• 한국수학교육학회지시리즈A:수학교육
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• 제55권3호
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• pp.317-334
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• 2016

Knowledge and data interpretation on statistical estimation was important to have statistical literacy that current curriculum was said not to satisfy. The author investigated mathematics teachers' MKT on statistical estimation concerning interpretation of confidence interval by using questionnaire and interview. SMK of teachers' confidence was limited to the area of textbooks to be difficult to interpret data of real life context. Most of teachers wrongly understood SMK of interpretation of confidence interval to have influence upon PCK making correction of students' wrong concept. SMK of samples and sampling distribution that were basic concept of reliability and confidence interval cognized representation of samples rather exactly not to understand importance and value of not only variability but also size of the sample exactly, and not to cognize appropriateness and needs of each stage from sampling to confidence interval estimation to have great difficulty at proper teaching of statistical estimation. PCK that had teaching method had problem of a lot of misconception. MKT of sample and sampling distribution that interpreted confidence interval had almost no relation with teachers' experience to require opportunity for development of teacher professionalism. Therefore, teachers were asked to estimate statistic and to get confidence interval and to understand concept of the sample and think much of not only relationship of each concept but also validity of estimated values, and to have knowledge enough to interpret data of real life contexts, and to think and discuss students' concepts. So, textbooks should introduce actual concepts at real life context to make use of exact orthography and to let teachers be reeducated for development of professionalism.

• 한국수학교육학회지시리즈D:수학교육연구
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• 제14권1호
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• pp.33-50
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• 2010

The mathematical thinking which transforms important mathematical content and developed into mathematical structure is a vital process in building up mathematical ability as mathematical knowledge based on structure. Such process based on students' recognition of mathematical concept. Developing mathematical thinking into mathematical structure happens when different cognitive units are connected and compressed to form schema of solution, which could happen through some guided problems. The effort of arithmetic approach in problem solving did not necessarily provide students the structure schema of solution. The using of equation to solve the problem is based on the schema of building equation, and is not necessary recognizing the structure of the solution, as the recognition of structure may be lost in the process of simplification of algebraic expressions, leaving only the final numeric answer of the problem.

• Korean Journal of Mathematics
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• 제30권4호
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• pp.679-686
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• 2022

In this study, the concept of lacunary statistical convergence is studied in G-metric spaces. The G-metric function is based on the concept of distance between three points. Considering this new concept of distance, we examined the relationships between GS, GS_θ, Gσ₁ and GN_θ sequence spaces.

• 한국수학교육학회지시리즈A:수학교육
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• 제46권3호
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• pp.315-329
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• 2007

The concepts of ratio, rate, and proportion are used in everyday life and are also applied to many disciplines such as mathematics and science. Proportional reasoning is known as one of the pivotal ideas in school mathematics because it links elementary ideas to deeper concepts of mathematics and science. However, previous research has shown that it is difficult for students to recognize the proportionality in contextualized situations. The purpose of this study is to understand how the mathematical concept in the middle school mathematics curriculum is connected with ratio, rate, and proportion and to investigate the characteristics of proportional reasoning through analyzing the concept including ratio, rate, and proportion on the middle school mathematics curriculum. This study also examines mathematical concepts (direct proportion, slope, and similarity) presented in a middle school textbook by exploring diverse interpretations among ratio, rate, and proportion and by comparing findings from literature on proportional reasoning. Our textbook analysis indicated that mechanical formal were emphasized in problems connected with ratio, rate, and proportion. Also, there were limited contextualizations of problems and tasks in the textbook so that it might not be enough to develop students' proportional reasoning.

• 대한수학교육학회지:학교수학
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• 제18권3호
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• pp.691-709
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• 2016

수학 예비교사의 신념을 이해하는 것은 효과적인 교사교육 프로그램을 시행하고 설계하기 위하여 필수적이다. 본 연구에서는 초등 예비교사의 수학적 신념에 대해 분석하였다. 연구결과는 다음과 같다. 첫째, 수학문제해결에 대한 신념인 끈기 요인, 수학학습에 대한 신념인 교사주도 요인, 활동참여 요인, 자아개념에 대한 신념인 흥미 요인은 다른 수학적 신념요인들과 관련성이 많았다. 둘째, 수학교과에 대한 신념인 고정관념 요인이 교사주도 요인에 영향을 주고 있고, 수학문제해결에 대한 신념인 과정 요인이 활동참여 요인에 영향을 주고 있었다. 셋째, 학년별 수학적 신념 비교에서는 수학교과에 대한 신념인 고정관념, 유용성 요인과 자아개념에 대한 신념인 유익성 요인만이 통계적으로 유의미한 차이가 있었다. 넷째, 전공별 수학적 신념비교에서는 자아개념에 대한 신념인 유익성 요인과 자신감 요인을 제외한 나머지 수학적 신념에서 모두 유의미한 차이가 있었다. 본 연구결과를 토대로 초등 예비교사가 지녀야 할 수학적 신념이 무엇인지를 정립하고, 예비교사교육과정, 교수 학습 방법등 다양한 방안을 마련해야 할 것이다.

• 터널과지하공간
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• 제28권1호
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• pp.25-37
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• 2018

미고결 암석에 대한 Creep 특성을 분석하고자 Burger 모델을 이용하였다. Burger 모델은 자료쌍 D(u,t)으로부터 4개의 역학적 매개변수를 결정 하여야 한다. 본 연구에서는 수학적 개념 해를 적용하여 매개변수를 결정 하였다. 미고결 암석에 대한 Burger 모델의 결정된 매개변수를 이용하여 Creep을 3년간 가속시켰다. 그 결과 Creep 거동은 수렴이 되지 않고 지속적인 변형거동을 보였다. 따라서 본 광산에서는 Roofbolt 보다 U-Beam 적용이 안정성 측면에서 더 적합 할 것으로 분석 되었다.

• 한국수학교육학회지시리즈D:수학교육연구
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• 제8권3호
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• pp.175-182
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• 2004

The design of learning environments which encourage students to work in a creative manner on mathematical problems is a creative process in itself. The concept of the Saturday University program is described in which pre-service teachers are guided at teaching students in extra-curriculum activities on interdisciplinary topics. In the process of the didactical reconstruction of mathematical problems, the pre-service teachers go through the stages of a revolving door model y.

• 대한수학회지
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• 제51권2호
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• pp.325-344
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• 2014

The aim of this paper is to generalize the theory of Hopf-Ore extension on Hopf algebras to Hopf group coalgebras. First the concept of Hopf-Ore extension of Hopf group coalgebra is introduced. Then we will give the necessary and sufficient condition for the Ore extensions to become a Hopf group coalgebra, and certain isomorphism between Ore extensions of Hopf group coalgebras are discussed.

• 한국수학교육학회지시리즈A:수학교육
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• 제48권3호
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• pp.353-358
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• 2009

The article discusses the independence concept occurring in the learning of probability. The author does not distinguishes the independence in the events from the independence in the trials. Instead, the author suggests the physico-empirical independence and the logico-mathematical independence to distinguish between the two concepts.

• 한국수학사학회지
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• 제18권2호
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• pp.9-22
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• 2005

본 연구는 자연수 개념이 역사적으로 전개된 방식을 이해하는 것이 수학적$\cdot$ 교육적으로 매우 중요함에도 불구하고, 그 역사적 고찰이 미진한 상태에 있다는 데에 문제 의식을 갖고 출발하였다. 그리하여 자연수 개념이 역사적으로 어떻게 논의되어 왔는지 살펴보고자 하였다. 수학의 발달 과정에서 수가 어떤 의미를 지녔는지, 문화적$\cdot$사회적 요소가 수 개념을 이해하는 방식과 수 개념의 발달에 어떤 영향을 주었는지 밝힘으로써 자연수 개념에 대한 이해를 풍부하게 하고자 하였다. 그리고 자연수 개념의 역사에 나타난 특징을 드러내고자 하였다.