• 대한산업공학회지
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• 제17권1호
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• pp.75-82
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• 1991

This research is concerned with Machine-Part Group Formation(MPGF) methodology for Flexible Manufacturing Systems(FMS). The purpose of the research is to develop a new heuristic algorithm for effectively solving MPGF problem. The new algorithm is proposed and evaluated by 100 machine-part incidence matrices generated. The performance measures are (1) grouping ability of mutually exclusive block-diagonal form. (2) number of unit group and exceptional elements, and (3) grouping time. The new heuristic algorithm has the following characteristics to effectively conduct MPGF : (a) The mathematical model is presented for rapid forming the proper number of unit groups and grouping mutually exclusive block-diagonal form, (b) The simple and effective mathematical analysis method of Rank Order Clustering(ROC) algorithm is applied to minimize intra-group journeys in each group and exceptional elements in the whole group. The results are compared with those from Expert System(ES) algorithm and ROC algorithm. The results show that the new algorithm always gives the group of mutually exclusive block-diagonal form and better results(85%) than ES algorithm and ROC algorithm.

• 대한수학교육학회지:학교수학
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• 제3권2호
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• pp.447-473
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• 2001

Since the greater part of mathematical concepts have been developed in the direction of “from the concrete and realistic aspects to the abstract level”, children should be secured to learn mathematics genetically with various manipulative materials. The aim of this study is to instigate the active use of geoboards in mathematics classroom. To achieve this arm, we first embodied the several significances on the use of geoboards in mathematics instruction. And we then performed an instruction that children discover and justify the formula related to the area of trapezoid by exploring with geoboards, and analyzed the instructional episode to support our assertion about some secure merit accompanied by using geoboards. From this study, we obtained the conclusion that geoboard activity contains many significances such as children can explore congruence, symmetry, similarity, fundamental properties of figures, and pattern. Futhermore, geoboard activity enable children to transform a figure into other equivalently, develop spatial sense, have basic experiences for coordinate geometry, build a concrete model to explain abstract ideas, and foster the ability of problem solving and mathematical thinking.

• 대한수학교육학회지:수학교육학연구
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• 제8권2호
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• pp.723-743
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• 1998

This study was designed for the purpose of finding some gender differences in the mathematical creative problem-solving ability. For this research, we selected two problems. One is "counting marbles" of algebra, and the other is "drawing figures" of geometry. And we examined and analyzed the written responses of the students with classifying the four categories; fluency, flexibility, originality, and elaboration. These are the factors of the creativity. There were no significant gender differences in the fluency, flexibility, and originality in both problems. but girls got significantly higher scores than boys in elaboration. In conclusion, boys tried unusual and special responses but gave many incorrect and many similiar answers, whereas girls had low scores in high originality but gave less incorrect and less overlapping answers than boys did.swers than boys did.

• 한국수학교육학회지시리즈C:초등수학교육
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• 제5권1호
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• pp.41-55
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• 2001

The purpose of this study was to compare and analyze the curricula of kindergarten and elementary school and to present a plan for connecting the two curricula. The curricula emphasized mathematical thinking and problem solving instead of fragmentary knowledge and adopted the streamed curriculum based on children’s ability and interest. And both of them consisted of number and operation, geometry, measurement, statistics, and put emphasis on activity such as real life experience, play, manipulation of concrete objects, and communication. However, there are some kinds of differences between them, because the kindergarten curriculum is not included in the common curriculum, from 1st grade to 10th grade. Thus, this study recommended several ideas based. Thus, this study recommended several ideas based on theories to connect the mathematics curricula of kindergarten and elementary school.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제25권1호
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• pp.185-205
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• 2011

본 연구는 전남대학교 과학영재교육원 중등수학 사사과정에 있는 수학영재 학생을 대상으로 사사독립연구를 실시하여 수확영재의 사사독립연구에서 얻어진 산출물에서 나타난 특징을 분석하고, 산출물 발표과정에서의 영재학생의 심리적 변화에 대하여 연구하였다. 연구 결과 다음과 같은 결론을 얻었다. 첫째, 영재학생의 사사독립연구는 수학영재성 중 수학적 능력의 구성요소만 귀납적 연역적 추론 능력을 발현하게 한다. 둘째, 영재학생의 사사독립연구에 대한 산출물 발표는 영재학생에게 수학영재성 관련된 창의적인 문제해결 능력 중 수학적 능력인 의사소통능력이 영재학생에게서 발현하게 한다. 셋째, 영재학생의 사사독립연구에 대한 산출물 발표는 영재학생에게 수학 영재성의 구성요소 중 자신의 능력에 대한 믿음, 자기 신뢰감 등과 관련된 요소를 상승하게 한다.

• 한국수학교육학회지시리즈A:수학교육
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• 제61권1호
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• pp.1-28
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• 2022

본 연구의 목적은 비례 문제 해결 과정에서 학생의 분수 지식이 어떻게 관련되어 나타나는지를 탐구하는 것이다. 이를 위해 단위 조정 3단계로 판단되는 중학교 1학년 학생 2명에 주목하여 분수 지식과 비례 문제 해결 과정에 대한 임상 면담 자료를 분석하였다. 분석 결과 자연수 맥락에서 단위 조정 3단계 학생으로 판단되었던 두 학생은 분수 맥락에서는 '활동을 통해' 3수준 단위를 조정하며 서로 다른 양적 조작 방식을 보여주었다. 특히 두 학생이 가분수가 포함된 곱셈 연산 과제에서 보여주었던 분할 조작과 단위 조정 활동에서 식별되었던 차이는 두 학생의 비례 문제에 대한 접근 방식에 있어서 중요한 차이로 나타났다. 이 과정에서 하나의 3수준 단위로부터 또 다른 3수준 단위 사이의 구조적 전환이 '재귀 분할의 내재화'와 관련이 되며, 합성 단위에 대한 스플리팅 조작에 중요한 근거가 됨을 시사하였다.

• 한국수학교육학회지시리즈C:초등수학교육
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• 제6권2호
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• pp.75-84
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• 2002

After entering an elementary school, in fact, a number of children regard mathematics as one of very difficult subjects because of its abstractiveness. This is caused by the fact that their basic thinking power is not yet formed or they can not understand the special quality of mathematics. So this article emphasizes the need to build up the higher logical thought and a basic mathematical concept at the lower grade elementary school stage in which the loaming activity on mathematics begins in earnest, that is, at the stage before having an experience on the calculating activity using numbers. But at present the lower grade elementary school students in our country do not understand the special quality of mathematics composed of a various symbolic system and lay stress upon mathematics learning attached to the calculative activity. In order to make the right mathematical concept of the lower grade elementary school, the basic knowledge and ability as follows is sure to be formed. 1) the foundational logical manipulation activity and knowledge 2) the using ability of the sign and symbolic system At the stage on which mathematics learning activity begins, it is a very important task to make the right concept of the abstractive math and nurse the capability for finding mathematical relations covered under the sign system through the continuos loaming activity on . Through the basic logical manipulation activity and the game activity of sign for lower grade elementary school students mentioned in this article, they can not only foster the higher level logical thinking power and the foundational calculative ability but also bring up the interest on the activity of establishing a new problem solving strategy.

• 대한수학교육학회지:학교수학
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• 제1권1호
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• pp.123-133
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• 1999

For an appropriate assessment in mathematics, students should play an active role in their learning by becoming aware of what they have learned in mathematics and by being able to assess their attainment of mathematical knowledge. The process of actively examining and monitoring students' own progress in learning and understanding of their mathematical knowledge, process, and attitude is called self-assessment, Researchers in mathematics education have found some important facts about the meta-cognitive process which is related to self-assessment : i. e. meta-cognition progress is composed of being aware of ones' own personal thinking of content knowledge and cognitive process(self-awareness) and engagement in self-evaluation. Tipical method for self-assessment in mathematics developed upon above finding about meta-cognitive progress is describing about students' knowledge and their problem solving strategies. In the beginning of the description in mathematics about themselves, students are required to answer which part they know and which part they don't know. Self-assessment of students' attitudes and dispositions can be just as important as assessment of their specific mathematical abilities. To make the self-assessment method a success, teachers should let students' have confidence and earn their cooperation by let them overcoming fear to be known the their ability to other students. In conclusion, self-assessment encourages students to assume an active role in development of mathematical power. For teachers, student self-assessment activities can provide a prism through which the development of students' mathematical power can be viewed.

• 한국초등수학교육학회지
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• 제15권3호
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• pp.641-654
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• 2011

수학교육의 목표 중의 하나인 합리적이고 창의적인 문제해결력을 기르기 위해서는 그 기저가 되는 수학적 개념 및 원리 법칙에 대한 올바른 이해가 뒷받침되어야 할 것이다. 수학과 교육과정에서 수학적 개념 및 원리 법칙의 교수 학습 방법으로는 주변의 여러 가지 현상을 학습 소재로 하여 구체적 조작 활동과 탐구 활동을 통하여 학생 스스로 개념, 원리, 법칙을 발견하고 이를 정당화하도록 권고하고 있다. 본고에서는 수학적 원리 법칙의 의미와 귀납적 추론 절차를 살펴보고, 교육과정에서 권고하는 원리 법칙지도를 위한 방안으로써 발견을 통한 지도와 발견전략으로써 귀납에 의한 지도 방법 및 지도상의 유의점을 살펴보았다.

• 한국수학교육학회지시리즈A:수학교육
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• 제53권3호
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• pp.413-434
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• 2014

Logic lays the foundation of Mathematics and the development of Mathematics is dependent on critical thinking. So it is important that school mathematics helps students develop their logical and critical thinking ability for both mathematics learning and problem solving in general. MINDSTORMS, a LEGO based programming activity kit, is an effective teaching and learning tool that can be used to enhance logical and critical thinking in students. This study focused on measuring the growth of students' ability to think logically and critically when they used MINDSTORMS activities to learn programming. In addition, we investigated how the students' logical and critical thinking changed from the MINDSTORMS learning experience. The study confirmed that the programming activities using MINDSTORMS help to enhance logical and critical thinking in students. The students attitude about logical and critical thinking became more positive and the activities helped to engage students to think logically and critically. This type of programming activities should be valuable in mathematics education and it should be included in a general mathematics curriculum.