• 한국수학교육학회지시리즈E:수학교육논문집
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• 제24권4호
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• pp.949-974
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• 2010

본 연구의 목적은 고등학생 6명을 대상으로 교수실험을 통해 컴퓨터 대수 환경에서 매개변수 개념에 대한 학생들의 이해 과정에서 나타난 특정들을 알아보는 것이다. 본 연구에서는 Drijvers(2003)의 매개변수 개념의 구분에 따라 매개변수 개념을 "자리지기로서의 매개변수", "변하는 양으로서의 매개변수", "미지수로서의 매개변수", "일반화로서의 매개변수"로 세분화하여 컴퓨터 대수 환경에서 각 매개변수 개념에 대한 학생들의 이해의 특징을 조사하고, 컴퓨터 대수 환경이 각 매개변수의 개념 이해에 어떠한 역할을 하는지에 대해 알아보았다.

• 한국수학교육학회지시리즈A:수학교육
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• 제44권4호
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• pp.565-586
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• 2005

The purpose of this paper is to analyze the selection difference of mathematical problem solving strategy by mathematical learning style, that is, the intellectual, emotional, and physiological factors of students, to allow teachers to instruct the mathematical problem solving strategy most pertinent to the student personality, and ultimately to contribute to enhance mathematical problem solving ability of the students. The conclusion of the study is the followings: (1) Students who studies with autonomous, steady, or understanding-centered effort was able to solve problems with more strategies respectively than the students who did not; (2) Student who studies autonomously or reconfirms one's learning was able to select more proper strategy and to explain the strategy respectively than the students who did not; and (3) The differences of the preference to the strategy are variable, and more than half of the students were likely to select frequently the strategy 'to use a formula or a principle' regardless of the learning style.

• 한국수학교육학회지시리즈A:수학교육
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• 제44권1호
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• pp.87-101
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• 2005

The purpose of this paper is to propose a teaching method which is focused on the mathematical thinking skills such as the use of induction, counter example, analogy, and so on mathematicians use when they explore their research fields. Many have indicated that students have learned mathematics exploring to use very different methods mathematicians have done and suggested students explore as they do. In the first part of the paper, the plausible whole processes from the beginning time they get a rough idea to a refined mathematical truth. In the second part, an example with Euler characteristic of 1. In the third, explaining the same processes with ${\pi}$, a model modified from the processes is designed. It is hoped that the suggested model, focused on a variety of mathematical thinking, helps students learn mathematics with understanding and with the association of exploring entertainment.

• 한국수학교육학회지시리즈A:수학교육
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• 제42권5호
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• pp.623-636
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• 2003

Metacognition is defined to be 'thinking about thinking' and 'knowing what we know and what we don't know'. It was verified that the metacognitive abilities of high school students can be improved via instruction. The purpose of this article is to investigate a new method for activating the metacognitive abilities that play a key role in the Mathematical Problem Solving Process(MPSP). Hyunsung participated in the MPSP using Visual Basic Programming. He actively participated in the MPSP. There are sufficient evidences about activating the metacognitive abilities via the activity processes and interviews. In solving mathematical problems, he had basic metacognitive abilities in the stage of understanding mathematical problems; through the experiments, he further developed his metacognitive abilities and successfully transferred them to general mathematical problem solving.

• East Asian mathematical journal
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• 제38권4호
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• pp.397-414
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• 2022

This study tried to explore and understand the meaning, and the properties of noticing. The result of this study were first, the difference in mathematical noticing is distinguished in either the object which is paid attention is different or the object is same but differently interpreted or react. The cause of each difference could be described as mathematical objects such as conceptual objects and perceptual features. Second, teachers' teaching strategies, which narrow the gap in attention and play a key role in the formation of mathematical meaning, appeared in various places. This teaching strategy was implemented to distract students' attention. This study confirmed that the mathematical attention of teachers and students in math classes will differ depending on the object to which they pay attention, and that difference will be narrowed through teacher's discourse practice and teaching strategies through communication strategies.

• 한국수학교육학회지시리즈A:수학교육
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• 제59권2호
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• pp.101-112
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• 2020

본 연구의 목적은 문장제 이해 과정에서 교사와 학생 간의 상호 작용 양상에 따른 교사의 담론 구조를 분석하는 것이다. 이를 위해 학생들의 참여를 촉진하는 교수법을 다년간 실행해 온 경력교사의 한 학기 수업 중에서 문제 해결 과정을 대표할 수 있는 수업 4차시를 추출하였다. 4차시 수업에서 교사와 학생 간에 중요하게 생각하는 부분에 대한 일치 여부에 따라 교사 담론의 구조는 어떠한 특징이 있는지를 분석하였다. 분석 결과, 교사와 학생 간의 상호 작용 양상에 따라 문장제에서 중요하게 생각하는 부분을 협의하고 수학적인 의미를 만들어 가는 교사 담론의 구조는 학생들의 수업 참여를 촉진함으로써 문장제 이해에 도움을 주는 것으로 볼 수 있었다. 교사와 학생 간의 상호 작용 양상에 따라 학생들의 문제 이해를 위한 교사 담론의 구조를 바탕으로 향후 교사들이 문제 이해를 위해 학생들과 어떻게 소통해야 하는지에 대한 구체적인 방법론을 제공하였다고 볼 수 있다.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제33권3호
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• pp.319-334
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• 2019

본 연구는 삼각함수와 관련된 과제를 통해 고등학교 학생들의 함수 개념 이해 정도를 Hitt(1998)의 층위 분석을 통해 살펴보았다. 우선 학생들의 함수 이해 정도를 층위 분석을 통해 단계를 구분한 후 이해 관점을 과정과 대상 관점으로 다시 분류하였다. 그 결과 고등학교 학생들의 함수 개념 이해의 정도 층위는 3단계에서 불완전성을 보였다. 그리고 함수의 이해의 관점은 그래프 해석에서 과정 관점이 주를 이루고 있으며 대수적 표상의 조작이 중요시되고 있음을 알 수 있었다. 이러한 결과를 바탕으로 삼각함수를 다양한 관점으로 이해할 수 있는 교수-학습 방법에 대한 연구와 함께 문제 해결과 그에 따른 표상 체계 사이의 일관성이 유지되는 함수 개념 이해 층위 5단계에 도달할 수 있는 수업모델의 연구가 필요할 것으로 보인다.

• 한국수학교육학회지시리즈D:수학교육연구
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• 제5권2호
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• pp.107-118
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• 2001

Mathematics subject of the seventh national curriculum in Korea, which has been effective since 2000, strongly encourages the use of calculators and computers to help children gain a better understanding of basic mathematical concepts and develop creative thinking and problem-solving skills without spending too much time and effort on making mechanical computations. Despite the recommendation by the national curriculum, however, only a small segment of elementary school teachers have been using calculators because of the fear that children\\`s dependence on calculators might bring about negative consequences. As a result, little research has been conducted in this area as well. This study has been conducted on the assumption that calculators have the potential for being a useful instructional tool in certain areas of elementary school mathematics education. To investigate the usefulness of calculators, a review was made of the scanty literature in the area. The literature review indicated that calculators are effective when they are used for the following purposes: understanding concepts and properties in numbers and operations, deducing mathematical rules, and solving problems. In view of the available research finding, we will give some concrete learning and teaching models of such uses of calculators. The teaching-learning models are organized around three categories: concept formation, discovery of principles and rules, and problem solving. Such organization is intended to help teachers use the models with ease.

• 대한수학교육학회지:학교수학
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• 제4권1호
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• pp.79-95
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• 2002

This paper is to make strides toward an enriched understanding of student learning and performance in mathematics that acknowledges the roles social and cultural contexts play in what students learn as well as what we are able to team about student learning. A student's mathematical practice over a year and a half is presented in detail in order to explore the relationships between classroom contexts and student performance. This study was situated at a K-4 urban elementary school in the United States. The data used for this study included classroom observations, interviews with the teachers and the student, and document collection. The data were analyzed by characterizing each classroom context and exploring the student's practice both in the classrooms and in the interviews. Despite the student's ongoing status as a struggling student, there were tremendous changes in his level of engagement in and persistence with mathematical tasks. The student was substantially more engaged in and enthusiastic about the daily mathematics lessons in third grade than he had been in second. However, we found little improvement in his mathematical understanding and performance during class or in the interviews. This highlights that increased engagement in the mathematical tasks does not necessarily signal increased learning. This paper discusses several issues of learning and performance raised by the student, looking at the relationship between classroom context and student performance. This paper also considers implications for how students' performances are interpreted and how learning is assessed.

• 한국수학교육학회지시리즈D:수학교육연구
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• 제25권3호
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• pp.201-225
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• 2022

This paper details case study vignettes that focus on enhancing the teaching and learning of geometry and measurement in the elementary grades with attention to pedagogical practices for teaching through problem solving with rigor and centering equitable teaching practices. Rigor is a matter of equity and opportunity (Dana Center, 2019). Rigor matters for each and every student and yet research indicates historically disadvantaged and underserved groups have more of an opportunity gap when it comes to rigorous mathematics instruction (NCTM, 2020). Along with providing a conceptual framework that focuses on the importance of equitable instruction, our study unpacks ways teachers can leverage their deep understanding of geometry and measurement learning trajectories to amplify the mathematics through rigorous problems using multiple approaches including learning by doing, challenged-based and mathematical modeling instruction. Through these vignettes, we provide examples of tasks taught through rigorous problem solving approaches that support conceptual teaching and learning of geometry and measurement. Specifically, each of the three vignettes presented includes a task that was implemented in an elementary classroom and a vertically articulated task that engaged teachers in a professional learning workshop. By beginning with elementary tasks to more sophisticated concepts in higher grades, we demonstrate how vertically articulating a deeper understanding of the learning trajectory in geometric thinking can add to the rigor of the mathematics.