• Education of Primary School Mathematics
• /
• v.17 no.1
• /
• pp.1-16
• /
• 2014

The purpose of this study is to analyze whether analogy distance and mathematical knowledge affect on transfer problems solving with different analogy distance. To conduct the study, transfer problems were classified into multiple categories: mathematical word problem based on rates, science word problem based on rates, and real-life problem based on rates with different analogy distance. Then analysed there are differences in participants' transfer ability and which mathematical knowledge contributes to the solution on over the three transfer problem. The study demonstrated a statistical significant difference(.05) in participants' three transfer problem solving and a gradual decrease of the participants' success rates of on transfer problems solving. Moreover, conceptual knowledge influenced transfer problem solving more than factual knowledge about rates. The study has an important implications in that it provided new direction for study about transfer of learning, and also show a good mathematics instruction on where teachers will put the focus in mathematical lesson to foster elementary students' transfer ability.

• Communications of Mathematical Education
• /
• v.36 no.3
• /
• pp.439-467
• /
• 2022

The future society requires not only knowledge but also various competencies, including creativity, cooperative spirit and integrated thinking. This research develops a program for integrating mathematics and information science to enhance important mathematical competencies such as problem-solving and communication. This program does not require much prior knowledge, can be motivated using everyday language and easy-to-access tools, and is based on creative problem-solving activities with multilateral cooperation. The usefulness and rigor of mathematics are emphasized as the number of participants increases in the activities, and theoretical principles stem from the matrix theory over finite fields. Moreover, the activity highlights a connection with error-correcting codes, an important topic in information science. We expect that the real-world contexts of this program contribute to enhancing mathematical communication competence and providing an opportunity to experience the values of mathematics and that this program to be accessible to teachers since coding is not included.

• Journal of the Korean School Mathematics Society
• /
• v.12 no.4
• /
• pp.365-388
• /
• 2009

In this paper we solve various triangle construction problems given by three points(a midpoint of side and other two points). We investigate relation between these construction problems, draw out a base problem, and make hierarchy of solved construction problems. In detail we describe analysis for searching solving method, and construction procedure of required triangle.

• Communications of Mathematical Education
• /
• v.23 no.4
• /
• pp.1015-1022
• /
• 2009

Generally, it is considered that analytical skills could not be easily taught and it requires quite a long training period. In this short essay, it was attempted to give four basic analytical skills useful for problem solving in mathematics.

• Communications of Mathematical Education
• /
• v.6
• /
• pp.337-355
• /
• 1997

• Education of Primary School Mathematics
• /
• v.17 no.1
• /
• pp.57-75
• /
• 2014

Problem Solving has been emphasized for recent decades, and many research case studies have been used to improve students' Problem Solving abilities. However, the gap of students' abilities can be easily shown after enrollment into school in spite of scholar's attempt to reduce students' level of differentiation. Besides, it is clear that teachers have been too readily assisting students' and not allowing them to acquire the process of Problem Solving, and this may be due to impatience. Therefore, students seem to show signs of the dependent tendency towards teachers and other materials. This tendency easily allows students' to depend on teaching resources without attempting any developmental mechanism of Problem Solving. The presupposition of this study is that every student must solve a problem without any assistance, and also this study is to provide new cognitive strategies for both teachers and students who want to solve their problems by themselves through the process of visible Problem Solving. After applying the student-based problem-solving model by this study, it was found to be effective. Therefore this will lead to the improvement of the Problem Solving and knowledge acquisition of students.

• Journal of the Korean School Mathematics Society
• /
• v.6 no.1
• /
• pp.1-17
• /
• 2003

In this paper, we study the methods of improving an ability of a creative solving mathematical problem belonging to an educational system which every province office of education has adopted for the mathematically talented students. Especially, we give an attention on a preferential reaction in teaching styles according to student's LQ., the relationship between student's LQ. and an ability of creative solving mathematical problems, and seeking for an appropriative teaching methods of the improvement ability of a creative solving problem. As results, we have the followings; 1. The group having excellent students who have a higher intelligential ability prefers inquiry learning which is composed of several sub-groups to a teacher-centered instruction. 2. The correlation coefficient between student's LQ. and an ability creative solving of mathematical is not high. 3. Although the contents and the model of thematic inquiry learning don't have a great influence on the divergent thinking (ex. fluency, flexibility, originality), they affect greatly the convergent thinking - a creative mathematical - problem solving ability. Accordingly, our results show that we should use a variety of mathematical teaching materials apart from our regular textbooks used in schools to improve a creative mathematical problem solving ability in the process of thematic inquiry learning. Also we can see that an inquiry learning which stimulates student's participation and discussion can be a desirable model in the thematic mathematical classroom activities.

• Korean Journal of Logic
• /
• v.9 no.1
• /
• pp.137-171
• /
• 2006

베나세라프의 수의 비고유성 논증은 플라톤주의에 대한 강력한 반박들 중의 하나다. 이에 대한 플라톤주의 진영에서의 대응은 현재까지 네 가지 정도가 있었다. 라이트와 헤일로 대표되는 신프레게주의, 샤피로의 ante rem 구조주의, 밸러거의 혈기왕성한 플라톤주의, 그리고 잴타의 원리화된 플라톤주의에서의 대응들이 그것들이다. 이 네 가지 대응들 중 잴타의 원리화된 플라톤주의는 진정한 플라톤주의로 간주되기 매우 힘들며, 신프레게주의는 수의 비고유성 문제해결에 심각한 어려움을 갖고 있다. 한편 수의 비고유성 문제를 어느 정도 극복하고 있는 듯이 보이는 샤피로와 밸러거의 견해들 중, 밸러거의 견해는 인식과 지칭의 문제와 관련하여 심각한 난관에 봉착해 있다. 따라서 현재까지 제시된 이론의 상태에서는 샤피로의 견해가 수의 비고유성 문제를 인식의 문제와 함께 가장 잘 해결하고 있는 것으로 평가될 수 있다.

• Communications of Mathematical Education
• /
• v.9
• /
• pp.187-201
• /
• 1999

본 논문에서는 사회적 구성주의(social constructivism) 관점에서 고등학교 수준에서의 수학적 모델링 (mathematical modelling) 자료를 개발, 적용, 활용함으로써 학교수학과 실생활 문제를 관련시켜 학생 스스로 관찰 ${\cdot}$ 해석 ${\cdot}$ 사고 ${\cdot}$ 분석하여 구조화하는 고차원적인 인지능력의 형성과 문제 해결력을 배양할 수 있는 학습방법을 고찰한다.

• Journal of Educational Research in Mathematics
• /
• v.19 no.4
• /
• pp.565-584
• /
• 2009

This study is aimed at providing the theoretical framework of characteristics of mathematical thinking processes and structuring the thinking process patterns of the mathematical gifted students through the analysis of their cognitive thinking processes. For this purpose, this study is trying to analyze characteristics of mathematical thinking processes of the mathematical gifted students in an objective and a systematic way, by using think-aloud method. For comparative study, the analysis framework with the use of the thinking characteristic code as a content-oriented method and the problem-solving processes code as a process-oriented method was developed, and the differences of thinking characteristics between the two groups chosen by the coding system which represented the subjects' thinking processes in the form of the language protocol through thinking-aloud method were compared and analyzed.