帮助组合情境学习的符号表征寄存器

IF 0.3 Q4 MATHEMATICS

Mathematics Enthusiast Pub Date : 2021-08-01 DOI:10.54870/1551-3440.1537

Juliana Azevedo Montenegro, Rute E. de S. Rosa Borba, Marilena Bittar

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引用次数: 1

摘要

为了分析组合情境解决的进展，由于符号语域的识别、转换和处理，进行了两项研究。在第一项研究中，五年级的学生从自然语言的问题中识别了可能性树、列表和数字表达式中的寄存器。第二项研究由五年级、七年级和九年级的学生进行，被配置为一项干预研究，其中使用树或列表作为出发语域（自然语言）和到达语域（数字表达）的中间表示。研究结果证实了一个假设，即转换为数值表达式比转换为树或列表更复杂。还证实了树比列表更一致，在数字表达式中有寄存器。结果表明，使用中间表征，如树或系统列表，是一种很好的教学策略，有助于提高学生在学校早期和中期的组合推理能力。

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REGISTERS OF SEMIOTIC REPRESENTATIONS AIDING THE LEARNING OF COMBINATORIAL SITUATIONS

In order to analyze advances in the resolution of combinatorial situations, due to the identification, conversion and treatment of semiotic registers, two studies were carried out. In the first study, 5th grade students identified, from problems in natural language, registers in trees of possibilities, lists and numerical expressions. The second study, carried out with 5th, 7th and 9th grade students, was configured as an intervention study in which trees or lists were used as an intermediate representation of the departure register (natural language) to the arrival register (numerical expression). The results of the studies confirmed the hypothesis that the conversion to numerical expression is more complex than the conversion to trees or lists. It was also confirmed that trees are more congruent, than lists, with registers in numerical expression. It is concluded that the use of intermediate representations, such as trees or systematic lists, is a good teaching strategy for advances in the combinatorial reasoning of students in the early and middle years of schooling.

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来源期刊

Mathematics Enthusiast MATHEMATICS-

CiteScore

1.40

自引率

0.00%

发文量

期刊介绍： The Mathematics Enthusiast (TME) is an eclectic internationally circulated peer reviewed journal which focuses on mathematics content, mathematics education research, innovation, interdisciplinary issues and pedagogy. The journal exists as an independent entity. The electronic version is hosted by the Department of Mathematical Sciences- University of Montana. The journal is NOT affiliated to nor subsidized by any professional organizations but supports PMENA [Psychology of Mathematics Education- North America] through special issues on various research topics. TME strives to promote equity internationally by adopting an open access policy, as well as allowing authors to retain full copyright of their scholarship contingent on the journals’ publication ethics guidelines. Authors do not need to be affiliated with the University of Montana in order to publish in this journal. Journal articles cover a wide spectrum of topics such as mathematics content (including advanced mathematics), educational studies related to mathematics, and reports of innovative pedagogical practices with the hope of stimulating dialogue between pre-service and practicing teachers, university educators and mathematicians. The journal is interested in research based articles as well as historical, philosophical, political, cross-cultural and systems perspectives on mathematics content, its teaching and learning. The journal also includes a monograph series on special topics of interest to the community of readers.