学習内容と日常生活との関連性の研究-第2部-第6章
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5 2000 BSE CJD CJD CJD
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9 GRS X,Y,Z X,Y,Z X,Y,Z X(N) cos() cos() Y(N) cos() sin() ZN+(1e 2 ) sin() e 2 f 2f Na1e 2 sin 2 () m GRS80 f a m GRS80 a f[ ] 386
10 (2004) CD-ROM Web (2002) 387
11 GPS GPSGlobal Positioning System 1,000 GPS GPS xyz iabc jxyz L = ( x j A) + ( y j B) + ( z j C) + c dti + c dt j L c dti dtj LA2 A1 LA2 B2 xyz GPS km mm cm 388
12 A B LA2 LA1 LB1 LB2 xyz - (xyz) GPS (2001) GPS GPS pp (2003) GPS GPS pp
13 II GPS 1 COS GPS 390
14 N () 391
15 GPS GPSGlobal Positioning System GPS GPS GPS GPS xyz dt ABC L c ( x A) + ( y B) + ( z C) + c dt L = m m 24 GPS GPS 392
16 A2B2C2 A3B3C3 L2 L3 A1B1C1 L1 L4 A4B4C4 xyz (xyz) dt (2001) GPS GPS pp (2003) GPS GPS pp
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20 (1) (2) (3) 397
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22 LCR LCR 399
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26 403
27 A A = A A 0.9 α A A A n 0 = A1 A0 = A2 A0 = A α = A 0.9 α = A ( 1 n 0.9 α ) A 0 3 A α 0.9 α A A = A A 1 2 = A A = A A n = A ( 1 β ) ( 1 β ) = A0 ( 1 β ) ( 1 β ) = A0 ( 1 β ) ( 1 β ) n A 404
28 URL: URL: 405
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31 W [t] L [t/year] D [t/year] M [t] C [t/t]t MCD t L D = dm dt M = C W D C k D / W = k C dc / dt = L / W k C b C = L / k W 1 b exp kt { ( )} { ( )} 408
32 L [t/year] W [t] M [t] C [t/t] D [t/year] C () t () 409
33 A B A B Pfd B A A T T 0 P dp dp = ( 1 P) λ dt = λ dt 1 P ( ) T λt log e ( 1 P) = λ dt P = 1 e λt ( λ) 0 1 P 1 = λt 2 410
34 2 3 n x x x x x e = ! 2! 3! n! e = ( x = 1) = ! 2! 3! n! λ 1 e x λx 411
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41 NC 1952 NC: Numerical Control NC 418
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43 B A r ax,ay,az B r = bx,by,bz A r B r = A B cos 420
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50 [mm] 427
51 r r r a = ( a1, a 2 ), b = ( b1, b2 ) a b r = a1b1 + a2b2 428
52 A1 A2 A3 A4 A5 A6 B1 B2 B3 B4 B5 B6 A1 A2 A3 A4 A5 A6 B1 B2 B3 B4 B5 B6 429
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55 A B C () () A B C () A B C () A B C a a a a a a a a a w1 w w2 = λ w w3 w w1w2w3 w1w2w =
56 a a a a a a a a a a a a a a a a = = = = = = λ λ λ λ b a b a b a b a
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58 [-] [g] 435
59 436 = (0) 1 (0) 21 (0) 11 M M X n X X = (1) 1 (1) 21 (1) 11 M M A X X X n = = (2) 1 (2) 21 (2) 11 M M M A A A X X X n ( ) = A I A A A I m L ( ) = = = ) ( n m m A I A A A I A A A β β β M M M L M L M M M
60 ( I A) ( I A) 1 to from 1 2 X j 1 [ X ij ] 1 2 X X X n1 X X X n2 X 1 n X 2 n X X 1 X 2 X n 2 [ a ij ] = [ A] 1 2 nn 1 2 a 11 a 21 a n1 a 12 a 22 a n2 a 1 n a 2 n a nn a ij = X ij X 3 [ θ ] = [ I A] j ij a 11 a 21 a n1 a 12 1 a 22 a n2 a 1n a 2n 1 a nn 4 [ ] [ ] 1 [ ] 1 β = = I A ij θ ij β 11 β 21 β n1 β 12 β 22 β n2 β 1n β 2n β nn 437
61 y=ax+b 2 X Y a b 2 3 xi[g] yi[cm] i=1n y=ax+b a b 2 2 ( ) ( ) 2 ( ) 2 E = ax + b y + ax + b y + L + ax + b y N N a,b E E = 2{ ( ax1 + b y1 ) x1 + L+ ( axn + b y N ) xn } = 0 = 2{ ( ax1 + b y1 ) + L+ ( axn + b y N )} = 0 a b 2 2 ( x + L + xn ) + b( x1 + L + xn ) = x1 y1 + L xn y N a + a x + + x + b N = y + L+ y 1 L 1 1 ( N ) N 438
62 y x y (x3,y3) (x6,y6) (x2,y2) (x1,y1) (x4,y4) (x5,y5) x y (x6,y6) (x3,y3) (x2,y2) (x4,y4) (x5,y5) (x1,y1) x 439
63 x1 x2 A B Z=a1x1+a2x2 A B A B a1 a2 x1 x2 440
64 x2 Z=a1x1+a2x2 x1 441
65 C A / /3 / /27 0 6/ / / /27 1/ / = / / / =
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