JGA
|
|
- さいぞう かりこめ
- 7 years ago
- Views:
Transcription
1 JGA
2 JGA
3
4
5
6 * i
7 * * * ii
8 1 1 ( ) N mm 4-11 N mm 4-11 N mm N mm N mm N mm N mm (4)(b) *1 (3)(c) (4)(b) 1
9 (c) ( i ) cos (ii) 4..3.(3)(b) sin N mm (3)() (3)(b) 4..3.(3)(b) N mm (3)(b)
10 3
11
12
13 *1 *1 (1) **1 7-1 *1 *1 (1) **1 7-1 T(s) 7- () T(s) 7- ()
14 (7) () (7) () bor Nmm c) b WV ( DbD bor 3 nt D t mm D 8-11 mm D b c n 8-11 mm F V D B F H H C C 4 S H W V (1) bor Nmm c) b WV ( DbD bor 3 nt D t mm D 8-11 mm D b c n 8-11 mm F V D B F H H C C 4 S H W V (1) 8-11 (b) FybOT K ybt K MH K ybt K MH bet Fy bot D bet Nmm bet 1 6 n 4FH H FV D B C 0. 67C tn 4 H L' n ( D L' ) t 0.Nmm Nmm WV L' bot 6 nn ( D L' ) t mm (b) FybOT K ybt K MH K ybt K MH bet Fy bot D bet Nmm 6 4FH HC L' bet FV n D n D L' t B 0.Nmm Nmm WV L' bot 6 nn ( D L' ) t mm 198
MH MH 9.50 8.50 9.40 8.40 9.30 9.20 8.30 9.10 9.00 8.20 8.90 8.80 8.10 8.70 8.60 8.00 8.50 7.90 8.40 8.30 7.80 8.20 8.10 7.70 8.00 7.60 7.90 7.80 7.50 7.70 7.60 7.40 1 7.50 7.40 7.30 2 7.30 7.20 7.20
More informationN N 1,, N 2 N N N N N 1,, N 2 N N N N N 1,, N 2 N N N 8 1 6 3 5 7 4 9 2 1 12 13 8 15 6 3 10 4 9 16 5 14 7 2 11 7 11 23 5 19 3 20 9 12 21 14 22 1 18 10 16 8 15 24 2 25 4 17 6 13 8 1 6 3 5 7 4 9 2 1 12 13
More information1 発病のとき
A A 1944 19 60 A 1 A 20 40 2 A 4 A A 23 6 A A 13 10 100 2 2 360 A 19 2 5 A A A A A TS TS A A A 194823 6 A A 23 A 361 A 3 2 4 2 16 9 A 7 18 A A 16 4 16 3 362 A A 6 A 6 4 A A 363 A 1 A A 1 A A 364 A 1 A
More information66 σ σ (8.1) σ = 0 0 σd = 0 (8.2) (8.2) (8.1) E ρ d = 0... d = 0 (8.3) d 1 NN K K 8.1 d σd σd M = σd = E 2 d (8.4) ρ 2 d = I M = EI ρ 1 ρ = M EI ρ EI
65 8. K 8 8 7 8 K 6 7 8 K 6 M Q σ (6.4) M O ρ dθ D N d N 1 P Q B C (1 + ε)d M N N h 2 h 1 ( ) B (+) M 8.1: σ = E ρ (E, 1/ρ ) (8.1) 66 σ σ (8.1) σ = 0 0 σd = 0 (8.2) (8.2) (8.1) E ρ d = 0... d = 0 (8.3)
More informationF8302D_1目次_160527.doc
N D F 830D.. 3. 4. 4. 4.. 4.. 4..3 4..4 4..5 4..6 3 4..7 3 4..8 3 4..9 3 4..0 3 4. 3 4.. 3 4.. 3 4.3 3 4.4 3 5. 3 5. 3 5. 3 5.3 3 5.4 3 5.5 4 6. 4 7. 4 7. 4 7. 4 8. 4 3. 3. 3. 3. 4.3 7.4 0 3. 3 3. 3 3.
More information9 5 ( α+ ) = (α + ) α (log ) = α d = α C d = log + C C 5. () d = 4 d = C = C = 3 + C 3 () d = d = C = C = 3 + C 3 =
5 5. 5.. A II f() f() F () f() F () = f() C (F () + C) = F () = f() F () + C f() F () G() f() G () = F () 39 G() = F () + C C f() F () f() F () + C C f() f() d f() f() C f() f() F () = f() f() f() d =
More information1 2 http://www.japan-shop.jp/ 3 4 http://www.japan-shop.jp/ 5 6 http://www.japan-shop.jp/ 7 2,930mm 2,700 mm 2,950mm 2,930mm 2,950mm 2,700mm 2,930mm 2,950mm 2,700mm 8 http://www.japan-shop.jp/ 9 10 http://www.japan-shop.jp/
More information1 911 34/ 22 1012 2/ 20 69 3/ 22 69 1/ 22 69 3/ 22 69 1/ 22 68 3/ 22 68 1/ 3 8 D 0.0900.129mm 0.1300.179mm 0.1800.199mm 0.1000.139mm 0.1400.409mm 0.4101.199mm 0.0900.139mm 0.1400.269mm 0.2700.289mm
More information液晶ディスプレイ取説TD-E432/TD-E502/TD-E552/TD-E652/TD-E432D/TD-E502D
1 2 3 4 5 6 7 1 2 3 4 5 6 7 2 2 2 1 1 2 9 10 11 12 13 14 15 16 17 1 8 2 3 4 5 6 7 1 2 3 4 5 6 7 8 9 10 9 11 12 13 13 14 15 16 17 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 1 2 3 4 5 6 7 8 9 11 12
More information1 1 36 223 42 14 92 4 3 2 1 4 3 4 3429 13536 5 6 7 8 9 2.4m/ (M) (M) (M) (M) (M) 6.67.3 6.57.2 6.97.6 7.27.8 8.4 5 6 5 6 5 5 74 1,239 0 30 21 ( ) 1,639 3,898 0 1,084 887 2 5 0 2 2 4 22 1 3 1 ( :) 426 1500
More information1 C 2 C 3 C 4 C 1 C 2 C 3 C
1 e N >. C 40 41 2 >. C 3 >.. C 26 >.. C .mm 4 C 106 e A 107 1 C 2 C 3 C 4 C 1 C 2 C 3 C 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124
More information平成24年財政投融資計画PDF出後8/016‐030
24 23 28,707,866 2,317,737 26,390,129 29,289,794 2,899,665 24 23 19,084,525 21,036,598 1952,073 24 23 8,603,613 8,393,427 967,631 925,404 202,440 179,834 217,469 219,963 66,716 64,877 3,160,423 2,951,165
More information[mm] [mm] [mm] 70 60 50 40 30 20 10 1H 0 18 19 20 21 22 23 24 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 1 2 3 4 5 6 7 8 9 10 11 12 60 50 40 30 20 10 0 18 19 20 21 22 23 24 1 2 3 4
More information第18回海岸シンポジウム報告書
2011.6.25 2011.6.26 L1 2011.6.27 L2 2011.7.6 2011.12.7 2011.10-12 2011.9-10 2012.3.9 23 2012.4, 2013.8.30 2012.6.13 2013.9 2011.7-2011.12-2012.4 2011.12.27 2013.9 1m30 1 2 3 4 5 6 m 5.0m 2.0m -5.0m 1.0m
More information000-.\..
1 1 1 2 3 4 5 6 7 8 9 e e 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 10mm 150mm 60mm 25mm 40mm 30mm 25 26 27 1 28 29 30 31 32 e e e e e e 33 e 34 35 35 e e e e 36 37 38 38 e e 39 e 1 40 e 41 e 42 43
More information(1519) () 1 ( ) () 1 ( ) - 1 - - 2 - (1531) (25) 5 25,000 (25) 5 30,000 25,000 174 3 323 174 3 323 (1532) () 2 () 2-3 - - 4 - (1533) () 1 (2267)204 () (1)(2) () 1 (2267)204 () (1)(2) (3) (3) 840,000 680,000
More informationlim lim lim lim 0 0 d lim 5. d 0 d d d d d d 0 0 lim lim 0 d
lim 5. 0 A B 5-5- A B lim 0 A B A 5. 5- 0 5-5- 0 0 lim lim 0 0 0 lim lim 0 0 d lim 5. d 0 d d d d d d 0 0 lim lim 0 d 0 0 5- 5-3 0 5-3 5-3b 5-3c lim lim d 0 0 5-3b 5-3c lim lim lim d 0 0 0 3 3 3 3 3 3
More information1 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 ( ) ( ) ( ) 31 32 ( ) ( ) 33 34 35 36 37 38 39 40 41 42 43 44 ) i ii i ii 45 46 47 2 48 49 50 51 52 53 54 55 56 57 58
More informationuntitled
i ii (1) (1) (2) (1) (3) (1) (1) (2) (1) (3) (1) (1) (2) (1) (3) (2) (3) (1) (2) (3) (1) (1) (1) (1) (2) (1) (3) (1) (2) (1) (3) (1) (1) (1) (2) (1) (3) (1) (1) (2) (1) (3)
More information23 15961615 1659 1657 14 1701 1711 1715 11 15 22 15 35 18 22 35 23 17 17 106 1.25 21 27 12 17 420,845 23 32 58.7 32 17 11.4 71.3 17.3 32 13.3 66.4 20.3 17 10,657 k 23 20 12 17 23 17 490,708 420,845 23
More information平成18年度「商品先物取引に関する実態調査」報告書
... 1.... 5-1.... 6-2.... 9-3.... 10-4.... 12-5.... 13-6.... 15-7.... 16-8.... 17-9.... 20-10.... 22-11.... 24-12.... 27-13... 29-14.... 32-15... 37-16.... 39-17.... 41-18... 43-19... 45.... 49-1... 50-2...
More information( ) 2.1. C. (1) x 4 dx = 1 5 x5 + C 1 (2) x dx = x 2 dx = x 1 + C = 1 2 x + C xdx (3) = x dx = 3 x C (4) (x + 1) 3 dx = (x 3 + 3x 2 + 3x +
(.. C. ( d 5 5 + C ( d d + C + C d ( d + C ( ( + d ( + + + d + + + + C (5 9 + d + d tan + C cos (sin (6 sin d d log sin + C sin + (7 + + d ( + + + + d log( + + + C ( (8 d 7 6 d + 6 + C ( (9 ( d 6 + 8 d
More information競技スポーツの科学研究 ~ アトランタ五輪を終えて ~ 新潟大学・山崎 健
1997 3 1998 12 sin cos 1997 3 1998 12 1997 3 1998 12 1997 3 1998 12 4 1997 3 1998 12 1964!? 100m 94 100m 100mH 10 100m 1964 1997 3 1998 12 1996 100m 7 0.174 0.14 9 84 1988 200m 25m 1986 1997 3 1998 12
More informationcm H.11.3 P.13 2 3-106-
H11.3 H.11.3 P.4-105- cm H.11.3 P.13 2 3-106- 2 H.11.3 P.47 H.11.3 P.27 i vl1 vl2-107- 3 h vl l1 l2 1 2 0 ii H.11.3 P.49 2 iii i 2 vl1 vl2-108- H.11.3 P.50 ii 2 H.11.3 P.52 cm -109- H.11.3 P.44 S S H.11.3
More informationChap10.dvi
=0. f = 2 +3 { 2 +3 0 2 f = 1 =0 { sin 0 3 f = 1 =0 2 sin 1 0 4 f = 0 =0 { 1 0 5 f = 0 =0 f 3 2 lim = lim 0 0 0 =0 =0. f 0 = 0. 2 =0. 3 4 f 1 lim 0 0 = lim 0 sin 2 cos 1 = lim 0 2 sin = lim =0 0 2 =0.
More information1 1 x y = y(x) y, y,..., y (n) : n y F (x, y, y,..., y (n) ) = 0 n F (x, y, y ) = 0 1 y(x) y y = G(x, y) y, y y + p(x)y = q(x) 1 p(x) q(
1 1 y = y() y, y,..., y (n) : n y F (, y, y,..., y (n) ) = 0 n F (, y, y ) = 0 1 y() 1.1 1 y y = G(, y) 1.1.1 1 y, y y + p()y = q() 1 p() q() (q() = 0) y + p()y = 0 y y + py = 0 y y = p (log y) = p log
More information, 1 ( f n (x))dx d dx ( f n (x)) 1 f n (x)dx d dx f n(x) lim f n (x) = [, 1] x f n (x) = n x x 1 f n (x) = x f n (x) = x 1 x n n f n(x) = [, 1] f n (x
1 1.1 4n 2 x, x 1 2n f n (x) = 4n 2 ( 1 x), 1 x 1 n 2n n, 1 x n n 1 1 f n (x)dx = 1, n = 1, 2,.. 1 lim 1 lim 1 f n (x)dx = 1 lim f n(x) = ( lim f n (x))dx = f n (x)dx 1 ( lim f n (x))dx d dx ( lim f d
More information1 (1) ( i ) 60 (ii) 75 (iii) 315 (2) π ( i ) (ii) π (iii) 7 12 π ( (3) r, AOB = θ 0 < θ < π ) OAB A 2 OB P ( AB ) < ( AP ) (4) 0 < θ < π 2 sin θ
1 (1) ( i ) 60 (ii) 75 (iii) 15 () ( i ) (ii) 4 (iii) 7 1 ( () r, AOB = θ 0 < θ < ) OAB A OB P ( AB ) < ( AP ) (4) 0 < θ < sin θ < θ < tan θ 0 x, 0 y (1) sin x = sin y (x, y) () cos x cos y (x, y) 1 c
More informationø12, ø16, ø20, ø25, ø32, ø40, ø50, ø63, ø80, ø100 CQ2 Series CQ2 B B CDQ2 D F C M D ø ø ø D M9BW ø ø ø ø TN TF F H S n B A L LC F G D ø ø
ø, ø, ø, ø, ø, ø, ø, ø, ø, ø Series 30 30 F C ø ø ø 9W øø øø TN TF F H S n C F G øø øø 30 W Z Z Z øø øø øø V W øø 96V 93V 90V 96 93 90 9NV 9PV 9V 9NWV 9PWV 9WV 9NV 9PV 9V 9N 9P 9 9NW 9PW 9W 9N 9P 9 P3W
More information0
5 A 1944 19 60 1944 19 2 5 A A A 4 B 1945 20 59 B 3 B B 24 C 1943 18 60 C 8 D 1949 24 55 D 3 E 1932 7 71 E 11 8 E E 5 C C 8 C 2 C 4 D 2 E A B 341 A C A A C E E E B 342 B B C C 5 D 3 D 41 11 343 C C C A
More informationuntitled
Web - - - - - - - - - - - - - - - - () () () sin θ,cosθ, tanθ () 3 5 () 4 () 12 5 r y 13 x x = r cosθ () y = r sinθ y = x tanθ P P () () A C 2,24 C -9- -10- -11- -12- 9 9 10 10-13- 4 4 4 1 0.5 4 10 30
More informationdvipsj.8449.dvi
9 1 9 9.1 9 2 (1) 9.1 9.2 σ a = σ Y FS σ a : σ Y : σ b = M I c = M W FS : M : I : c : = σ b
More informationuntitled
( ) 200133 3 3 3 3, 7 347 57 10 i ii iii -1- -2- -3- -4- 90011001700mm -5- 4.2 1991 73.5 44.4 7.4 10.5 10.5 7.4 W 3 H 2.25 H 2.25 7.4 51.8 140.6 88.8 268.8m 5,037.9m 2 2mm 16cm916cm 10.5 W 3 H 2.25 62.8
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 information.. p.2/5
IV. p./5 .. p.2/5 .. 8 >< >: d dt y = a, y + a,2 y 2 + + a,n y n + f (t) d dt y 2 = a 2, y + a 2,2 y 2 + + a 2,n y n + f 2 (t). d dt y n = a n, y + a n,2 y 2 + + a n,n y n + f n (t) (a i,j ) p.2/5 .. 8
More information表1-表4_No78_念校.indd
mmmmmmmmmmmmmmmmmmmmmmmmmmmmmmmmm mmmmmmmmmmmmmmmmmmmmmmmmmmmmmmmmm Fs = tan + tan. sin(1.5) tan sin. cos Fs ccccccccccccccccccccccccccccccccccccccccccccccccccccccccccccc ccccccccccccccccccccccccccccccccccccccccccccccccccccccccccccc
More information38
3 37 38 3.1. 3.1.1. 3.1-1 2005 12 5 7 2006 5 31 6 2 2006 8 10 11 14 2006 10 18 20 3.1-1 9 00 17 3 3.1.2. 3.1-2 3.1-1 9 9 3.1-2 M- M-2 M-3 N- N-2 N-3 S- S-2 S-3 3.1.2.1. 25 26 3.1.2.2. 3.1-3 25 26 39 3.1-1
More information70 : 20 : A B (20 ) (30 ) 50 1
70 : 0 : A B (0 ) (30 ) 50 1 1 4 1.1................................................ 5 1. A............................................... 6 1.3 B............................................... 7 8.1 A...............................................
More information10 117 5 1 121841 4 15 12 7 27 12 6 31856 8 21 1983-2 - 321899 12 21656 2 45 9 2 131816 4 91812 11 20 1887 461971 11 3 2 161703 11 13 98 3 16201700-3 - 2 35 6 7 8 9 12 13 12 481973 12 2 571982 161703 11
More information0226_ぱどMD表1-ol前
No. MEDIA DATA 0 B O O K 00-090-0 0 000900 000 00 00 00 0000 0900 000900 AREA MAP 0,000 0,000 0,000 0,000 00,000 0,000 0,000 0,000 0,000 0,000 0,000 0,000 0,000 0,000 0,000 0,000 0,000 0,000 00,000 0,000
More information- II
- II- - -.................................................................................................... 3.3.............................................. 4 6...........................................
More information0.45m1.00m 1.00m 1.00m 0.33m 0.33m 0.33m 0.45m 1.00m 2
24 11 10 24 12 10 30 1 0.45m1.00m 1.00m 1.00m 0.33m 0.33m 0.33m 0.45m 1.00m 2 23% 29% 71% 67% 6% 4% n=1525 n=1137 6% +6% -4% -2% 21% 30% 5% 35% 6% 6% 11% 40% 37% 36 172 166 371 213 226 177 54 382 704 216
More information1 (1) (2)
1 2 (1) (2) (3) 3-78 - 1 (1) (2) - 79 - i) ii) iii) (3) (4) (5) (6) - 80 - (7) (8) (9) (10) 2 (1) (2) (3) (4) i) - 81 - ii) (a) (b) 3 (1) (2) - 82 - - 83 - - 84 - - 85 - - 86 - (1) (2) (3) (4) (5) (6)
More information10 44 1.2 5 4 5 3 6-1 - 1 2 3 4 5 1 2 3 4 5 6 7 8 1 2 3 4 5 6 7 8 9 10 TEL TEL 1 2 TEL FAX TEL FAX TEL FAX 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 1 2 3 4 5 6 ( ) ( ) 2
More information= M + M + M + M M + =.,. f = < ρ, > ρ ρ. ρ f. = ρ = = ± = log 4 = = = ± f = k k ρ. k
7 b f n f} d = b f n f d,. 5,. [ ] ɛ >, n ɛ + + n < ɛ. m. n m log + < n m. n lim sin kπ sin kπ } k π sin = n n n. k= 4 f, y = r + s, y = rs f rs = f + r + sf y + rsf yy + f y. f = f =, f = sin. 5 f f =.
More information- 2 -
- 2 - - 3 - (1) (2) (3) (1) - 4 - ~ - 5 - (2) - 6 - (1) (1) - 7 - - 8 - (i) (ii) (iii) (ii) (iii) (ii) 10 - 9 - (3) - 10 - (3) - 11 - - 12 - (1) - 13 - - 14 - (2) - 15 - - 16 - (3) - 17 - - 18 - (4) -
More information2 1980 8 4 4 4 4 4 3 4 2 4 4 2 4 6 0 0 6 4 2 4 1 2 2 1 4 4 4 2 3 3 3 4 3 4 4 4 4 2 5 5 2 4 4 4 0 3 3 0 9 10 10 9 1 1
1 1979 6 24 3 4 4 4 4 3 4 4 2 3 4 4 6 0 0 6 2 4 4 4 3 0 0 3 3 3 4 3 2 4 3? 4 3 4 3 4 4 4 4 3 3 4 4 4 4 2 1 1 2 15 4 4 15 0 1 2 1980 8 4 4 4 4 4 3 4 2 4 4 2 4 6 0 0 6 4 2 4 1 2 2 1 4 4 4 2 3 3 3 4 3 4 4
More information() 2
1 () 2 2 4 3 6,500 4 5 2 6 A B A B A B A B - A B 7 8 A B A B A B 9 JR JR 10 11 6 5 12 17 6 13 14 B A A B A B A B 2 1 8 15 8 16 17 9 18 3 4 5 mm mm 19 2 20 3 6 7 11 12 13 14 18 4 3 2 1 21 3 12 13 14 16
More information20 15 14.6 15.3 14.9 15.7 16.0 15.7 13.4 14.5 13.7 14.2 10 10 13 16 19 22 1 70,000 60,000 50,000 40,000 30,000 20,000 10,000 0 2,500 59,862 56,384 2,000 42,662 44,211 40,639 37,323 1,500 33,408 34,472
More information() n C + n C + n C + + n C n n (3) n C + n C + n C 4 + n C + n C 3 + n C 5 + (5) (6 ) n C + nc + 3 nc n nc n (7 ) n C + nc + 3 nc n nc n (
3 n nc k+ k + 3 () n C r n C n r nc r C r + C r ( r n ) () n C + n C + n C + + n C n n (3) n C + n C + n C 4 + n C + n C 3 + n C 5 + (4) n C n n C + n C + n C + + n C n (5) k k n C k n C k (6) n C + nc
More informationI? 3 1 3 1.1?................................. 3 1.2?............................... 3 1.3!................................... 3 2 4 2.1........................................ 4 2.2.......................................
More information岩手県2012-初校.indd
http://www.kairyudo.co.jp/ 2012 IWATE 2 3 4 16 1 2 3 2 14 165.6 165.2 55.2 54.3 88.6 88.1 cm kg cm 13 160.1 159.7 50.1 49.1 85.1 84.9 12 153.5 152.5 46.3 44.2 81.9 81.3 13 155.4 154.9 48.9 47.3 84.2 83.7
More informationLaVie Tab PC-TE510N1B スタートアップガイド
PC-TE510N1B 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 31 32 33 34 35 36 37 2.4FH1 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 1 53 1 2 54 55 1 2 3 4 56 5 1 2 3 4 5
More informationDocuPrint C5450 ユーザーズガイド
1 2 3 4 5 6 7 8 1 10 1 11 1 12 1 13 1 14 1 15 1 16 17 1 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 27 1 1 28 1 29 1 30 1 31 1 2 12 13 3 2 10 11 4 9 8 7 6 5 34 24 23 14 15 22 21 20 16 19 18 17 2 35
More informationuntitled
1 1 1. 2. 3. 2 2 1 (5/6) 4 =0.517... 5/6 (5/6) 4 1 (5/6) 4 1 (35/36) 24 =0.491... 0.5 2.7 3 1 n =rand() 0 1 = rand() () rand 6 0,1,2,3,4,5 1 1 6 6 *6 int() integer 1 6 = int(rand()*6)+1 1 4 3 500 260 52%
More informationChap9.dvi
.,. f(),, f(),,.,. () lim 2 +3 2 9 (2) lim 3 3 2 9 (4) lim ( ) 2 3 +3 (5) lim 2 9 (6) lim + (7) lim (8) lim (9) lim (0) lim 2 3 + 3 9 2 2 +3 () lim sin 2 sin 2 (2) lim +3 () lim 2 2 9 = 5 5 = 3 (2) lim
More informationさくらの個別指導 ( さくら教育研究所 ) A 2 2 Q ABC 2 1 BC AB, AC AB, BC AC 1 B BC AB = QR PQ = 1 2 AC AB = PR 3 PQ = 2 BC AC = QR PR = 1
... 0 60 Q,, = QR PQ = = PR PQ = = QR PR = P 0 0 R 5 6 θ r xy r y y r, x r, y x θ x θ θ (sine) (cosine) (tangent) sin θ, cos θ, tan θ. θ sin θ = = 5 cos θ = = 4 5 tan θ = = 4 θ 5 4 sin θ = y r cos θ =
More information:30 100m 4 3 (2 ) 5 (3 ) 7 (1 ) 16 OB OG m 200m (2 ) m (1 ) 4 (3 ) 2m m 10:35 100m 3 (3 ) 5 OB OG (1
2003 10 1 1 1.1............ 1 1.2............ 2 1.3.......... 2 1.4.............. 2 1.5.............. 7 1.6.............. 10 2 11 100m,200m 200m 21 2.1............ 11 2m A 1 2.2.... 11 1500m 3 1 14m15
More information2
1 12123456789012345678901234 12123456789012345678901234 12123456789012345678901234 12123456789012345678901234 12123456789012345678901234 12123456789012345678901234 12123456789012345678901234 12123456789012345678901234
More information(1) 3 A B E e AE = e AB OE = OA + e AB = (1 35 e ) e OE z 1 1 e E xy e = 0 e = 5 OE = ( 2 0 0) E ( 2 0 0) (2) 3 E P Q k EQ = k EP E y 0
(1) 3 A B E e AE = e AB OE = OA + e AB = (1 35 e 0 1 15 ) e OE z 1 1 e E xy 5 1 1 5 e = 0 e = 5 OE = ( 2 0 0) E ( 2 0 0) (2) 3 E P Q k EQ = k EP E y 0 Q y P y k 2 M N M( 1 0 0) N(1 0 0) 4 P Q M N C EP
More information2 7 V 7 {fx fx 3 } 8 P 3 {fx fx 3 } 9 V 9 {fx fx f x 2fx } V {fx fx f x 2fx + } V {{a n } {a n } a n+2 a n+ + a n n } 2 V 2 {{a n } {a n } a n+2 a n+
R 3 R n C n V??,?? k, l K x, y, z K n, i x + y + z x + y + z iv x V, x + x o x V v kx + y kx + ky vi k + lx kx + lx vii klx klx viii x x ii x + y y + x, V iii o K n, x K n, x + o x iv x K n, x + x o x
More information1.... 1 1.1.... 1 1.2.... 1 1.3.... 1 1.3.1.... 1 2.... 3 2.1.... 3 2.2.... 5 3.... 5 3.1.... 5 3.2.... 6 3.2.1.... 6 3.2.2.... 7 3.2.3.... 8 3.2.4.... 8 3.2.5.... 8 3.2.6.... 8 3.3.... 9 3.3.1.... 9 3.3.2....
More informationa a b a b c d e R c d e A a b e a b a b c d a b c d e f a M a b f d a M b a b a M b a M b M M M R M a M b M c a M a R b A a b b a CF a b c a b a M b a b M a M b c a A b a b M b a A b a M b C a M C a M
More informationuntitled
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 informationLaVie Tab 安全上のご注意・サポートガイド PC-TS708T1W
PC-TS708T1W 2 3 4 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 31 32 33 34 35 36 37 38 39 40 2.4FH4 41 42 43 44 45 46 47 48 1 1 2 49 50 51 52 53 54 55 56 57 58 59 1 60 2 61
More information