{"id":3592,"date":"2006-05-24T02:31:00","date_gmt":"2006-05-23T17:31:00","guid":{"rendered":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/?p=3592"},"modified":"2021-08-12T11:57:23","modified_gmt":"2021-08-12T02:57:23","slug":"%eb%b0%9c%ed%91%9c-%ea%b0%80%eb%8a%a5%ed%95%9c-%ed%86%a0%ed%94%bd-%eb%aa%a8%ec%9d%8c","status":"publish","type":"post","link":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/2006\/05\/24\/%eb%b0%9c%ed%91%9c-%ea%b0%80%eb%8a%a5%ed%95%9c-%ed%86%a0%ed%94%bd-%eb%aa%a8%ec%9d%8c\/","title":{"rendered":"\ubc1c\ud45c \uac00\ub2a5\ud55c \ud1a0\ud53d \ubaa8\uc74c"},"content":{"rendered":"<p> \uae30\ubcf8 \ucc38\uace0\ub3c4\uc11c\ub97c \ud568\uaed8 \uc801\uc2b5\ub2c8\ub2e4. \ub2e4\uc74c \ub0b4\uc6a9 \ubc16\uc5d0\ub3c4 \uac00\ub2a5\ud55c \ubb38\uc81c\uac00 \ub9ce\uc774 \uc788\uc2b5\ub2c8\ub2e4. \ud1a0\ud53d\uc744 \uc815\ud558\uba74 \uc77c\ubc29\uc801\uc73c\ub85c \uc2dc\uc791\ud558\uc9c0 \ub9d0\uace0 \uaf2d \uad6c\uccb4\uc801\uc778 \ub0b4\uc6a9\uc744 \ub098\uc640 \uac80\ud1a0\ud574\uc11c(e-mail\ub85c\ub77c\ub3c4) \ub108\ubb34 \uc5b4\ub824\uc6b4 topic\uc774 \ub418\uc9c0 \uc54a\ub3c4\ub85d \ud569\ub2c8\ub2e4. \uc774 \ub0b4\uc6a9\uc758 \uc0c1\ub2f9\ubd80\ubd84\uc740 \uc544\ub9c8\ub3c4 \uc62c\ub824\ub193\uc740 \ud30c\uc77c\uc778 source book\uc5d0\uc11c\ub3c4 \ucc3e\uc744 \uc218 \uc788\uc744 \uac83\uc785\ub2c8\ub2e4. <\/p>\n<p> \uc870\ubcc4 \ubc1c\ud45c \uc21c\uc11c\ub294 \ub2e4\uc74c\uacfc \uac19\uc2b5\ub2c8\ub2e4: &#8221;'(17c)&#8221;&#8217;12345678, &#8221;'(18c)&#8221;&#8217;87654321, &#8221;'(19-20c)&#8221;&#8217;86275341. \ubc1c\ud45c\ub294 \ub2e4\uc74c\uc8fc \uc218\uc694\uc77c(&#8221;&#8217;5\/10&#8221;&#8217;)\uc5d0 \uc2dc\uc791\ud569\uc2dc\ub2e4. &#8221;&#8217;1\uc77c 3\uac1c\uc870\uc529&#8221;&#8217; \ubc1c\ud45c\ud569\ub2c8\ub2e4. <\/p>\n<table border=\"2\" cellspacing=\"0\" cellpadding=\"6\" rules=\"groups\">\n<colgroup>\n<col class=\"org-left\" \/>\n<col class=\"org-right\" \/>\n<col class=\"org-right\" \/>\n<col class=\"org-right\" \/>\n<\/colgroup>\n<tbody>\n<tr>\n<td class=\"org-left\">\uc870<\/td>\n<td class=\"org-right\">\ubc1c\ud45c1(16~17\uc138\uae30)<\/td>\n<td class=\"org-right\">\ubc1c\ud45c2(18\uc138\uae30)<\/td>\n<td class=\"org-right\">\ubc1c\ud45c3(19~20\uc138\uae30)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">1\uc870<\/td>\n<td class=\"org-right\">5<\/td>\n<td class=\"org-right\">9(1)<\/td>\n<td class=\"org-right\">22(6)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">2\uc870<\/td>\n<td class=\"org-right\">3<\/td>\n<td class=\"org-right\">12(4)<\/td>\n<td class=\"org-right\">17(1)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">3\uc870<\/td>\n<td class=\"org-right\">7<\/td>\n<td class=\"org-right\">16(8)<\/td>\n<td class=\"org-right\">24(8)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">4\uc870<\/td>\n<td class=\"org-right\">2<\/td>\n<td class=\"org-right\">14(6)<\/td>\n<td class=\"org-right\">21(5)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">5\uc870<\/td>\n<td class=\"org-right\">4<\/td>\n<td class=\"org-right\">13(5)<\/td>\n<td class=\"org-right\">19(3)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">6\uc870<\/td>\n<td class=\"org-right\">1<\/td>\n<td class=\"org-right\">15(7)<\/td>\n<td class=\"org-right\">25(9)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">7\uc870<\/td>\n<td class=\"org-right\">8<\/td>\n<td class=\"org-right\">11(3)<\/td>\n<td class=\"org-right\">18(2)<\/td>\n<\/tr>\n<tr>\n<td class=\"org-left\">8\uc870<\/td>\n<td class=\"org-right\">6<\/td>\n<td class=\"org-right\">10(2)<\/td>\n<td class=\"org-right\">20(4)<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<ul class=\"org-ul\">\n<li>&#8221;&#8217;\ucc38\uace0\ub3c4\uc11c&#8221;&#8217;:\n<ul class=\"org-ul\">\n<li>(Art) Artemiadis, History of Mathematics: From a Mathematician&#8217;s Vantage Point, AMS.<\/li>\n<li>(KK) \uae40\uba85\ud658,\uae40\ud64d\uc885: \ud604\ub300\uc218\ud559\uc785\ubb38, \uacbd\ubb38\uc0ac.(\ub3c4\uc11c\uad00)<\/li>\n<li>(AKL) Aleksandrov, Kolmogorov, Lavrent&#8217;ev: Mathematics, its content, methods, and meaning, M&#8220;I&#8220;T Press, 1963.(\uc774\uacfc\ub300 \uc218\ud559\uacfc \ub3c4\uc11c\uc2e4)<\/li>\n<li>(Str) Struik, A Brief History of Mathematics, Dover.(\ud55c\uae00 \ubc88\uc5ed:\uac04\ucd94\ub9b0 \uc218\ud559\uc0ac, \ub3c4\uc11c\uad00)<\/li>\n<li>(CR) Courant and Robbins, What is Mathematics? (\uc218\ud559\uc774\ub780 \ubb34\uc5c7\uc778\uac00?, \ubc15\ud3c9\uc6b0 \uc678 \uc5ed, \uacbd\ubb38\uc0ac \uac04, \ub3c4\uc11c\uad00, \uc218\ud559\uacfc \ub3c4\uc11c\uc2e4)<\/li>\n<li>(Eves) Eves, An introduction to the history of mathematics(4th ed), (\ub3c4\uc11c\uad00, \uc218\ud559\uacfc \ub3c4\uc11c\uc2e4)<\/li>\n<li>(Boyer) \ubcf4\uc774\uc5b4, History of Mathematics, (\u4e0b\uad8c, \ud55c\uae00\ud310 \uc788\uc74c, \uacbd\ubb38\uc0ac, \ub3c4\uc11c\uad00, \uc218\ud559\uacfc \ub3c4\uc11c\uc2e4)<\/li>\n<\/ul>\n<\/li>\n<\/ul>\n<div id=\"outline-container-orga717235\" class=\"outline-2\">\n<h2 id=\"orga717235\">17\uc138\uae30<\/h2>\n<div class=\"outline-text-2\" id=\"text-orga717235\">\n<ol class=\"org-ol\">\n<li>\ub274\ud134\uc758 \uc720\uc728\ubc95(fluxions method): Boyer, Struik<\/li>\n<li>\ubc84\ud074\ub9ac\uc758 \ubbf8\ubd84\uc5d0 \ub300\ud55c \ubc18\ub860<\/li>\n<li>\ud30c\uc2a4\uce7c\uc758 \uc815\ub9ac: \ud0c0\uc6d0\uc5d0 \ub0b4\uc811\ud558\ub294 6\uac01\ud615\uc5d0 \ub300\ud55c \uc815\ub9ac\uc640 \uc774\uc640 \uad00\ub828\ub41c \uc815\ub9ac(Brianchon\uc758 \uc815\ub9ac)<\/li>\n<li>Cavalieri principle<\/li>\n<li>Leibniz\uc758 \ubb34\ud55c\uae09\uc218 \uacc4\uc0b0\uc758 \ubb38\uc81c\uc810: Boyer<\/li>\n<li>Newton\uc758 \uadfc\uc758 \uadfc\uc0ac\ud574\ubc95: Boyer<\/li>\n<li>\ud638\uc774\uac90\uc2a4(Huygens)\uc758 \uc9c4\uc790\uc2dc\uacc4\uc640 \ud3c9\uba74\uace1\uc120\uc758 \uad00\uacc4: Boyer<\/li>\n<li>Des Cartes\uc5d0 \uc758\ud55c 4\ucc28\ubc29\uc815\uc2dd\uc758 \ud574\ubc95: AKL<\/li>\n<\/ol>\n<\/div>\n<\/div>\n<div id=\"outline-container-org2e1bf85\" class=\"outline-2\">\n<h2 id=\"org2e1bf85\">18\uc138\uae30<\/h2>\n<div class=\"outline-text-2\" id=\"text-org2e1bf85\">\n<ol class=\"org-ol\">\n<li>\ub2e4\uba74\uccb4\uc5d0 \ub300\ud55c \uc624\uc77c\ub7ec\uc758 \uacf5\uc2dd: \uad6c\uba74\uacfc \uac19\uc740 \ubaa8\uc591\uc758 \ub2e4\uba74\uccb4\uc5d0 \ub300\ud558\uc5ec $ V-E+F=2 $, \uc77c\ubc18\uc801\uc778 \ub2e4\uba74\uccb4\uc758 \uacbd\uc6b0\ub294?<\/li>\n<li>\uc624\uc77c\ub7ec\uc758 Four square theorem(\uc815\uc218\ub97c \ub2e4\ub978 \ub124 \uc815\uc218\uc758 &#8221;&#8217;\uc81c\uacf1\uc758&#8221;&#8217; \ud569\uc73c\ub85c \ud45c\uc2dc\ud558\ub294 \ubb38\uc81c): Art<\/li>\n<li>\uc624\uc77c\ub7ec\uc758 \ubcc0\ubd84\ubc95(calculus of variation): AKL 2\uad8c 8\uc7a5<\/li>\n<li>$ e^{ix}=cos x +i sin x $: \uc624\uc77c\ub7ec \uacf5\uc2dd: Boyer<\/li>\n<li>\uc624\uc77c\ub7ec\uc758 \uc815\ub9ac: a\uc640 p\uac00 \uc11c\ub85c \uc18c \uc77c\ub54c, p\ub294 $ a^{p-1}-1 $ \uc758 \uc57d\uc218\uc774\ub2e4. : Boyer<\/li>\n<li>\uc0bc\uac01\ud568\uc218\uc640 \uc30d\uace1\uc120\ud568\uc218<\/li>\n<li>Carnot\uc758 \uc0ac\uba74\uccb4\uc5d0 \ub300\ud55c \ucf54\uc0ac\uc778 \ubc95\uce59: $ a^2=b^2+c^2+c^2-2cdcos B-2bdcos C &#8211; 2bccos D $<\/li>\n<li>Lagrange\uc5d0 \uc758\ud55c 3\ucc28(4\ucc28)\ubc29\uc815\uc2dd\uc758 \ud574\ubc95<\/li>\n<\/ol>\n<\/div>\n<\/div>\n<div id=\"outline-container-org1c295d9\" class=\"outline-2\">\n<h2 id=\"org1c295d9\">19~20\uc138\uae30<\/h2>\n<div class=\"outline-text-2\" id=\"text-org1c295d9\">\n<ol class=\"org-ol\">\n<li>\uac00\uc6b0\uc2a4(Gauss), \ubcfc\ub9ac\uc544\uc774(Bolyai), \ub85c\ubc14\uccb4\ud504\uc2a4\ud0a4(Lobachevski)\uc758 \ube44\uc720\ud074\ub9ac\ub4dc\uae30\ud558\ud559<\/li>\n<li>\uac08\ub8e8\uc544(Galois)\uc758 \uad70\uc758 \uc774\ub860<\/li>\n<li>\ubc0d\ucf54\ube0c\uc2a4\ud0a4(Minkowski) \uacf5\uac04\uacfc \ud2b9\uc218\uc0c1\ub300\uc131\uc774\ub860<\/li>\n<li>\ub9ac(Lie)\uc758 \uad70\ub860<\/li>\n<li>\ud074\ub77c\uc778(Klein)\uc758 \uae30\ud558\ud559\uacfc Erlanger programm<\/li>\n<li>Poincare\uc640 \uc704\uc0c1\uae30\ud558\ud559<\/li>\n<li>Bourbaki\uc640 \uad6c\uc870\uc8fc\uc758<\/li>\n<li>Goedel\uc758 incompleteness theorem<\/li>\n<li>Boule\uc758 \ub300\uc218\uc640 \ub17c\ub9ac\ud559<\/li>\n<li>Fourier \ubcc0\ud658\uacfc \ud3b8\ubbf8\ubd84\ubc29\uc815\uc2dd<\/li>\n<\/ol>\n<\/div>\n<\/div>\n","protected":false},"excerpt":{"rendered":"<p>\uae30\ubcf8 \ucc38\uace0\ub3c4\uc11c\ub97c \ud568\uaed8 \uc801\uc2b5\ub2c8\ub2e4. \ub2e4\uc74c \ub0b4\uc6a9 \ubc16\uc5d0\ub3c4 \uac00\ub2a5\ud55c \ubb38\uc81c\uac00 \ub9ce\uc774 \uc788\uc2b5\ub2c8\ub2e4. \ud1a0\ud53d\uc744 \uc815\ud558\uba74 \uc77c\ubc29\uc801\uc73c\ub85c \uc2dc\uc791\ud558\uc9c0 \ub9d0\uace0 \uaf2d \uad6c\uccb4\uc801\uc778 \ub0b4\uc6a9\uc744 \ub098\uc640 \uac80\ud1a0\ud574\uc11c(e-mail\ub85c\ub77c\ub3c4) \ub108\ubb34 \uc5b4\ub824\uc6b4 topic\uc774 \ub418\uc9c0 \uc54a\ub3c4\ub85d \ud569\ub2c8\ub2e4. \uc774 \ub0b4\uc6a9\uc758 \uc0c1\ub2f9\ubd80\ubd84\uc740 \uc544\ub9c8\ub3c4 \uc62c\ub824\ub193\uc740 \ud30c\uc77c\uc778 source book\uc5d0\uc11c\ub3c4 \ucc3e\uc744 \uc218 \uc788\uc744 \uac83\uc785\ub2c8\ub2e4. \uc870\ubcc4 \ubc1c\ud45c \uc21c\uc11c\ub294 \ub2e4\uc74c\uacfc \uac19\uc2b5\ub2c8\ub2e4: &#8221;'(17c)&#8221;&#8217;12345678, &#8221;'(18c)&#8221;&#8217;87654321, &#8221;'(19-20c)&#8221;&#8217;86275341. \ubc1c\ud45c\ub294 \ub2e4\uc74c\uc8fc \uc218\uc694\uc77c(&#8221;&#8217;5\/10&#8221;&#8217;)\uc5d0 \uc2dc\uc791\ud569\uc2dc\ub2e4. &#8221;&#8217;1\uc77c 3\uac1c\uc870\uc529&#8221;&#8217; \ubc1c\ud45c\ud569\ub2c8\ub2e4. \uc870 &#8230; <a title=\"\ubc1c\ud45c \uac00\ub2a5\ud55c \ud1a0\ud53d \ubaa8\uc74c\" class=\"read-more\" href=\"https:\/\/mathematicians.korea.ac.kr\/ywkim\/2006\/05\/24\/%eb%b0%9c%ed%91%9c-%ea%b0%80%eb%8a%a5%ed%95%9c-%ed%86%a0%ed%94%bd-%eb%aa%a8%ec%9d%8c\/\" aria-label=\"\ubc1c\ud45c \uac00\ub2a5\ud55c \ud1a0\ud53d \ubaa8\uc74c\uc5d0 \ub300\ud574 \ub354 \uc790\uc138\ud788 \uc54c\uc544\ubcf4\uc138\uc694\">\ub354 \uc77d\uae30<\/a><\/p>\n","protected":false},"author":7,"featured_media":0,"comment_status":"closed","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"ngg_post_thumbnail":0,"footnotes":""},"categories":[1],"tags":[],"class_list":["post-3592","post","type-post","status-publish","format-standard","hentry","category-uncategorized"],"distributor_meta":false,"distributor_terms":false,"distributor_media":false,"distributor_original_site_name":"\uae40\uc601\uc6b1","distributor_original_site_url":"https:\/\/mathematicians.korea.ac.kr\/ywkim","push-errors":false,"_links":{"self":[{"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/posts\/3592","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/users\/7"}],"replies":[{"embeddable":true,"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/comments?post=3592"}],"version-history":[{"count":1,"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/posts\/3592\/revisions"}],"predecessor-version":[{"id":3593,"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/posts\/3592\/revisions\/3593"}],"wp:attachment":[{"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/media?parent=3592"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/categories?post=3592"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/mathematicians.korea.ac.kr\/ywkim\/wp-json\/wp\/v2\/tags?post=3592"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}