九年级学生对数线概念的理解

Q2 Mathematics
Zehra E Ünal, A. M. Ala, Gamze Kartal, Serkan Özel, David C. Geary
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引用次数: 0

摘要

通过口头解释和视觉呈现,对 60 名(35 名女生和 25 名男生)九年级学生对数列概念的理解进行了定性评估。评估包括一个开放式问题,重点是学生对数线的描述,解释围绕六个特征展开:顺序排序(即数字是按顺序表示的)、数字的正负性(即数线包含正数和负数)、非中心性(即数线包含正数和负数)、数字的正负性(即数线包含正数和负数)、非中心性(即数线包含正数和负数)、数线包含正数和负数)、非中心性(即 0 不一定在中心)、无穷大、增量灵活性(即数线的增量可 以变化)和连续性(即数字可以放在负无穷大和正无穷大之间的任何地方而不会中断)。从学生的解释中可以看出,在对数线的概念理解过程中,这六个特征依次出现在五个 阶段。这五个阶段是:(1) 一无所知;(2) 顺序排序和正负性;(3) 无穷大和非中心性;(4) 递增灵活性;(5) 连续性。后两个阶段在大多数描述中都没有出现。结果表明,学生对数线的理解是不完整的,常用的数线知识定量评估可能会高估学生的理解。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Ninth-grade students’ conceptual understanding of the number line
Sixty (35 girls and 25 boys) 9th-grade students’ conceptual understanding of the number line was qualitatively assessed through verbal explanations and visual representations. The assessment included an open-ended question focused on students’ number line descriptions and the explanations coalesced around six features: sequential ordering (i.e., numbers are sequentially represented), positivity-negativity of numbers (i.e., the number line contains positive and negative numbers), non-centrality (i.e., zero does not have to be in the center), infinity, increment flexibility (i.e., number line increments can vary), and continuity (i.e., numbers can be placed anywhere between minus infinity and plus infinity without breaks). The students’ explanations show that these six features emerge in five successive stages in the conceptual understanding of the number line. These stages are (1) no knowledge, (2) sequential ordering and positivity-negativity, (3) infinity and non-centrality, (4) incremental flexibility, and (5) continuity. The last two stages were not found in most descriptions. The results suggest that students’ understanding of the number line is incomplete and may be overestimated by commonly used quantitative assessments of number line knowledge.
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来源期刊
Journal of Numerical Cognition
Journal of Numerical Cognition Mathematics-Numerical Analysis
CiteScore
3.20
自引率
0.00%
发文量
18
审稿时长
40 weeks
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