1 |
Henry Briggs, Arithmetica logarithmica, London: William Jones, 1624.
|
2 |
Dr. C. Bruhns, A new manual of logarithms, 1889.
|
3 |
Francois Callet, Tables portatives de logarithms, 1795.
|
4 |
Cho C. S., The Analysis of the Way of Teaching and Learning Logarithms with a Historical Background in High School Mathematics, J. Korea Soc. Math Ed Ser. E: Communications of Mathematical Education 25(3) (2011), 567-575. 조정수, 학교수학 관점에서 살펴본 로그의 역사적 배경과 교수-학습 방법에 대한 고찰. 한국수학교육학회지 시리즈 E '수학교육 논문집' 제25집 제3호, 2011, 567-575.
과학기술학회마을
|
5 |
Choi Y. J., Haebyub Feel Mathematics I, Chunjae Education Inc, 2002, 462-463. 최용준, 해법FEEL수학 수학 I, (주) 천재교육, 2002, 462-463.
|
6 |
Herbert Bristol Dwight, Tables of Integrals and other Mathematical Data, The Macmillan Company, 1957.
|
7 |
Richard Farley, Tables of six-figure logarithms, 1859.
|
8 |
William Gardiner, Tables of Logarithms, 1770.
|
9 |
E. W. Hobson, John Napier and the invention of logarithms, Cambridge, 1614. The University Press, 1914.
|
10 |
Hong S. D., Standard procedure of mathematics I, Seongjisa, 2002, 594-595. 홍성대, 수학의 정석 수학 I. 성지사, 2002, 594-595.
|
11 |
Charles Hutton, Mathematical tables(2ed), 1794.
|
12 |
Kim B. Y., Kim S. Y., The Operational Approach and Structural Approach to the Mathematical Concepts-Focusing on exponential function and logarithmin function, J. Korea Soc. Math Ed Ser. E: Communications of Mathematical Education 21(3) (2007), 499-514. 김부윤, 김소영, 수학적 개념에 대한 조작적 접근과 구조적 접근-지수함수와 로그함수 중심으로-, 한국수학교육학회지 시리즈 E '수학교육 논문집' 21(3) (2007), 499-514.
|
13 |
Kim S. H. et al, Highschool Mathematics I, Gyoakssa Inc, 2010, 196-197. 김수환외 13인, 고등학교 수학 I, (주) 교학사, 2010, 196-197.
|
14 |
Lee D. W., Highschool Mathematics I, Beommunsa, 2010, 245-246. 이동원 외 6인, 수학 I 익힘책, 법문사, 2010, 245-246.
|
15 |
Ministry of Education & Human Resources Development, The principle and manual of a course of study 6th: Mathematics 73, 1992. 교육인적자원부 교육과정 원문 및 해설서 6차 개정 고등학교 수학과 해설서, 73, 1992.
|
16 |
Lee J. Y. et al, Highschool Mathematics I, Chunjae Education Inc, 2010, 276-277. 이준열 외 9인, 수학 I 익힘책, (주) 천재교육, 2010, 276-277.
|
17 |
Michael A. Lexa, Remembering John Napier and His Logarithms, 2013, 1-13. www.see.ed.ac.uk/-mlexa/supportingdoc/mlexa_napier_revised.pdf (검색일 2014.7.25.).
|
18 |
Ministry of Education, Science and Technology, The principle and manual of a course of study: Mathematics(2011-361) 62, 2009. 교육과학기술부, 교육과정 원문 및 해설서 수학과 교육과정 (교육과학기술부 고시 제2011-361호) 62, 2009.
|
19 |
Friedrich Wilhelm von Oppel, Tafeln derer Logarithmorum von die Zahlen, 1752.
|
20 |
Gaspard de Prony, Tables du Cadastre, 1796.
|
21 |
Denis Roegel, A reconstruction of the tables of Briggs' Arithmetica logarithmica(1624). Technical report, LORIA, Nancy, 2010.
|
22 |
Denis Roegel, Introduction to Chinese and Japanese tables of logarithms, with a review of secondary sources. Technical report, LORIA, Nancy, 2010.
|
23 |
Denis Roegel, Napier's ideal construction of the logarithms, http://locomat.loria.fr (검색일 2014.7.20.).
|
24 |
Edward Sang, A new table of seven-place logarithms of all numbers from 20,000 to 200,000, 1871.
|
25 |
Schaums Mathematical Handbook of Formulas and Tables (1968), 202-203, http://www.4electron.com (검색일 2014.8.5.).
|
26 |
Miller and Powell, The Cambridge Elementary Mathematical Tables, Cambridge University Press, 1980.
|
27 |
http://mathworld.wolfram.com (검색일 2014.7.21.).
|
28 |
http://www.girishgovindan.com/uploads/mt/Log_Antilog.pdf (검색일 2014.7.28.).
|
29 |
https://www.ncetm.org.uk/public/files/6203452/logarithms.pdf (검색일 2014.8.5.).
|