• East Asian mathematical journal
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• 제33권2호
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• pp.177-197
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• 2017

The purpose of this study is to investigate and analyze the understandings of elementary pre-service teachers about 'estimation' in the elementary mathematics. Together with this analysis, we identify elementary pre-service teacher's Mathematical Pedagogical Contents Knowledge(MPCK), especially focusing to Subject Matter Knowledge(SMK). In order to this goals, we investigate contents relating to 'estimation' from $1^{st}$ curriculum to 2009 revised curriculum and compare 'rounding up', 'rounding off', 'rounding' in the elementary mathematics textbooks. As results of investigations, 'estimation' has been teaching at the 'Measurement' domain from $3^{rd}$ curriculum, but contexts of measuring weaken from $7^{th}$ curriculum. 'Rounding up(off)' is defined three types in the textbooks from $1^{st}$ to 2009 revised curriculum. And we examine elementary pre-service teachers through the questions on these 'estimation' contents. On the analysis of pre-service teacher's understanding relating MPCK, four themes is summarized as followings; the understanding of '0' in the 'rounding up', the cognitive gap between 'rounding up' and 'rounding off', the difference of percentage of correct answers according to types of question in the 'rounding up', and the difference between the definition of 'rounding up' and the definition of 'rounding'.

• 한국수학교육학회:학술대회논문집
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• 한국수학교육학회 2006년도 제37회 전국수학교육연구대회 프로시딩
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• pp.215-217
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• 2006

• 한국수학교육학회지시리즈A:수학교육
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• 제57권1호
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• pp.1-36
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• 2018

The purpose of this study is to examine the relationship between utilization of technology and TPACK in mathematics teachers, and to analyze needs and retentions, difference between needs and retentions, and educational needs of TPACK in mathematics teachers. Furthermore, we will prioritize TPACK items that mathematics teachers want to change, and provide implications for teacher education related to TPACK in the future. To do this, we analyzed 328 mathematics teachers nationwide by using survey on the utilization of technology, averages of TPACK's needs and retentions, t-test of two averages, Borich's educational needs analysis, and the Locus for Focus model. The results are as follows. Firstly, the actual utilization rate was lower than the positive recognition of utilization of technology by mathematics teachers, and many mathematics teachers mentioned the lack of knowledge related to TPACK. Secondly, the characteristics of in-service mathematics teacher's needs and retentions for TPACK were clear, and TPACK's starting line of in-service mathematics teacher can be different from pre-mathematics teacher's. The retentions was high in the order of CK, PCK and PK, and the needs was higher in the order of TPACK, TCK, TK and TPK. All of the higher retentions were knowledge related to PCK, and the value of CK was extremely high among them. In addition, mathematics teachers recognized needs for integrated knowledge related to technology, and they needed more TCK than TPK. The difference between needs and retentions showed that all items except two items in the PK were significant. Retentions of all items in CK was higher than needs, needs of all items in TK, TCK, TPK and TPACK was higher than retentions, PK and PCK were mixed. Thirdly, based on the analysis of Borich's educational needs and the Locus for Focus model, teacher education on TPACK for mathematics teachers needs to focus on TPACK, TK, TCK, and TPK. Specifically, TPACK needs to combine technology in terms of creativity-convergence, mathematical connections, communication, improvement of evaluation quality, and TK needs to new technology acquisition, function of utilizing technology, troubleshoot problems with technology, TCK needs to mathematical value(esthetic, practical) with technology, and TPK needs to consider technology in terms of evaluation methods, teaching and learning methods, improvement of pedagogy. Therefore, when determining the direction of teacher education related to TPACK in the future, if they try to reflect these items in detail, the teachers could participate more actively and receive practical help.

• 한국수학교육학회지시리즈A:수학교육
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• 제42권1호
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• pp.41-56
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• 2003

As the information society appears, the increasing power and access of personal computers along with wide spread use of the information technology has not only changed the landscape for communication but it has opened up new and exciting opportunities for education. One of the ways that information technology could help improve education is to be used in interactive communication to share the knowledge and experience of all the teachers as well as students. In this paper, the use and application of information communication technology[ICT] into mathematics classroom are described and showed several examples. furthermore, the web site design and developed for this study was introduced of the purpose of sharing the ideas about the knowledge and usage of the history of mathematics and examples of mathematical connections. The study suggests that enabling mathematics in incorporating of ICT by teachers and students requires more effort to be made in training teachers on the use and application of ICT into mathematics classroom.

• 한국수학교육학회지시리즈A:수학교육
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• 제60권2호
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• pp.229-247
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• 2021

학생의 수학적 사고는 다양한 형태의 산출물로 나타나며, 교사는 이를 통해 학생의 수학적 사고를 추론하고 반응할 수 있어야 한다. 본 연구는 이분모 분수의 덧셈과 뺄셈을 중심으로 오류가 포함된 문제해결전략에 대한 39명의 현직 초등교사의 노티싱 역량을 분석하였다. 그로부터 다음과 같은 연구 결과를 도출하였다. 첫째, 교사의 노티싱 역량은 식별하기, 해석하기, 반응하기 순으로 낮아지는 경향을 보였다. 둘째, 반응하기는 교사의 의도와 문제 유형에 따라 범주화할 수 있었다. 이를 바탕으로 교사 노티싱 연구의 시사점을 제언하였다.

• 한국수학교육학회지시리즈E:수학교육논문집
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• 제25권4호
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• pp.693-734
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• 2011

연구의 목적은 자연수 개념에 대한 초등 교사들의 교수학적 내용지식을 분석하는 것이다. Shulman(1986b)은 교사의 지식을 이해하기 위한 도구를 개발하면서, 가르치는데 필요한 내용지식을 교과내용지식, 교육과정지식, 교수학적 내용지식의 세 가지로 구분하였고, 방정숙(2002)은 교사의 교수 방법에 포함되는 요소를 개인 요소와 사회 문화 요소로 구분하였다. 연구 문제는 (1) 초등 교사들은 자연수 개념에 대하여 어떤 교수학적 내용지식을 가지고 있는가, (2) 초등 교사들이 가지고 있는 자연수 개념에 대한 교수학적 내용지식에는 어떤 요소들이 포함되어 있는가의 두 가지이다. 연구 결과 (1) 초등 교사들은 자연수 개념에 대한 교수학적 내용지식의 세 가지 유형을 적절히 갖추고 있고, (2) 초등 교사들이 가지고 있는 자연수 개념에 대한 교수학적 내용지식에는 사회문화적 요소 보다는 개인 요소가 더 많이 포함되어 있다. 연구의 제안점으로는 (1) 보통의 현장 교사와 수학교육을 전공한 교사간의 비교 연구와 (2)자연수 개념에 대한 교실 활동에 대한 연구가 수행되기를 바란다.

• 대한수학교육학회지:학교수학
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• 제13권4호
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• pp.615-632
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• 2011

본 연구는 벡터 개념에 대해 예비교사와 현직교사가 어떻게 이해하고 있는가를 밝히는 것을 연구의 목적으로 한다. 이에 벡터 개념에 대한 예비교사와 현직교사의 가르치기 위한 수학적 지식(MKT)을 알아보고자 한다. 설문지와 인터뷰 조사 결과 예비교사와 현직교사 모두 벡터 자체가 되는 것보다 벡터의 표현수단을 벡터로 보는 경향이 있었으며 예비교사는 상대적으로 벡터를 벡터공간의 원소로 보는 대학교 수준의 공통내용지식(CCK)으로 응답했던 반면, 현직교사는 가르치는 상황에 필요한 특수 내용지식(SCK)과 내용과 가르치는 것에 대한 지식(KCT)으로 응답하고 있었다. 본 연구는 이를 바탕으로 다음과 같은 벡터 개념에 대한 CCK, SCK, KCT와 수평내용지식 (Horizon content knowledge)을 도출하였다. 또한 논의된 벡터 개념에 대한 MKT를 바탕으로 MKT 하위 영역 간의 관련성에 대해서도 살펴보았다.

• 대한수학교육학회지:학교수학
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• 제15권2호
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• pp.243-262
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• 2013

본 연구는 인지적 측면에서 수학 교사의 교수 양식을 분석하는 것을 목적으로 하고 있다. 이를 위해 먼저 문헌 연구를 통해 수학에서 서로 대비되는 유형으로 분류될 수 있는 인지적 사고 요소들을 탐색하고, 확인적 요인분석을 통해 이 요소들을 시각적 양식과 분석적 양식으로 범주화할 수 있다는 것을 검증하였다. 요인 분석 결과를 바탕으로 두 가지 양식과 두 가지 양식이 대등하게 나타나는 혼합적 양식을 수학 교수 양식으로 설정하고, 교사들의 양식을 분석할 수 있는 분석틀을 개발하였다. 또한, 수학 교수 양식 분석틀을 Flanders의 언어 상호작용 분석법(Amidon & Flanders, 1967)에 적용하여 교사들의 수학 수업을 통해서 교수 양식을 분석할 수 있는 방법을 설계하였다. 그리고 이를 활용해 수학 수업에서 교사들이 사용하는 수학적 언어를 분석한 결과, 실제로 시각적 양식, 분석적 양식, 혼합적 양식이 나타나는 것을 확인하였다.

• 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.

• 호남수학학술지
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• 제30권2호
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• pp.311-321
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• 2008

Mathematical paradoxes may arise when computations give unexpected results. We use three paradoxes to illustrate how they work in the basic probability theory. In the process of resolving the paradoxes, we expect that student-teachers can pedagogically gain valuable experience in regards to sharpening their mathematical knowledge and critical reasoning.