• 한국수학사학회지
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• 제19권2호
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• pp.59-76
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• 2006

본 논문은 탈근대화의 영향으로 등장한 카오스 이론의 시각으로, 수학과 미술의 관련성을 연구하였다 중세 말에서 르네상스로 접어드는 13-14세기, 르네상스의 개화기인 15, 16세기 그리고 16세기말에서 바로크 시대로 접어드는 세 시기에 시대정신이 역동적 체계에서 어떻게 구축되는지를 조망하였다. 시간의 흐름과 더불어 역동적으로 변모해가는 문화와 역사는복잡계의 전형이기 때문이다.

• 한국수학사학회지
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• 제16권4호
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• pp.59-68
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• 2003

Mathematics and arts are reflection of the spirit of the ages, since they have human inner parallel vision. Therefore, in ancient Greek ages, the artists' cannon was actually geometric ratio, golden section. However, in middle ages, the Euclidean Geometry was disappeared according to the Monastic Mathematics, then the art was divided two categories, one was holy Christian arts and the other was secular arts. In this research, we take notice of Renaissance Painting and Perspective Geometry, since Perspective Geometry was influenced by Renaissance notorious painter, Massccio, Leonardo and Raphael, etc. They drew and painted works by mathematical principles, at last, reformed the paradigm of arts. If we can say Euclidean Geometry is tactile geometry, the Perspective Geometry can be called by visual geometry.

• 한국수학사학회지
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• 제18권2호
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• pp.31-42
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• 2005

르네상스 시대가 도래하자 고대 그리스와 로마 문화의 부흥으로 유클리드 기하학이 다시 연구되고 실험과 관찰의 정신이 대두되었다. 이는 곧 근대의 정신인 것이다. 본 논문에서는 17, 18세기에 지식인이 추구했던 가치가 운동, 속도, 빛이었으므로 수학에서 미분적분차이 발명되고, 미술에서는 빛의 화가, 순간의 화가를 탄생시킨 근대의 시대정신과 사회적인 배경을 주목한다.

• 한국수학사학회지
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• 제22권2호
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• pp.53-68
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• 2009

고대 그리스에서 발현된 수학의 무한 개념은 헤브라이인의 유대교 전통인 카발라의 영향을 받아 중세 기독교 교부 철학자들에 의해 보다 성숙되어져 갔으며, 그 후 기독교의 무한사상이 르네상스 시대에는 화가들에 의해 원근법으로 구체화되었다. 본 논문에서는 그리스 시대부터 발전된 무한 개념의 경로를 살펴보고, 근대와 19세기 이후 무한수학이 발달될 때 당시 미술에서는 무한 개념이 어떻게 표현되었는지 그 시대정신을 고찰한다.

• 한국수학사학회지
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• 제2권1호
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• pp.9-27
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• 1985

Islam toot a great interest in the utility sciences such as mathematics and astronomy as it needed them for the religious reasons. It needeed geometry to determine the direction toward Mecca, its holiest place: arithmetic and algebra to settle the dates of the festivals and to calculate the accounts lot the inheritance; astronomy to settle the dates of Ramadan and other festivals. Islam expanded and developed mathematics and sciences which it needed at first for the religious reasons to the benefit of all mankind. This thesis focuses upon the golden age of Islamic culture between 7th to 13th century, the age in which Islam came to possess the spirit of discovery and learning that opened the Islamic Renaissance and provided, in turn, Europeans with the setting for the Renaissance in 14th century. While Europe was still in the midst of the dark age of the feudal society based upon the agricultural economy and its mathematics was barey alive with the efforts of a few scholars in churches, the. Arabs played the important role of bridge between civilizations of the ancient and modern times. In the history of mathematics, the Arabian mathematics formed the orthodox, not collateral, school uniting into one the Indo-Arab and the Greco-Arab mathematics. The Islam scholars made a great contribution toward the development of civilization with their advanced the development of civilization with their advanced knowledge of algebra, arithmetic and trigonometry. the Islam mathematicians demonstrated the value of numerals by using arithmetic in the every day life. They replaced the cumbersome Roman numerals with the convenient Arabic numerals. They used Algebraic methods to solve the geometric problems and vice versa. They proved the correlation between these two branches of mathematics and established the foundation of analytic geometry. This thesis examines the historical background against which Islam united and developed the Indian and Greek mathematics; the reason why the Arabic numerals replaced the Roman numerals in the whole world: and the influence of the Arabic mathematics upon the development of the modern mathematics.

• 한국수학사학회지
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• 제31권4호
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• pp.197-207
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• 2018

The Abacus schools were created by the needs of merchants who had accumulated wealth through trades in Italy during the Renaissance. Teachers in the Abacus school taught practical mathematics mainly used in commerce and trade, and the schools had courses in the fields of management and accounting today. This Abacus school also served as an educational institution, but also provided the opportunity to develop into today's mathematics. In this paper, we investigate about the background and role of the Abacus school.

• 한국수학사학회지
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• 제12권2호
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• pp.119-133
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• 1999

In this paper, we consider the abstraction of mathematics and arts. In particular, we compare cave arts of Palaeolith stone ages with those of Neolith stone ages and analyze paintings of a child. After the Middle ages, in Renaissance period the new technique, perspective was introduced by painters for the sake of realistic description. We consider the social background of perspective. In 19th century, European society became familiar with the abstraction of mathematics and arts. And we also study the mathematical concepts and the abstract paintings on the basis of the social backgrounds.

• 대한수학교육학회지:수학교육학연구
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• 제27권3호
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• pp.581-598
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• 2017

독일 르네상스의 대표적인 예술가인 뒤러는 정다각형 작도법을 정리하였다. 이 논문에서는 뒤러의 정다각형 작도를 둘러싼 배경과 실제 내용을 살펴보았다. 이어 교육적인 활용 방안을 탐색하기 위해, 첫째, 유클리드 원론의 작도와 뒤러 작도의 차이를 도출하고, 둘째, 각 작도를 오늘날의 기호로 표현하고, 셋째, 기본 작도를 추출하였다. 마지막으로, 정다각형 작도로 만들 수 있는 형태 문양들을 살펴보았다. 이는 초등학교 고학년에서 융합교육, 영재교육, 활동주의교육에 관한 자료 개발에 기초가 될 수 있을 것이다.

• 한국실내디자인학회논문집
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• 제15권4호
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• pp.12-20
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• 2006

The purpose of this study is to analyze the influence of theory of Cusanus on the Leonardo's theory of the centralized plan. In Renaissance, Neo-Platonism was so popular that is wat influenced nearly every architecture, literature, painting, sculpture and so on. Theory of Neo-Platonism was so various that every Neo-Platonist had his own theory. Among them, Cusanus focused his theory on rationality, mathematics rather than the medieval symbolism and studied the relationship between the God and men. In the same age, Leonardo da Vinci studied the planning system influenced on many architects works, including Bramante s. His planning system came not from symbolic appearance but from his scientific and rational researches as the theory of Cusanus. This study is to compare Cusanus Neo-Platonism theory and artistie view shown in Leonardo da Vinci's memorandum and drawing and to ascertain the influential relationship, abstracting the common things, and to substitute the characteristics that are seen in his centralized space sketch, abstracting the key words. The study on Cusanus will take advantage of the issued books and will requote Cusanus's copied ones.

• 한국수학사학회지
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• 제2권1호
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• pp.91-105
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• 1985

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 is 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 any one with the mathematic talent onto 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 per se 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 of 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 King 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 the number of such technocrats as mathematicians inevitably became quite ambitious and proud. They tried to explore deeply into mathematics per se 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 traditonal Korean mathematics influenced by Chinese disappeared from the history of Korean mathematics, as the school system was changed into the Western style and the Western matehmatics 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 sifted from Chinese into European.od" is the period in which Korean mathematics sifted from Chinese into European.pean.