• 한국학교수학회논문집
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• 제25권2호
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• pp.195-224
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• 2022

본 연구에서는 예비수학교사가 고등학생들의 집단창의성 신장을 위한 모바일 수학 학습 콘텐츠인 애플리케이션 "집단창의성 발현을 위한 E-learning 고등수학"을 활용하여 사범대학 정규교육과정에서 테크놀로지 내용교수지식(TPACK)을 함양하고 수학 수업에서 학생과의 의사소통 능력을 신장하는 방안을 제안하였다. 집단창의성 발현을 위한 애플리케이션을 활용한 예비교사의 수학수업 전문성을 향상하기 위한 교육프로그램은 사전교육, 목표설정, 수업계획, 수업실습, 수업평가 단계로 구성된다. 이 과정에서 예비교사들은 테크놀로지 도구를 평가하였고, 앱의 두 활동에서 고등학생들이 집단창의성을 발현하도록 지도하기 위해 과제대화록, 레슨 플레이, 반성적 저널, 교수·학습지도안을 작성하였다. 교육프로그램 적용 결과, 예비수학교사의 TPACK을 함양할 수 있었고 집단창의성 발현을 위한 학생과의 수학적 의사소통 능력을 신장할 수 있었다.

• 한국수학교육학회지시리즈A:수학교육
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• 제62권3호
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• pp.341-362
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• 2023

본 연구는 초등학교 1학년 학생을 대상으로 등호의 관계적 이해를 강조한 수업에서 나타나는 학생의 노티싱을 초점의 중심, 집중하는 상호작용, 수학 과제, 수학 활동의 본질의 네 가지 측면에서 분석하였다. 구체적으로 선행연구에서 도출한 지도방안을 등호를 처음 도입하는 1학년 덧셈과 뺄셈 단원에 적용하여 등호의 관계적 이해를 강조한 수업을 실행하고, 이 과정에서 나타난 학생의 노티싱을 종합적으로 분석하였다. 그 결과 실제 수업 맥락에서 초점의 중심은 등식의 구조와 과제 형태, 교사와 학생의 상호작용, 교실 관행 등에 영향을 받았으며, 특히 학생이 등호를 관계적으로 인식할 수 있도록 돕는 특정한 교사와 학생의 상호작용을 발견할 수 있었다. 또한 크기가 같은 두 양에 주목하는 경우와 양변의 관계에 주목하는 경우 등식을 관계적으로 추론할 수 있었던 것과 같이 등식에 대한 학생의 노티싱은 등식을 추론하는 방식에 영향을 미친다는 것을 알 수 있었다. 이러한 연구결과를 통해 등호의 지도 방안에 대한 시사점을 제시하였다.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제38권2호
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• pp.247-261
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• 2024

본 연구는 스크래치 같은 드래그 앤 드롭 방식 교육용 프로그래밍 언어를 활용하여 복잡한 도형의 한붓그리기 과제를 해결하는 활동의 교육적 활용가능성을 논의하고자 한다. 주어진 도형이 한붓그리기가 가능한지를 판별하는 문제와 실제로 한붓그리기의 경로를 찾아서, 프로그래밍으로 구현하는 것은 별개의 문제가 된다. 특히 규칙성을 가지는 복잡한 도형에 대해 한붓그리기가 가능한 규칙적인 경로를 찾고, 이를 프로그래밍으로 구현하는 것은 다양한 수학지식의 융합을 바탕으로 하는 문제해결 역량을 요구한다. 이에 본 연구에서는 다각형 관련 도형들, 테셀레이션 관련 도형들, 프랙탈 도형들 중에 한붓그리기와 관련된 문제를 제시하고, 해당 도형의 한붓그리기 프로그래밍 결과를 예시하였다. 또 예시된 문제의 해결과정을 위해 필요한 수학지식과 계산적 사고 요소들을 분석하였다. 본 연구는 수학과 정보가 융합하는 수학교육에 대한 새로운 예시라는 의미를 갖는다.

• 한국초등수학교육학회지
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• 제13권1호
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• pp.115-140
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• 2009

Freudenthal은 수학화를 핵심 개념으로 하는 현실주의 수학 교육론을 주창하였다. 수학화란 현실 안에 있는 여러 현상들을 수학적인 수단을 사용하여 조직함으로써 현실에 질서를 부여하는 활동을 말한다. 본 연구에서는 Freudenthal의 수학화 이론을 바탕으로 제 7차 초등 수학 교과서 5-가 단계의 넓이 단원을 재구성하여 실험적인 지도만을 작성한 다음, 이를 통하여 교수 실험을 실시함으로써, 수학화를 통한 넓이의 지도 방안의 효과와 더불어 학생들의 넓이 개념과 공식에 대한 이해 실태를 분석하였다. 그 결과, 넓이의 개념 이해 측면에서는 실험반 학생들이 우수하였으나, 넓이의 계산 측면에서는 유의미한 차이가 없는 것으로 나타났다.

• 대한의용생체공학회:의공학회지
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• 제30권4호
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• pp.279-287
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• 2009

Magnetic resonance electrical impedance tomography (MREIT) is a new medical imaging modality providing cross-sectional images of a conductivity distribution inside an electrically conducting object. MREIT has rapidly progressed in its theory, algorithm and experimental technique and now reached the stage of in vivo animal and human experiments. Conductivity image reconstructions in MREIT require various steps of carefully implemented numerical computations. To facilitate MREIT research, there is a pressing need for an MREIT software package with an efficient user interface. In this paper, we present an example of such a software, called CoReHA which stands for conductivity reconstructor using harmonic algorithms. It offers various computational tools including preprocessing of MREIT data, identification of boundary geometry, electrode modeling, meshing and implementation of the finite element method. Conductivity image reconstruction methods based on the harmonic $B_z$ algorithm are used to produce cross-sectional conductivity images. After summarizing basics of MREIT theory and experimental method, we describe technical details of each data processing task for conductivity image reconstructions. We pay attention to pitfalls and cautions in their numerical implementations. The presented software will be useful to researchers in the field of MREIT for simulation as well as experimental studies.

• 한국수학교육학회지시리즈A:수학교육
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• 제56권1호
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• pp.1-17
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• 2017

The purpose of this study is to analyze the differences between the cognitive load of mathematics textbooks based on storytelling and traditional mathematics textbooks that are presented to students. In order to verify this, we have selected two 4th grade classes in elementary school that were identified as a homogeneous group through prior testing, and thus were separated into experimental group and comparative group. Then, without the teacher's lessons, the experimental group learned from mathematics textbooks based on storytelling and the comparative group learned from traditional mathematics textbooks. Afterwards, the two groups' cognitive load was measured through a questionnaire, and the following results were obtained: In the 'mental effort' and 'self evaluation' categories, the students that learned from the mathematics textbook based on storytelling showed higher scores than the students that learned from the traditional mathematics textbook. also there was statistically significant difference in some items. However, no statistically significant difference was found in the remaining categories 'task difficulty', 'self evaluation', and 'material design'.

• 한국수학교육학회지시리즈D:수학교육연구
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• 제5권2호
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• pp.87-98
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• 2001

The Center for Science Gifted Education (CSGE) of Chongju National University of Education was established in 1998 with the financial support of the Korea. Science & Engineering Foundation (KOSEF). In fact, we had prepared mathematics and science gifted education program beginning in 1997. It was possible due to the commitment of faculty members with an interest in gifted education. Now we have 5 classes in Mathematics, two of which are fundamental, one of which is a strengthened second-grade class gifted elementary school students, and one a fundamental class, and one a strengthened class for gifted middle school students in Chungbuk province. Each class consists of 16 students selected by a rigorous examination and filtering process. Also we have a mentoring system for particularly gifted students in mathematics. We have a number of programs for Super-Saturday, Summer School, Winter School, and Mathematics and Science Gifted Camp. Each program is suitable for 90 or 180 minutes of class time. The types of tasks developed can be divided into experimental, group discussion, open-ended problem solving, and exposition and problem solving tasks. Levels of the tasks developed for talented elementary students in mathematics can be further divided into grade 5 and under, grade 6, and grade 7 and over. Types of the tasks developed can be divided into experimental, group discussion, open-ended problem solving, and exposition and problem solving task. Also levels of the tasks developed for talented elementary students in mathematics can be divided into the level of lower than grade 5, level of grade 6, and level of more than grade 7. Three tasks developed and practiced are reported in this article.

• 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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• 제52권2호
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• pp.191-201
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• 2013

The theory of embodied cognition assumes that behaviors, senses and cognitions are closely connected, and there is a growing interest in investigating the significance of embodied cognition in the field of mathematics education. This study aims to applicate the embodied turtle metaphor and expressions when students visualize three-dimensional objects. We used MRT(Verdenberg & Kuse, 1978) & SVT for this research and both tests turned out that turtle schemes are useful to the students in a low level group. In addition, students found turtle schemes more useful in SVT which requires constructing three-dimensional objects, than in MRT which requires just rotating the image of three-dimensional objects in their mind. These results suggest that providing students who are less capable of spatial visualizing with the embodied schemes like turtle metaphor and expressions can be an alternative to improve their spatial visualization ability.

• 대한기계학회논문집A
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• 제30권10호
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• pp.1227-1234
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• 2006

Up to now, several mathematical theories based on strain energy functions have been developed for rubber materials. These theories, coupled with the finite element method, can be used very effectively by engineers to analyze and design rubber components. However, due to the complexities of the mathematical formulations and the lack of general guidelines available fur the analysis of rubber components, it is a formidable task for an engineer to analyze rubber components. In this paper a method for predicting strain energy functions - Neo-Hookean model and Mooney-Rivlin model - from the hardness using the empirical equation without any experiment is discussed. First based on the elasticity theories of rubber, the relation between stress and strain is defined. Then for the butyl rubbers, the model constants of Neo-Hookean model and Mooney-Rivlin model are calculated from uniaxial tension tests. From the results, the usefulness of the empirical equation to estimate elastic modulus from hardness is confirmed and, fur Mooney-Rivlin model, the predicted and the experimental model constants are compared and discussed.