Young Students’ Functional Thinking Modes: The Relation Between Recursive Patterning, Covariational Thinking, and Correspondence Relations

IF 3.5 2区教育学 Q1 EDUCATION & EDUCATIONAL RESEARCH

Journal for Research in Mathematics Education Pub Date : 2020-11-01 DOI:10.5951/jresematheduc-2020-0164

M. Pittalis, D. Pitta-Pantazi, C. Christou

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引用次数: 12

Abstract

A theoretical model describing young students’ (Grades 1–3) functional-thinking modes was formulated and validated empirically (n = 345), hypothesizing that young students’ functional-thinking modes consist of recursive patterning, covariational thinking, correspondence-particular, and correspondence-general factors. Data analysis suggested that functional-thinking tasks can be categorized on the basis of the proposed model. Analysis traced three categories of students that represent different functional-thinking profiles. Category 1 students exhibited a recursive-thinking profile. Category 2 students utilized a combination of recursive and contextual strategies and exhibited an emergent covariational and correspondence-particular thinking. Category 3 students approached functional-thinking situations flexibly, using a combination of covariational and correspondence strategies. A structural model showed two parallel paths from recursive patterning to correspondence-general through correspondence-particular or covariational.

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青年学生的功能思维模式:递归模式、协变思维与对应关系的关系

本文建立了一种描述青年学生(1-3年级)功能思维模式的理论模型，并进行了实证验证(n = 345)，假设青年学生的功能思维模式由递归模式、协变思维、对应特定因素和对应一般因素组成。数据分析表明，功能思维任务可以根据所提出的模型进行分类。分析追踪了代表不同功能思维特征的三类学生。第一类学生表现出递归思维特征。第二类学生运用递归策略和情境策略相结合，并表现出紧急协变思维和对应特定思维。第三类学生运用协变和对应策略的结合，灵活地处理功能思维情境。结构模型显示了从递归模式到一般对应、特殊对应或协变对应的两条并行路径。

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.