AN EXPRESSION OF MATHEMATICAL CONNECTIONS IN MULTIPLICATION-RELATED THINKING IN THIRD AND FOURTH GRADES OF PRIMARY SCHOOL

ŠVIETIMAS: POLITIKA, VADYBA, KOKYBĖ / EDUCATION POLICY, MANAGEMENT AND QUALITY Pub Date : 2019-08-25 DOI:10.48127/spvk-epmq/19.11.09

Vaiva Grabauskienė, Oksana Mockaitytė-Rastenienė

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Abstract

Mathematical comprehension is closely related to a cognition of mathematical connections. A multiplication is a mathematical operation characterized by complex mathematical connections. Students are early introduced with the multiplication. Therefore, in primary school, not so developed cognition of mathematical connections may become a reason for difficulties in Maths. A functionality of concept is based on a view to a multiplication. The analysis scientific literature revealed that a thinking of multiplication can be either additive or multiplicative. Additionally, the multiplication learning has a variety of additive and multiplicative explanations. Because they use different specificity of visualization, the models are not equally suitable for teaching children about different properties of multiplication. Based on research, in Math classes, students are only introduced with few of the models, not covering a whole variety of them. In the research, a paper and pencil type of survey consisted of 157 participants from 3rd and 4th Grades, eight different classes from four different schools. The students had to fill the table explaining multiplication of 5 x 12 in a form of writing and drawing. The quantitative analysis of results has showed that in Grades 3 to 4, the additive view to multiplication is much more prevalent, in comparison to the multiplicative reasoning. The array model is used often but not in an extensive way. The students do not know other types of multiplicative type models. In conclusion, the results showed that students of Grades 3rd and 4th knew not enough about the mathematical connections. Therefore, teachers should pay more attention to teaching students various ways of visualizing, for children, to obtain a comprehensive understanding of the multiplication process. Acknowledgement. This work was supported by a grant (No. 09.2.1-ESFA-K-728-01-0040) from the ESFA. Keywords: additive reasoning, multiplication learning, multiplicative reasoning, primary mathematics education.

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小学三、四年级学生乘法相关思维中数学联系的表达

数学理解与对数学联系的认知密切相关。乘法是一种以复杂的数学联系为特征的数学运算。学生们很早就学会了乘法。因此，在小学阶段，数学联系认知不发达可能成为数学学习困难的原因之一。概念的功能是基于对乘法的视图。对科学文献的分析表明，乘法思维既可以是加法思维，也可以是乘法思维。此外，乘法学习有多种加法和乘法的解释。由于这些模型使用了不同的可视化特异性，因此它们并不同样适用于教儿童乘法的不同性质。根据研究，在数学课上，学生只被介绍了几个模型，而不是涵盖所有的模型。在这项研究中，一项纸笔式的调查包括来自四所不同学校的三年级和四年级八个不同班级的157名参与者。学生们必须以书写和绘画的形式填写表格，解释5 × 12的乘法。结果的定量分析表明，在3至4年级，与乘法推理相比，乘法的加法观点更为普遍。数组模型是常用的，但并不广泛。学生不知道其他类型的乘法模型。综上所述，结果表明，三年级和四年级学生对数学联系的认识不足。因此，教师更应注重教学生各种形象化的方法，让孩子对乘法过程有一个全面的认识。这项工作得到了ESFA的资助(No. 09.2.1-ESFA-K-728-01-0040)的支持。关键词:加性推理，乘法学习，乘法推理，小学数学教育

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ŠVIETIMAS: POLITIKA, VADYBA, KOKYBĖ / EDUCATION POLICY, MANAGEMENT AND QUALITY

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