Learning basic arithmetic: A comparison between rote and procedural learning based on an artificial sequence.

IF 2.2 2区 心理学 Q2 PSYCHOLOGY
Stéphanie Chouteau, Benoît Lemaire, Catherine Thevenot, Jasinta Dewi, Karine Mazens
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引用次数: 0

Abstract

It is commonly accepted that repeatedly using mental procedures results in a transition to memory retrieval, but the determinant of this process is still unclear. In a 3-week experiment, we compared two different learning situations involving basic additions, one based on counting and the other based on arithmetic fact memorization. Two groups of participants learned to verify additions such as "G + 2 = Q?" built on an artificial sequence (e.g., "XGRQD…"). The first group learned the sequence beforehand and could therefore count to solve the problems, whereas the second group was not aware of the sequence and had to learn the equations by rote. With practice, solution times of both groups reached a plateau, indicating a certain level of automatization. However, a more fine-grained comparison indicated that participants relied on fundamentally different learning mechanisms. In the counting condition, most participants showed a persistent linear effect of the numerical operand on solution times, suggesting that fluency was reached through an acceleration of counting procedures. However, some participants began memorizing the problems involving the largest addends: Their solution times were very similar to those of participants in the rote learning group, suggesting that they resulted from a memory retrieval process. These findings show that repeated mental procedures do not systematically lead to memory retrieval but that fluency can also be reached through the acceleration of these procedures. Moreover, these results challenge associationist models, which cannot currently predict that the process of memorization begins with problems involving the largest addends. (PsycInfo Database Record (c) 2024 APA, all rights reserved).

学习基本算术:基于人工序列的背诵式学习和程序式学习的比较。
人们普遍认为,反复使用心理程序会导致向记忆检索过渡,但这一过程的决定因素仍不清楚。在一项为期 3 周的实验中,我们比较了涉及基本加法的两种不同学习情境,一种是基于计数的学习情境,另一种是基于算术事实记忆的学习情境。两组参与者学习验证建立在人工序列(如 "XGRQD......")上的加法,如 "G + 2 = Q?第一组事先学习了序列,因此可以通过计算来解决问题,而第二组则不知道序列,只能通过死记硬背来学习等式。随着练习的进行,两组学生的解题时间都达到了一个平稳点,这表明他们已经达到了一定的自动化水平。然而,更细致的比较表明,学员们所依赖的学习机制有着本质的不同。在计数条件下,大多数参与者的数字操作数对解题时间有持续的线性影响,这表明他们是通过加速计数程序来达到流畅解题的。然而,一些参与者开始记忆涉及最大加数的问题:他们的解题时间与死记硬背组的学员非常相似,这表明他们的解题时间是记忆检索过程的结果。这些研究结果表明,重复的思维过程并不会系统地导致记忆检索,但通过加速这些过程也可以达到流畅的记忆。此外,这些结果对联想模型提出了挑战,因为联想模型目前无法预测记忆过程是从涉及最大加数的问题开始的。(PsycInfo Database Record (c) 2024 APA, 版权所有)。
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
CiteScore
4.30
自引率
3.80%
发文量
163
审稿时长
4-8 weeks
期刊介绍: The Journal of Experimental Psychology: Learning, Memory, and Cognition publishes studies on perception, control of action, perceptual aspects of language processing, and related cognitive processes.
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