2 Part A B C A > B > C (0) 90, 69, 61, 68, 6, 77, 75, 20, 41, 34 (1) 8, 56, 16, 50, 43, 66, 44, 77, 55, 48 (2) 92, 74, 56, 81, 84, 86, 1, 27,
|
|
- うまじ いんそん
- 5 years ago
- Views:
Transcription
1 / (1) (2) (3) (4) (0) (10) 11 (10) (a) (b) (c) (5)
2 2 Part A B C A > B > C (0) 90, 69, 61, 68, 6, 77, 75, 20, 41, 34 (1) 8, 56, 16, 50, 43, 66, 44, 77, 55, 48 (2) 92, 74, 56, 81, 84, 86, 1, 27, 84, 56 (3) 89, 3, 82, 97, 54, 57, 5, 94, 8, 74 (4) 38, 14, 40, 100, 55, 25, 3, 78, 30, 14 (5) 36, 43, 74, 13, 59, 11, 9, 58, 92, 98 (6) 21, 62, 31, 13, 99, 82, 56, 90, 11, 57 (7) 3, 88, 40, 13, 38, 9, 41, 98, 58, 100 (8) 30, 1, 86, 86, 78, 48, 39, 94, 100, 84 (9) 20, 4, 66, 77, 100, 44, 25, 54, 25, 26 (10) 45, 4, 52, 74, 49, 25, 31, 91, 79, (0) 8, 5, 4, 20, 8, 15, 7, 1, 19, 4, 11, 9, 94, 3, 8, 0, 0, 19, 17, 14, 6, 4, 4 (1) 2, 2, 17, 8, 18, 9, 13, 17, 96, 14, 3, 6, 1, 7, 16, 9, 6, 9, 14, 11 (2) 4, 12, 2, 7, 5, 2, 12, 2, 2, 0, 18, 19, 3, 6, 9, 15, 110, 200, 18, 13, 20, 6 (3) 8, 11, 20, 5, 17, 6, 11, 9, 8, 5, 11, 9, 3, 1, 0, 15, 14, 19, 8, 1, 38 (4) 8, 1, 17, 10, 13, 12, 53, 2, 1, 1, 0, 72, 98, 17, 17, 15, 11, 12, 9, 4, 1, 4 (5) 0, 0, 0, 13, 20, 10, 1, 8, 3, 19, 13, 11, 10, 8, 0, 0, 0, 4, 1, 20, 18, 9, 15, 15, 15 (6) 14, 8, 16, 10, 17, 7, 18, 13, 17, 7, 11, 18, 18, 5, 55, 14, 12, 4, 9, 9 (7) 12, 13, 1, 13, 12, 20, 3, 5, 9, 5, 1, 19, 20, 16, 19, 12, 16, 8, 20, 9, 2, 1, 3 (8) 3, 16, 15, 14, 57, 19, 15, 8, 18, 11, 0, 14, 17, 5, 5, 7, 6, 20, 17, 4, 2 (9) 1, 9, 10, 13, 1, 16, 3, 6, 18, 14, 2, 15, 20, 3, 12, 3, 13, 2, 7, 14 (10) 3, 15, 10, 11, 3, 20, 17, 12, 0, 8, 7, 8, 12, 15, 7, 9, 7, 6, 13, 6, (0) (1) (2) (3) (4) (5) (6) (7) (8) (9) (10)
3 (0) 82, 115, 136, 196, 24, 33, 64, 66, 16, 13 (1) 95, 34, 106, 18, 43, 193, 118, 134, 54, 153 (2) 78, 182, 176, 73, 3, 25, 78, 195, 32, 198 (3) 28, 47, 119, 174, 15, 195, 3, 22, 87, 176 (4) 40, 20, 60, 43, 134, 192, 190, 23, 93, 104 (5) 118, 100, 125, 173, 177, 156, 146, 80, 83, 50 (6) 37, 148, 11, 111, 146, 42, 156, 128, 125, 115 (7) 42, 96, 40, 59, 171, 67, 170, 3, 135, 177 (8) 66, 73, 141, 143, 101, 179, 124, 155, 82, 134 (9) 61, 42, 72, 57, 165, 123, 103, 60, 171, 14 (10) 30, 64, 168, 71, 124, 159, 115, 12, 87, (0) 21, 18, 47, 94, 90, 82, 20, 39, 65, 74, 19, 60, 56, 54, 19, 20, 77, 86, 48, 87, 50, 79, 46, 71, 11 (1) 90, 30, 22, 78, 80, 39, 82, 81, 46, 55, 96, 74, 70, 22, 58, 68, 91, 75, 79, 18, 89, 16, 84, 32, 27 (2) 24, 95, 96, 99, 45, 25, 62, 48, 17, 55, 28, 80, 29, 63, 78, 14, 98, 33, 75, 51, 59, 74, 52, 25, 25 (3) 46, 52, 85, 37, 29, 76, 59, 96, 29, 41, 90, 96, 46, 85, 32, 46, 13, 74, 21, 95, 97, 67, 29, 90, 63 (4) 87, 85, 93, 69, 25, 56, 54, 37, 96, 30, 57, 46, 55, 40, 70, 34, 33, 99, 28, 52, 58, 98, 91, 16, 37 (5) 84, 37, 89, 18, 38, 10, 67, 35, 48, 59, 72, 33, 27, 36, 71, 23, 50, 24, 73, 36, 83, 48, 22, 30, 80 (6) 15, 28, 31, 35, 17, 28, 27, 25, 50, 90, 22, 35, 63, 28, 37, 47, 16, 97, 41, 34, 15, 36, 34, 37, 91 (7) 36, 57, 26, 64, 48, 21, 99, 11, 59, 33, 49, 15, 39, 43, 67, 26, 53, 36, 52, 66, 97, 65, 19, 34, 91 (8) 11, 52, 54, 90, 65, 95, 36, 85, 50, 35, 32, 72, 62, 91, 17, 85, 34, 13, 57, 25, 54, 53, 90, 56, 46 (9) 53, 79, 17, 17, 93, 37, 10, 62, 92, 20, 61, 57, 89, 77, 91, 24, 65, 40, 70, 25, 13, 77, 19, 33, 19 (10) 48, 34, 11, 35, 84, 77, 87, 75, 35, 85, 45, 78, 11, 63, 21, 48, 86, 42, 15, 63, 14, 54, 60, 91, (0) 6, 6, 7, 3, 9, 8, 8, 3, 7, 2, 4, 9, 6, 5, 10, 3, 10, 3 (1) 4, 3, 6, 7, 7, 7, 2, 8, 9, 10, 10, 5, 7, 8, 3, 5, 6, 9 (2) 4, 3, 10, 5, 7, 3, 4, 5, 8, 8, 5, 3, 3, 8, 9, 7, 4, 3 (3) 10, 8, 9, 8, 8, 4, 6, 4, 3, 9, 3, 9, 6, 1, 2, 3, 6, 3 (4) 7, 1, 6, 2, 10, 4, 6, 7, 6, 3, 9, 6, 5, 5, 7, 3, 9, 2 (5) 5, 2, 9, 9, 8, 4, 8, 10, 4, 9, 7, 1, 5, 4, 9, 7, 6, 7 (6) 5, 5, 1, 3, 6, 6, 2, 5, 6, 8, 5, 7, 3, 2, 9, 8, 3, 2 (7) 6, 5, 9, 6, 6, 9, 5, 8, 6, 2, 5, 8, 3, 4, 6, 10, 4, 5 (8) 4, 6, 4, 7, 5, 8, 6, 5, 5, 6, 8, 2, 7, 5, 2, 9, 1, 8 (9) 5, 6, 8, 9, 2, 8, 1, 2, 4, 6, 8, 2, 7, 6, 9, 10, 10, 10 (10) 5, 4, 7, 5, 9, 6, 5, 2, 5, 8, 6, 2, 2, 5, 5, 8, 10, 3
4 (0) (1) (2) (3) (4) (5) (6) (7) (8) (9) (10)
5 , 2, 3, 4, 5 5 A A (0) (2) (4) (6) (8) (10) (1) (5) (7) (9) (3) Part n p n C k p k (1 p) n k (0) n = 6, 8, 1, p = 1/2 (1) n = 12, 13, 14, p = 1/2 (2) n = 13, 14, 15, p = 1/2 (3) n = 10, 15, 20, p = 1/2 (4) n = 2, 25, 3, p = 1/2 (5) n = 8, 9, 10, p = 1/2 (6) n = 7, 8, 9, p = 1/2 (7) n = 6, 7, 8, p = 1/2 (8) n = 6, 9, 12, p = 1/2 (9) n = 1, 2, 3, p = 1/2 (10) n = 5, 6, 7, p = 1/2
6 λ Po λ X X = 0, 1, 2, 3, 4, 5, 6, 7, 8 (0) λ = 2 (1) λ = 4 (2) λ = 1.5 (3) λ = 5 (4) λ = 3.1 (5) λ = 6 (6) λ = 4.1 (7) λ = 5 (8) λ = 6 (9) λ = 7 (10) λ = N(m, σ 2 ) X P (X a) P (X b) = 0.6 b (0) m = 450, σ = 6, a = 300 (1) m = 13, σ = 2.6, a = 18 (2) m = 800, σ = 15, a = 900 (3) m = 4, σ = 9, a = 24 (4) m = 80, σ = 5, a = 103 (5) m = 56, σ = 8, a = 72 (6) m = 45, σ = 1.4, a = 48 (7) m = 103, σ = 1, a = 100 (8) m = 3, σ = 7.2, a = 27 (9) m = 750, σ = 5, a = 800 (10) m = 10, σ = 1.5, a = (0) 32, 95, 89, 36, 69, 19, 45, 21, 45, 49, 91, 46, 76, 58, 48, 12, 78, 94, 11, 64 (1) 50, 71, 11, 16, 24, 66, 54, 47, 95, 40, 81, 60, 69, 44, 19, 62, 40, 36, 36, 49 (2) 23, 29, 71, 52, 26, 45, 66, 35, 46, 24, 31, 33, 52, 34, 19, 44, 63, 10, 13, 94 (3) 87, 17, 51, 47, 26, 47, 27, 34, 32, 65, 38, 83, 94, 12, 69, 58, 43, 43, 79, 32 (4) 38, 93, 61, 69, 26, 44, 98, 47, 49, 60, 84, 60, 92, 84, 67, 58, 51, 53, 64, 73 (5) 57, 16, 38, 44, 15, 39, 43, 39, 42, 42, 13, 58, 93, 16, 69, 34, 81, 87, 65, 33 (6) 28, 90, 26, 84, 37, 98, 61, 97, 46, 27, 98, 96, 77, 11, 54, 17, 57, 29, 64, 19 (7) 88, 78, 78, 74, 99, 37, 59, 94, 38, 41, 71, 41, 41, 56, 45, 67, 46, 86, 24, 57 (8) 67, 27, 22, 77, 52, 14, 75, 52, 45, 50, 80, 59, 36, 70, 27, 35, 64, 80, 52, 14 (9) 78, 91, 86, 70, 77, 45, 22, 42, 84, 24, 96, 59, 73, 75, 35, 36, 68, 79, 24, 59 (10) 19, 95, 39, 31, 55, 91, 96, 14, 71, 23, 54, 70, 53, 75, 68, 72, 81, 42, 19, 85
7 Cov[X, Y ] (0) 1, 2, 3, X Y (1) X Y (2) X Y (3) X Y (4) X Y (5) X Y (6) X Y (7) X Y (8) X Y (9) X Y (10) 1, 2, 3, X Y
8 8 Part (g 2 ) X P (X > 2.58) = 0.005, P (X > 2.32) = 0.01, P (X > 1.96) = 0.025, P (X > 1.64) = 0.05 (0) , 900.2, 898.3, 899.4, 900.2, 898.3, 899.1, (1) , 199.9, 200.4, 198.4, 199.1, 199.0, 200.5, (2) , 203.4, 198.5, 195.6, 200.5, 197.6, (3) , 99.8, 101.9, 98.3, 98.2, 98.4, 98.5, (4) , 403.4, 394.5, 395.6, 406.5, 391.6, (5) , 99.7, 99.6, 99.5, 100.1, 99.4, 99.3, (6) , 99.9, 99.7, 98.4, 99.6, 99.9, 100.3, (7) , 200.4, , 199.8, 200.1, 199.1, (8) , 301.4, 299.5, 299.6, 300.5, 299.6, (9) , 98.4, 101.9, 99.2, 98.3, 99.6, (10) , 299.4, 301.5, 297.6, 298.1, 299.2,
9 , 14, 15 t- A, B, C P (A > 2.160) = 0.025, P (B > 2.145) = 0.025, P (C > 2.131) = 0.025, P (A > 1.771) = 0.05, P (B > 1.761) = 0.05, P (C > 1.753) = (0) 50 38, 46, 21, 43, 79, 32, 38, 83, 54, 15, 92, 65, 37, 89, 79, 50, 28, 87 ( ) 50 (1) 15 57, 57, 60, 46, 67, 70, 50, 48, 30, 27, 79, 55, 64, 51, (2) 399, 388, 396, 397, 400, 401, 403, 399, 391, 391, 399, 398, 397, 401, (3) , 7.2, 7.6, 7.5, 7.8, 7.9, 7.0, 6.9, 7.7, 7.7, 7.0, 7.5, (4) 2 280, 274, 283, 292, 288, 285, 291, 250, 277, 274, 276, 262, 283, 285, (5) , 104, 88, 137, 202, 99, 153, 147, 103, 155, 221, 209, 199, 104( ) 100 (6) 14 80, 85, 71, 90, 87, 81, 83, 87, 100, 67, 78, 75, 80, (7) , 17, 21, 17, 18, 21, 21, 18, 21, 22, 16, 17, 23, 22, (8) 80, 75, 74, 73, 57, 73, 67, 72, 73, 73, 67, 64, 87, 89, (9) 99, 102, 103, 108, 109, 87, 103, 105, 103, 102, 102, 108, 103, 107, (10) 15 62, 76, 64, 63, 62, 76, 67, 61, 51, 71, 67, 68, 59, 55, 73 60
10 (a), (b) 10 X (0) (a) 142, 132, 141, 169, 80, 163, 142, 159, 112, 72 (b) 120, 158, 90, 139, 97, 185, 141, 123, 121, 162, 176, 136, 175, 186, 179, 91 (1) (a) 48, 29, 30, 60, 28, 37, 36, 17, 41, 59, 30, 40, 47, 49, 70 (b) 33, 25, 47, 37, 51, 48, 33, 58, 35, 35, 66, 29, 55, 43 (2) (a) 57, 68, 69, 80, 73, 72, 56, 42, 78 (b) 68, 70, 80, 82, 83, 85, 89, 90, 67, 98, 95 (3) (a) 87, 75, 57, 61, 63, 76, 47, 18, 57, 59, 60, 56, 51 (b) 79, 83, 84, 37, 67, 67, 78, 86, 78, 86 (4) (a) 53, 67, 66, 38, 78, 72, 35, 41, 22, 80 (b) 53, 54, 54, 46, 47, 58, 39, 89, 75, 72, 74 (5) (a) 30, 51, 67, 37, 67, 45, 63, 58, 39, 57 (b) 70, 86, 74, 66, 86, 48, 59, 68 (6) (a) 28, 37, 47, 57, 56, 58, 67, 78, 72, 74, 75 (b) 88, 84, 84, 37, 47, 56, 67, 63, 68, 75, 85 (7) (a) 103, 105, 70, 107, 130, 89, 68, 154, 103 (b) 102, 110, 103, 155, 103, 165, 130, 145 (8) (a) 109, 83, 102, 103, 82, 104, 105, 123, 72, 75, 157, 104, 103, 158, 160, 168 (b) 70, 154, 150, 104, 106, 106, 105, 125, 74, 107, 165, 169 (9) (a) 97, 80, 81, 87, 75, 87, 83, 72, 71, 90, 93, 95 (b) 89, 89, 85, 86, 85, 79, 88, 86, 77, 77, 93, 96, 93 (10) (a) 140, 139, 80, 73, 105, 162, 170, 157, 103, 140, 101, 139, 120, 102 (b) 192, 178, 173, 167, 138, 134, 180, 137, 156, 167
11 H 0 : 2.2 H 1 : H 1 (0) 59, 60, 61, 58, 65, 61, 59, 58, 59 (1) 89, 90, 87, 88, 87, 88, 89, 89, 88, 89 (2) 71, 73, 78, 74, 78, 74, 73, 76, 73, 71 (3) 56, 57, 58, 57, 57, 59, 57, 58, 56 (4) 109, 108, 107, 109, 108, 108, 110, 108, 109, 110 (5) 141, 143, 140, 142, 142, 142, 141, 142, 140 (6) 71, 70, 71, 70, 70, 71, 70, 71, 71, 71 (7) 13, 14, 15, 14, 13, 15, 14, 14, 15, 14 (8) 51, 53, 52, 53, 51, 50, 51, 52, 53, 52, 50 (9) 131, 139, 134, 139, 133, 133, 135 (10) 79, 78, 81, 78, 82, 80, 77, 78, 79 7, 8, 9, , 15.51, 16.92, (a) (b) (0) (a) 189, 178, 173, 182, 238, 197, 145, 193 (b) 209, 195, 238, 272, 251, 253, 265, 238, 255, 237 (1) (a) 102, 171, 110, 189, 182, 238, 157, 154, 103 (b) 209, 155, 138, 172, 201, 103, 165, 138, 155, 237 (2) (a) 137, 183, 185, 144, 133, 118, 180, 168 (b) 186, 205, 270, 243, 176, 149, 251, 203, 222 (3) (a) 57, 68, 69, 80, 78, 58, 58, 67, 39, 89 (b) 70, 68, 33, 43, 55, 90, 65, 98, 95 (4) (a) 87, 75, 57, 61, 67, 63, 76, 60, 56, 51 (b) 67, 67, 67, 96, 74, 84, 57, 67, 68, 69, 70, 50 (5) (a) 67, 65, 65, 65, 68, 22, 80 (b) 53, 54, 54, 46, 47, 58, 72, 74, 30 (6) (a) 30, 51, 67, 60, 31, 57, 67, 70, 57 (b) 71, 90, 73, 80, 64, 75, 80, 73 (7) (a) 98, 21, 77, 99, 47, 48, 99, 74, 75 (b) 56, 67, 39, 63, 68, 75, 72, 85 (8) (a) 170, 184, 185, 178, 171, 197 (b) 216, 225, 239, 248, 186, 226, 253 (9) (a) 203, 143, 208, 230, 221, 212 (b) 164, 203, 180, 177, 166, 167 (10) (a) 48, 29, 30, 30, 28, 37, 36, 17, 41, 59, 69, 30, 40, 47, 49, 50, 70 (b) 33, 25, 47, 37, 51, 35, 35, 66, 48, 33, 58, 29, 55, 43
12 (0) (1) (2) (3) (4) (5) (6) (7) (8)
13 13 (9) (10) , 6, 7, 8 t- A 5, A 6, A 7, A 8 P (A 5 > 2.571) = 0.025, P (A 6 > 2.447) = 0.025, P (A 7 > 2.365) = 0.025, P (A 8 > 2.306) = 0.025, P (A 5 > 2.015) = 0.05, P (A 6 > 1.943) = 0.05, P (A 7 > 1.895) = 0.05, P (A 8 > 1.860) = 0.05
14 (24.1 ) 5 (0) (1) (2) (3) (4) (5) (6) (7) (8) (9) (10) (24.2 ) r 0 5 (0) r 0 = 0.83 (1) r 0 = 0.1 (2) r 0 = 0.72 (3) r 0 = 0.5 (4) r 0 = 0 (5) r 0 = 0.5 (6) r 0 = 0.92 (7) r 0 = 0.91 (8) r 0 = 0.95 (9) r 0 = 0.45 (10) r 0 = (24.2 ) 5 (0) (1) (2) (3) (4) (5) (6) (7) (8) (9) (10)
15 ( ) (A) (B) (0) (A) (B) (1) (A) (B) (2) (A) (B) (3) (A) (B) (4) (A) (B) (5) (A) (B) (6) (A) (B) (7) (A) (B) (8) (A) (B) (9) (A) (B) (10) (A) (B) χ (0) (2) (4) (6) (8) (10) (1) (3) (5) (7) (9)
16
17
18
19
CompuSec SW Ver.5.2 アプリケーションガイド(一部抜粋)
64 PART 9 65 66 PART10 67 1 2 3 68 PART 10 4 5 69 1 2 3 4 5 70 PART 10 6 7 8 6 9 71 PART11 72 PART 11 1 2 3 73 4 5 6 74 PART 11 7 8 9 75 PART12 76 PART 12 1 2 3 4 1 2 3 4 77 1 2 3 4 5 6 7 8 78 PART13 79
More information65歳雇用時代の賃金制度のつくり方
1 65 2005 2 65 18 65 2 PART 165 6 7 8 11 14 16 60 17 25 PART 2 28 35 () 10 35 () 35 () 36 () 39 () 39 () 41 () 42 () 42 () 44 (10) 44 (11) 47 1 15 2007 2 35 3 10 10 2.5 2.5 1.5 0.5 2.5 2.5 1.5 0.5 10
More informationII (No.2) 2 4,.. (1) (cm) (2) (cm) , (
II (No.1) 1 x 1, x 2,..., x µ = 1 V = 1 k=1 x k (x k µ) 2 k=1 σ = V. V = σ 2 = 1 x 2 k µ 2 k=1 1 µ, V σ. (1) 4, 7, 3, 1, 9, 6 (2) 14, 17, 13, 11, 19, 16 (3) 12, 21, 9, 3, 27, 18 (4) 27.2, 29.3, 29.1, 26.0,
More informationB's Recorderマニュアル_B's Recorderマニュアル
5 Part 6 - 8 9 - 0 5 A C B AB A B A B C 7-6 - 8 9-5 0 5 7 A D B C E F A B C D F E 6 9 8 0 Part - - 5 5 7 6 9-7 6 8 0 5 5-6 7 9 8 5-5 50 5 5 5 -6 5 55 5 57-7 56 59 8 7 6 58 0 8 9 6 6 7 6 5 60 7 5 6 6-8
More informationB's Recorderマニュアル
2 3 4 5 Part 1 6 1-1 8 9 1-2 10 11 12 13 A B C A C B AB A B 14 15 17 1-4 2 1 16 1-3 18 19 1-5 2 1 20 21 22 23 24 25 A B C D E F A B C D E F 26 27 28 29 30 31 Part 2 32 2-1 2-2 1 2 34 35 5 37 4 3 36 6 2-3
More information「東京都子供・子育て支援総合計画」中間見直し版(案)第2章 子供と家庭をめぐる状況
1 (1) (2) (3) (4) (5) (6) (7) (8) 2 (1) (2) (3) (4) (5) (6) (7) 10,000 100% 8,000 78.7% 78.1% 79.3% 78.3% 74.1% 75.4% 73.2% 80% 6,000 46.6% 47.5% 50.9% 51.5% 49.9% 51.8% 52.2% 60% 4,000 2,000 3,713
More informationPart () () Γ Part ,
Contents a 6 6 6 6 6 6 6 7 7. 8.. 8.. 8.3. 8 Part. 9. 9.. 9.. 3. 3.. 3.. 3 4. 5 4.. 5 4.. 9 4.3. 3 Part. 6 5. () 6 5.. () 7 5.. 9 5.3. Γ 3 6. 3 6.. 3 6.. 3 6.3. 33 Part 3. 34 7. 34 7.. 34 7.. 34 8. 35
More informationu 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 informationii 3.,. 4. F. (), ,,. 8.,. 1. (75% ) (25% ) =9 7, =9 8 (. ). 1.,, (). 3.,. 1. ( ).,.,.,.,.,. ( ) (1 2 )., ( ), 0. 2., 1., 0,.
23(2011) (1 C104) 5 11 (2 C206) 5 12 http://www.math.is.tohoku.ac.jp/~obata,.,,,.. 1. 2. 3. 4. 5. 6. 7.,,. 1., 2007 ( ). 2. P. G. Hoel, 1995. 3... 1... 2.,,. ii 3.,. 4. F. (),.. 5.. 6.. 7.,,. 8.,. 1. (75%
More information1 2 3 2 3 4 5 PART 1 6 PART 1 1 2 3 7 PART 1 4 8 PART 2 1 9 PART 2 1 2 10 PART 2 3 11 PART 2 1 2 12 PART 2 3 4 13 PART 2 1 2 14 PART 2 1 2 15 PART 2 16 PART 2 1 17 PART 2 1 18 PART 2 1 2 19 PART 2 20 PART
More informationビジネス交渉術入稿.indd
Part1 1 1 6 1 2 8 1 3 10 1 4 12 1 5 14 Part1 16 Part2 Part2 Part3 2 1 18 2 2 20 2 3 22 2 4 24 2 5 26 2 6 28 2 7 30 2 8 32 2 Contents 2 9 34 2 10 36 2 11 38 40 Part3 3 1 42 3 2 44 3 3 46 3 4 48 3 5 50 3
More informationLLG-R8.Nisus.pdf
d M d t = γ M H + α M d M d t M γ [ 1/ ( Oe sec) ] α γ γ = gµ B h g g µ B h / π γ g = γ = 1.76 10 [ 7 1/ ( Oe sec) ] α α = λ γ λ λ λ α γ α α H α = γ H ω ω H α α H K K H K / M 1 1 > 0 α 1 M > 0 γ α γ =
More informationii 3.,. 4. F. (), ,,. 8.,. 1. (75%) (25%) =7 20, =7 21 (. ). 1.,, (). 3.,. 1. ().,.,.,.,.,. () (12 )., (), 0. 2., 1., 0,.
24(2012) (1 C106) 4 11 (2 C206) 4 12 http://www.math.is.tohoku.ac.jp/~obata,.,,,.. 1. 2. 3. 4. 5. 6. 7.,,. 1., 2007 (). 2. P. G. Hoel, 1995. 3... 1... 2.,,. ii 3.,. 4. F. (),.. 5... 6.. 7.,,. 8.,. 1. (75%)
More information統計学のポイント整理
.. September 17, 2012 1 / 55 n! = n (n 1) (n 2) 1 0! = 1 10! = 10 9 8 1 = 3628800 n k np k np k = n! (n k)! (1) 5 3 5 P 3 = 5! = 5 4 3 = 60 (5 3)! n k n C k nc k = npk k! = n! k!(n k)! (2) 5 3 5C 3 = 5!
More informationPick up Part 01 2013C o n t e n t s Part 02 Part 03 Part 04 Pick up 4 2013 2013 5 Pick up 6 2013 2013 7 Part 01 8 2013 2013 9 10 2013 2013 11 12 2013 2013 13 14 2013 2013 15 16 2013 Part 02 18 2013 2013
More information大野川水系中流圏域
-------------------------------------------------------------------- 1 -------------------------------------------------------------------------- 1 -----------------------------------------------------------------------------
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 information1. 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分散分析・2次元正規分布
2 II L10(2016-06-30 Thu) : Time-stamp: 2016-06-30 Thu 13:55 JST hig F 2.. http://hig3.net ( ) L10 2 II(2016) 1 / 24 F 2 F L09-Q1 Quiz :F 1 α = 0.05, 2 F 3 H 0, : σ 2 1 /σ2 2 = 1., H 1, σ 2 1 /σ2 2 1. 4
More informationI 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 informationt χ 2 F Q t χ 2 F 1 2 µ, σ 2 N(µ, σ 2 ) f(x µ, σ 2 ) = 1 ( exp (x ) µ)2 2πσ 2 2σ 2 0, N(0, 1) (100 α) z(α) t χ 2 *1 2.1 t (i)x N(µ, σ 2 ) x µ σ N(0, 1
t χ F Q t χ F µ, σ N(µ, σ ) f(x µ, σ ) = ( exp (x ) µ) πσ σ 0, N(0, ) (00 α) z(α) t χ *. t (i)x N(µ, σ ) x µ σ N(0, ) (ii)x,, x N(µ, σ ) x = x+ +x N(µ, σ ) (iii) (i),(ii) z = x µ N(0, ) σ N(0, ) ( 9 97.
More informationA B P (A B) = P (A)P (B) (3) A B A B P (B A) A B A B P (A B) = P (B A)P (A) (4) P (B A) = P (A B) P (A) (5) P (A B) P (B A) P (A B) A B P
1 1.1 (population) (sample) (event) (trial) Ω () 1 1 Ω 1.2 P 1. A A P (A) 0 1 0 P (A) 1 (1) 2. P 1 P 0 1 6 1 1 6 0 3. A B P (A B) = P (A) + P (B) (2) A B A B A 1 B 2 A B 1 2 1 2 1 1 2 2 3 1.3 A B P (A
More information( ) sin 1 x, cos 1 x, tan 1 x sin x, cos x, tan x, arcsin x, arccos x, arctan x. π 2 sin 1 x π 2, 0 cos 1 x π, π 2 < tan 1 x < π 2 1 (1) (
6 20 ( ) sin, cos, tan sin, cos, tan, arcsin, arccos, arctan. π 2 sin π 2, 0 cos π, π 2 < tan < π 2 () ( 2 2 lim 2 ( 2 ) ) 2 = 3 sin (2) lim 5 0 = 2 2 0 0 2 2 3 3 4 5 5 2 5 6 3 5 7 4 5 8 4 9 3 4 a 3 b
More information2
1 2 H17 14,352 9,194 127,628 3,497 5,227 23,792 ( ( )) ( ( ( ) ) ) 3 4 17 3 ( ) 20 5 5 17 5 19 6 23 17 18 20 6 7 8 17 18 2 19 6 H17.6.23 1 H17.8.2 H17.9.6 H17.10.13 H17.12.4 H18.3.10 1 H18.6.7 H18.8.10
More informationrenshumondai-kaito.dvi
3 1 13 14 1.1 1 44.5 39.5 49.5 2 0.10 2 0.10 54.5 49.5 59.5 5 0.25 7 0.35 64.5 59.5 69.5 8 0.40 15 0.75 74.5 69.5 79.5 3 0.15 18 0.90 84.5 79.5 89.5 2 0.10 20 1.00 20 1.00 2 1.2 1 16.5 20.5 12.5 2 0.10
More information6 BV17057 30 2 7 1 1 1.1.................................................... 1 1.2.................................................. 1 1.3 6............................... 1 1.4....................................................
More informationii 3.,. 4. F. ( ), ,,. 8.,. 1. (75% ) (25% ) =7 24, =7 25, =7 26 (. ). 1.,, ( ). 3.,...,.,.,.,.,. ( ) (1 2 )., ( ), 0., 1., 0,.
(1 C205) 4 10 (2 C206) 4 11 (2 B202) 4 12 25(2013) http://www.math.is.tohoku.ac.jp/~obata,.,,,..,,. 1. 2. 3. 4. 5. 6. 7. 8. 1., 2007 ( ).,. 2. P. G., 1995. 3. J. C., 1988. 1... 2.,,. ii 3.,. 4. F. ( ),..
More informationM,,,,, M A A B,,,,, M M M a,,, B B, 2
, A A 1 M,,,,, M A A B,,,,, M M M a,,, B B, 2 B B B B,,, B B B B B B B M a 3 M a A A B B M, M M M M M b,,,, 4 , B B,,, A A M,,, 5 ,,,,,,,,, 6 , B B,,, 7 ,,,,,,,,,,,,,,,, 8 , 9 A B B 10 ,,,,,,, NM SHYM
More information本文/報告3
Integral 3D Contents Production from Multi View Images Kensuke IKEYA Kensuke HISATOMI Miwa KATAYAMA and Yuichi IWADATE ABSTRACT NHK R&D/No.144/2014.3 47 48 NHK R&D/No.144/2014.3 NHK R&D/No.144/2014.3 49
More informationN cos s s cos ψ e e e e 3 3 e e 3 e 3 e
3 3 5 5 5 3 3 7 5 33 5 33 9 5 8 > e > f U f U u u > u ue u e u ue u ue u e u e u u e u u e u N cos s s cos ψ e e e e 3 3 e e 3 e 3 e 3 > A A > A E A f A A f A [ ] f A A e > > A e[ ] > f A E A < < f ; >
More information6.1 (P (P (P (P (P (P (, P (, P.
(011 30 7 0 ( ( 3 ( 010 1 (P.3 1 1.1 (P.4.................. 1 1. (P.4............... 1 (P.15.1 (P.16................. (P.0............3 (P.18 3.4 (P.3............... 4 3 (P.9 4 3.1 (P.30........... 4 3.
More information( )/2 hara/lectures/lectures-j.html 2, {H} {T } S = {H, T } {(H, H), (H, T )} {(H, T ), (T, T )} {(H, H), (T, T )} {1
( )/2 http://www2.math.kyushu-u.ac.jp/ hara/lectures/lectures-j.html 1 2011 ( )/2 2 2011 4 1 2 1.1 1 2 1 2 3 4 5 1.1.1 sample space S S = {H, T } H T T H S = {(H, H), (H, T ), (T, H), (T, T )} (T, H) S
More information気象庁委託調査
ART - 103 1. (2-1) 2-1 : 61 20km 1 2 6 10km 6 12 7 1 100km 1 1 34 7 300km 7 3 3 1300km 1 *1 *1 6 3 *2 300km 6 *3 *1 15 3 GPV 15 *2 15 *3 16 *2 1 7 1 15 2. (1 ) 15 1 15 ( GPV=Grid Point Value) 104 1 / 2-1
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. 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..3. Ω, Ω F, P Ω, F, P ). ) F a) A, A,..., A i,... F A i F. b) A F A c F c) Ω F. ) A F A P A),. a) 0 P A) b) P Ω) c) [ ] A, A,..., A i,... F i j A i A
.. Laplace ). A... i),. ω i i ). {ω,..., ω } Ω,. ii) Ω. Ω. A ) r, A P A) P A) r... ).. Ω {,, 3, 4, 5, 6}. i i 6). A {, 4, 6} P A) P A) 3 6. ).. i, j i, j) ) Ω {i, j) i 6, j 6}., 36. A. A {i, j) i j }.
More informationy = 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 informationSTC-PC10_Ver1.01
JA Windows 1 3 4 5 6 1 8 1 8 1 2 1 3 5 6 2 4 7 1 9 2 3 4 5 Χ 7 8 1 6 2 3 4 5 10 1 2 3 4 5 6 11 12 2 1 2 1 13 3 4 1 2 14 2 1 2 1 15 3 4 16 1 2 17 3 1 18 2 19 2 1 20 3 4 21 5 1 6 2 7 3 8 4 22 2 1 23 3
More information³ÎΨÏÀ
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 informationgoogle_guide_h1_h4.ai
?! PART 1 PART 2 FAQ PART 1 1 STEP! CASE A CASE B CASE B B CASE C CASE A CASE B CASE A CASE C 02 2 STEP!! 03 PART 1 PART 1? 04 PART 1 3 STEP 1 2 3 05 !! 1 2 3 1 2 3 PART 1 06 07 PART 2 PART 2 09 PART
More information6.1 (P (P (P (P (P (P (, P (, P.101
(008 0 3 7 ( ( ( 00 1 (P.3 1 1.1 (P.3.................. 1 1. (P.4............... 1 (P.15.1 (P.15................. (P.18............3 (P.17......... 3.4 (P................ 4 3 (P.7 4 3.1 ( P.7...........
More information: 1: 3:
1 2013 10 11 google maps engine : : : : : : : : : : 1 4.6.1 2: 1: 3: 4: 6: 5: 7: 2 2.1 2.1.1 2.1.2 2.2 2.2.1 2.2.2 2.2.3 2.2.4 2.2.5 2.3 2.3.1 18 2.3.2 2.3.3 2.3.4 2.3.5 2000 SA 2.3.6 2.4 2.4.1 2.4.2 2.4.3
More information244650/05 佐貫利雄
Part I Part II CIF B kl t kl kl kl B kbk B B B B IEA Energy Prices and Taxes 5A 5A MRI MRI A B A A CCD B 1.5 0.4 UFJFG FG FG HD UFJ Point G etc G UFJ UFJ FG G UFJ m A A A B B C C D D A A A A A A
More information目次
00D80020G 2004 3 ID POS 30 40 0 RFM i ... 2...2 2. ID POS...2 2.2...3 3...5 3....5 3.2...6 4...9 4....9 4.2...9 4.3...0 4.4...4 4.3....4 4.3.2...6 4.3.3...7 4.3.4...9 4.3.5...2 5...23 5....23 5.....23
More informationZ[i] Z[i] π 4,1 (x) π 4,3 (x) 1 x (x ) 2 log x π m,a (x) 1 x ϕ(m) log x 1.1 ( ). π(x) x (a, m) = 1 π m,a (x) x modm a 1 π m,a (x) 1 ϕ(m) π(x)
3 3 22 Z[i] Z[i] π 4, (x) π 4,3 (x) x (x ) 2 log x π m,a (x) x ϕ(m) log x. ( ). π(x) x (a, m) = π m,a (x) x modm a π m,a (x) ϕ(m) π(x) ϕ(m) x log x ϕ(m) m f(x) g(x) (x α) lim f(x)/g(x) = x α mod m (a,
More informationuntitled
(a) (b) (c) (d) Wunderlich 2.5.1 = = =90 2 1 (hkl) {hkl} [hkl] L tan 2θ = r L nλ = 2dsinθ dhkl ( ) = 1 2 2 2 h k l + + a b c c l=2 l=1 l=0 Polanyi nλ = I sinφ I: B A a 110 B c 110 b b 110 µ a 110
More information活用ガイド(ハードウェア編)
4 5 6 1 2 3 7 8 MITSUBISHI ELECTRIC INFORMATION TECHNOLOGY CORPORATION 2010 9 PART 1 10 11 PART 2 PART 3 12 PART 4 PART 5 13 P A R T 1 16 1 17 18 1 19 20 1 21 22 1 1 2 23 1 2 3 4 24 1 25 26 1 27 1 2 3
More information4 2 Rutherford 89 Rydberg λ = R ( n 2 ) n 2 n = n +,n +2, n = Lyman n =2 Balmer n =3 Paschen R Rydberg R = cm 896 Zeeman Zeeman Zeeman Lorentz
2 Rutherford 2. Rutherford N. Bohr Rutherford 859 Kirchhoff Bunsen 86 Maxwell Maxwell 885 Balmer λ Balmer λ = 364.56 n 2 n 2 4 Lyman, Paschen 3 nm, n =3, 4, 5, 4 2 Rutherford 89 Rydberg λ = R ( n 2 ) n
More informationCG-FPSU2BDG
http://corega.jp/ ... PART 1 WLFPSU2BDG WLFPSU2BDG WLFPSU2BDG WLFPSU2BDG PART 2 PART 3 PART 4 PART 5 ! @ #!#! @ # $! $ http://corega.jp/ http://corega.jp/repair/
More informationMuon Muon Muon lif
2005 2005 3 23 1 2 2 2 2.1 Muon.......................................... 2 2.2 Muon........................... 2 2.3................................. 3 2.4 Muon life time.........................................
More information1 2 2 (Dielecrics) Maxwell ( ) D H
2003.02.13 1 2 2 (Dielecrics) 4 2.1... 4 2.2... 5 2.3... 6 2.4... 6 3 Maxwell ( ) 9 3.1... 9 3.2 D H... 11 3.3... 13 4 14 4.1... 14 4.2... 14 4.3... 17 4.4... 19 5 22 6 THz 24 6.1... 24 6.2... 25 7 26
More information* n x 11,, x 1n N(µ 1, σ 2 ) x 21,, x 2n N(µ 2, σ 2 ) H 0 µ 1 = µ 2 (= µ ) H 1 µ 1 µ 2 H 0, H 1 *2 σ 2 σ 2 0, σ 2 1 *1 *2 H 0 H
1 1 1.1 *1 1. 1.3.1 n x 11,, x 1n Nµ 1, σ x 1,, x n Nµ, σ H 0 µ 1 = µ = µ H 1 µ 1 µ H 0, H 1 * σ σ 0, σ 1 *1 * H 0 H 0, H 1 H 1 1 H 0 µ, σ 0 H 1 µ 1, µ, σ 1 L 0 µ, σ x L 1 µ 1, µ, σ x x H 0 L 0 µ, σ 0
More information23 1 Section ( ) ( ) ( 46 ) , 238( 235,238 U) 232( 232 Th) 40( 40 K, % ) (Rn) (Ra). 7( 7 Be) 14( 14 C) 22( 22 Na) (1 ) (2 ) 1 µ 2 4
23 1 Section 1.1 1 ( ) ( ) ( 46 ) 2 3 235, 238( 235,238 U) 232( 232 Th) 40( 40 K, 0.0118% ) (Rn) (Ra). 7( 7 Be) 14( 14 C) 22( 22 Na) (1 ) (2 ) 1 µ 2 4 2 ( )2 4( 4 He) 12 3 16 12 56( 56 Fe) 4 56( 56 Ni)
More information1 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 informationad bc A A A = ad bc ( d ) b c a n A n A n A A det A A ( ) a b A = c d det A = ad bc σ {,,,, n} {,,, } {,,, } {,,, } ( ) σ = σ() = σ() = n sign σ sign(
I n n A AX = I, YA = I () n XY A () X = IX = (YA)X = Y(AX) = YI = Y X Y () XY A A AB AB BA (AB)(B A ) = A(BB )A = AA = I (BA)(A B ) = B(AA )B = BB = I (AB) = B A (BA) = A B A B A = B = 5 5 A B AB BA A
More information(1) 1.1
1 1 1.1 1.1.1 1.1 ( ) ( ) ( ) { ( ) ( ) { ( ) ( ) { ( ) ( ) { ( ) ( ) { ( ) ( ) ( ) ( ) ( ) 2 1 1.1.2 (1) 1.1 1.1 3 (2) 1.2 4 1 (3) 1.3 ( ) ( ) (4) 1.1 5 (5) ( ) 1.4 6 1 (6) 1.5 (7) ( ) (8) 1.1 7 1.1.3
More information23回会社説明会資料(HP用)
FFG Part FFG 09 09 1 20074 Core Core Bank Bank 170 50 32 12 68 IT 4050 4050 Core Core Value Value Part Part 2006 3 06/3 06/12 06/3 30.0% 4.5% 25.5% 26.2% 0.7% 47,500 6,300 41,200 42,200
More information1 G K C 1.1. G K V ρ : G GL(V ) (ρ, V ) G V 1.2. G 2 (ρ, V ), (τ, W ) 2 V, W T : V W τ g T = T ρ g ( g G) V ρ g T W τ g V T W 1.3. G (ρ, V ) V W ρ g W
Naoya Enomoto 2002.9. paper 1 2 2 3 3 6 1 1 G K C 1.1. G K V ρ : G GL(V ) (ρ, V ) G V 1.2. G 2 (ρ, V ), (τ, W ) 2 V, W T : V W τ g T = T ρ g ( g G) V ρ g T W τ g V T W 1.3. G (ρ, V ) V W ρ g W W G- G W
More information応用数学III-4.ppt
III f x ( ) = 1 f x ( ) = P( X = x) = f ( x) = P( X = x) =! x ( ) b! a, X! U a,b f ( x) =! " e #!x, X! Ex (!) n! ( n! x)!x! " x 1! " x! e"!, X! Po! ( ) n! x, X! B( n;" ) ( ) ! xf ( x) = = n n!! ( n
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 information1.500 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 informationc y /2 ddy = = 2π sin θ /2 dθd /2 [ ] 2π cos θ d = log 2 + a 2 d = log 2 + a 2 = log 2 + a a 2 d d + 2 = l
c 28. 2, y 2, θ = cos θ y = sin θ 2 3, y, 3, θ, ϕ = sin θ cos ϕ 3 y = sin θ sin ϕ 4 = cos θ 5.2 2 e, e y 2 e, e θ e = cos θ e sin θ e θ 6 e y = sin θ e + cos θ e θ 7.3 sgn sgn = = { = + > 2 < 8.4 a b 2
More informationver Web
ver201723 Web 1 4 11 4 12 5 13 7 2 9 21 9 22 10 23 10 24 11 3 13 31 n 13 32 15 33 21 34 25 35 (1) 27 4 30 41 30 42 32 43 36 44 (2) 38 45 45 46 45 5 46 51 46 52 48 53 49 54 51 55 54 56 58 57 (3) 61 2 3
More informationmeiji_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 informationI
I 6 4 10 1 1 1.1............... 1 1................ 1 1.3.................... 1.4............... 1.4.1.............. 1.4................. 1.4.3........... 3 1.4.4.. 3 1.5.......... 3 1.5.1..............
More information(iii) x, x N(µ, ) z = x µ () N(0, ) () 0 (y,, y 0 ) (σ = 6) *3 0 y y 2 y 3 y 4 y 5 y 6 y 7 y 8 y 9 y ( ) *4 H 0 : µ
t 2 Armitage t t t χ 2 F χ 2 F 2 µ, N(µ, ) f(x µ, ) = ( ) exp (x µ)2 2πσ 2 2 0, N(0, ) (00 α) z(α) t * 2. t (i)x N(µ, ) x µ σ N(0, ) 2 (ii)x,, x N(µ, ) x = x + +x ( N µ, σ2 ) (iii) (i),(ii) x,, x N(µ,
More information2 350 1610
2 350 1610 1 2 3 1 1 2 2 3 3 4 5 1 11 20 34 47 49 50 52 53 62 70 75 89 100 116 119 121 126 147 148 163 167 qqqqqqqq qqqqqqqq 1 9 2 24 3 33 4 36 5 40 6 47 7 54 8 56 9 64 10 78 11 86 12 94 13 129 14 151
More informationN/m f x x L dl U 1 du = T ds pdv + fdl (2.1)
23 2 2.1 10 5 6 N/m 2 2.1.1 f x x L dl U 1 du = T ds pdv + fdl (2.1) 24 2 dv = 0 dl ( ) U f = T L p,t ( ) S L p,t (2.2) 2 ( ) ( ) S f = L T p,t p,l (2.3) ( ) U f = L p,t + T ( ) f T p,l (2.4) 1 f e ( U/
More information2 0 B B B B - B B - B - - B (1.0.6) 0 1 p /p p {0} (1.0.7) B m n ϕ : B ϕ(m) n ϕ 1 (n) = m /m B/n 1.1. (1.1.1) a a n > 0 x n a x r(a) a r(r(a)) = r(a)
1 0 1. 1.0. (1.0.1) - (1.0.2), B ϕ : B resp. B- M a m = ϕ(a) m (resp. m a = m ϕ(a)) resp. - M - B- resp. - M [ϕ] L - u : L M [ϕ] a x L u(a x) = ϕ(a) u(x) ϕ- L M (ϕ, u) u (, L) (B, M) - L (, L) (1.0.3)
More informationkeisoku01.dvi
2.,, Mon, 2006, 401, SAGA, JAPAN Dept. of Mechanical Engineering, Saga Univ., JAPAN 4 Mon, 2006, 401, SAGA, JAPAN Dept. of Mechanical Engineering, Saga Univ., JAPAN 5 Mon, 2006, 401, SAGA, JAPAN Dept.
More information[ ] =. =3.5 3 =.3 =. =0.30 : (f i ) u i u i f i u i f i
[ ] 00 30 ( x s, x + s) 5% x s = 3, x + s = 7 s = 3 5 + 0 = 70 5 = 0 a = 3, b = 5 75.5 73.0 80.0 75.5 73.0 75.5 0 = 5 75.5 80.0 8 75.5 70.5 80.5 75.5 = 6. 70. 30% 5 A 50 + 5 0 8 0 = 56.5, 50 + 56 50 6
More information-------------------------------------------------------------------------------------------------- 1 ----------------------------------------- 3 --------------------------------------------------------------------------------
More informationuntitled
FACT BOOK CONTENTS PAR T 1 1 2 2003 3 4 4 5 PAR T PAR T 1 6 2 7 7 8 9 1 10 2 11 3 12 4 13 5 14 14 PAR T 1 15 2 16 3 17 PAR T 1 18 2 18 3 21 21 1 PART 1 2200200kcal 1 2 3 A 1 2 Q1 3 4 5 4 201010 P ART PART
More informationB
B YES NO 5 7 6 1 4 3 2 BB BB BB AA AA BB 510J B B A 510J B A A A A A A 510J B A 510J B A A A A A 510J M = σ Z Z = M σ AAA π T T = a ZP ZP = a AAA π B M + M 2 +T 2 M T Me = = 1 + 1 + 2 2 M σ Te = M 2 +T
More information数学の基礎訓練I
I 9 6 13 1 1 1.1............... 1 1................ 1 1.3.................... 1.4............... 1.4.1.............. 1.4................. 3 1.4.3........... 3 1.4.4.. 3 1.5.......... 3 1.5.1..............
More information