruction, indicating the importance of attending to metaphors when teaching, and the importance of discussing what is intended by some sameness-based metaphors, such as operation-preservation.

抽象代数学生对同构和同态的概念隐喻
群同构和同态是抽象代数的核心概念,学生对同构的理解也因这一主题的核心地位而受到广泛关注。然而,直接研究学生对同态的概念或学生在解题时使用什么隐喻来表达他们的思维过程的研究却很有限。根据对四名学生的访谈,我们对比了两名主要使用以形式定义和映射为中心的同构隐喻的学生和两名额外使用以同一性为中心的隐喻的学生,并注意到使用或不使用以同一性为中心的隐喻并不代表问题解决的成功与否。其意义包括学生的隐喻与教学中使用的隐喻之间的一致性,表明在教学中关注隐喻的重要性,以及讨论一些基于同一性的隐喻(如操作-保存)的意图的重要性。
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来源期刊
Journal of Mathematical Behavior
Journal of Mathematical Behavior EDUCATION & EDUCATIONAL RESEARCH-
CiteScore
2.70
自引率
17.60%
发文量
69
期刊介绍: The Journal of Mathematical Behavior solicits original research on the learning and teaching of mathematics. We are interested especially in basic research, research that aims to clarify, in detail and depth, how mathematical ideas develop in learners. Over three decades, our experience confirms a founding premise of this journal: that mathematical thinking, hence mathematics learning as a social enterprise, is special. It is special because mathematics is special, both logically and psychologically. Logically, through the way that mathematical ideas and methods have been built, refined and organized for centuries across a range of cultures; and psychologically, through the variety of ways people today, in many walks of life, make sense of mathematics, develop it, make it their own.
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