l∫dOet - PDF 無料ダウンロード

２００７年０８月号　０２２４１６／０８１２　会告

More information

all

More information

102 5 102 5 103 q w 104 e r t y 5 u 105 q w e r t y u i 106 o!0 io!1 io q w e r t y 5 u 107 i o 108 q w e q w e r 5 109 q w 110 e r t 5 y 111 q w e r t y u 112 i q w e r 5 113 q w e 114 r t 5 115 q w e 116

More information

.V...z.\

$.V...z.\$

More information

- 1 - - 0.5%5 10 10 5 10 1 5 1

- - - 1 - - 0.5%5 10 10 5 10 1 5 1 - 2 - - - - A B A A A B A B B A - 3 - - 100 100 100 - A) ( ) B) A) A B A B 110 A B 13 - 4 - A) 36 - - - 5 - - 1 - 6-1 - 7 - - 8 - Q.15 0% 10% 20% 30% 40% 50% 60% 70%

More information

2

More information

県士会広報第185号-最終.indd

More information

PIJディスカッション・ペーパー　No

More information

I II III IV V

I II III IV V N/m 2 640 980 50 200 290 440 2m 50 4m 100 100 150 200 290 390 590 150 340 4m 6m 8m 100 170 250 µ = E FRVβ β N/mm 2 N/mm 2 1.1 F c t.1 3 1 1.1 1.1 2 2 2 2 F F b F s F c F t F b F s 3 3 3

More information

untitled

More information

untitled

untitled 1 th 1 th Dec.2006 1 1 th 1 th Dec.2006 103 1 2 EITC 2 1 th 1 th Dec.2006 3 1 th 1 th Dec.2006 2006 4 1 th 1 th Dec.2006 5 1 th 1 th Dec.2006 2 6 1 th 1 th Dec.2006 7 1 th 1 th Dec.2006 3 8 1 th 1 th Dec.2006

More information

地域開発の事後的分析－経済指標と社会指標による考察－

地域開発の事後的分析－経済指標と社会指標による考察－ 47 N a N a = N N S 48 H r H r = H S / N a N N =.0079N + ( NOi NiO ) (745.86) N N NOi NiO N 4 7.0 47.8 7.9 4. 47.7 4 6.6 47 E E E 3 E = 5.64 E E 3 + 0.0445E.0074E (44.0) = 0.980E + (4.35) = 450.04 0.033E

More information

2

1 2 3 4 スイッチ 5 6 7 6.6m 2 123-4567-8910 123-4567- 8 123-4567-8910 123-4567- 9 () 10 () 11 12 () 13 14 ) 15 16 17 18 ++ 19 20 21 22 23 の 24 25 26 27 28 ( ) ( ) 29 ( ) ( ) 30 31 32 33 34 35 36 37 6.6m

More information

直売所

More information

- 1 -

- 1 - - 1 - - 2 - - 3 - - 4 - - 5 - - 6 - - 7 - - 8 - - 9 - - 10 - - 11 - - 12 - - 13 - - 14 - - 15 - - 16 - - 17 - - 18 - - 19 - - 20 - - 21 - - 22 - - 23 - - 24 - - 25 - - 26 - EC NEC - 27 - NEC - 28 - R NEC

More information

読めば必ずわかる分散分析の基礎第２版

読めば必ずわかる分散分析の基礎第２版 2 2003 12 5 ( ) ( ) 2 I 3 1 3 2 2? 6 3 11 4? 12 II 14 5 15 6 16 7 17 8 19 9 21 10 22 11 F 25 12 : 1 26 3 I 1 17 11 x 1, x 2,, x n x( ) x = 1 n n i=1 x i 12 (SD ) x 1, x 2,, x n s 2 s 2 = 1 n n (x i x)

More information

(1.2) T D = 0 T = D = 30 kn 1.2 (1.4) 2F W = 0 F = W/2 = 300 kn/2 = 150 kn 1.3 (1.9) R = W 1 + W 2 = = 1100 N. (1.9) W 2 b W 1 a = 0

(1.2) T D = 0 T = D = 30 kn 1.2 (1.4) 2F W = 0 F = W/2 = 300 kn/2 = 150 kn 1.3 (1.9) R = W 1 + W 2 = = 1100 N. (1.9) W 2 b W 1 a = 0 1 1 1.1 1.) T D = T = D = kn 1. 1.4) F W = F = W/ = kn/ = 15 kn 1. 1.9) R = W 1 + W = 6 + 5 = 11 N. 1.9) W b W 1 a = a = W /W 1 )b = 5/6) = 5 cm 1.4 AB AC P 1, P x, y x, y y x 1.4.) P sin 6 + P 1 sin 45

More information

untitled

untitled . 96. 99. ( 000 SIC SIC N88 SIC for Windows95 6 6 3 0 . amano No.008 6. 6.. z σ v σ v γ z (6. σ 0 (a (b 6. (b 0 0 0 6. σ σ v σ σ 0 / v σ v γ z σ σ 0 σ v 0γ z σ / σ ν /( ν, ν ( 0 0.5 0.0 0 v sinφ, φ 0 (6.

More information

untitled

More information

y = x x R = 0. 9, R = σ $ = y x w = x y x x w = x y α ε = + β + x x x y α ε = + β + γ x + x x x x' = / x y' = y/ x y' =

y = x x R = 0. 9, R = σ $ = y x w = x y x x w = x y α ε = + β + x x x y α ε = + β + γ x + x x x x' = / x y' = y/ x y' = y x = α + β + ε =,, ε V( ε) = E( ε ) = σ α $ $ β w ( 0) σ = w σ σ y α x ε = + β + w w w w ε / w ( w y x α β ) = α$ $ W = yw βwxw $β = W ( W) ( W)( W) w x x w x x y y = = x W y W x y x y xw = y W = w w

More information

³ÎÎ¨ÏÀ

³ÎÎ¨ÏÀ 2017 12 12 Makoto Nakashima 2017 12 12 1 / 22 2.1. C, D π- C, D. A 1, A 2 C A 1 A 2 C A 3, A 4 D A 1 A 2 D Makoto Nakashima 2017 12 12 2 / 22 . (,, L p - ). Makoto Nakashima 2017 12 12 3 / 22 . (,, L p

More information

健康文化44

More information

Microsoft Word - AT9719-00_A.doc

More information

u Θ u u u ( λ + ) v Θ v v v ( λ + ) (.) Θ ( λ + ) (.) u + + v (.),, S ( λ + ) uv,, S uv, SH (.8) (.8) S S (.9),

u Θ u u u ( λ + ) v Θ v v v ( λ + ) (.) Θ ( λ + ) (.) u + + v (.),, S ( λ + ) uv,, S uv, SH (.8) (.8) S S (.9), ML rgr ML ML ML (,, ) σ τ τ u + + τ σ τ v + + τ τ σ + + (.) uv,,,, σ, σ, σ, τ, τ, τ t (Hook) σ λθ + ε, τ γ σ λθ + ε, τ γ σ λθ + ε, τ γ λ, E ν ν λ E, E ( + ν)( ν) ( + ν) Θ Θ ε + ε + ε (.) ε, ε, ε, γ, γ,

More information

untitled

More information

日本内科学会雑誌第102巻第4号

More information

all.dvi

all.dvi 72 9 Hooke,,,. Hooke. 9.1 Hooke 1 Hooke. 1, 1 Hooke. σ, ε, Young. σ ε (9.1), Young. τ γ G τ Gγ (9.2) X 1, X 2. Poisson, Poisson ν. ν ε 22 (9.) ε 11 F F X 2 X 1 9.1: Poisson 9.1. Hooke 7 Young Poisson G

More information

untitled

untitled 1990 816 98 30 1 930 4 30 1 12 1228 1 1228 1 1991 211 412 427 513 614 712 830 913 117 1 1130 1128 1 1224 1992 229 2 3 1086 3610 418 58 1 79 62 612 2 6 627 710 4 827 6 912 925 1010 10 119 10 1114 1 10 2

More information

ｔｎｂｐ５９－２１＿Ｗｅｂ：Ｐ２／ｋｙ１３２３７９５０９６１０００２９４４

More information

変位変位とは物体中のある点が変形後に別の点に異動したときの位置の変化でありベクトル量である変位には物体の変形の他に剛体運動剛体変位が含まれている剛体変位 P(x, y, z) 平行移動と回転 P! (x + u, y + v, z + w) Q(x + d x, y + dy,

変位変位とは物体中のある点が変形後に別の点に異動したときの位置の変化でありベクトル量である変位には物体の変形の他に剛体運動剛体変位が含まれている剛体変位 P(x, y, z) 平行移動と回転 P! (x + u, y + v, z + w) Q(x + d x, y + dy, 変位変位とは物体中のある点が変形後に別の点に異動したときの位置の変化でありベクトル量である変位には物体の変形の他に剛体運動剛体変位が含まれている剛体変位 P(x, y, z) 平行移動と回転 P! (x + u, y + v, z + w) Q(x + d x, y + dy, z + dz) Q! (x + d x + u + du, y + dy + v + dv, z +

More information

1 st 2 nd Dec

1 st 2 nd Dec.2007 21 2003 2 1 st 2 nd Dec.2007 5 DC DC 3 1 st 2 nd Dec.2007 1 2 3 1 2 3 4 5 1 2 3 1 2 3 4 1 st 2 nd Dec.2007 25 17 http://www.ipss.go.jp/ 5 1 st 2 nd Dec.2007 1 1 2 1:() 6 1 st 2 nd Dec.2007

More information

IPA... 3... 4... 7... 8... 8... 10... 11... 13... 14... 21... 21... 23... 27 2

IPA 1 IPA... 3... 4... 7... 8... 8... 10... 11... 13... 14... 21... 21... 23... 27 2 IPA 2011103 3 1 139 2 4 10 4 5 6 7 8 9 2 ID 10 11 12 13 14 15 16 17 18 19 20 http://www.jpcert.or.jp/research/2008/inoculation_200808.pdf

More information

all.dvi

all.dvi 38 5 Cauchy.,,,,., σ.,, 3,,. 5.1 Cauchy (a) (b) (a) (b) 5.1: 5.1. Cauchy 39 F Q Newton F F F Q F Q 5.2: n n ds df n ( 5.1). df n n df(n) df n, t n. t n = df n (5.1) ds 40 5 Cauchy t l n mds df n 5.3: t

More information

neutrino

neutrino Fermion 1st 2nd 3rd Quark Lepton aaacc3icbvdlsgmxfm34rpvvdekmwarbldmiqluig5cvhfvojcwt3mldm8mqzjqy9apc+ctuxki49qfc+temj4w2hkg4nhmuyt1rypk2rvvtzm0vlc4tf1akq2vrg5ulre1bltnfwaess9wiiabobpiggq6nvafjig71qhc59ov3odst4sb0uwgt0heszpqyk7vkzyedxtpdq5ssdzjfhxjujuwdretlgchamlapt+koggejnyflnegtvfok2pjmcqhdodg66bmpcxoidkmcbsug05as2imdafoqsai6zefldpc+vdo4lsoeyfbi/t2rk0trfhlzzejmv097q/e/r5mz+czmmugza4koh4ozjo3ew2zwmymghvctivqx+1dmu0qramx/rvucn73ylpgpk+cv7/qkxl2ytffau2gphsapnaiquki15cokhtezekvvzppz4rw7h+pondoz2uf/4hz+abswmfi=

More information

( ) Note (e ) (µ ) (τ ) ( (ν e,e ) e- (ν µ, µ ) µ- (ν τ,τ ) τ- ) ( ) ( ) (SU(2) ) (W +,Z 0,W ) * 1) 3 * 2) [ ] [ ] [ ] ν e ν µ ν τ e

( ) Note (e ) (µ ) (τ ) ( (ν e,e ) e- (ν µ, µ ) µ- (ν τ,τ ) τ- ) ( ) ( ) (SU(2) ) (W +,Z 0,W ) * 1) 3 * 2) [ ] [ ] [ ] ν e ν µ ν τ e ( ) Note 3 19 12 13 8 8.1 (e ) (µ ) (τ ) ( (ν e,e ) e- (ν µ, µ ) µ- (ν τ,τ ) τ- ) ( ) ( ) (SU(2) ) (W +,Z 0,W ) * 1) 3 * 2) [ ] [ ] [ ] ν e ν µ ν τ e µ τ, e R, µ R, τ R (1a) L ( ) ) * 3) W Z 1/2 ( - )

More information

G

More information

untitled

untitled 8- My + Cy + Ky = f () t 8. C f () t ( t) = Ψq( t) () t = Ψq () t () t = Ψq () t = ( q q ) ; = [ ] y y y q Ψ φ φ φ = ( ϕ, ϕ, ϕ,3 ) 8. ψ Ψ MΨq + Ψ CΨq + Ψ KΨq = Ψ f ( t) Ψ MΨ = I; Ψ CΨ = C; Ψ KΨ = Λ; q

More information

4 Mindlin -Reissner 4 δ T T T εσdω= δ ubdω+ δ utd Γ Ω Ω Γ T εσ (1.1) ε σ u b t 3 σ ε. u T T T = = = { σx σ y σ z τxy τ yz τzx} { εx εy εz γ xy γ yz γ

4 Mindlin -Reissner 4 δ T T T εσdω= δ ubdω+ δ utd Γ Ω Ω Γ T εσ (1.1) ε σ u b t 3 σ ε. u T T T = = = { σx σ y σ z τxy τ yz τzx} { εx εy εz γ xy γ yz γ Mindlin -Rissnr δ εσd δ ubd+ δ utd Γ Γ εσ (.) ε σ u b t σ ε. u { σ σ σ z τ τ z τz} { ε ε εz γ γ z γ z} { u u uz} { b b bz} b t { t t tz}. ε u u u u z u u u z u u z ε + + + (.) z z z (.) u u NU (.) N U

More information

Ｐ２０・０１／東　芦塚　木下

More information

眼球運動1

眼球運動1 pf G cf G G G AN NRTP fv IO OMN PT R F t k F t k d k m k d = m F F F k k k k d T e T e d Hoizot c Semicicu c H p O t Sccdic ig Vetibu uceu NRTP Abducet uceu Petectum Ocuomoto uceu Sccdic ig Lt. ectu m.

More information

1 I 1.1 ± e = = - = C C MKSA [m], [Kg] [s] [A] 1C 1A 1 MKSA 1C 1C +q q +q q 1

1 I 1.1 ± e = = - = C C MKSA [m], [Kg] [s] [A] 1C 1A 1 MKSA 1C 1C +q q +q q 1 1 I 1.1 ± e = = - =1.602 10 19 C C MKA [m], [Kg] [s] [A] 1C 1A 1 MKA 1C 1C +q q +q q 1 1.1 r 1,2 q 1, q 2 r 12 2 q 1, q 2 2 F 12 = k q 1q 2 r 12 2 (1.1) k 2 k 2 ( r 1 r 2 ) ( r 2 r 1 ) q 1 q 2 (q 1 q 2

More information

Microsoft Word - 01マニュアル・入稿原稿p1-112.doc

Microsoft Word - 01マニュアル・入稿原稿p1-112.doc 4 54 55 56 ( ( 1994 1st stage 2nd stage 2012 57 / 58 365 46.6 120 365 40.4 120 13.0 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 4 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97

More information

GJG160842_O.QXD

More information

untitled

untitled 29 10 1 2011 12 JRSJ Vol. 29 No. 10 2 Dec., 2011 29 10 3 2011 12 JRSJ Vol. 29 No. 10 4 Dec., 2011 29 10 5 2011 12 JRSJ Vol. 29 No. 10 6 Dec., 2011 29 10 7 2011 12 JRSJ Vol. 29 No. 10 8 Dec., 2011 29 10

More information

ρ ( ) sgv + ρwgv γ sv + γ wv γ s + γ w e e γ ρ g s s γ s ( ) + γ w( ) Vs + V Vs + V + e + e + e γ γ sa γ e e n( ) + e γ γ s ( n) + γ wn γ s, γ w γ γ +

σ P σ () n σ () n σ P ) σ ( σ P σ σ σ + u V e m w ρ w gv V V s m s ρ s gv s ρ ( ) sgv + ρwgv γ sv + γ wv γ s + γ w e e γ ρ g s s γ s ( ) + γ w( ) Vs + V Vs + V + e + e + e γ γ sa γ e e n( ) + e γ γ s (

More information

xyz,, uvw,, Bernoulli-Euler u c c c v, w θ x c c c dv ( x) dw uxyz (,, ) = u( x) y z + ω( yz, ) φ dx dx c vxyz (,, ) = v( x) zθ x ( x) c wxyz (,, ) =

xyz,, uvw,, Bernoulli-Euler u c c c v, w θ x c c c dv ( x) dw uxyz (,, ) = u( x) y z + ω( yz, ) φ dx dx c vxyz (,, ) = v( x) zθ x ( x) c wxyz (,, ) = ,, uvw,, Bernoull-Euler u v, w θ dv ( ) dw u (,, ) u( ) ω(, ) φ d d v (,, ) v( ) θ ( ) w (,, ) w( ) θ ( ) (11.1) ω φ φ dθ / dφ v v θ u w u w 11.1 θ θ θ 11. vw, (11.1) u du d v d w ε d d d u v ω γ φ w u

More information

2

1 2 2005 15 17 21 22 24 25 67 95 3 1 2 3 4 17 4 5 6 7 8 9 PR PR PR 10 11 12 PR 419 844 1,490 950 590 20 12 50 13 12/20 2/28 3/30 14 17 349 666 15 59 6 11 15 17 14 15 15 17 3,525,992 15 59 15 17 18 910

More information

土地税制の理論的・計量的分析

土地税制の理論的・計量的分析 126 312 1 126 312... 2... 4 I...12...12...12...14...14...16...16...17...20...22...22...24...25 II...31...33...33...33...36...36...38 2...41...41...42...50...50...51 III...54...54...54...54...55...55...57...57...58...60...60...60...63...65...67...67

More information

1 239 1 1 1 1 1 50 50 2 2 2 1 J1 G 2 20 50 J L AF 2 Y B 2 1 0 20 25 50 3 20 2 50 1 20 50 2 1 1 5 111 115 5 11 11 1 1 5 5 5 1 5 1 5 211 215 2 2 3 3 2 1 5 50 0 50 5 115 2 2 00 5 2 2 252 0 0 1 1 150 13 0

More information

<483237944E93788EE597768E968BC682CC8A5497762E6169>

More information

VR学会誌スポーツ特集

More information

医系の統計入門第 2 版サンプルページこの本の定価判型などは, 以下の URL からご覧いただけます. このサンプルページの内容は, 第 2 版 1 刷発行時のものです.

医系の統計入門第 2 版サンプルページこの本の定価判型などは, 以下の URL からご覧いただけます. このサンプルページの内容は, 第 2 版 1 刷発行時のものです. 医系の統計入門第 2 版サンプルページこの本の定価判型などは, 以下の URL からご覧いただけます. http://www.morikita.co.jp/books/mid/009192 このサンプルページの内容は, 第 2 版 1 刷発行時のものです. i 2 t 1. 2. 3 2 3. 6 4. 7 5. n 2 ν 6. 2 7. 2003 ii 2 2013 10 iii 1987

More information

2010 IA ε-n I 1, 2, 3, 4, 5, 6, 7, 8, ε-n 1 ε-n ε-n? {a n } n=1 1 {a n } n=1 a a {a n } n=1 ε ε N N n a n a < ε

2010 IA ε-n I 1, 2, 3, 4, 5, 6, 7, 8, ε-n 1 ε-n ε-n? {a n } n=1 1 {a n } n=1 a a {a n } n=1 ε ε N N n a n a < ε 00 IA ε-n I,, 3, 4, 5, 6, 7, 8, 9 4 6 ε-n ε-n ε-n? {a } = {a } = a a {a } = ε ε N N a a < ε ε-n ε ε N a a < ε N ε ε N ε N N ε N [ > N = a a < ε] ε > 0 N N N ε N N ε N N ε a = lim a = 0 ε-n 3 ε N 0 < ε

More information

農林金融2010年12月号

農林金融2010年12月号 3 3 1 2 3 2 200810 3 2010 1 2 163 2 9 4 1 3 2 3 4 5 6 7 8 農林中金総合研究所 1 1 2 3 2 1 2 3 1 2 3 4 5 6 7 4 1 1 1 2 2 2010 1 3 農林中金総合研究所 4 3 2 1 0 0 1 2 3 2009 1 2008 2 3 5 6 農林中金総合研究所

More information

弾性論（Chen）

弾性論（Chen） Phase-field by T.Koyama Phase-field da da a( ) a + { } a d + d δ (-) δ (-) eigen a a a ε ε δ δ (-) da ε (-4) a d ε ε + δε ( ) (-5) δε d (-6) V u ul δεl + l (-7) eigen el ε ε ε (-8) σ el C ε el C { ε ε

More information

[Ver. 0.2] 1 2 3 4 5 6 7 1 1.1 1.2 1.3 1.4 1.5 1 1.1 1 1.2 1. (elasticity) 2. (plasticity) 3. (strength) 4. 5. (toughness) 6. 1 1.2 1. (elasticity) } 1 1.2 2. (plasticity), 1 1.2 3. (strength) a < b F

More information

1.500 m X Y m m m m m m m m m m m m N/ N/ ( ) qa N/ N/ 2 2

1.500 m X Y m m m m m m m m m m m m N/ N/ ( ) qa N/ N/ 2 2 1.500 m X Y 0.200 m 0.200 m 0.200 m 0.200 m 0.200 m 0.000 m 1.200 m m 0.150 m 0.150 m m m 2 24.5 N/ 3 18.0 N/ 3 30.0 0.60 ( ) qa 50.79 N/ 2 0.0 N/ 2 20.000 20.000 15.000 15.000 X(m) Y(m) (kn/m 2 ) 10.000

More information

綱島論文.PDF

綱島論文.PDF 中国帰国者定着促進センター http://www.kikokusha-center.or.jp 中国帰国者定着促進センター http://www.kikokusha-center.or.jp 中国帰国者定着促進センター http://www.kikokusha-center.or.jp 中国帰国者定着促進センター http://www.kikokusha-center.or.jp

More information

( ) ) AGD 2) 7) 1

( ) ) AGD 2) 7) 1 ( 9 5 6 ) ) AGD ) 7) S. ψ (r, t) ψ(r, t) (r, t) Ĥ ψ(r, t) = e iĥt/ħ ψ(r, )e iĥt/ħ ˆn(r, t) = ψ (r, t)ψ(r, t) () : ψ(r, t)ψ (r, t) ψ (r, t)ψ(r, t) = δ(r r ) () ψ(r, t)ψ(r, t) ψ(r, t)ψ(r, t) = (3) ψ (r,

More information

~ は, ~. 13 軸加速度センサ J~ 品. 鳥匂守噌, ~ _~.~ ~. 一. _. -. -. _. 一 '- ' - ' _.-.- ニヱユニー -. 一. _. _. -. _. 一. _. _. JI>o スから通信されたデータが記録されるかを確認した. その結果, 高さ約 5 rn~ こお 098m/s 2 号 5. 3 t --l. --- --r --,_r-

More information

-

More information

= hυ = h c λ υ λ (ev) = 1240 λ W=NE = Nhc λ W= N 2 10-16 λ / / Φe = dqe dt J/s Φ = km Φe(λ)v(λ)dλ THBV3_0101JA Qe = Φedt (W s) Q = Φdt lm s Ee = dφe ds E = dφ ds Φ Φ THBV3_0102JA Me = dφe ds M = dφ ds

More information

Γ Ec Γ V BIAS THBV3_0401JA THBV3_0402JAa THBV3_0402JAb 1000 800 600 400 50 % 25 % 200 100 80 60 40 20 10 8 6 4 10 % 2.5 % 0.5 % 0.25 % 2 1.0 0.8 0.6 0.4 0.2 0.1 200 300 400 500 600 700 800 1000 1200 14001600

More information

73

73 74 ( u w + bw) d = Ɣ t tw dɣ u = N u + N u + N 3 u 3 + N 4 u 4 + [K ] {u = {F 75 u δu L σ (L) σ dx σ + dσ x δu b δu + d(δu) ALW W = L b δu dv + Aσ (L)δu(L) δu = (= ) W = A L b δu dx + Aσ (L)δu(L) Aσ

More information

Microsoft Word - optical.doc

Microsoft Word - optical.doc 1 2 3 CCD () () 4 5 6 7 ) ) 8 9 10 l l l l 10-9 11 12 13 14 15 16 w h f = = W H L f W f h f 6.6 f = = H L 500 2, 000 17 Ec T R Ec = 2 2 4 F ( m + 1) Es a b m = f V m = = L f m = a f f H = C F B( H + f

More information

/ 3 1 / 3 / 3 1 /

/ 3 1 / 3 / 3 1 / 8-18-29 3 291415 297 1-11-4 3/31/ 3/31/ 29 8 22 29 1 17 24 8-1 29 [1] PCB [2] HCB [3] [4] [5] DDT [6-1] p,p'-ddt [6-2] p,p'-dde pg/l ( ) nd 2,4 (46/47) 2.9 18 (47/47) 84 12 pg/g-dry ( ) nd 61, (61/62)

More information

1

GL (a) (b) Ph l P N P h l l Ph Ph Ph Ph l l l l P Ph l P N h l P l .9 αl B βlt D E. 5.5 L r..8 e g s e,e l l W l s l g W W s g l l W W e s g e s g r e l ( s ) l ( l s ) r e l ( s ) l ( l s ) e R e r

More information

untitled

untitled 0 ( L CONTENTS 0 . sin(-x-sinx, (-x(x, sin(90-xx,(90-xsinx sin(80-xsinx,(80-x-x ( sin{90-(ωφ}(ωφ. :n :m.0 m.0 n tn. 0 n.0 tn ω m :n.0n tn n.0 tn.0 m c ω sinω c ω c tnω ecω sin ω ω sin c ω c ω tn c tn ω

More information

2.5 (Gauss) (flux) v(r)( ) S n S v n v n (1) v n S = v n S = v S, n S S. n n S v S v Minoru TANAKA (Osaka Univ.) I(2012), Sec p. 1/30

2.5 (Gauss) (flux) v(r)( ) S n S v n v n (1) v n S = v n S = v S, n S S. n n S v S v Minoru TANAKA (Osaka Univ.) I(2012), Sec p. 1/30 2.5 (Gauss) 2.5.1 (flux) v(r)( ) n v n v n (1) v n = v n = v, n. n n v v I(2012), ec. 2. 5 p. 1/30 i (2) lim v(r i ) i = v(r) d. i 0 i (flux) I(2012), ec. 2. 5 p. 2/30 2.5.2 ( ) ( ) q 1 r 2 E 2 q r 1 E

More information

untitled

untitled ( ) c a sin b c b c a cos a c b c a tan b a b cos sin a c b c a ccos b csin (4) Ma k Mg a (Gal) g(98gal) (Gal) a max (K-E) kh Zck.85.6. 4 Ma g a k a g k D τ f c + σ tanφ σ 3 3 /A τ f3 S S τ A σ /A σ /A

More information

白山羊さんの宿題.PDF

白山羊さんの宿題.PDF ICRU Report 60 Fundamental Quantities and Units for Ionizing Radiation (1998) dosimetric quantity exposurex kermak absorbed dosed 1) fluenceφ hν 1. ρ x Φ/Φ { Φ/Φ}/{ρ x} mass attenuation coefficient µ/ρ

More information

meiji_resume_1.PDF

meiji_resume_1.PDF β β β (q 1,q,..., q n ; p 1, p,..., p n ) H(q 1,q,..., q n ; p 1, p,..., p n ) Hψ = εψ ε k = k +1/ ε k = k(k 1) (x, y, z; p x, p y, p z ) (r; p r ), (θ; p θ ), (ϕ; p ϕ ) ε k = 1/ k p i dq i E total = E

More information

1. 1 A : l l : (1) l m (m 3) (2) m (3) n (n 3) (4) A α, β γ α β + γ = 2 m l lm n nα nα = lm. α = lm n. m lm 2β 2β = lm β = lm 2. γ l 2. 3

1. 1 A : l l : (1) l m (m 3) (2) m (3) n (n 3) (4) A 2 1 2 1 2 3 α, β γ α β + γ = 2 m l lm n nα nα = lm. α = lm n. m lm 2β 2β = lm β = lm 2. γ l 2. 3 4 P, Q R n = {(x 1, x 2,, x n ) ; x 1, x 2,, x n R}

More information

B [ 0.1 ] x > 0 x 6= 1 f(x) µ 1 1 xn 1 + sin sin x 1 x 1 f(x) := lim. n x n (1) lim inf f(x) (2) lim sup f(x) x 1 0 x 1 0 (

B [ 0.1 ] x > 0 x 6= 1 f(x) µ 1 1 xn 1 + sin sin x 1 x 1 f(x) := lim. n x n (1) lim inf f(x) (2) lim sup f(x) x 1 0 x 1 0 ( . 28 4 14 [.1 ] x > x 6= 1 f(x) µ 1 1 xn 1 + sin + 2 + sin x 1 x 1 f(x) := lim. 1 + x n (1) lim inf f(x) (2) lim sup f(x) x 1 x 1 (3) lim inf x 1+ f(x) (4) lim sup f(x) x 1+ [.2 ] [, 1] Ω æ x (1) (2) nx(1

More information

x y x-y σ x + τ xy + X σ y B = + τ xy + Y B = S x = σ x l + τ xy m S y = σ y m + τ xy l σ x σ y τ xy X B Y B S x S y l m δu δv [ ( σx δu + τ )

x y x-y σ x + τ xy + X σ y B = + τ xy + Y B = S x = σ x l + τ xy m S y = σ y m + τ xy l σ x σ y τ xy X B Y B S x S y l m δu δv [ ( σx δu + τ ) 1 8 6 No-tension 1. 1 1.1................................ 1 1............................................ 5.1 - [B].................................. 5................................. 6.3..........................................

More information

ALM

ALM ALM 4 60025480 1 1.1 1.1.1 1.1.2 1.2 ALM 2. 2.11 2.1.1 2.1.2 2.2 2.3 3. 3.1 3.1.1 3.1.2 3.1.3 3.1.4 3.2 3.2.1 3.2.2 4. 4.1 4.1.1 4.1.2 4.1.3 4.2 4.2.1 4.2.2 4.2.3 5. 5.1 5.1.1 5.1.2 5.2 2 6. 6.1 6.2 6.1.1

More information

lecture

lecture 5 3 3. 9. 4. x, x. 4, f(x, ) :=x x + =4,x,.. 4 (, 3) (, 5) (3, 5), (4, 9) 95 9 (g) 4 6 8 (cm).9 3.8 6. 8. 9.9 Phsics 85 8 75 7 65 7 75 8 85 9 95 Mathematics = ax + b 6 3 (, 3) 3 ( a + b). f(a, b) ={3 (a

More information

総セク報告書（印刷発出版_.PDF

総セク報告書（印刷発出版_.PDF - 1 - - 2 - - 3 - - 4 - - 5 - - 6 - - 7 - - 8 - - 9 - - 10 - - 11 - IP 110 110 IP 110 110 - 12-110 2 IP 3 1 110 2 IP 3 1 - 13 - - 14 - IP - 15 - 17 11-16 - - 17 - - 18 - FAX (*1) http://www.kantei.go.jp/jp/singi/titeki2/kettei/040527f.html

More information

微分積分サンプルページこの本の定価判型などは, 以下の URL からご覧いただけます. このサンプルページの内容は, 初版 1 刷発行時のものです.

微分積分サンプルページこの本の定価判型などは, 以下の URL からご覧いただけます. このサンプルページの内容は, 初版 1 刷発行時のものです. 微分積分サンプルページこの本の定価判型などは, 以下の URL からご覧いただけます. ttp://www.morikita.co.jp/books/mid/00571 このサンプルページの内容は, 初版 1 刷発行時のものです. i ii 014 10 iii [note] 1 3 iv 4 5 3 6 4 x 0 sin x x 1 5 6 z = f(x, y) 1 y = f(x)

More information