表紙
|
|
- りえ さかど
- 5 years ago
- Views:
Transcription
1 A B,BW C
2
3 Rc No. h Rc C M2 M3 M4 M5 M HK No. 25Hk 35HK 40HK 50HK 60HK 80HK 100HK 120HK 140HK 160HK 180HK 200HK 240HK Rc h Rc C 2 3 M2 M No. Rc h Rc 06B C 2 3 M2 M3
4
5 Ds G Dr R U A B ac E P K V F H S xy yz
平塚信用金庫の現況 2015
2015 1 2 3 1 2 3 4 5 6 7 1 2 3 4 5 8 9 @ A B C D E F G H I J K HK L M N O P Q R T R T S T U V W 1 2 3 4 5 6 E F C J I O M N K L H 8 7 G D 0 A 6 9 5
More information() () () 200,000 160,000 120,000 80,000 40,000 3.3 144,688 43,867 3.1 162,624 52,254 170,934 171,246 172,183 3 2.8 2.6 57,805 61,108 65,035 3.5 3 2.5 2 1.5 1 0.5 0 0 2 7 12 17 22 10.1 12.7 17 22.3 73.4
More informationuntitled
20 7 1 22 7 1 1 2 3 7 8 9 10 11 13 14 15 17 18 19 21 22 - 1 - - 2 - - 3 - - 4 - 50 200 50 200-5 - 50 200 50 200 50 200 - 6 - - 7 - () - 8 - (XY) - 9 - 112-10 - - 11 - - 12 - - 13 - - 14 - - 15 - - 16 -
More informationuntitled
19 1 19 19 3 8 1 19 1 61 2 479 1965 64 1237 148 1272 58 183 X 1 X 2 12 2 15 A B 5 18 B 29 X 1 12 10 31 A 1 58 Y B 14 1 25 3 31 1 5 5 15 Y B 1 232 Y B 1 4235 14 11 8 5350 2409 X 1 15 10 10 B Y Y 2 X 1 X
More informationmaster
000000000 (1) 1064 B 5m78 091080067 6067 (0.80 52m59 100000000 (1) 0 B 9:52.00 101000744 744 (7. 8m79 101001650 650 12.50 101004483 (3) 3483 (0.80 52m36 101004486 (3) 3486 11.00 101004488 (3) 3488 50.00
More informationNetcommunity SYSTEM X7000 IPコードレス電話機 取扱説明書
4 5 6 7 8 9 . 4 DS 0 4 5 4 4 4 5 5 6 7 8 9 0 4 5 6 7 8 9 4 5 6 4 0 4 4 4 4 5 6 7 8 9 40 4 4 4 4 44 45 4 6 7 5 46 47 4 5 6 48 49 50 5 4 5 4 5 6 5 5 6 4 54 4 5 6 7 55 5 6 4 56 4 5 6 57 4 5 6 7 58 4
More information.A. D.S
1999-1- .A. D.S 1996 2001 1999-2- -3- 1 p.16 17 18 19 2-4- 1-5- 1~2 1~2 2 5 1 34 2 10 3 2.6 2.85 3.05 2.9 2.9 3.16 4 7 9 9 17 9 25 10 3 10 8 10 17 10 18 10 22 11 29-6- 1 p.1-7- p.5-8- p.9 10 12 13-9- 2
More informationAC-2
AC-1 AC-2 AC-3 AC-4 AC-5 AC-6 AC-7 AC-8 AC-9 * * * AC-10 AC-11 AC-12 AC-13 AC-14 AC-15 AC-16 AC-17 AC-18 AC-19 AC-20 AC-21 AC-22 AC-23 AC-24 AC-25 AC-26 AC-27 AC-28 AC-29 AC-30 AC-31 AC-32 * * * * AC-33
More informationエンジョイ北スポーツ
28 3 20 85132 http://www.kita-city-taikyo.or.jp 85 63 27 27 85132 http://www.kita-city-taikyo.or.jp 2 2 3 4 4 3 6 78 27, http://www.kita-city-taikyo.or.jp 85132 3 35 11 8 52 11 8 2 3 4 1 2 4 4 5 4 6 8
More information.....Z...^.[.......\..
15 10 16 42 55 55 56 60 62 199310 1995 134 10 8 15 1 13 1311 a s d f 141412 2 g h j 376104 3 104102 232 4 5 51 30 53 27 36 6 Y 7 8 9 10 8686 86 11 1310 15 12 Z 13 14 15 16 102193 23 1712 60 27 17 18 Z
More information90 120.0 80 70 72.8 75.1 76.7 78.6 80.1 80.1 79.6 78.5 76.8 74.8 72.4 69.5 95.6% 66.4 100.0 60 80.0 50 40 60.0 30 48.3% 38.0% 40.0 20 10 10.4% 20.0 0 S60 H2 H7 H12 H17 H22 H27 H32 H37 H42 H47 H52 H57 0.0
More information3 ( 9 ) ( 13 ) ( ) 4 ( ) (3379 ) ( ) 2 ( ) 5 33 ( 3 ) ( ) 6 10 () 7 ( 4 ) ( ) ( ) 8 3() 2 ( ) 9 81
1 ( 1 8 ) 2 ( 9 23 ) 3 ( 24 32 ) 4 ( 33 35 ) 1 9 3 28 3 () 1 (25201 ) 421 5 ()45 (25338 )(2540 )(1230 ) (89 ) () 2 () 3 ( ) 2 ( 1 ) 3 ( 2 ) 4 3 ( 9 ) ( 13 ) ( ) 4 ( 43100 ) (3379 ) ( ) 2 ( ) 5 33 ( 3 )
More information3 4 3 2 4 1 4 2 4 2 1 3 1 1 4 1 1 16,000 14,000 12,000 W) S) RC) CB 10,000 8,000 6,000 4,000 2,000 0 12,000 11,500 11,000 10,500 10,000 9,500 9,000 550 540 530 520 510 500 490 480 470 460 450 2008 2009
More information1 2 2 4 4 6 8 20 51 60 61 64 65 65 67 69 69 70 72 12 104,007 13.9 40.7 34.6 2030 16 1 21 1 16 1 1 1979 1979 25 30 12 25 2 60 2 2 3 16 1 1 1/2500 1979 16 9 4 5 16 11 16 12 6 7 3,214 146,390 977 30.4% 39,658
More informationuntitled
58 3 2012 393 400 1 1) 2 5) 6) 6) 7) 2 1 8) 9) 10) 1 11) 11 ) 3 2 12) 13,14) 2 4 1871 12 5 16 3 26 2 14) 13) 15 17) 2 11 8) 9) 2 11 2 2 12 27 2 1869 11 2 12 4 4 3 1 13,14) 4 4 3 18) 2 19) 394 58 3 2012
More information第4回報告書.PDF
7 8 () 13001630 / - 3 - 6 10 () 13001630 2. 3. 6 18 ()13001630 6 24 () 13001630 21 7 8 () 13001630 / 7 22 () 13001630 8 12 () 13001630 Context - 4 - 8 26 ()13001630 7 9 9 ()13001630 21 9 24 13001630 10
More information木材利用における林野庁施策の動向1
10 1931 10 1050 H21 2,900 45.9% (14%) 253 4.0% 6,321m 3 (100%) 816 12.9% (21%) m 3 2,351 37.2% (41%) 8130 598 1,024m 3 8248% 198m 3 58 7% 1,758m 3 55% 48%+7%=55% 22 519 26 10 4 1 3 Vol53No.4,1998
More informationh1_h4.ai
01 02 03 04 05 PS RC RC CSR CSR CSR 10 11 14 15 400 350 300 250 200 150 100 50 0 2011/12 2012/02 2012/04 2012/06 2012/08 2012/10 2012/12 2013/02 2013/04 2013/06 2013/08 2013/10 2013/12 2014/02 2014/04
More informationユニセフ表紙_CS6_三.indd
16 179 97 101 94 121 70 36 30,552 1,042 100 700 61 32 110 41 15 16 13 35 13 7 3,173 41 1 4,700 77 97 81 47 25 26 24 40 22 14 39,208 952 25 5,290 71 73 x 99 185 9 3 3 3 8 2 1 79 0 d 1 226 167 175 159 133
More information応力とひずみ.ppt
in yukawa@numse.nagoya-u.ac.jp 2 3 4 5 x 2 6 Continuum) 7 8 9 F F 10 F L L F L 1 L F L F L F 11 F L F F L F L L L 1 L 2 12 F L F! A A! S! = F S 13 F L L F F n = F " cos# F t = F " sin# S $ = S cos# S S
More information7 27 7.1........................................ 27 7.2.......................................... 28 1 ( a 3 = 3 = 3 a a > 0(a a a a < 0(a a a -1 1 6
26 11 5 1 ( 2 2 2 3 5 3.1...................................... 5 3.2....................................... 5 3.3....................................... 6 3.4....................................... 7
More information- 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 - - 27 - - 28 - - - - 29 - - 30
More informationkihoku_09_01.indd
20 20 21 5018 5403 5417 0002 0038 0146 0232 0238 0338 10 1146 11 1811 12 2148 4902 5018 5242 5309 5420 0015 0018 1717 1806 1756 2324 2443 2604 2831 2859 3646 38 45 57 38 36 52 33 59 06 08 02 49 47 10 00
More informationMicrosoft Word - ゴールドコーストマラソン2014.docx
2014 2014 7 3 7 14:25 16:20 22:25 6:25 10:55 19:00 22:55 0:35 42.195Km 7,300km 537,844 2013 6 30 6 2 1 Dr. 1 20 10 Q1 Q1 8m 2 7 4 15 J B H..S 45 30 7 20 49 20 15 3 45 4 3 50 28 35 km 40km 4 4 6 15km 20km
More information2
2007 8 12 1 Q&A Q1 A 2007 6 29 2008 1 1 14 1 12 1 2 3 1 1 13 1 2 15 1 1 2 Q2 A 627 1 20 1 1 3 15 2003 18 2 3 4 5 3 406 44 2 1997 7 16 5 1 1 15 4 52 1 31 268 17 5 60 55 50 1999 3 9 1999 3 39 40 44 100 1
More information1 23G 2 1 2 3 4 5 6 7 3 a a b c a 4 1 18G 18G 6 6 3 30 34 2 23G 48 23G 1 25 45 5 20 145mm 20 26 0.6 1.000 0.7 1.000mm a b c a 20 b c 24 28 a c d 3 60 70 / a RC 5 15 b 1 3 c 0.5 1 4 6 5 a 5 1 b a b a d
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, z + dz) Q! (x + d x + u + du, y + dy + v + dv, z +
More informationユニセフ表紙_CS6_三.indd
16 179 97 101 94 121 70 36 30,552 1,042 100 700 61 32 110 41 15 16 13 35 13 7 3,173 41 1 4,700 77 97 81 47 25 26 24 40 22 14 39,208 952 25 5,290 71 73 x 99 185 9 3 3 3 8 2 1 79 0 d 1 226 167 175 159 133
More informationEPSON LP-S7500シリーズ 取扱説明書1 セットアップと使い方編
A B K L N N N N A B A N B N N A B D A B A B N N N N N N N N N N N K A B E C D F G N N N A B N N A A K B C D L E L L K F A B G N C N N C D B K E A B F AC N K G A B C H K D F E B G H K I G H L J
More information2.4 ( ) ( B ) A B F (1) W = B A F dr. A F q dr f(x,y,z) A B Γ( ) Minoru TANAKA (Osaka Univ.) I(2011), Sec p. 1/30
2.4 ( ) 2.4.1 ( B ) A B F (1) W = B A F dr. A F q dr f(x,y,z) A B Γ( ) I(2011), Sec. 2. 4 p. 1/30 (2) Γ f dr lim f i r i. r i 0 i f i i f r i i i+1 (1) n i r i (3) F dr = lim F i n i r i. Γ r i 0 i n i
More information030801調査結果速報版.PDF
15 8 1 15 7 26 1. 2. 15 7 27 15 7 28 1 2 7:13 16:56 0:13 3km 45 346 108 3.1 3.2 3.3 3.4 3.5 3.6 3.7 3.8 3.9 3.10 3.11 3. 3.1 26 7 10 1 20cm 2 1 2 45 1/15 3 4 5,6 3 4 3 5 6 ( ) 7,8 8 7 8 2 55 9 10 9 10
More information2005
20 30 8 3 190 60 A,B 67,2000 98 20 23,600 100 60 10 20 1 3 2 1 2 1 12 1 1 ( ) 340 20 20 30 50 50 ( ) 6 80 5 65 17 21 5 5 12 35 1 5 20 3 3,456,871 2,539,950 916,921 18 10 29 5 3 JC-V 2 ( ) 1 17 3 1 6
More informationac b 0 r = r a 0 b 0 y 0 cy 0 ac b 0 f(, y) = a + by + cy ac b = 0 1 ac b = 0 z = f(, y) f(, y) 1 a, b, c 0 a 0 f(, y) = a ( ( + b ) ) a y ac b + a y
01 4 17 1.. y f(, y) = a + by + cy + p + qy + r a, b, c 0 y b b 1 z = f(, y) z = a + by + cy z = p + qy + r (, y) z = p + qy + r 1 y = + + 1 y = y = + 1 6 + + 1 ( = + 1 ) + 7 4 16 y y y + = O O O y = y
More information( ) x y f(x, y) = ax
013 4 16 5 54 (03-5465-7040) nkiyono@mail.ecc.u-okyo.ac.jp hp://lecure.ecc.u-okyo.ac.jp/~nkiyono/inde.hml 1.. y f(, y) = a + by + cy + p + qy + r a, b, c 0 y b b 1 z = f(, y) z = a + by + cy z = p + qy
More informationPLPLS IP65
PLPLS IP65 00 00 PL0-45 PL-3 PL6-3 PL6-33 PL6-34 PL6-35 PL6-43 PL6-54 PL0-4 PL0-34 PL0-44 PL0-45 PL0-55 PL0-565 650 00 0 65 00 50 50 50 50 40 4.7.7.8.4 3.4 4. 3. 5..6 3.6 4.5 5.4 6.9 8.5 0 00 390 540 3
More informationall.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 informationxyr x y r x y r u u
xyr x y r x y r u u y a b u a b a b c d e f g u a b c d e g u u e e f yx a b a b a b c a b c a b a b c a b a b c a b c a b c a u xy a b u a b c d a b c d u ar ar a xy u a b c a b c a b p a b a b c a
More information1958 1984 1985 1 1985 1987 1987 1992 2004 j - 1996 j 1996 12 j 1997 6 1997 j 1998 6 j 1998 6 j 1998 9 1998 2000 2-01 j 2000. 12 2000.7.24 2001 2001.12
1958 1984 1985 1 1985 1987 1987 1992 2004 j - 1996 j 1996 12 j 1997 6 1997 j 1998 6 j 1998 6 j 1998 9 1998 2000 2-01 j 2000. 12 2000.7.24 2001 2001.12 2002.4 2002 2003.9 2003 2004 2005. 2006 2007.11 2008
More information曲面のパラメタ表示と接線ベクトル
L11(2011-07-06 Wed) :Time-stamp: 2011-07-06 Wed 13:08 JST hig 1,,. 2. http://hig3.net () (L11) 2011-07-06 Wed 1 / 18 ( ) 1 V = (xy2 ) x + (2y) y = y 2 + 2. 2 V = 4y., D V ds = 2 2 ( ) 4 x 2 4y dy dx =
More informationIII No (i) (ii) (iii) (iv) (v) (vi) x 2 3xy + 2 lim. (x,y) (1,0) x 2 + y 2 lim (x,y) (0,0) lim (x,y) (0,0) lim (x,y) (0,0) 5x 2 y x 2 + y 2. xy x2 + y
III No (i) (ii) (iii) (iv) (v) (vi) x 2 3xy + 2. (x,y) (1,0) x 2 + y 2 5x 2 y x 2 + y 2. xy x2 + y 2. 2x + y 3 x 2 + y 2 + 5. sin(x 2 + y 2 ). x 2 + y 2 sin(x 2 y + xy 2 ). xy (i) (ii) (iii) 2xy x 2 +
More informations s U s L e A = P A l l + dl dε = dl l l
P (ε) A o B s= P A s B o Y l o s Y l e = l l 0.% o 0. s e s B 1 s (e) s Y s s U s L e A = P A l l + dl dε = dl l l ε = dε = l dl o + l lo l = log l o + l =log(1+ e) l o Β F Α E YA C Ο D ε YF B YA A YA
More informationINFINIUM PPT PRESENTATION
2 1 2 1 2 5 1 2 1 2 1 11 22 2 0 6 1 2 7 1 2 KAGA (USA KAGA (H.K.) KAGA DEVICES(H.K.) KAGA (KOREA) KAGA (TAIWAN) KAGA (SINGAPORE) KAGA (THAILAND) KAGA (EUROPE) KAGA IMPEX 2006 8 1 2 9 10 1 2 1 11 1 2 12
More informationMicrosoft Word - 計算力学2007有限要素法.doc
95 2 x y yz = zx = yz = zx = { } T = { x y z xy } () {} T { } T = { x y z xy } = u u x y u z u x x y z y + u y (2) x u x u y x y x y z xy E( ) = ( + )( 2) 2 2( ) x y z xy (3) E x y z z = z = (3) z x y
More informationII Time-stamp: <05/09/30 17:14:06 waki> ii
II waki@cc.hirosaki-u.ac.jp 18 1 30 II Time-stamp: ii 1 1 1.1.................................................. 1 1.2................................................... 3 1.3..................................................
More information1
005 11 http://www.hyuki.com/girl/ http://www.hyuki.com/story/tetora.html http://www.hyuki.com/ Hiroshi Yuki c 005, All rights reserved. 1 1 3 (a + b)(a b) = a b (x + y)(x y) = x y a b x y a b x y 4 5 6
More information21 2 26 i 1 1 1.1............................ 1 1.2............................ 3 2 9 2.1................... 9 2.2.......... 9 2.3................... 11 2.4....................... 12 3 15 3.1..........
More information48 * *2
374-1- 17 2 1 1 B A C A C 48 *2 49-2- 2 176 176 *2 -3- B A A B B C A B A C 1 B C B C 2 B C 94 2 B C 3 1 6 2 8 1 177 C B C C C A D A A B A 7 B C C A 3 C A 187 187 C B 10 AC 187-4- 10 C C B B B B A B 2 BC
More information96 7 1m =2 10 7 N 1A 7.1 7.2 a C (1) I (2) A C I A A a A a A A a C C C 7.2: C A C A = = µ 0 2π (1) A C 7.2 AC C A 3 3 µ0 I 2 = 2πa. (2) A C C 7.2 A A
7 Lorentz 7.1 Ampère I 1 I 2 I 2 I 1 L I 1 I 2 21 12 L r 21 = 12 = µ 0 2π I 1 I 2 r L. (7.1) 7.1 µ 0 =4π 10 7 N A 2 (7.2) magnetic permiability I 1 I 2 I 1 I 2 12 21 12 21 7.1: 1m 95 96 7 1m =2 10 7 N
More information134,000 0 0 0 RC 6!! 2 7 1 1,212,052 134,000 1,346,052 1/1 No.2734-2
2015.1.8 2734 SAA EU 1 954,000 1,083,000 2 5 23 24 2 22 IM 3 15 IM 12 134,000 0 0 0 RC 6!! 2 7 1 1,212,052 134,000 1,346,052 1/1 No.2734-2 57 11/5 1 27 5 No.2734-3 No.2734-4 No.2734-5 53 3 2 1 MU MU 12
More informationB line of mgnetic induction AB MN ds df (7.1) (7.3) (8.1) df = µ 0 ds, df = ds B = B ds 2π A B P P O s s Q PQ R QP AB θ 0 <θ<π
8 Biot-Svt Ampèe Biot-Svt 8.1 Biot-Svt 8.1.1 Ampèe B B B = µ 0 2π. (8.1) B N df B ds A M 8.1: Ampèe 107 108 8 0 B line of mgnetic induction 8.1 8.1 AB MN ds df (7.1) (7.3) (8.1) df = µ 0 ds, df = ds B
More informationE9A40JD_001_029.qx4j
DV-RW5 DV-RW5 NA57JD 2 ALL 2 :9 LB 2 2 DV-RW5 DV-RW5 [ 2 3 5 7 9 0 2 3 5 7 9 20 2 22 23 2 25 2 27 2 29 30 3 32 B h C g k 2 3 DV-RW5 23 22 2 20 9 7 5 3 2 0 9 A I B C 7 5 I B AC g h 2 3 5 3 2
More information1 2 1 No p. 111 p , 4, 2, f (x, y) = x2 y x 4 + y. 2 (1) y = mx (x, y) (0, 0) f (x, y). m. (2) y = ax 2 (x, y) (0, 0) f (x,
No... p. p. 3, 4,, 5.... f (, y) y 4 + y. () y m (, y) (, ) f (, y). m. () y a (, y) (, ) f (, y). a. (3) lim f (, y). (,y) (,)... (, y) (, ). () f (, y) a + by, a, b. + y () f (, y) 4 + y + y 3 + y..3.
More informationII 2 II
II 2 II 2005 yugami@cc.utsunomiya-u.ac.jp 2005 4 1 1 2 5 2.1.................................... 5 2.2................................. 6 2.3............................. 6 2.4.................................
More information1.1 1 A
. A..2 2 2. () (xyz) ( xyz) ( xy z) = (x x)yz ( xy z) = yz ( xy z) = y(z ( x z)) = y((z x)(z z)) = y( x z) (2) (3) M aj (x, y, M aj ( x, ȳ, z)) = xy ȳm aj ( x, ȳ, z) M aj ( x, ȳ, z)x M aj (x, y, z) x =
More information第2章 第4代神奈川県庁舎(現本庁舎)の建設
217 218 219 PFI Private Finance Initiative 220 221 222 2 223 9 (M37) (M44) (T7) (M44) (T7) (T6) (T9) 224 (T15) (T9 ) (T2) (T6) (T11) T13) (S4) (T5) (S2) (T11) (T10) (T13) (T13) (T14) (T14) (T14) (T14)
More information2002 9 9 2003 5 19 14 2003 6 30 2
2003 2 27 19992000 2002 9 1 14 5000 1 2002 9 9 2003 5 19 14 2003 6 30 2 30 2003 4 1 3 100 60 20031 1 2003 6 20 23 40 2040 4 1980 3050 80 5m 20 1.3 10 97 99 150 1.3 80 65 5 2002 9 4200a 10 15 190a 6 100
More informationPSCHG000.PS
a b c a ac bc ab bc a b c a c a b bc a b c a ac bc ab bc a b c a ac bc ab bc a b c a ac bc ab bc de df d d d d df d d d d d d d a a b c a b b a b c a b c b a a a a b a b a
More informationMicrosoft Word - Łñ“’‘‚.doc
5 4 3 2 1 19921996 1 0 19921996 19972001 20022006 20072001 20122016 20172021 20222026 20272031 20322036 20372041 20422046 20472051 20000 8000 4000 4000 2000 10 10 20 30 40 50 60 70 20 30 40 50 60 70 ,
More informationJKR Point loading of an elastic half-space 2 3 Pressure applied to a circular region Boussinesq, n =
JKR 17 9 15 1 Point loading of an elastic half-space Pressure applied to a circular region 4.1 Boussinesq, n = 1.............................. 4. Hertz, n = 1.................................. 6 4 Hertz
More information431 a s a s a s d a s a 10 d s 11 f a 12 g s 13 a 14 a 15
431 a s a s a s d a sa 10ds 11fa 12gs 13a 14a 15 a s d f g h a s d 10f 11g a 12h s 13j a 14k s 15 432 433 10 11 12 13 14 15 10 11 12 13 14 15 434 10 11 12 13 14 15 10 11 12 13 14 15 10 11 12 13 14 15 435
More informationIC IC IC IC MONDEX JR Suica Edy IC E-cash Bitcash IC
2006 1990 1990 MONDEX MONDEX 1995 7 ( 17 ) 4 1000 e-cash 1998 9 e-cash 1990 2000 IC IC IC IC MONDEX JR Suica Edy IC E-cash Bitcash IC 3 100% / Suica Suica 100% H M M/B M C D M=C+D H R C H R+C M H C
More informationï ñ ö ò ô ó õ ú ù n n ú ù ö ò ô ñ ó õ ï
ï ñ ö ò ô ó õ ú ù n n ú ù ö ò ô ñ ó õ ï B A C Z E ^ N U M G F Q T H L Y D V R I J [ R _ T Z S Y ^ X ] [ V \ W U D E F G H I J K O _ K W ] \ L M N X P S O P Q @ @ @ @ @ @ @ @ @ @ @ @ @ @ @ @ r r @ @
More informationPowerPoint プレゼンテーション
米田 戸倉川月 7 限 193~21 西 5-19 応用数学 A 積分定理 Gaussの定理 divbd = B nds Stokesの定理 E bds = E dr Green の定理 g x f y dxdy = fdx + gdy = f e i + ge j dr Gauss の発散定理 S n FdS = Fd 1777-1855 ドイツ Johann arl Friedrich Gauss
More informationII (10 4 ) 1. p (x, y) (a, b) ε(x, y; a, b) 0 f (x, y) f (a, b) A, B (6.5) y = b f (x, b) f (a, b) x a = A + ε(x, b; a, b) x a 2 x a 0 A = f x (
II (1 4 ) 1. p.13 1 (x, y) (a, b) ε(x, y; a, b) f (x, y) f (a, b) A, B (6.5) y = b f (x, b) f (a, b) x a = A + ε(x, b; a, b) x a x a A = f x (a, b) y x 3 3y 3 (x, y) (, ) f (x, y) = x + y (x, y) = (, )
More information5 n P j j (P i,, P k, j 1) 1 n n ) φ(n) = n (1 1Pj [ ] φ φ P j j P j j = = = = = n = φ(p j j ) (P j j P j 1 j ) P j j ( 1 1 P j ) P j j ) (1 1Pj (1 1P
p P 1 n n n 1 φ(n) φ φ(1) = 1 1 n φ(n), n φ(n) = φ()φ(n) [ ] n 1 n 1 1 n 1 φ(n) φ() φ(n) 1 3 4 5 6 7 8 9 1 3 4 5 6 7 8 9 1 4 5 7 8 1 4 5 7 8 10 11 1 13 14 15 16 17 18 19 0 1 3 4 5 6 7 19 0 1 3 4 5 6 7
More information1/1 lim f(x, y) (x,y) (a,b) ( ) ( ) lim limf(x, y) lim lim f(x, y) x a y b y b x a ( ) ( ) xy x lim lim lim lim x y x y x + y y x x + y x x lim x x 1
1/5 ( ) Taylor ( 7.1) (x, y) f(x, y) f(x, y) x + y, xy, e x y,... 1 R {(x, y) x, y R} f(x, y) x y,xy e y log x,... R {(x, y, z) (x, y),z f(x, y)} R 3 z 1 (x + y ) z ax + by + c x 1 z ax + by + c y x +
More informationGmech08.dvi
51 5 5.1 5.1.1 P r P z θ P P P z e r e, z ) r, θ, ) 5.1 z r e θ,, z r, θ, = r sin θ cos = r sin θ sin 5.1) e θ e z = r cos θ r, θ, 5.1: 0 r
More information234 50cm
234 50cm () 1 10 2 3 4 1 5 6 2 2 1 7 ( ー ) っ ー っ 8 1 2 10 10 2m 4m 6m 15m 457-2472 585-1154 9 10 2 60 2 100 RC SRC 30 80 500 1 500 500 ) 10 B b A 2 A B 2m 457-2473 585-1154 11 20m a 2m 3 3 1m 75cm 120cm
More informationax 2 + bx + c = n 8 (n ) a n x n + a n 1 x n a 1 x + a 0 = 0 ( a n, a n 1,, a 1, a 0 a n 0) n n ( ) ( ) ax 3 + bx 2 + cx + d = 0 4
20 20.0 ( ) 8 y = ax 2 + bx + c 443 ax 2 + bx + c = 0 20.1 20.1.1 n 8 (n ) a n x n + a n 1 x n 1 + + a 1 x + a 0 = 0 ( a n, a n 1,, a 1, a 0 a n 0) n n ( ) ( ) ax 3 + bx 2 + cx + d = 0 444 ( a, b, c, d
More information120 9 I I 1 I 2 I 1 I 2 ( a) ( b) ( c ) I I 2 I 1 I ( d) ( e) ( f ) 9.1: Ampère (c) (d) (e) S I 1 I 2 B ds = µ 0 ( I 1 I 2 ) I 1 I 2 B ds =0. I 1 I 2
9 E B 9.1 9.1.1 Ampère Ampère Ampère s law B S µ 0 B ds = µ 0 j ds (9.1) S rot B = µ 0 j (9.2) S Ampère Biot-Savart oulomb Gauss Ampère rot B 0 Ampère µ 0 9.1 (a) (b) I B ds = µ 0 I. I 1 I 2 B ds = µ 0
More information4.6: 3 sin 5 sin θ θ t θ 2t θ 4t : sin ωt ω sin θ θ ωt sin ωt 1 ω ω [rad/sec] 1 [sec] ω[rad] [rad/sec] 5.3 ω [rad/sec] 5.7: 2t 4t sin 2t sin 4t
1 1.1 sin 2π [rad] 3 ft 3 sin 2t π 4 3.1 2 1.1: sin θ 2.2 sin θ ft t t [sec] t sin 2t π 4 [rad] sin 3.1 3 sin θ θ t θ 2t π 4 3.2 3.1 3.4 3.4: 2.2: sin θ θ θ [rad] 2.3 0 [rad] 4 sin θ sin 2t π 4 sin 1 1
More information取扱説明書 [F-07E]
2 3 4 5 6 7 8 9 0 2 3 4 5 a b c d a b c d 6 a b cd e a b c d e 7 8 9 20 a b a a b b 2 22 a c b d 23 24 a b ef ghi j k cd l m n op q w xy z r s t u v A B a b c d e f g h i j k l m n o p q r s 25 t u v
More informationSTC-W10
STC-W10 2013 CASIO COMPUTER CO., LTD. 1 2 3 4 5 6 7 8 9 10 11 2.4 DS / OF4 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53
More informationGmech08.dvi
145 13 13.1 13.1.1 0 m mg S 13.1 F 13.1 F /m S F F 13.1 F mg S F F mg 13.1: m d2 r 2 = F + F = 0 (13.1) 146 13 F = F (13.2) S S S S S P r S P r r = r 0 + r (13.3) r 0 S S m d2 r 2 = F (13.4) (13.3) d 2
More information参考資料509
参考資料509 参考資料 510 参考資料 511 参考資料 512 参考資料 513 参考資料 F( day W pdg/cm Z ( 514 参考資料 515 参考資料 516 参考資料 517 参考資料 518 参考資料 519 参考資料 520 参考資料 521 参考資料 522 参考資料 523 参考資料 524 参考資料 525 参考資料 526 参考資料 527 参考資料 528 参考資料
More information<8EAD8E99938781408C9A90DD2E786C73>
(1) ()(1) (1) ()(1) () ()(1) ()(26-5) ()(26-6) ()(2) () (27-1) (27-2) (27-3) (27-1) (27-1) (27-2) 24 1 1.25 1 2 24 1 (2.8)S 1F 370 (1.2) (1.25 ) 1F 202 3,, 24 1 24 1 13 (,) (2.8)S 1F 370 (1.25 )RC 1F 320
More informationl µ l µ l 0 (1, x r, y r, z r ) 1 r (1, x r, y r, z r ) l µ g µν η µν 2ml µ l ν 1 2m r 2mx r 2 2my r 2 2mz r 2 2mx r 2 1 2mx2 2mxy 2mxz 2my r 2mz 2 r
2 1 (7a)(7b) λ i( w w ) + [ w + w ] 1 + w w l 2 0 Re(γ) α (7a)(7b) 2 γ 0, ( w) 2 1, w 1 γ (1) l µ, λ j γ l 2 0 Re(γ) α, λ w + w i( w w ) 1 + w w γ γ 1 w 1 r [x2 + y 2 + z 2 ] 1/2 ( w) 2 x2 + y 2 + z 2
More information.5 z = a + b + c n.6 = a sin t y = b cos t dy d a e e b e + e c e e e + e 3 s36 3 a + y = a, b > b 3 s363.7 y = + 3 y = + 3 s364.8 cos a 3 s365.9 y =,
[ ] IC. r, θ r, θ π, y y = 3 3 = r cos θ r sin θ D D = {, y ; y }, y D r, θ ep y yddy D D 9 s96. d y dt + 3dy + y = cos t dt t = y = e π + e π +. t = π y =.9 s6.3 d y d + dy d + y = y =, dy d = 3 a, b
More informationuntitled
/ Total 8G48s1 2G48s8G x 6s 5. HK$1=12 1000 % HK$4,00048,000 175 7.5% HK$4,000-5,99948,000-71,000 129.4 5.6% HK$6,000-7,99972,00095,000 161.7 7.0% HK$8,000-9,99996,000-119,000 165.1 7.1% HK$10,000-14,999120,000-179,000
More information46 4 E E E E E 0 0 E E = E E E = ) E =0 2) φ = 3) ρ =0 1) 0 2) E φ E = grad φ E =0 P P φ = E ds 0
4 4.1 conductor E E E 4.1: 45 46 4 E E E E E 0 0 E E = E E E =0 4.1.1 1) E =0 2) φ = 3) ρ =0 1) 0 2) E φ E = grad φ E =0 P P φ = E ds 0 4.1 47 0 0 3) ε 0 div E = ρ E =0 ρ =0 0 0 a Q Q/4πa 2 ) r E r 0 Gauss
More information(1) (2) (3) (4) HB B ( ) (5) (6) (7) 40 (8) (9) (10)
2017 12 9 4 1 30 4 10 3 1 30 3 30 2 1 30 2 50 1 1 30 2 10 (1) (2) (3) (4) HB B ( ) (5) (6) (7) 40 (8) (9) (10) (1) i 23 c 23 0 1 2 3 4 5 6 7 8 9 a b d e f g h i (2) 23 23 (3) 23 ( 23 ) 23 x 1 x 2 23 x
More informationA
A 2563 15 4 21 1 3 1.1................................................ 3 1.2............................................. 3 2 3 2.1......................................... 3 2.2............................................
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 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