数学月間活動から見た教育数学
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1 () (Katsuhiko Tani) MAM $-$ 2. 3 MMP $MMP$ Plus 37 ( ) ( ) $\sim$ [1] 5000 $x$ 19
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5 52 $($ $3)============================_{ }--$ 2005 (2004) $COE$ ( ) [7], [8] SSH 2002 ( ) 2005 ( ) MAM [1] Mathematics Awareness Month$(=MAM)[9]$ ( 2) 1980 TQC(4) MAM ( 1). $=========================_{---}$ (4) TQC/TQM( ) TQM
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10 $=$ ( ) [13]. BSE( ), (5). [ (1999)] ( ) (1972) [13]. ( ), ( $GE$ Mark $I$ ), $MOX$ (2010,9) ( ) (1973 ) [14] ( $\sim$ $)$ 3[15]. : [16]
11 58 / DNA. $)$ ( ) [17], ( ) $===-$ (5) 1990 BSE BSE 1996 (2002) [13]. $==============================================-$
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15 62 ( 1) MAW (1998 )/MAMAM (1999 ) ( ) MAM: Mathematics Awareness Week MAM: Mathematics Awareness Month $(4fl)$ AMS: American Mathematical Society MAA: Mathematical Association of America SIAM: Society for Industrial and Applied Mathematics $ASA($ $*)$ ;American Statistical Association JPMB: Joint Policy $Bo$ ard for Mathematics () 2006 $ASA$ $*$
16 $\ovalbox{\tt\small REJECT}$ $\Re_{\Xi^{\backslash \underline{g}}\tau_{ J}^{F}}^{1}$ $^{}\backslash \backslash \Leftrightarrow tf\phi T\ovalbox{\tt\small REJECT}_{\acute{t}_{\vee}r_{t^{\dot{z}_{\lrcorner}}}^{1}aer_{arrow}}^{\ovalbox{\tt\small REJECT}>\theta m },$ $\check{)}_{\hat{l3}}f_{\llcorner}^{\vee}$ $\theta_{1}\backslash ^{}\backslash \ovalbox{\tt\small REJECT}\ovalbox{\tt\small REJECT}\Lambda\ovalbox{\tt\small REJECT}$ $\lambda\sigma\not\subset\rangle$ $Et_{-}\epsilon\ovalbox{\tt\small REJECT}\ovalbox{\tt\small REJECT} X\ovalbox{\tt\small REJECT}_{S}^{f}f_{arrow}\wedge _{}\underline{\sigma}kaet^{\frac{\in\tilde{p}}{\llcorner}\not\in:\backslash }\subset l^{}\check{.}\delta\re_{\backslash }?\S$ $\ovalbox{\tt\small REJECT},$ $\grave{\lambda}$ $g\ \not\equiv\overline{-\tilde{\sigma}\xi\cdot}t\prime Y-\zeta$ $\overline{-}$ $Tf\overline{\overline{fl}}$ $m^{\check{\llcorner}}\ovalbox{\tt\small REJECT}\not\in^{)}\mathfrak{F}^{\#g_{\backslash }}\not\subset$ $\iota g_{\backslash A\sigma F\mathfrak{B}}^{b\Phi\Re}a_{\vee}$ $\approx$ $\ovalbox{\tt\small REJECT}$ REJECT}}}.$ $\eta J\backslash$ $>\ovalbox{\tt\small REJECT}_{\Re}^{\backslash }$ $*\backslash \vee^{/}\leftrightarrow \backslash b^{\wedge}5\ovalbox{\tt\small REJECT}\not\in_{\wedge}:\supset\vec{x}$ $\mathfrak{h}\leftrightarrow\dot{\prime}\pi^{j}\supset g\mathscr{x}_{\ovalbox{\tt\small REJECT} g^{arrow}}^{r}3^{\backslash }$ $t,\leftrightarrow\backslash$ $\overline{\fcircle g\vee}$ $r-r_{\eta^{-}}^{1}*(\swarrow\ovalbox{\tt\small REJECT} ^{}\backslash$ $\Re g_{1i}^{\overline{r}}\rightarrow t\re$ $\tilde{\re}\neg$ $\succ\lambda\ddagger\gamma g\ovalbox{\tt\small REJECT}_{1\ovalbox{\tt\small REJECT}}^{-\dot{\pi}}{\}\grave{l}^{}\mathfrak{B}\}^{*_{}\ovalbox{\tt\small REJECT}\ovalbox{\tt\small REJECT}}.f^{-}$ $\mapsto\backslash$ REJECT}$ $\mathfrak{m}\tau$ $A\ovalbox{\tt\small REJECT}$ $\Leftrightarrow n_{\triangleleft}7\iota_{-\neg}^{\s\cdot \tau \Leftrightarrow_{\backslash }}_{}p^{\neg}\rightarrow$ $\mathfrak{b},\mathfrak{b} 1^{\backslash \phi_{e}+}\approx$ $\grave{2}_{\circ}$ $*$ g $\Re \mathfrak{b}arrow$ $\sqrt{}\epsilon\grave{}\grave{}$ $\}\grave{}$ $arrow$ $\grave{}$ $\tau\sim$ $f_{c}\ovalbox{\tt\small REJECT}$ REJECT}\ovalbox{\tt\small REJECT}$ $\ovalbox{\tt\small REJECT} \xi$ $\Vert$ $\Leftrightarrow.\zeta\Xi i _{}\veeff_{\backslash }\ovalbox{\tt\small REJECT}_{\vee}^{1_{R}^{R}}l_{\dot{{\}}}^{-}\ovalbox{\tt\small REJECT}^{\sim}$ $\ovalbox{\tt\small REJECT} A$ $A\ovalbox{\tt\small REJECT}\not\in\ovalbox{\tt\small REJECT}\ovalbox{\tt\small REJECT}*b$ $\ovalbox{\tt\small REJECT}\ovalbox{\tt\small REJECT}$ $\approx\xi$ $\ovalbox{\tt\small REJECT}$ $\aleph\leq \mathfrak{f}$ $\#\ovalbox{\tt\small REJECT} _{}\epsilon^{\backslash }-r_{\overline{\sim}\ovalbox{\tt\small REJECT}^{b}} /\backslash \ovalbox{\tt\small REJECT}$ $\ovalbox{\tt\small REJECT}$ $\ovalbox{\tt\small REJECT}$ $\ovalbox{\tt\small REJECT}_{-}^{\S}$ 63 ( 2) ( 3) $\sqrt{-\urcorner}$ dt $199$ $k^{\backslash }$ $\overline{\overline{\underline{b}}}\overline{\equiv}-$5000 $g\ovalbox{\tt\small $(Nati\circ nalnethemati_{cs}affiren\ovalbox{\tt\small REJECT} ss$ $\backslash$$eek)$ \S ae $g$ $n$ } $g$ {/ l $3C$ }$ $\forall\not\in!\theta $F\iota\emptyset 1b^{\backslash }w\hslash^{3}\mathfrak{b}\not\in PA$ ^{}\underline{a}$ $t_{\sqrt\backslash $_{}1-arrow^{\backslash }$ $1\prime e_{\ovalbox{\tt\small REJECT}_{\backslash }}$ :f$\theta$ REJECT} \mathfrak{f}$ $24$ g? $\Re\underline{g}$ $\ovalbox{\tt\small $\not\in\epsilon\epsilon ae\epsilon$ $\Xi\vee\emptyset K g\cdot$ aem\ovalbox{\tt\small REJECT}\not\in$ k }$ $\epsilon_{\tilde{w}}\re $\yen$ $l_{, [- $\Phi$ $\zeta\grave{}$ $*i^{-}\cdot\leftrightarrow-\subset*atf\ovalbox{\tt\small REJECT}$ $,$ $fh$ -$arrow$ $\mp 7\iota\bigoplus_{arrow.\underline{F}}\prime\hat{\tilde{g^{r}}}\ovalbox{\tt\small REJECT}\not\in^{)}\mathfrak{B}^{7}\underline{\sim^{E}\neq}$ $4$ $\otimes a\{;\backslash $ $14$ $4$ $20$ $,$ $bf^{\psi\hslash^{3\neq}}\ovalbox{\tt\small REJECT}_{}^{ae}\neg@ffi*$ $\Re$ $\ovalbox{\tt\small REJECT}$ $L$ 4 $g\re$ $g$ BSR $\prime\wedge^{\acute{\sim}}\overline{\mathfrak{h}}\tau^{\dot{g}_{:\ovalbox{\tt\small. $gg$ $\ ^{\sim}\ovalbox{\tt\small REJECT}\pi aa$ $lif_{c}$ $8^{\backslash }\neq^{r_{\vee}}$ $\ovalbox{\tt\small REJECT}_{\backslash }gp_{1}-.$ aet2}}\#\dot{a}\ovalbox{\tt\small REJECT}\backslashae$ $\hat{a}p$ $*\not\leqq^{o_{lg\backslash $a\not\in l\neqarrow b*$ $-\grave{x}gg$ $i\xi$ $0*\iota\backslash \ovalbox{\tt\small REJECT}$ $\supset$ $gb$ $g5>g ^{}\backslash \ovalbox{\tt\small REJECT}$ $g$ $\#_{\backslash }^{s}*^{\sim}\not\in\wedge\not\cong$ $g_{p_{\nabla}}\backslash \geqq\not\in\not\equiv*$ $J;t\iota$ $g\lambda g\emptyset\neg$ $4$ $=$ 17 $\supset$ $\ovalbox{\tt\small REJECT} k^{\backslash c}$ $\grave{l}\backslash$ ae ae $\ovalbox{\tt\small REJECT} P_{B^{f}}i$ $E$ $\Re$ $\prime/\ovalbox{\tt\small REJECT} \not\cong\dot{4} _{i}$ $\ovalbox{\tt\small ; g (Ronald Reagm) $18B$, $\Re$ $ag^{\check{p}}\epsilon\epsilon_{^{}\backslash }0\underline{\mathcal{X}}\ovalbox{\tt\small REJECT}_{e}^{ae}\ovalbox{\tt\small REJECT}$ $\not\in$ $\iota$ $_{}s\iota\supset\ovalbox{\tt\small REJECT}\backslash$ 4 $\Lambda*$ $s\theta^{\backslash }\mathbb{h}\not\in$ $7\circ\Leftrightarrow\check{\ovalbox{\tt\small REJECT}}a$
17 64 [1] No.6, 2006, 8-14 $\nearrow\backslash$ [2] $E$. ( ), 2004 [3] No.15, 2011, [4] ( ), 1987 [5] ( ), 1966 [6] ( ), 1985 [7] 2006 [8] 2010 [9] Maths Awareness Month, http: $// mathaware. $org/$ index. $html$ [10] Millennium Maths Project, http: $/fwww$. mmp. maths. org/index. html [11] http: $//plus.$ maths. org/issue38/editorial/index. html $[12]$ http: $//plus$. maths. org/issue37/editorial/index. html $\ovalbox{\tt\small REJECT}$ [13] NTT 2007 [14] http: $//cnic$.jp [15] 1995,5 28 [16] 1995 [17] (2011,2,7-10) [18] S. Y. Del Valle and J. P. Smith, Understanding Complex Systems: Population Interactions Resulting in Disease Transmission [19] B. K. Edwards and M. Ewers, Understanding Complex Systems: Economic Impacts from Catastrophic Events [20] P. D. H. Hines, $O$ B. Hara, E. Cotilla-Sanchez, and C. M. Danforth, Cascading Failures: Extreme Properties of Large Blackouts in the Electric Grid $[21]$ http: $//www$. dwd. de/ [22] R. Graham, D. Knuth, O. Patashnik, Concrete Mathematics: A Foundation for Computer $Science $, Addison-Wesley, 1994
: ( ) (Takeo Suzuki) Kakegawa City Education Center Sizuoka Prif ] [ 18 (1943 ) $A $ ( : ),, 1 18, , 3 $A$,, $C$
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Title 九州大学所蔵 : 中国暦算書について ( 数学史の研究 ) Author(s) 鈴木, 武雄 Citation 数理解析研究所講究録 (2009), 1625: 244-253 Issue Date 2009-01 URL http://hdlhandlenet/2433/140284 Right Type Departmental Bulletin Paper Textversion
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Title 狩野本 綴術算経 について ( 数学史の研究 ) Author(s) 小川 束 Citation 数理解析研究所講究録 (2004) 1392: 60-68 Issue Date 2004-09 URL http://hdlhandlenet/2433/25859 Right Type Departmental Bulletin Paper Textversion publisher Kyoto
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Title Compactification theorems in dimens Topology and Related Problems) Author(s) 木村, 孝 Citation 数理解析研究所講究録 (1996), 953: Issue Date URL
Title Compactification theorems in dimens Topology and Related Problems Authors 木村 孝 Citation 数理解析研究所講究録 1996 953 73-92 Issue Date 1996-06 URL http//hdlhandlenet/2433/60394 Right Type Departmental Bulletin
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1257 2002 150-162 150 Abstract When was the Suanshushu edited? * JOCHI Shigeru The oldest mathematical book in China whose name is the Suanshushu was unearthed in the Zhangjiashan ruins, Jiangsha City,
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Title 二次超曲面へのアファインはめ込みの基本定理とその応用 ( 部分多様体の幾何学 ) Author(s) 長谷川 和志 Citation 数理解析研究所講究録 (2001) 1206 107-113 Issue Date 2001-05 URL http//hdlhandlenet/2433/41034 Right Type Departmental Bulletin Paper Textversion
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Title ウェーブレットのリモートセンシングへの応用 ( ウェーブレットの構成法と理工学的応用 ) Author(s) 新井, 康平 Citation 数理解析研究所講究録 (2009), 1622: Issue Date URL
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Title DEA ゲームの凸性 ( 数理最適化から見た 凸性の深み, 非凸性の魅惑 ) Author(s) 中林, 健 ; 刀根, 薫 Citation 数理解析研究所講究録 (2004), 1349: Issue Date URL
Title DEA ゲームの凸性 ( 数理最適化から見た 凸性の深み 非凸性の魅惑 ) Author(s) 中林 健 ; 刀根 薫 Citation 数理解析研究所講究録 (2004) 1349: 204-220 Issue Date 2004-01 URL http://hdl.handle.net/2433/24871 Right Type Departmental Bulletin Paper
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得点圏打率 盗塁 併殺を考慮した最適打順決定モデル Titleについて : FA 打者トレード戦略の検討 ( 不確実性の下での数理モデルとその周辺 ) Author(s) 穴太, 克則 ; 高野, 健大 Citation 数理解析研究所講究録 (2015), 1939: 133-142 Issue Date 2015-04 URL http://hdl.handle.net/2433/223766
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Title 改良型 S 字型風車についての数値シミュレーション ( 複雑流体の数理とシミュレーション ) Author(s) 桑名, 杏奈 ; 佐藤, 祐子 ; 河村, 哲也 Citation 数理解析研究所講究録 (2007), 1539 43-50 Issue Date 2007-02 URL http//hdlhandlenet/2433/59070 Right Type Departmental
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1848 2013 132-146 132 Fuminori Sakaguchi Graduate School of Engineering, University of Fukui ; Masahito Hayashi Graduate School of Mathematics, Nagoya University; Centre for Quantum Technologies, National
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Title KETpicによる曲面描画と教育利用 ( 数式処理と教育教育における数式処理システムの効果的利用に関する研究 ) : 数学 Author(s) 金子, 真隆 ; 阿部, 孝之 ; 関口, 昌由 ; 山下, 哲 ; 高遠, Citation 数理解析研究所講究録 (2009), 1624: 1-10 Issue Date 2009-01 URL http://hdl.handle.net/2433/140279
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Title 非線形シュレディンガー方程式に対する3 次分散項の効果 ( 流体における波動現象の数理とその応用 ) Author(s) 及川 正行 Citation 数理解析研究所講究録 (1993) 830: 244-253 Issue Date 1993-04 URL http://hdlhandlenet/2433/83338 Right Type Departmental Bulletin Paper
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