• 한국수학교육학회지시리즈E:수학교육논문집
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• 제31권2호
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• pp.203-221
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• 2017

본 연구에서는 수학 교구 활용을 위한 교수학적 원리를 제안하고 교육과정과 연계하여 그 적용 방안을 도출하는 것에 목표를 두었다. 먼저 수학 교구의 활용을 위한 교수학적 원리를 제안하기 위해 관련 문헌을 메타적으로 분석하였으며, 그 결과에 기초하여 활동의 원리, 도구의 원리, 학습의 원리를 제안하였다. 이들 교수학적 원리를 염두에 두고 수학 교구를 활용한다면 단지 수학 교구가 흥미를 높이는 수단으로만 활용하는 사태를 피하는 데에 도움이 될 것으로 생각한다. 다음으로 이들 교수학적 원리를 적용하여 수학 교구를 활용한다는 의미를 교육과정과 관련지어 구체화하였다. 교육과정 문서에서 제시하는 기본적인 요소 중 영역, 핵심개념, 기능, 성취기준을 핵심적으로 고려하고 구체적인 활동 내용을 제시하는 방식을 따랐다. 마지막으로, 교수학적 원리를 적용하여 교육과정의 내용을 지도하는 방안을 삼각형의 내심과 외심 그리고 일차함수와 그래프를 예로 하여 제안하였다.

• East Asian mathematical journal
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• 제32권4호
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• pp.443-464
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• 2016

The purpose of ths study is to compare and analyze the sequence of teaching multiplication facts in the elementary school mathematics. Generally, the multiplication in the elementary school mathematics is composed of the followings; concepts of multiplication, situations involving multiplication, didactical models for multiplication, and multiplication strategies for teaching multiplication facts. This study is focusing to multiplication facts, especially to the sequence of teaching and multiplication strategies. The method of this study is a comparative and analytic method. In order to compare textbooks, we select the Korean elementary mathematics textbooks(1st curriculum~2009 revised curriculum) and the 9 foreign elementary mathematics textbooks(Japan, China, Germany, Finland, Hongkong etc.). As results of comparative investigation, the sequence of teaching multiplication facts is reconsidered on a basis of elementary students' mathematical thinking. And the connectivity of multiplication facts is strengthened in comparison with the foreign elementary mathematics textbooks. Finally multiplication strategies for teaching multiplication facts are discussed for more understanding and reasoning the principles of multiplication facts in the elementary school mathematics.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제18권2호
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• pp.265-276
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• 2004

In this study we in detail analyze Kolmogorov's viewpoint of mathematical abilities, and conclude that school geometry plays important role in developing and upbringing mathematical abilities. We discuss meanings of school geometry in gifted students education, and draw didactical principles concerned with gifted students education. We suggest some geometrical materials which aim for developing and upbringing mathematical abilities.

• 한국초등수학교육학회지
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• 제21권1호
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• pp.1-22
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• 2017

연산법칙은 산술 학습을 위해 계산 원리 파악 및 효과적인 계산 전략 개발에 필수적인 것으로 간주되며, 초등학교에서 초기 대수 지도에 대한 긍정적 견해와 더불어 연산에 대한 직관적 관념 및 구조적 이해를 위해 연산법칙 자체에 대한 탐구가 요구된다. 따라서 연산법칙에 대한 이해가 부족할 경우, 연산법칙을 가정한 후속 학습시 학습 곤란과 오개념 형성을 유발할 우려가 있다. 이에 본 연구는 초등학교 수학 교과서에서 연산법칙이 다루어지는 특성을 분석함으로써 연산법칙의 바람직한 지도 방안을 탐색하는 것을 목적으로 한다. 이를 위해 우리나라 교육과정기에 따른 교과서 분석을 통해 어떤 연산법칙이 어느 시기에 어떤 방법으로 지도되어 왔는지를 비교하고 연산법칙을 가정하는 내용 전개 사례를 추출하였다. 그 결과에 대한 논의에 기초하여 초등학교 수학에서 연산법칙의 지도 필요성과 가능성을 확인하고 지도 방안에 대한 시사점을 도출하였다.

• 한국수학교육학회지시리즈A:수학교육
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• 제45권4호
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• pp.439-457
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• 2006

This research was to understand the features of mathematization and didactical phenomenology, in a way that was not a routine calculation of equation, rather a complete comprehension by the reinventing historical principles of the equation. To achieve the purpose of this study, one-mate middle school student participated in the study. Interview and observation were used for collecting data during the student's performance. The results of research were: First, the student understood the mathematical concepts from a real life and developed the abstract concepts from it, which were very intimately related with his life. Second, the skill and formula definition were accomplished with the accompanying predicted and consequently derived mathematical concepts. Third, through the approach of using the history of mathematics, he became more interested in what he was doing and took lessons with confidence. Forth, the student performed his learning based on the historical reinventing principle under the proper guidance of a teacher.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제36권4호
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• pp.469-486
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• 2022

수 세기는 수 개념 및 연산과의 관련성으로 인해 수학 학습에서 기초적이면서도 중요한 위상을 차지한다. 특히 큰 수 세기는 수학 학습 초기의 수 개념 도입시 수 세기가 요구하는 일대일 대응이나 기수의 원리 등은 물론 자릿값의 이해를 포함하는 구조적 세기라는 점에서 핵심 학습 요소라 할 만하다. 본 연구는 현행 교과서 활동으로 구성되어 있지 않아 학생들의 경험이 전무할 것으로 예상되는 큰 수에 대한 수 세기 가능 여부 및 세기 전략을 파악하여 교수학적 시사점을 도출하는 것을 목적으로 한다. 이를 위해 세 자리 수까지 학습하였고 교과서 활동으로서 묶어 세기와 뛰어 세기를 경험한 초등학교 2학년 학생 89명을 대상으로 세 자리 수만큼의 대상이 불규칙적으로 배열된 그림에서 수 세기 및 세기 방법을 묻는 문항으로 구성된 검사지를 제공하였다. 학생 응답을 정오답률과 사용한 세기 전략 및 인지적 특징 측면에서 분석한 결과, 오답률이 매우 높고 십진 원리, 묶어 세기, 1씩 세기, 부분합 전략 등의 사용이 확인되었다. 이와 같은 분석 결과에 기초하여 교과서 활동으로서 큰 수 세기 활동을 포함할 필요성을 비롯한 몇 가지 교수학적 시사점을 도출하였다.

• 대한수학교육학회지:수학교육학연구
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• 제9권1호
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• pp.81-109
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• 1999

This study aims to reflect the basic principles and teaching-teaming principles of Realistic Mathematics Education in order to suppose an way in which mathematics as an activity is carried out in primary school. The development of what is known as RME started almost thirty years ago. It is founded by Freudenthal and his colleagues at the former IOWO. Freudenthal stressed the idea of matheamatics as a human activity. According to him, the key principles of RME are as follows: guided reinvention and progressive mathematisation, level theory, and didactical phenomenology. This means that children have guided opportunities to reinvent mathematics by doing it and so the focal point should not be on mathematics as a closed system but on the process of mathematisation. There are different levels in learning process. One should let children make the transition from one level to the next level in the progress of mathematisation in realistic contexts. Here, contexts means that domain of reality, which in some particular learning process is disclosed to the learner in order to be mathematised. And the word of 'realistic' is related not just with the real world, but is related to the emphasis that RME puts on offering the students problem situations which they can imagine. Under the background of these principles, RME supposes the following five instruction principles: phenomenological exploration, bridging by vertical instruments, pupils' own constructions and productions, interactivity, and interwining of learning strands. In order to reflect how to realize these principles in practice, the teaming process of algorithms is illustrated. In this process, children follow a learning route that takes its inspiration from the history of mathematics or from their own informal knowledge and strategies. Considering long division, the first levee is associated with real-life activities such as sharing sweets among children. Here, children use their own strategies to solve context problems. The second level is entered when the same sweet problems is presented and a model of the situation is created. Then it is focused on finding shortcomings. Finally, the schema of division becomes a subject of investigation. Comparing realistic mathematics education with constructivistic mathematics education, there interaction, reflective thinking, conflict situation are many similarities but there are alsodifferences. They share the characteristics such as mathematics as a human activity, active learner, etc. But in RME, it is focused on the delicate balance between the spontaneity of children and the authority of teachers, and the development of long-term loaming process which is structured but flexible. In this respect two forms of mathematics education are different. Here, we learn how to develop mathematics curriculum that respects the theory of children on reality and at the same time the theory of mathematics experts. In order to connect the informal mathematics of children and formal mathematics, we need more teachers as researchers and more researchers as observers who try to find the mathematical informal notions of children and anticipate routes of children's learning through thought-experiment continuously.

• 대한수학교육학회지:학교수학
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• 제4권2호
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• pp.297-316
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• 2002

In this paper, a teaching unit on series of number sentences with patterns is designed according to Wittmann's perspectives. In this paper, series of number sentences wish patterns means number sentences in which some patterns are contained. especially, seven kinds of number sentences wish patterns are offered as basic materials, and fifteen tasks based on these basic materials are offered. These tasks are for ninth grade students and higher grade students. These tasks heap students to recognize patterns, and to understand mechanism underlying in those patterns by looking for patterns and proving whether these patterns are generally hold. As working on these tasks, students can reinforce meaning of algebraic expression, its manipulation, and concept of number series. Students also can reinforce mathematical thinking such as analogical thinking, deductive thinking, etc. In this point, this teaching unit reveal important objectives, contents, and Principles of mathematics education. This teaching unit can also be rich sources for student's activities. Especially, for each task's level is different, each student's personal ability is considered fully. Since teachers can know mathematical facet, psychological facet, and didactical facet holistically, this teaching unit can offer broad possibilities for experimental studies. SD, this leaching unit can be said to be substantial. In this paper, this leaching unit is not applied in classroom directly. Actually such applying in classroom is suggested as follow-up studies. By appling this teaching unit in various classroom, some effective informations for teaching this teaching unit and some particular phenomenons in those teaching processes can be identified, and this teaching unit can be revised to be better one.

• 한국수학교육학회지시리즈A:수학교육
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• 제57권4호
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• pp.413-431
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• 2018

In this study, I developed an activity oriented lesson to support the understanding of probabilistic and quantitative estimating population ratios according to the standard statistical principles and discussed its implications in didactical respects. The developed activity lesson, as an efficient physical simulation activity by sampling with replacement, simulates unknown populations and real problem situations through completely closed 'Closed Box' in which we can not see nor take out the inside balls, and provides teaching and learning devices which highlight the representativeness of sample ratios and the sampling variability. I applied this activity lesson to the gifted students who did not learn estimating population ratios and collected the research data such as the activity sheets and recording and transcribing data of students' presenting, and analyzed them by Qualitative Content Analysis. As a result of an application, this activity lesson was effective in recognizing and reflecting on the representativeness of sample ratios and recognizing the random sampling variability. On the other hand, in order to show the sampling variability clearer, I discussed appropriately increasing the total number of the inside balls put in 'Closed Box' and the active involvement of the teachers to make students pay attention to controlling possible selection bias in sampling processes.

• 대한수학교육학회지:학교수학
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• 제19권1호
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• pp.137-151
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• 2017

2009 개정 초등학교 수학과 교육과정에서 주요 변화 내용 중 하나는 덧셈과 뺄셈의 지도를 네 자리 수의 범위에서 세 자리 수의 범위로 축소한 것이다. 이전 교육과정과 달리 2009 개정 시에는 세 자리 수 범위에서 덧셈과 뺄셈의 계산 원리를 파악하고 나면 그 원리를 일반화하여 네 자리 이상의 자연수의 덧셈과 뺄셈도 가능하다고 가정된 것이다. 이에 본 연구에서는 세 자리 수의 덧셈과 뺄셈 원리 이해가 네 자리 수의 덧셈과 뺄셈으로 확장될 수 있는지 파악함으로써 계산 원리의 일반화 가능성에 대해 논의하고자 하였다. 2015년과 2016년 2년에 걸쳐, 전국적으로 6개 시 도에 속한 6개 학교로 부터 네 자리 수의 덧셈과 뺄셈까지 배운 5학년 339명(집단 2015)과 세 자리 수의 덧셈과 뺄셈까지만 배운 5학년 316명(집단 2016)을 표집하여 세 자리 수와 네 자리 수의 덧셈과 뺄셈 검사를 실시하고, 두 집단의 성취 수준 결과를 독립표본 t-검정을 통해 비교 분석하였다. 연구 결과, 네 자리 수의 뺄셈에 대해 두 집단 간에 통계적으로 유의미한 차이가 있는 것으로 나타났고, 그에 대한 논의로부터 몇 가지 교수학적 시사점을 도출하였다.