• Korean Journal of Child Studies
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• v.27 no.1
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• pp.139-151
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• 2006

This study was conducted to examine the effects of mathematical activities with online mathematical contents on children's arithmetic development and attitudes toward mathematical activities. Pre- and post-tests were administered to 62 5-year-old children. Differences of children's arithmetic development level and attitudes toward mathematical activities were found between the experimental group using online mathematical contents and the control group using offline mathematical contents. All findings proved that online mathematical contents were effective and had positive influences on children's arithmetic development and attitudes toward mathematical activities. This supports the proposition that online mathematical contents can provide an important means to the improvement of children's mathematical development and attitudes toward mathematical activities.

• Journal for History of Mathematics
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• v.17 no.4
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• pp.87-100
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• 2004

There is great enthusiasm among many mathematics educators to seek to understand how mathematical history can be employed to emphasize the usefulness of mathematics and to make it even more useful. This study focused on reviewing the history of mathematics to provide a 'source of insight.' In this study, the reasons for including the history of mathematics in the mathematics curriculum were divided into three domains: cognitive, affective, and sociocultural. Each domain included the followings: mathematical thinking and understanding; development of a positive attitude and increase motivation; and last, humanistic facets and sociocultural experience. At the same time, we need to develope a pedagogical approach that allows educators to use history properly. Furthermore, we must integrate the historical topics into regular curricula including the syllabus historically-informed grounds.

• Journal of the Korean School Mathematics Society
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• v.20 no.3
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• pp.239-254
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• 2017

The study in this paper considers how high school students' attitudes toward and interest in mathematics could be promoted by conjoining the learning of ma thematics with the learning of social science topics. Survey instrument was dev eloped to measure student attitudes toward mathematics and social science subje cts and to evaluate student beliefs on learning mathematics embedded in social science topics. Data were collected from high school students in Korea by admi nistering pre- and post-tests: students were intervened with examples of math problems embedded in certain social contexts. The findings indicate that high sc hool students' experience of solving mathematics problems embedded in social c ontexts positively affects the promotion of their attitudes toward and beliefs on both mathematics and social science subjects.

• Communications of Mathematical Education
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• v.12
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• pp.249-264
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• 2001

학교수학을 가르치고 배우는 과정에서 교사의 역할은 기술 공학의 활용으로 변화하고 있다. 기술공학의 역할은 학생들로 하여금 수학에 대한 태도를 변하게 하여, 탐구적이며 창의적인 방법으로 수학을 공부하는데 열의를 갖도록 한다. 반면에 현재의 수학교수는 여전히 보수적이며 환경의 변화에 더디게 적응하고 있으나, 세상이 상당히 빨리 변하고 있으므로 기술공학을 활용하여 현재의 교수를 개선해 나가야 하겠다. 변화에 대한 인식과 갈망은 학습자료, 재정 상태, 그리고 기타 여러 가지 요인보다도 훨씬 중요하며 가장 중요한 것은 교수관점 및 교수견해의 변화에 대한 의지이다. 교사가 기호연산 실행 조작이 가능한 수학 학습용 컴퓨터 응용 소프트웨어와 이들을 탑재한 휴대용 수학학습 전용기를 중등학교수학에 적용할 경우, 수학교육에서 신중히 고려해야 할 것은, 첫째 모든 수준의 학생들을 격려하며, 둘째 대상 영역의 수학학습 내용을 이해하도록 기술공학을 활용한 새로운 교수 기법에 접근할 수 있어야 한다는 점이다.

• Journal of Creative Information Culture
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• v.5 no.3
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• pp.295-306
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• 2019

Despite the popularity and convenient accessibility of puzzles, the variety of puzzles have led to a lack of research on the nature of the puzzle itself. In guiding certain skills, such as abstractness, creativity, and logic, a teacher should have the thinking skill and strategy that appear in solving puzzles. In this study, the mathematical thinking that appears in solving puzzles from the perspective of experts is identified, and the strategies and characteristics are described and classified accordingly. For this purpose, we analyzed 85 math puzzles including the well-know puzzles to the public, plus puzzles from a popular book for the gifted student. The research analysis shows that there are 6 types of mathematics puzzles in which require mathematical thinking.

• Communications of Mathematical Education
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• v.33 no.2
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• pp.141-161
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• 2019

The purpose of this study is to review the trends of international and domestic research in mathematics education for social justice and to present the meanings to the mathematics education in Korean mathematics education. For Korean mathematics educators and teachers, interest and research in mathematics education for social justice is still insufficient. For this study, the researcher analyzed the concerned research on mathematics education for social justice. According to the study, international research on social justice were started with Freire's critical mathematics education in the 1970s and has been actively conducted from various perspectives and has been applied to their mathematics lessons. However, domestic studies on mathematics education for social justice have recently been started. The implications of mathematics education for social justice is that it provides an opportunity for reflection on traditional mathematics lessons and enables integration and convergence with humanities perspective. This approach can also foster a positive attitude toward mathematics and deepen the view of mathematics and the world of teachers and students. The researcher proposed to include mathematics education for social justice in Korean mathematics curriculum and textbooks, support teachers' professionalism by teacher training programs, and continue to develop a more sophisticated education model through practical applications.

• Communications of Mathematical Education
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• v.31 no.2
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• pp.187-201
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• 2017

The study in this paper, which is part of a bigger study investigating non-cognitive characteristics of Korean students at the 4-12 grade levels, aims to identify the influential characteristics that explain students' decision to give up on mathematics learning. We consider seven non-cognitive student characteristics: value, interest, attitudes, external motivation, internal motivation, learning conation and efficacy. Data were collected from 21,485 Korean students, and were analyzed with a logistic regression method using SPSS. The findings show that efficacy was the most significant indicator of students' decision to give up on mathematics learning in all three grade level bands: elementary (4th-6th), middle (7th-9th) and high (10th-12th). In particular, the causal model analysis shows that students who highly value mathematics tend to have stronger internal and external motivation, which bring about stronger interest and learning conation, which in turn lead to positive attitudes and strong efficacy regarding the learning of mathematics. It was further found that while external motivation was a significant indicator of upper grade level students' decision to give up on mathematics learning, it was only a moderate indicator for lower grade level students. The findings of this study provide useful information about which non-cognitive areas need to be focused on, in what grade levels, to help students stay on track and not fall behind in learning mathematics.

• Communications of Mathematical Education
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• v.13 no.1
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• pp.73-96
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• 2002

수학적인 사고력과 창의력이 강조되고 있는 요즈음 수학교육에서는, 이산수학적인 영역이 담당해야 할부분이 더욱 많아진 것으로 생각된다. 이에 발맞춰, 최근에 이산수학에 관한 연구가 활발해지고 있다. 그러나, 아직 초등학교에서 적절히 사용할 수 있는 별도의 이산수학 관련 서적이나 연구 문헌이 없어 아동들의 이산수학에 대한 관심과, 수학 성적과 이산수학의 문제 해결력과의 관계에 대하여 조사해 보았다. 이산수학의 문제들을 구성하여 아동들에게 예고 없이 평가하고 문제에 대한 수학적인 태도를 질문을 통하여 알아보고, 수학 실력이 우수한 학생과 그렇지 못한 학생들과의 이산수학 문제 해결력의 관계를 알아보고자 다음과 같은 연구 내용을 설정하였다. 이를 살펴보면 첫째, 초등 수학교육에서 이산수학에 대한 학생들의 반응에 대하여 생각해 본다. 둘째, 수학 성적과 이산수학 문제 해결과의 관계를 생각해 본다. 이상의 연구 문제를 해결하기 위해, 문헌 연구를 통하여 이산수학에 관련된 초등학교 내용을 소개하고, 문항을 구성하였다. 소개된 주제 중에서 4개의 주제(수 세기, 한 붓 그리기, 지도 색칠하기, 최소 거리 ${\cdot}$ 비용 수형도)를 선정하여 10개의 문항을 작성하였다. 조사 연구를 위한 대상은 서운 시내 2개 초등학교 5, 6학년 2개 반을 선정하였다. 각 문항의 정답율은 백분율(%)에 의하여 분석하였는데 그 결과를 살펴보면, 첫째, 수 세기의 정답율은 첫 번째 문항의 정답율이 낮았을 뿐, 다른 문항들의 정답율은 비교적 좋게 나타난 것으로 보아 문제를 이해하기 쉽게 구성하는 것이 중요하다는 것을 알게 되었다. 둘째, 한 붓 그리기와 지도 색칠하기의 문제들의 정답율은 상당히 높게 나타났는데, 그러한 것은 아동들이 직접 다양한 방법으로 시도해 봄으로써 문제를 해결할 수 있었기 때문인 것 같다. 또한 이러한 유형의 문제들은 아래 학년에도 투입해 볼 수 있을 것 같다. 셋째, 최소거리 ${\cdot}$ 비용 수형도의 문제에서는 난이도가 높은 이유도 있지만 문제 이해를 완전히 하지 못해 정답율이 무척 낮게 나온 것으로 생각된다. 넷째, 수학 성적이 높은 학생들이 대체적으로 문제 해결력이 높았던 것으로 나타났으나, 몇몇 학생들은 정반대의 결과가 나와 특이한 시사점을 제공했다. 그러한 이유로는 정형화된 문제들을 선호하고 쉽게 해결하는 아동들과, 그렇지 않은 아동들 사이의 문제 접근 방법의 차이라고 생각된다. 본 연구를 통하여 다음과 같은 제언을 하고자 한다. 첫째, 이산수학에 관련된 많은 문항을 개발하여 아동들에게 확대 투입함으로써 수학 수업의 효과와 문제 해결력을 높일 수 있을 것이라 생각된다. 둘째, 수학 실력이 떨어지는 아동들에게 보다 흥미있는 이산수학적 문제들을 제시함으로써 수학에 대한 자신감과 흥미를 높일 수 있을 것이라 생각된다. 셋째, 초등학교 과정에 알맞은 이산수학의 다른 주제도 학습 지도안과 그와 관련된 문제들을 개발하는 연구가 진행되어야 하겠다.

• Journal of the Korean School Mathematics Society
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• v.17 no.1
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• pp.73-92
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• 2014

This study was performed in part with the task to find measures to improve the defining characteristics of feelings, value, interest, self-efficacy, and others aspects in regards to learning math among elementary and middle school students. For this study, it was essential to understand the appropriate questions that are needed to be asked during a consultation at a math clinic, for students that are having a hard time learning math. As a method for performing this study, the content of scheduled counseling over 2 years from a math clinic were collected and the questions that were given and taken were analyzed in order to figure out the types of questions needed in order to effectively examine students that are facing difficulty with learning math. The analysis was performed using Grounded theory analysis by Strauss & Corbin(1998) and went through the process of open coding, axial coding, and selective coding. For the paradigm in the categorical analysis stage, 'attitude towards learning math' was set as the casual condition, 'feelings towards learning math' was set as the contextual condition, 'confidence in one's ability to learn math' was set as the phenomenon, 'individual tendencies when learning math' was set as the intervening condition, 'self-management of learning math' was set as the action/interaction strategy, and 'method of learning' was set as the consequence. Through this, the questions that appeared during counseling were linked into categories and subcategories. Through this process, 81 concepts were deducted, which were grouped into 31 categories. I believe that this data can be used as grounded theory for standardization of consultation in clinics.

• Education of Primary School Mathematics
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• v.15 no.2
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• pp.107-134
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• 2012

The purpose of this study is to investigate the effectiveness of two teaching methods of word problems, one based on mathematical modeling learning(ML) and the other on traditional learning(TL). Additionally, the influence of mathematical modeling learning in word problem solving behavior, application ability of real world experiences in word problem solving and the beliefs of word problem solving will be examined. The results of this study were as follows: First, as to word problem solving behavior, there was a significant difference between the two groups. This mean that the ML was effective for word problem solving behavior. Second, all of the students in the ML group and the TL group had a strong tendency to exclude real world knowledge and sense-making when solving word problems during the pre-test. but A significant difference appeared between the two groups during post-test. classroom culture improvement efforts. Third, mathematical modeling learning(ML) was effective for improvement of traditional beliefs about word problems. Fourth, mathematical modeling learning(ML) exerted more influence on mathematically strong and average students and a positive effect to mathematically weak students. High and average-level students tended to benefit from mathematical modeling learning(ML) more than their low-level peers. This difference was caused by less involvement from low-level students in group assignments and whole-class discussions. While using the mathematical modeling learning method, elementary students were able to build various models about problem situations, justify, and elaborate models by discussions and comparisons from each other. This proves that elementary students could participate in mathematical modeling activities via word problems, it results form the use of more authentic tasks, small group activities and whole-class discussions, exclusion of teacher's direct intervention, and classroom culture improvement efforts. The conclusions drawn from the results obtained in this study are as follows: First, mathematical modeling learning(ML) can become an effective method, guiding word problem solving behavior from the direct translation approach(DTA) based on numbers and key words without understanding about problem situations to the meaningful based approach(MBA) building rich models for problem situations. Second, mathematical modeling learning(ML) will contribute attitudes considering real world situations in solving word problems. Mathematical modeling activities for word problems can help elementary students to understand relations between word problems and the real world. It will be also help them to develop the ability to look at the real world mathematically. Third, mathematical modeling learning(ML) will contribute to the development of positive beliefs for mathematics and word problem solving. Word problem teaching focused on just mathematical operations can't develop proper beliefs for mathematics and word problem solving. Mathematical modeling learning(ML) for word problems provide elementary students the opportunity to understand the real world mathematically, and it increases students' modeling abilities. Futhermore, it is a very useful method of reforming the current problems of word problem teaching and learning. Therefore, word problems in school mathematics should be replaced by more authentic ones and modeling activities should be introduced early in elementary school eduction, which would help change the perceptions about word problem teaching.