• 한국수학교육학회지시리즈A:수학교육
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• 제24권2호
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• pp.48-73
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• 1986

Though the tradition of Korean mathematics since the ancient time up to the 'Enlightenment Period' in the late 19th century had been under the influence of the Chinese mathematics, it strove to develop its own independent of Chinese. However, the fact that it couldn't succeed to form the independent Korean mathematics in spite of many chances under the reign of Kings Sejong, Youngjo, and Joungjo was mainly due to the use of Chinese characters by Koreans. Han-gul (Korean characters) invented by King Sejong had not been used widely as it was called and despised Un-mun and Koreans still used Chinese characters as the only 'true letters' (Jin-suh). The correlation between characters and culture was such that, if Koreans used Han-gul as their official letters, we may have different picture of Korean mathematics. It is quite interesting to note that the mathematics in the 'Enlightenment Period' changed rather smoothly into the Western mathematics at the time when Han-gul was used officially with Chinese characters. In Koryo, the mathematics existed only as a part of the Confucian refinement, not as the object of sincere study. The mathematics in Koryo inherited that of the Unified Shilla without any remarkable development of its own, and the mathematicians were the Inner Officials isolated from the outside world who maintained their positions as specialists amid the turbulence of political changes. They formed a kind of Guild, their posts becoming patrimony. The mathematics in Koryo significant in that they paved the way for that of Chosun through a few books of mathematics such as 'Sanhak-Kyemong', 'Yanghwi-Sanpup' and 'Sangmyung-Sanpup'. King Sejong was quite phenomenal in his policy of promotion of mathematics. King himself was deeply interested in the study, createing an atmosphere in which all the high ranking officials and scholars highly valued mathematics. The sudden development of mathematic culture was mainly due to the personality and capacity of king who took anyone with the mathematic talent into government service regardless of his birth and against the strong opposition of the conservative officials. However, King's view of mathematics never resulted in the true development of mathematics perse and he used it only as an official technique in the tradition way. Korean mathematics in King Sejong's reign was based upon both the natural philosophy in China and the unique geo-political reality of Korean peninsula. The reason why the mathematic culture failed to develop continually against those social background was that the mathematicians were not allowed to play the vital role in that culture, they being only the instrument for the personality or politics of the king. While the learned scholar class sometimes played the important role for the development of the mathematic culture, they often as not became an adamant barrier to it. As the society in Chosun needed the function of mathematics acutely, the mathematicians formed the settled class called Jung-in (Middle-Man). Jung-in was a unique class in Chosun and we can't find its equivalent in China or Japan. These Jung-in mathematician officials lacked tendency to publish their study, since their society was strictly exclusive and their knowledge was very limited. Though they were relatively low class, these mathematicians played very important role in Chosun society. In 'Sil-Hak (the Practical Learning) period' which began in the late 16th century, especially in the reigns of Kings Youngjo and Jungjo, which was called the Renaissance of Chosun, the ambitious policy for the development of science and technology called for. the rapid increase of he number of such technocrats as mathematics, astronomy and medicine. Amid these social changes, the Jung-in mathematicians inevitably became quite ambitious and proud. They tried to explore deeply into mathematics perse beyond the narrow limit of knowledge required for their office. Thus, in this period the mathematics developed rapidly, undergoing very important changes. The characteristic features of the mathematics in this period were: Jung-in mathematicians' active study an publication, the mathematic studies by the renowned scholars of Sil-Hak, joint works by these two classes, their approach to the Western mathematics and their effort to develop Korean mathematics. Toward the 'Enlightenment Period' in the late 19th century, the Western mathematics experienced great difficulty to take its roots in the Peninsula which had been under the strong influence of Confucian ideology and traditional Korean mathematic system. However, with King Kojong's ordinance in 1895, the traditional Korean mathematics influenced by Chinese disappeared from the history of Korean mathematics, as the school system was hanged into the Western style and the Western mathematics was adopted as the only mathematics to be taught at the Schools of various levels. Thus the 'Enlightenment Period' is the period in which Korean mathematics shifted from Chinese into European.

• 문화기술의 융합
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• 제6권1호
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• pp.255-261
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• 2020

융복합적 인재란 자신의 전문 분야를 넘어서 다른 분야의 전문가들과 효율적인 협력 작업을 수행할 수 있는 인재를 의미하거나 아니면 스스로 다양한 분야의 지식을 융합해 낼 수 있는 인재를 의미한다. 이 논문에서는 역사적 인물들 중 다양한 분야의 지식을 융합해 내어 한 분야로의 지식만으로는 이룰 수 없는 성과를 도출해 냈던 사례로 갈릴레오를 살필 것이다. 논문에서는 르네상스 분위기 속에서 화가들과 교류했던 갈릴레오가 망원경으로 하늘을 관측한 결과를 그림으로 표현했다는 점과 그가 과거의 우주론을 비판하는 결정적인 논리를 만들어 내는 과정에서 그 그림들을 적극적으로 활용했음을 보일 것이다. 이러한 갈릴레오의 사례는 융합적 인재 양성에 있어서 목표로 삼아야 할 지향점을 제시해 준다는 점에 있어서 의미가 크다.

• 한국실내디자인학회논문집
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• 제19권2호
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• pp.90-98
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• 2010

The concepts of laws like regularity or persistence or recurrence those are discovered in nature, became the essential elements in speculative philosophy, study and scientific technology. Western civilization was spread out by these natural laws. As this background, this study is aimed to research the theories of natural laws and the development of geometry as the descriptive tools and the development aspects of the concepts of space. According to Whitehead's four theories on the natural laws, the result of this study that aimed like that as follows. First, the theories on the immanence and imposition of the natural laws were the predominant ideas from ancient Greek to before the scientific revolution, the theory on the simple description like the positivism made the Newton-Cartesian mechanism and an absolutist world view. The theory on the conventional interpretation made the organicism and relativism world view according to non-Euclidean geometry. Second, the geometrical composition of ancient Greek architecture was an aesthetics that represented the immanence of natural laws. Third, in the basic symbol of medieval times, the numeral symbol was the frame of thought and was an important principal of architecture. Fourth, during the Renaissance, architecture was regarded as mathematics that made the order of universe to visible things and the geometry was regarded as an important architectural principal. Fifth, according to the non-Euclidean geometry, it was possible to present the natural phenomena and the universe. Sixth, topology made to lapse the division of traditional floor, wall and ceiling in contemporary architecture and made to build the continuous space. Seventy, the new nature was explained by fractal concepts not by Euclidean shapes, fractal presented that the essence of nature had not mechanical and linear characteristic but organic and non-linear characteristic.

• 논리연구
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• 제14권2호
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• pp.1-38
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• 2011

베르나이스는 국내외를 막론하고 그의 업적에 상응하는 집중적 관심의 대상이 되지 못했다. 극히 최근에 이르러 베르나이스의 저작의 재출간을 비롯하여 그의 철학에 대한 재조명이 시작되고 있다. 본 논문은 이러한 흐름에 발맞춰 공리적 방법을 초점으로 베르나이스의 사상을 힐버트의 사상으로부터 섬세하게 가려내는 시도를 시작해보고자 한다. 우선 힐버트가 자신의 공리적 방법에 대해 대단한 자부심을 지녔었다는 점을 전거를 제시해가며 부각시킨다. 그리고 힐버트의 공리적 방법이 공리적 방법의 역사 전체 안에서 어떤 위치를 지니는지에 관한 베르나이스의 견해를 정리해볼 것이다. 또한 중전기 베르나이스와 후기 베르나이스가 이 문제에 관하여 상당히 다른 입장을 취하는 것으로 보인다는 점에 착안하여, 중전기 베르나이스의 견해와 후기 베르나이스의 견해를 대조해 보일 것이다. 그리하여 공리적 방법에 관하여 가장 뚜렷하게 부각되는 힐버트와 베르나이스의 견해의 차이가 공리적 방법의 제일성의 문제에서 찾아진다는 점을 보여줄 것이다. 같은 맥락에서 1950년대 중반 이후 과학철학에서의 카르납의 프로젝트가 공리적 방법의 제일성에 대한 힐버트의 신념을 계승하려는 것으로 보고, 후기 베르나이스의 카르납 비판을 논의할 것이다.

• 해부∙생물인류학
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• 제29권2호
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• pp.35-46
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• 2016

레오나르도 다빈치는 르네상스 시대의 천재 예술가이다. 그는 예술가와 과학자, 발명가로서 뛰어난 업적을 남겼고, 식물학과 수학, 지질학, 천문학, 기하학, 광학 등의 다양한 분야에서 최고의 반열에 올랐을 뿐 아니라 오늘날의 과학에까지 크게 기여하고 있다. 또한 레오나르도는 예술가와 과학자, 발명가, 철학자로도 잘 알려져 있으며, 사람과 동물들을 직접 해부하여 관찰한 후 많은 해부 그림들을 남긴 위대한 해부학자였다. 레오나르도가 해부학에 관심을 가졌던 이유는 - 화가는 해부학에 무지해서는 안 된다 - 라는 예술가의 관점에서 사람의 구조와 기능을 알기 위함이었다. 그는 사람 몸의 구조와 기능에 더욱 관심을 갖게 되었고, 시체를 구하기 어려운 상황에도 불구하고 많은 시체를 직접 해부하여 관찰하였다. 이러한 그의 해부학적 탐구와 심취로 말미암아 그는 동시대의 사람들보다 100년 이상 앞선 위대한 해부학 업적을 남겼다. 레오나르도가 남긴 뼈대와 근육, 혈관, 신경, 비뇨생식계통에 관한 1,800여 개의 해부 그림들은 높은 예술성과 함께 과학적으로도 매우 가치가 높은 걸작들이다. 이 연구의 목적은 레오나르도의 해부학 분야의 업적과 사고를 살펴보고, 해부학 분야의 선구자인 레오나르도의 위대한 업적을 오늘날 사람들에게 널리 알리고자 하는 것이다.