• 한국학교수학회논문집
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• 제4권2호
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• pp.115-123
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• 2001

In its seventh revision to start in 2001, mathematics will have a new emphasis in the middle school curriculum. Mathematics subject is now composed of practical things in the use of mathematics. Also, the future of new generation, which has been known as the information age, places much focus on problem-solving in order to collect, analyze, synthesize, and judge various kinds informations. This demand of problem-solving ability is not only related with mathematical education but, along the entire educational process, its related to actual life. With this change of social structure, the importance of school education is increasing rapidly. Therefore, in order to grow abilities and create new knowledge, adapted this new method of self-oriented learning in groups to middle school 2nd graders for one year, the results were as follows : 1. Students developed their ability of the use of mathematical terms and signs correctly. 2. Students' mathematical knowledge and problem-solving ability improved as they had increased interest in mathematics. 3. Students' peership was enhanced through their communication and cooperative activities in groups during the class. 4. Students themselves were more willing to volunteer and participate during the class.

• 한국수학교육학회지시리즈D:수학교육연구
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• 제7권3호
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• pp.163-189
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• 2003

The purpose of this study is to develop a test, which can be used in creative problem solving ability in mathematics of the mathematically gifted and the regular students. This test tool is composed of three categories; fluency (number of responses), flexibility (number of different kinds of responses), and originality (degree of uniqueness of responses) which are the factors of the creativity. After applying to 462 middle school students, this test was analyzed into item analysis. As a results of item analysis, it turned out to be meaningful (reliability: 0.80, validity: item 1(1.05), item 2(1.10), item 3(0.85), item 4(0.90), item 5(1.08), item difficulty: item 1(-0.22), item 2(-0.41), item 3(0.23), item 4(0.40), item 5(-0.01), item discriminating power: item 1(0.73), item 2(0.73), item 3(0.67), item 4(0.51), item 5(0.56), over the level of a standard basis. This means that the test tool was useful in the test process of creative problem solving ability in mathematics

• 한국학교수학회논문집
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• 제3권1호
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• pp.131-148
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• 2000

Above all, the ability to solve problems must be emphasized as a basic skill of mathematics, but it is neglected when we teach. In this study, learning task means ［same meaning］ ［same form］ ［same technique］, so I tried to extend mathematical scholastic ability of the students as an extensional problem solving that is a basic element of mathematics. The purpose of this study is the investigation of level type learning, using the basic learning elements to extend thinking ability. From the constructed hypothesis as follows and then implement it. I selected basic learning elements from an analyzed textbook and then task learning material was created for each level type learning. The problem solving ability will be extended through the level type learning of the small group, using the level type learning task material. The conclusions this study are as follows. The level type learning in small group learning, using and making level type learning material, having basic learning elements in analysed text are. Basic learning content is understood clearly and deeply, so, fundamentally, it is effective in achieving the problem solving in mathematics. It is an effective method to achieve the meta-cognitive faculty because achieved the expected method of solving problems and resulted in the true learning of content.

• 한국산학기술학회논문지
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• 제20권4호
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• pp.336-344
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• 2019

교육부(2015)에서 "초 중등학교 2015 개정 교육과정"을 고시하고 초 중학교에서 컴퓨팅 사고력 함양을 위한 소프트웨어교육을 2018년부터 단계적으로 초 중 고등학교의 교육과정에 필수적으로 적용함에 따라 '문제해결과 프로그래밍'이 중요한 영역으로 부각되었다. 한편, 우리가 살고 있는 이 시대는 홍수처럼 쏟아져 나오는 빅데이터를 분석하고 활용하는 능력이 더욱 강조되어 가고 있다. 이러한 시대의 흐름에 따라 학생들의 문제해결력과 프로그래밍/수학 흥미도를 향상시키는 수업을 구상하였고 이는 정보와 수학, 즉 프로그래밍과 통계적 소양을 겸비하는 통계-파이썬 프로그래밍 융합교육과정을 개발하고 적용해 봄으로써 유의한 차이를 검증해 보고자 한다. 실험처치 전 후 문제해결력 검사와 프로그래밍/수학 흥미도 검사를 실시하였고 대응표본 t-검정으로 비교분석하였다. 분석 결과에 의하면 문제해결력에 관한 사전 사후 검사 결과 유의도 수준 0.05에서 유의한 차이가 있었으며, 프로그래밍 흥미도와 수학흥미도의 사전 사후 검사 결과 역시 유의도 수준 0.05에서 유의한 차이가 있었다.

• 한국보육지원학회지
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• 제13권6호
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• pp.69-86
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• 2017

Objective: This study was conducted to investigate the effects of small-group arithmetic word problem activities with concrete materials on 5 year old children's mathematical ability and attitude. Methods: A total of 34 five-year-old children (control group 16 children, experimental group18 children) attending two kindergartens in P city participated in this study. Fifteen small-group arithmetic word problem activities with concrete materials were conducted in the classroom of the experimental group twice a week for eight weeks. Before and after the activities, all the participants individually took a basic arithmetic test, mathematical word problem solving test, and mathematical attitudes test. Results: First, we observed that the children in the experimental group achieved significantly higher scores on the mathematical ability tests, including the basic arithmetic test and mathematical word problems solving test when compared to the children in the control group. Second, we also found that children in the experimental group showed higher improvement in the mathematical attitudes test than their counterparts. Conclusion/Implications: The results of this study suggest that small-group arithmetic word problem activities with concrete materials are effective in improving children's mathematical ability and attitudes.

• 한국초등수학교육학회지
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• 제8권1호
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• pp.23-43
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• 2004

문제 만들기 단계와 다양한 문제 만들기 학습 자료를 사용한 문제 만들기 교수-학습 모형을 고안하여 4-가 단계 수학 수업에 적용함으로써, 이 교수-학습 모형이 학생들의 수학적 문제 해결력 및 수학적 태도에 긍정적인 효과를 주는지 알아보았다. 이를 위해 실험반은 문제 만들기 교수-학습 활동을, 비교반에는 일반적인 교수-학습 활동을 실시하는 실험 연구를 실시하였으며, 그 결과 첫째, 문제 만들기를 적용하여 교수-학습 활동을 실시한 실험반이 비교반보다 문제 해결력 향상에 있어서 유의미한 효과가 있었고, 둘째, 문제 만들기를 적용하여 교수-학습 활동을 실시한 실험반의 수학 학습 태도에 긍정적인 변화가 있었음을 알 수 있었다.

• 한국초등수학교육학회지
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• 제5권1호
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• pp.77-98
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• 2001

사회 구조가 산업사회에서 정보화 사회로 전환됨에 따라 학생들이 배양해야 할 능력은 단순한 지식이나 기능의 습득보다는 이러한 지식과 기능을 이용하여 새로운 상황에서 문제를 해결하는 능력, 즉 문제 해결력이다. 문제 해결력 신장을 위하여 문제 만들기가 효과적이라 생각된다. 본 연구자는 제 7차 교육과정이 적용되고 있는 상황에서 4학년을 대상으로 문제 상황에 따른 문제 만들기 활동을 적용하여 문제 해결력에 미치는 영향을 분석하였다. 연구 대상을 실험반과 비교반으로 나누어 연구 분석한 결과 실험반이 수학과 학습에 대한 흥미를 더 가질 수 있었으며, 문제 해결력에 도움이 된 것으로 나타났다. 본 연구 결과를 바탕으로 문제 상황 제시 형태에 따른 연구가 전문적으로 지속되길 기대한다.

• East Asian mathematical journal
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• 제31권2호
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• pp.145-165
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• 2015

The purpose of this study is to suggest how to go about teaching and learning secondary school algebra by analyzing problem-solving ability and problem-solving process through algebraic reasoning. In doing this, 393 students' data were thoroughly analyzed after setting up the exam questions and analytic standards. As with the test conducted with technical school students, the students scored low achievement in the algebraic reasoning test and even worse the majority tried to answer the questions by substituting arbitrary numbers. The students with high problem-solving abilities tended to utilize conceptual strategies as well as procedural strategies, whereas those with low problem-solving abilities were more keen on utilizing procedural strategies. All the subject groups mentioned above frequently utilized equations in solving the questions, and when that utilization failed they were left with the unanswered questions. When solving algebraic reasoning questions, students need to be guided to utilize both strategies based on the questions.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제20권1호
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• pp.117-145
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• 2006

수학 영재들은 타고난 수학적 소질과 적성, 지적인 능력과 창의성을 바탕으로 참신한 과제에 대한 도전적이고 창조적인 호기심을 가지고 있다. 영재아들의 창의적인 사고력을 길러주기 위해서는 다양한 방법으로 문제 해결에 접근하게 하고 전략적 시도를 할 수 있도록 만들어주어야 한다. 이런 관점에서 볼 때 개방적이고 비정형적인 문제를 영재 교육프로그램의 과제로 선정하는 것은 바람직하다 할 수 있다. 본 논문에서는 다양한 유형의 개방형 문제를 구안하고, 이를 토대로 영재 학급에서 학습 활동을 전개한 후, 문제해결 과정에서 영재아들의 수학적 사고 능력의 특성과 문제 해결 전략 사례를 분석하여, 개방형 과제를 활용한 초등학교 영재 수업에 관한 시사점을 얻고자 하였다.

• 대한수학교육학회지:수학교육학연구
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• 제12권2호
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• pp.265-274
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• 2002

The purpose of the paper is to provide the importance of matacognition as a factor to correct the errors generated by the intuition. For this, first of all, we examine not only the role of metacognition in mathematics education but also the errors generated by the intuition in the mathematical problem solving process. Next, we research the possibility of using metacognition as a factor to correct the errors in the mathematical problem solving process via both the related theories about the metacognition and an example. In particular, we are able to acknowledge the importance of the role of metacognition throughout the example in the process of the problem solving It is not difficult to conclude from the study that emphasis on problem solving will enhance the development of problem solving ability via not only the activity of metacognition but also intuitive thinking. For this, it is essential to provide an environment that the students can experience intuitive thinking and metacognitive activity in mathematics education .