• 대한수학회지
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• 제38권1호
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• pp.25-35
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• 2001

In this paper we consider an age dependent branching process whose particles move according to a Markov process with continuous state space. The Markov process is assumed to the stationary with independent increments and positive recurrent. We find some sufficient conditions for he Markov motion process such that the empirical distribution of the positions converges to the limiting distribution of the motion process.

• 대한수학교육학회지:학교수학
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• 제12권4호
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• pp.667-686
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• 2010

2009 개정 교육과정 총론에 따라 수학과 교육과정 개정 시안 연구가 진행 중이다. 수학과 교육과정 개정 연구팀이 교육과정 체제의 측면에서 고려하고 있는 두 가지 중요한 사항은 '학년군의 도입'과 '수학적 과정의 신설'이다. 본 고는 학년군과 수학적 과정 도입의 타당성을 검토하기 위해 이 두 가지 측면을 중심으로 외국의 수학과 교육과정을 비교 분석하였다. 그 결과 학년군의 도입은 실효성을 갖기 어렵기 때문에 재고의 여지가 있고, 수학적 과정의 신설은 수학 교과서 집필과 수업의 방향성을 제시한다는 측면에서 긍정적인 측면을 갖는 것으로 평가하였다.

• 대한수학회지
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• 제39권1호
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• pp.119-126
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• 2002

For a stationary multivariate linear process of the form X$_{t}$ = (equation omitted), where {Z$_{t}$ : t = 0$\pm$1$\pm$2ㆍㆍㆍ} is a sequence of stationary linearly positive quadrant dependent m-dimensional random vectors with E(Z$_{t}$) = O and E∥Z$_{t}$∥ $^2$< $\infty$, we prove a central limit theorem.theorem.

• 대한수학회보
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• 제54권2호
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• pp.573-581
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• 2017

Reflected Ornstein-Uhlenbeck process is a process that returns continuously and immediately to the interior of the state space when it attains a certain boundary. In this work, we are concerned with the study of asymptotic behaviours of parametric estimation for ergodic reflected Ornstein-Uhlenbeck processes with two-sided barriers. Moreover, we also focus on the relations between regulators and the local time process.

• 한국수학교육학회지시리즈A:수학교육
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• 제42권5호
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• pp.623-636
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• 2003

Metacognition is defined to be 'thinking about thinking' and 'knowing what we know and what we don't know'. It was verified that the metacognitive abilities of high school students can be improved via instruction. The purpose of this article is to investigate a new method for activating the metacognitive abilities that play a key role in the Mathematical Problem Solving Process(MPSP). Hyunsung participated in the MPSP using Visual Basic Programming. He actively participated in the MPSP. There are sufficient evidences about activating the metacognitive abilities via the activity processes and interviews. In solving mathematical problems, he had basic metacognitive abilities in the stage of understanding mathematical problems; through the experiments, he further developed his metacognitive abilities and successfully transferred them to general mathematical problem solving.

• 한국수학교육학회지시리즈A:수학교육
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• 제48권4호
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• pp.455-467
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• 2009

During problem solving, "mathematical thought process" is a systematic sequence of thoughts triggered between logic and insight. The test questions are formulated into several areas of questioning-types which can reveal rather different result. The lower level questions are to investigate individual ability to solve multiple mathematical problems while using "mathematical thought." During problem solving, "mathematical thought process" is a systematic sequence of thoughts triggered between logic and insight. The scope of this case study is to present a desirable model in solving mathematical problems and to improve teaching methods for math teachers.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제16권
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• pp.1-65
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• 2003

The focus of this article is on the process of cultivating students' interests so that they come to view mathematics as an activity worthy of their engagement. We first define and operationalize the notion of interests, in the process developing a perspective in which they are seen to be generative, to evolve, and to be deeply cultural. We concretize this perspective by presenting an analysis of a classroom design experiment that documents both the process by which the students' interests evolved and the means by which these developments were supported. We then frame the analysis as a case in which to tease out the implications for a nascent design theory of mathematical interests and in doing so give particular attention to the issue of equity in students' access to significant mathematical ideas

• 한국수학교육학회지시리즈C:초등수학교육
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• 제6권1호
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• pp.41-54
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• 2002

The purpose of this study is to find out what mathematical situation means, how to pose a meaningful situation and how situation-centered teaching could be done. The obtained informations will help learners to improve their math abilities. A survey was done to investigate teachers' perception on teaching-learning in mathematics by elementary teachers. The result showed that students had to find solutions of the textbook problems accurately in the math classes, calculated many problems for the class time and disliked mathematics. We define mathematical situation. It is artificially scene that emphasize the process of learners doing mathematizing from physical world to identical world. When teacher poses and expresses mathematical situation, learners know mathematical concepts through the process of mathematizing in the mathematical situation. Mathematical situation contains many concepts and happens in real life. Learners act with real things or models in the mathematical situation. Mathematical situation can be posed by 5 steps(learners' environment investigation step, mathematical knowledge investigation step, mathematical situation development step, adaption step and reflection step). Situation-centered teaching enhances mathematical connections, arises learners' interest and develops the ability of doing mathematics. Therefore teachers have to reform textbook based on connections of mathematics, other subject and real life, math curriculum, learners' level, learners' experience, learners' interest and so on.

• 한국수학교육학회지시리즈A:수학교육
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• 제62권3호
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• pp.363-380
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• 2023

본 연구의 목적은 초등학교 교사가 수학 교과서 과제를 수학적 모델링 과제로 변형하는 과정에서 경험하는 어려움과 수학적 모델링 과제 개발을 위한 지식 변화의 사례를 분석하는 것이다. 이를 위해 10년 경력의 초등교사가 교사연구공동체의 반복적인 논의에 참여하면서 초등학교 5학년 수학의 자료와 규칙성 영역 중 평균 지도를 위한 과제를 수학적 모델링 과제로 변형하였다. 연구결과, 첫째, 교사는 과제 변형 과정에서 현실성의 반영, 수학적 모델링 과제의 적절한 인지적 수준 설정, 수학적 모델링 과정에 따른 세부 과제의 제시에 어려움을 겪었다. 둘째, 반복된 과제 변형을 통해, 교사는 학습 내용과 학생의 인지적 수준을 고려한 현실성 있는 과제의 개발, 과제의 복잡성 및 개방성 조정을 통한 과제의 인지적 수준 조정, 학생의 과제 해결 과정에 대한 사고실험을 통한 수학적 모델링 과정에 따른 세부 과제의 제시를 수행할 수 있었으며, 이는 수학적 모델링의 개념과 과제의 특징 등 수학적 모델링 과제 개발을 위해 요구되는 교사 지식이 향상되었음 보여준다. 본 연구결과는 향후 수학적 모델링 교사교육과 관련하여, 교과서 과제 변형을 통한 수학적 모델링 과제 개발 역량 향상의 기회를 제공하는 교사교육, 수학적 모델링의 이론 및 실제를 결합한 교사교육, 교사연구공동체에의 참여를 통한 교사교육이 필요함을 보여준다.

• 대한수학회보
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• 제41권3호
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• pp.403-412
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• 2004

We obtain a kernel quantile process based on the kernel quantile estimator and prove the uniform consistency of the kernel quantile process by developing that of the usual sample quantile process. We apply our result to the classical kernel type processes.