バッテリー適合表_1301
|
|
|
- もえり いとえ
- 5 years ago
- Views:
Transcription
1
2 1 PM26NL PM24NL X911 24X912 X X LED PAS X C Ah L Li-ion X90-20 X ,650 33, PM26NLDX PM24NLDX X913 24X914 X X LED PAS X C Ah L Li-ion X90-20 X ,650 33, PM26NL PM24NL PM26NL PM24NL 26X831 24X832 26X736 24X737 X X X X Ah L Li-ion X , Ah L Li-ion X ,000 PM26NL DX PM24NL DX 26X833 24X834 X X Ah L Li-ion X , Ah L Li-ion X ,000
3 2 PM26NM PM24NM PM26NM PM24NM 26X821 24X822 26X734 24X735 X X X X Ah M Li-ion X ,440 32, Ah L PM26NM DX PM24NM DX PM26NM DX PM24NM DX 26X823 24X824 26X734 24X735 X X X X Ah M Li-ion X ,440 32, Ah L Ah M Li-ion X ,440 32, Ah L PM26NL SP PM24NL SP PM26NL SP PM24NL SP 26X841 24X842 26X741 24X742 X X X X Ah L Li-ion X , Ah L Li-ion X ,000
4 3 PM26NT PM24NT PM26NT PM24NT PZ26NT PZ24NT X901 24X902 26X801 24X802 26X751 24X752 X X X X X X Ah S Ah M Ah L Ah T Li-ion X ,250 25, Ah S Ah M Ah L Ah T Li-ion X ,250 25,000 PM26NS PM24NS PZ26NS PZ24NS 26X811 24X812 26X721 24X722 X X X X Ah S Li-ion X ,190 27, Ah M Ah L Ah S Li-ion X ,190 27, Ah M Ah L
5 4 PZ26LS PZ24LS PZ26LS PZ24LS 26X651 24X652 26X541 24X542 X X X X Ah S Li-ion X , Ah M Ah L Ah S Li-ion X , Ah M Ah L PZ26LS PZ24LS PZ26LS PZ24LS PZ26LS PZ24LS PZ26LS PZ24LS X481 24X482 26X381 24X382 26X291 24X292 26X237 24X238 X X X X X X X X Ah S Li-ion X , Ah M Ah L PZ26LM PZ24LM PZ26LM PZ24LM 26X674 24X675 26X563 24X564 X X X X Ah M Li-ion X ,600 32, Ah L Ah M Li-ion X ,600 32, Ah L PV26LL PV24LL 26X681 24X682 X X Ah L Li-ion X ,325 36,500
6 PZ26LL PZ24LL PV26LL PV24LL PZ26LL PZ24LL PZ26LL PZ24LL PZ26LL PZ24LL PZ26LL PZ24LL X676 24X677 26X601 24X602 26X491 24X492 26X441 24X442 26X293 24X294 26X239 24X23L X X X X X X X X X X X X Ah L Li-ion X ,325 36, Ah L Li-ion X ,325 36,500 PZ26LT PZ24LT PZ26LT PZ24LT 26X661 24X662 26X551 24X552 X X X X Ah T Li-ion X ,250 25, Ah S Ah M Ah L
7 PZ26 PZ24 PZ26 PZ24 PZ26 PZ X471 24X472 26X371 24X372 26X281 24X282 X X X X X X Ni-MH 3.1Ah ,940 22,800 PAS PZ26 PZ X218 24X219 X X Ni-MH 3.1Ah ,940 22,800 PM26A X910 X Ah L Li-ion X90-20 X ,650 33, LED PAS X C PM26A 26X825 X PM26A 26X731 X Ah M Li-ion X ,440 32, Ah L Ah S Li-ion X ,190 27, Ah M Ah L
8 6.6Ah M Li-ion X82-21 PM27CM 27X732 X ,440 32, Ah L Ah L Li-ion PM27CL8 27X843 X X PM27CL8 27X743 X ,000 PM27CS PZ27CS 27X813 27X723 X X Ah S Li-ion X ,190 27, Ah M Ah L
9 PZ27CS PZ26CF X653 27X543 27X501 27X391 27X311 27X235 26X654 26X544 26X502 X X X X X X X X X Ah S Li-ion X , Ah M Ah L Ah S Li-ion X , Ah M Ah L Ah S Li-ion X , Ah M Ah L X392 26X312 26X236 X X X Ah S Li-ion X , Ah M Ah L
10 PV27CSL 27X683 X X565 X Ah L Li-ion X ,325 36,500 PZ27CSL 27X503 X X391 27X313 X X Ah L Li-ion X ,325 36,500 PZ26CM 26X671 26X561 26X504 X X X Ah M Li-ion X ,600 32, Ah L Ah S Li-ion X , Ah M Ah L
11 PM20CX 20X853 X PZ20CX 20X783 X Ah M Li-ion X ,440 32, Ah L Ah S Li-ion X ,190 27, Ah M Ah L PZ20CX 20X713 20X573 20X523 20X433 X X X X Ah S Li-ion X , Ah M Ah L PM20CC 20X852 X PZ20CC 20X782 X Ah M Li-ion X ,440 32, Ah L Ah S Li-ion X ,190 27, Ah M Ah L
12 11 PV26SL 20X712 20X572 26X702 26X641 X X Ah S Li-ion X PZ20CC 26, Ah M X522 X Ah L X432 X X302 X X701 X X631 X Ah S Li-ion X Ah L Li-ion PV26S , Ah M Ah L X351 X PM26B X X772 X X772 X ,000 X X Ah L Li-ion X ,325 36,500
13 X PM26V 26X771 26X771 X X Ah M Li-ion X ,440 32, Ah L PZ26 PZ24 PZ26 PZ X211 24X212 26X211 24X212 X X X Ni-MH 3.1Ah ,940 22,800 PZ26D PZ24D PZ26C X211 24X212 26X217 X X X Ni-MH 3.1Ah ,940 22,800 PZ26SD PZ24SD X215 24X216 X X Ni-MH 8.6Ah ,350 47,000 PZ26LS PZ24LS X231 24X232 X X Ah S Li-ion X , Ah M Ah L
14 PZ26LL PZ24LL X233 24X234 X X Ah L Li-ion X ,325 36,500 PH26 PH26D 26X121 26X122 X X Ni-Cd 3.6Ah ,200 24, PU26D PU24D 26X131 24X132 X X Ni-Cd 3.6Ah ,200 24,000 PU26 PU24 26X135 24X136 X X
15 14 Ni-MH 7.0Ah ,250 45,000 PY26A PY24A PY26A PY24A X X X X X06T 24X06U 26X205 24X206 PY26A PY24A X X X065 24X Ni-Cd ,475 39, PY26 PY24 PY26 PY24 PY26 PY24 PY26C PY24C PY26C PY24C PY26C PY24C Ni-MH 7.0Ah ,250 45,000 PY26D PY24D X X X X X X X X X X X X X X X201 24X202 26X06N 24X06P 26X061 24X062 26X063 24X064 26X203 24X204 26X06R 24X06S 26X067 24X Ni-Cd ,475 39,
16 15 PQ26H PQ24H PQ26HD PQ24HD Ni-MH 7.0Ah ,250 45,000 26X151 24X152 26X153 24X154 X X X X PQ26 PQ24 26X157 24X158 X X Ni-Cd ,600 32, PJ26D PJ24D Ni-Cd ,600 32, Ni-Cd ,600 32, X101 24X102 26X101 24X102 X X PJ26 PJ24 26X101 24X102 X X X X PJ26 PJ
17 PQ26D PQ24D 26X155 24X156 X X Ni-Cd ,600 32, PQ26HD PQ24HD 26X159 24X15A X X Ni-MH 7.0Ah ,250 45,000 PQ26C PQ24C 26X15D 24X15E X X Ni-Cd ,600 32, PX26 PX24 PX26 PX24 PX26 PX24 PX26D PX24D PX26D PX24D X016 24X017 26X011 24X AT 244XF 26X016 24X017 26X016 24X017 X X X X AT XF X X X X Ni-Cd X01-W ,
18 PX26C PX24C X01X 24X01Y X01X X01Y Ni-MH 7.0Ah X01-W ,250 45, PM26K X923 X Ah L Li-ion X ,000 PM20K X925 20X863 X X Ah L Li-ion X ,000 PM20B 20X855 X Ah L Li-ion X ,000 PM26RL X924 26X862 26X792 X X X Ah L Li-ion X ,000 PM26RS 26X793 X Ah S Li-ion X ,190 27, Ah M Ah L
19 X251 26X672 26X562 PC24 PC26 Ni-Cd ,600 32, X511 26X411 26X251 26X251 X X X X X X X X673 26X566 PZ26RM X X X861 26X791 PC26 X X Ah M Li-ion X ,600 32, Ah L Ah M Li-ion X ,600 32, Ah L Ah L Li-ion X , Ah S Li-ion X , Ah M Ah L
20 X521 20X431 20X301 20X301 20X711 20X571 PZ20C X X X X X X X851 PM20C X X023 20X021 PX20D Ni-Cd X01-W ,000 Ni-Cd X02-W ,000 X X X085 26X015 PC26 X X X781 PZ20C X Ah M Li-ion X ,440 32, Ah L Ah S Li-ion X ,190 27, Ah M Ah L Ah S Li-ion X , Ah M Ah L
21 20 8.9Ah L Li-ion X , Ah L Li-ion X ,325 36,500 Ni-Cd X03-W ,050 41,000 Ni-Cd 4SP-W ,300 46, PT20 D PT VS 20X031 16X531 16X461 16X241 16X714 16X581 X VS X X X X X PX X021 X Ni-Cd X02-W , PT X854 16X784 X X
22 PV26BS 26X693 X Ah L Li-ion X ,325 36,500 PM26BU 26X761 24X762 X X Ah L Li-ion X ,000 PV26BU PV24BU 26X691 24X692 X X PV26B PV24B 26X621 24X622 X X Ah L Li-ion X ,325 36,500 26X451 24X452 26X451 24X452 X X X X PB X084 X Ni-Cd X01-W ,
バッテリー適合表_1604_n
http://www.yamaha-motor.jp/pas/info/ 1 PM26NXL 26X903 X903-0001001 0005000 LED PAS 10,000 12.8Ah XL Li-ion X91-20 X91-82110-20 41,040 38,000 PA26NXL SP PA24NXL SP PA26NXL SP PA24NXL SP PM26NXL SP PM24NXL
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
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
5 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
![5 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](/thumbs/90/103736623.jpg "5 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
a,, f. a e c a M V N W W c V R MN W e sin V e cos f a b a ba e b W c V e c e F af af F a a c a e be a f a F a b e f F f a b e F e ff a e F a b e e f b e f F F a R b e c e f F M N DD s n s n D s s nd s
1
1 - 2 - ... - 4 -... - 4 -... - 4 -... - 4 -... - 5 -... - 5 -... - 8 -... - 9 -... - 9 -... - 9 -... - 9 -... - 9 -... - 9 -... - 10 -... - 10 -... - 10 -... - 10 -... - 10 -... - 11 -... - 11 -... -
A(6, 13) B(1, 1) 65 y C 2 A(2, 1) B( 3, 2) C 66 x + 2y 1 = 0 2 A(1, 1) B(3, 0) P 67 3 A(3, 3) B(1, 2) C(4, 0) (1) ABC G (2) 3 A B C P 6
1 1 1.1 64 A6, 1) B1, 1) 65 C A, 1) B, ) C 66 + 1 = 0 A1, 1) B, 0) P 67 A, ) B1, ) C4, 0) 1) ABC G ) A B C P 64 A 1, 1) B, ) AB AB = 1) + 1) A 1, 1) 1 B, ) 1 65 66 65 C0, k) 66 1 p, p) 1 1 A B AB A 67
Taro13-第6章(まとめ).PDF
% % % % % % % % 31 NO 1 52,422 10,431 19.9 10,431 19.9 1,380 2.6 1,039 2.0 33,859 64.6 5,713 10.9 2 8,292 1,591 19.2 1,591 19.2 1,827 22.0 1,782 21.5 1,431 17.3 1,661 20.0 3 1,948 1,541 79.1 1,541 79.1
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
a q q y y a xp p q y a xp y a xp y a x p p y a xp q y x yaxp x y a xp q x p y q p x y a x p p p p x p
a a a a y y ax q y ax q q y ax y ax a a a q q y y a xp p q y a xp y a xp y a x p p y a xp q y x yaxp x y a xp q x p y q p x y a x p p p p x p y a xp q y a x p q p p x p p q p q y a x xy xy a a a y a x
untitled
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 -
untitled
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
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 =
f : R R f(x, y) = x + y axy f = 0, x + y axy = 0 y 直線 x+y+a=0 に漸近し 原点で交叉する美しい形をしている x +y axy=0 X+Y+a=0 o x t x = at 1 + t, y = at (a > 0) 1 + t f(x, y
017 8 10 f : R R f(x) = x n + x n 1 + 1, f(x) = sin 1, log x x n m :f : R n R m z = f(x, y) R R R R, R R R n R m R n R m R n R m f : R R f (x) = lim h 0 f(x + h) f(x) h f : R n R m m n M Jacobi( ) m n
, 1. x 2 1 = (x 1)(x + 1) x 3 1 = (x 1)(x 2 + x + 1). a 2 b 2 = (a b)(a + b) a 3 b 3 = (a b)(a 2 + ab + b 2 ) 2 2, 2.. x a b b 2. b {( 2 a } b )2 1 =
x n 1 1.,,.,. 2..... 4 = 2 2 12 = 2 2 3 6 = 2 3 14 = 2 7 8 = 2 2 2 15 = 3 5 9 = 3 3 16 = 2 2 2 2 10 = 2 5 18 = 2 3 3 2, 3, 5, 7, 11, 13, 17, 19.,, 2,.,.,.,?.,,. 1 , 1. x 2 1 = (x 1)(x + 1) x 3 1 = (x 1)(x
II R n k +1 v 0,, v k k v 1 v 0,, v k v v 0,, v k R n 1 a 0,, a k a 0 v 0 + a k v k v 0 v k k k v 0,, v k σ k σ dimσ = k 1.3. k
II 231017 1 1.1. R n k +1 v 0,, v k k v 1 v 0,, v k v 0 1.2. v 0,, v k R n 1 a 0,, a k a 0 v 0 + a k v k v 0 v k k k v 0,, v k σ kσ dimσ = k 1.3. k σ {v 0,...,v k } {v i0,...,v il } l σ τ < τ τ σ 1.4.
renshumondai-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
02
Q A Ax Pb Ni Cd Hg Al Q A Q A Q A 1 2 3 2 0 1 2 3 4 5 6 7 0 1 2 3 4 5 6 7 8 0 0 1 2 3 4 1 0 1 2 Q A ng/ml 4500 D H E A 4000 3500 3000 2500 2000 DHEA-S - S 1500 1000 500 0 10 15 20 25 30 35 40 45
1 X X T T X (topology) T X (open set) (X, T ) (topological space) ( ) T1 T, X T T2 T T T3 T T ( ) ( ) T1 X T2 T3 1 X T = {, X} X (X, T ) indiscrete sp
1 X X T T X (topology) T X (open set) (X, T ) (topological space) ( ) T1 T, X T T2 T T T3 T T ( ) ( ) T1 X T2 T3 1 X T = {, X} X (X, T ) indiscrete space T1 T2 =, X = X, X X = X T3 =, X =, X X = X 2 X
6 2 2 x y x y t P P = P t P = I P P P ( ) ( ) ,, ( ) ( ) cos θ sin θ cos θ sin θ, sin θ cos θ sin θ cos θ y x θ x θ P
6 x x 6.1 t P P = P t P = I P P P 1 0 1 0,, 0 1 0 1 cos θ sin θ cos θ sin θ, sin θ cos θ sin θ cos θ x θ x θ P x P x, P ) = t P x)p ) = t x t P P ) = t x = x, ) 6.1) x = Figure 6.1 Px = x, P=, θ = θ P
a, b a bc c b a a b a a a a p > p p p 2, 3, 5, 7,, 3, 7, 9, 23, 29, 3, a > p a p [ ] a bp, b p p cq, c, q, < q < p a bp bcq q a <
![a, b a bc c b a a b a a a a p > p p p 2, 3, 5, 7,, 3, 7, 9, 23, 29, 3, a > p a p [ ] a bp, b p p cq, c, q, < q < p a bp bcq q a <](/thumbs/91/107555270.jpg "a, b a bc c b a a b a a a a p > p p p 2, 3, 5, 7,, 3, 7, 9, 23, 29, 3, a > p a p [ ] a bp, b p p cq, c, q, < q < p a bp bcq q a <")
22 9 8 5 22 9 29 0 2 2 5 2.............................. 5 2.2.................................. 6 2.3.............................. 8 3 8 4 9 4............................. 9 4.2 S(, a)..............................
untitled
8016! [! A]10060 3 1 (1) 1-1 4 (3) 3 3 (1) 3 0 4 1 3 f0x 1=(1+a)(1-x)+(-a)x=(-1-a+-a)x+a+1=(-3a+1)x+a+1 =(- a+ )x+a+1 (1) 0 ( x ( 1f0x1 a( 1 3 f 0x1f00=a+1= 1 a+ a 1 3 f 0x1f01=-a+= 1 a+ 0 ( x ( 1 f0x
JA2008
A1 1 10 vs 3 2 1 3 2 0 3 2 10 2 0 0 2 1 0 3 A2 3 11 vs 0 4 4 0 0 0 0 0 3 6 0 1 4 x 11 A3 5 4 vs 5 6 5 1 0 0 3 0 4 6 0 0 1 0 4 5 A4 7 11 vs 2 8 8 2 0 0 0 0 2 7 2 7 0 2 x 11 A5 9 5 vs 3 10 9 4 0 1 0 0 5
Microsoft Word - 5J0080_EAN-128MenuBook_v023.doc
目 次 1. はじめに 2 2.UCC/EAN-128 概要 2 3. 仕様概要 3 4. 設定方法 6 5. オプション設定 12 6. 出力モード 1 用アプリケーション識別子メニュー 14 7. 直接入力 23 本書の内容につきましては 万全を期して作成いたしましたが 万一ご不審の点やお気づきの点がございましたら 弊社営業部までご連絡ください 本書の一部または全部を無断で複製することは禁止されております
05›ª“è†E‘¼›Y”†(P47-P62).qx
z z z z z pz z x ux z ux z subject Ixp z I p z z z z z L ux z Ixp z L u u i p z i u x z i I xp z x z u u ux z uip z z u u z ui z z u u z z z z u ui z Iuz u u i u z u x x z i z i Ix u x u x z i z i x z
17. (1) 18. (1) 19. (1) 20. (1) 21. (1) (3) 22. (1) (3) 23. (1) (3) (1) (3) 25. (1) (3) 26. (1) 27. (1) (3) 28. (1) 29. (1) 2
1. (1) 2. 2 (1) 4. (1) 5. (1) 6. (1) 7. (1) 8. (1) 9. (1) 10. (1) 11. (1) 12. (1) 13. (1) 14. (1) 15. (1) (3) 16. (1) 1 17. (1) 18. (1) 19. (1) 20. (1) 21. (1) (3) 22. (1) (3) 23. (1) (3) 24. 1 (1) (3)
r 1 m A r/m i) t ii) m i) t B(t; m) ( B(t; m) = A 1 + r ) mt m ii) B(t; m) ( B(t; m) = A 1 + r ) mt m { ( = A 1 + r ) m } rt r m n = m r m n B
1 1.1 1 r 1 m A r/m i) t ii) m i) t Bt; m) Bt; m) = A 1 + r ) mt m ii) Bt; m) Bt; m) = A 1 + r ) mt m { = A 1 + r ) m } rt r m n = m r m n Bt; m) Aert e lim 1 + 1 n 1.1) n!1 n) e a 1, a 2, a 3,... {a 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 + (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
X G P G (X) G BG [X, BG] S 2 2 2 S 2 2 S 2 = { (x 1, x 2, x 3 ) R 3 x 2 1 + x 2 2 + x 2 3 = 1 } R 3 S 2 S 2 v x S 2 x x v(x) T x S 2 T x S 2 S 2 x T x S 2 = { ξ R 3 x ξ } R 3 T x S 2 S 2 x x T x S 2
OABC OA OC 4, OB, AOB BOC COA 60 OA a OB b OC c () AB AC () ABC D OD ABC OD OA + p AB + q AC p q () OABC 4 f(x) + x ( ), () y f(x) P l 4 () y f(x) l P
4 ( ) ( ) ( ) ( ) 4 5 5 II III A B (0 ) 4, 6, 7 II III A B (0 ) ( ),, 6, 8, 9 II III A B (0 ) ( [ ] ) 5, 0, II A B (90 ) log x x () (a) y x + x (b) y sin (x + ) () (a) (b) (c) (d) 0 e π 0 x x x + dx e
II No.01 [n/2] [1]H n (x) H n (x) = ( 1) r n! r!(n 2r)! (2x)n 2r. r=0 [2]H n (x) n,, H n ( x) = ( 1) n H n (x). [3] H n (x) = ( 1) n dn x2 e dx n e x2
![II No.01 [n/2] [1]H n (x) H n (x) = ( 1) r n! r!(n 2r)! (2x)n 2r. r=0 [2]H n (x) n,, H n ( x) = ( 1) n H n (x). [3] H n (x) = ( 1) n dn x2 e dx n e x2](/thumbs/101/149159646.jpg "II No.01 [n/2] [1]H n (x) H n (x) = ( 1) r n! r!(n 2r)! (2x)n 2r. r=0 [2]H n (x) n,, H n ( x) = ( 1) n H n (x). [3] H n (x) = ( 1) n dn x2 e dx n e x2")
II No.1 [n/] [1]H n x) H n x) = 1) r n! r!n r)! x)n r r= []H n x) n,, H n x) = 1) n H n x) [3] H n x) = 1) n dn x e dx n e x [4] H n+1 x) = xh n x) nh n 1 x) ) d dx x H n x) = H n+1 x) d dx H nx) = nh
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
2014-11.key
2014-11 1 2 3 4 5 7 8 9 10 11 12 PC 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 45 46 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68
「東京こどもネット・ケータイヘルプデスク(こたエール)」平成22年度相談実績の概要
734, 35% 62, 11% 84, 16% 530, 26% 235, 11% PC) 396, 73% 579, 28% ) (21 ) 2 3 4 5 6 7 8 9 10 11 12 13 200 150 100 22 182 200 150 100 22 50 54 PC 49 52 PC 50 41 14 17 1 1 4 16 3 6 14 180 250 200 150 235
6 30 2005 10 1 65 2,682 00 21.9 481 1 2,776 21.0 15 1,740 00 5.8 107 13.6 40 2025 24.2-0 - -1 - -2 - -3 - -4 - -5 - -6 - -7 - -8- -9 - - 10 - -11 - - 12 - - 13-10 11 59 4 59 3 10 17 - 14 - - 15 - - 16
mugensho.dvi
1 1 f (t) lim t a f (t) = 0 f (t) t a 1.1 (1) lim(t 1) 2 = 0 t 1 (t 1) 2 t 1 (2) lim(t 1) 3 = 0 t 1 (t 1) 3 t 1 2 f (t), g(t) t a lim t a f (t) g(t) g(t) f (t) = o(g(t)) (t a) = 0 f (t) (t 1) 3 1.2 lim
tokei01.dvi
2. :,,,. :.... Apr. - Jul., 26FY Dept. of Mechanical Engineering, Saga Univ., JAPAN 4 3. (probability),, 1. : : n, α A, A a/n. :, p, p Apr. - Jul., 26FY Dept. of Mechanical Engineering, Saga Univ., JAPAN
V T n n = A r n A n r n U V m m n n UT U = I V T V = I : A = A = UΣV T A T AV = VΣ T Σ : AB T = B T A T V A T A V A V T V = I 3 V A V T V = I : A AK =
PLS Janes PLS PLS PCR MLR PCA singular value decomposition : m n A 3 A = U m n m m Σ m n VT n n U left singular matrix V Σ U = m m A m r Σ = m n σ σ r A m m r V T n n = A r n A n r n U V m m n n UT U =
Gmech08.dvi
63 6 6.1 6.1.1 v = v 0 =v 0x,v 0y, 0) t =0 x 0,y 0, 0) t x x 0 + v 0x t v x v 0x = y = y 0 + v 0y t, v = v y = v 0y 6.1) z 0 0 v z yv z zv y zv x xv z xv y yv x = 0 0 x 0 v 0y y 0 v 0x 6.) 6.) 6.1) 6.)
K E N Z OU
K E N Z OU 11 1 1 1.1..................................... 1.1.1............................ 1.1..................................................................................... 4 1.........................................
C:/KENAR/0p1.dvi
2{3. 53 2{3 [ ] 4 2 1 2 10,15 m 10,10 m 2 2 54 2 III 1{I U 2.4 U r (2.16 F U F =, du dt du dr > 0 du dr < 0 O r 0 r 2.4: 1 m =1:00 10 kg 1:20 10 kgf 8:0 kgf g =9:8 m=s 2 (a) x N mg 2.5: N 2{3. 55 (b) x
!!! 10 1 110 88 7 9 91 79 81 82 87 6 5 90 83 75 77 12 80 8 11 89 84 76 78 85 86 4 2 32 64 10 44 13 17 94 34 33 107 96 14 105 16 97 99 100 106 103 98 63 at 29, 66 at 58 12 16 17 25 56
1. (8) (1) (x + y) + (x + y) = 0 () (x + y ) 5xy = 0 (3) (x y + 3y 3 ) (x 3 + xy ) = 0 (4) x tan y x y + x = 0 (5) x = y + x + y (6) = x + y 1 x y 3 (
1 1.1 (1) (1 + x) + (1 + y) = 0 () x + y = 0 (3) xy = x (4) x(y + 3) + y(y + 3) = 0 (5) (a + y ) = x ax a (6) x y 1 + y x 1 = 0 (7) cos x + sin x cos y = 0 (8) = tan y tan x (9) = (y 1) tan x (10) (1 +
,. Black-Scholes u t t, x c u 0 t, x x u t t, x c u t, x x u t t, x + σ x u t, x + rx ut, x rux, t 0 x x,,.,. Step 3, 7,,, Step 6., Step 4,. Step 5,,.
9 α ν β Ξ ξ Γ γ o δ Π π ε ρ ζ Σ σ η τ Θ θ Υ υ ι Φ φ κ χ Λ λ Ψ ψ µ Ω ω Def, Prop, Th, Lem, Note, Remark, Ex,, Proof, R, N, Q, C [a, b {x R : a x b} : a, b {x R : a < x < b} : [a, b {x R : a x < b} : a,
9 2 1 f(x, y) = xy sin x cos y x y cos y y x sin x d (x, y) = y cos y (x sin x) = y cos y(sin x + x cos x) x dx d (x, y) = x sin x (y cos y) = x sin x
2009 9 6 16 7 1 7.1 1 1 1 9 2 1 f(x, y) = xy sin x cos y x y cos y y x sin x d (x, y) = y cos y (x sin x) = y cos y(sin x + x cos x) x dx d (x, y) = x sin x (y cos y) = x sin x(cos y y sin y) y dy 1 sin
CALCULUS II (Hiroshi SUZUKI ) f(x, y) A(a, b) 1. P (x, y) A(a, b) A(a, b) f(x, y) c f(x, y) A(a, b) c f(x, y) c f(x, y) c (x a, y b)
CALCULUS II (Hiroshi SUZUKI ) 16 1 1 1.1 1.1 f(x, y) A(a, b) 1. P (x, y) A(a, b) A(a, b) f(x, y) c f(x, y) A(a, b) c f(x, y) c f(x, y) c (x a, y b) lim f(x, y) = lim f(x, y) = lim f(x, y) = c. x a, y b
( ) ( )
20 21 2 8 1 2 2 3 21 3 22 3 23 4 24 5 25 5 26 6 27 8 28 ( ) 9 3 10 31 10 32 ( ) 12 4 13 41 0 13 42 14 43 0 15 44 17 5 18 6 18 1 1 2 2 1 2 1 0 2 0 3 0 4 0 2 2 21 t (x(t) y(t)) 2 x(t) y(t) γ(t) (x(t) y(t))
x ( ) x dx = ax
x ( ) x dx = ax 1 dx = a x log x = at + c x(t) = e at C (C = e c ) a > 0 t a < 0 t 0 (at + b ) h dx = lim x(t + h) x(t) h 0 h x(t + h) x(t) h x(t) t x(t + h) x(t) ax(t) h x(t + h) x(t) + ahx(t) 0, h, 2h,
入試の軌跡
4 y O x 4 Typed by L A TEX ε ) ) ) 6 4 ) 4 75 ) http://kumamoto.s.xrea.com/plan/.. PDF) Ctrl +L) Ctrl +) Ctrl + Ctrl + ) ) Alt + ) Alt + ) ESC. http://kumamoto.s.xrea.com/nyusi/kumadai kiseki ri i.pdf
名古屋工業大の数学 2000 年 ~2015 年 大学入試数学動画解説サイト
名古屋工業大の数学 年 ~5 年 大学入試数学動画解説サイト http://mathroom.jugem.jp/ 68 i 4 3 III III 3 5 3 ii 5 6 45 99 5 4 3. () r \= S n = r + r + 3r 3 + + nr n () x > f n (x) = e x + e x + 3e 3x + + ne nx f(x) = lim f n(x) lim
v er.1/ c /(21)
12 -- 1 1 2009 1 17 1-1 1-2 1-3 1-4 2 2 2 1-5 1 1-6 1 1-7 1-1 1-2 1-3 1-4 1-5 1-6 1-7 c 2011 1/(21) 12 -- 1 -- 1 1--1 1--1--1 1 2009 1 n n α { n } α α { n } lim n = α, n α n n ε n > N n α < ε N {1, 1,
LGL24
LGL24 a ii 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 Li-ion00 16 17 18 19 20 21 22 a b 23 24 25 26 27 28 a b c d a b d e 29 30 31 32 33 34 o p q r s t c d e f k l a b j m n g h i u v a b c d e f g h i j k l
No2 4 y =sinx (5) y = p sin(2x +3) (6) y = 1 tan(3x 2) (7) y =cos 2 (4x +5) (8) y = cos x 1+sinx 5 (1) y =sinx cos x 6 f(x) = sin(sin x) f 0 (π) (2) y
No1 1 (1) 2 f(x) =1+x + x 2 + + x n, g(x) = 1 (n +1)xn + nx n+1 (1 x) 2 x 6= 1 f 0 (x) =g(x) y = f(x)g(x) y 0 = f 0 (x)g(x)+f(x)g 0 (x) 3 (1) y = x2 x +1 x (2) y = 1 g(x) y0 = g0 (x) {g(x)} 2 (2) y = µ
, = = 7 6 = 42, =
http://www.ss.u-tokai.ac.jp/~mahoro/2016autumn/alg_intro/ 1 1 2016.9.26, http://www.ss.u-tokai.ac.jp/~mahoro/2016autumn/alg_intro/ 1.1 1 214 132 = 28258 2 + 1 + 4 1 + 3 + 2 = 7 6 = 42, 4 + 2 = 6 2 + 8
(1) (2) (1) (2) 2 3 {a n } a 2 + a 4 + a a n S n S n = n = S n
. 99 () 0 0 0 () 0 00 0 350 300 () 5 0 () 3 {a n } a + a 4 + a 6 + + a 40 30 53 47 77 95 30 83 4 n S n S n = n = S n 303 9 k d 9 45 k =, d = 99 a d n a n d n a n = a + (n )d a n a n S n S n = n(a + a n
a ii
LGV31 a ii 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 Li-ion00 16 17 18 19 20 21 22 a b 23 24 25 26 27 28 a b c d a b d e 29 30 31 32 33 34 o p q r s t c d e f k l a b j m n g h i u v a b c d e f g h i j k l
x, y x 3 y xy 3 x 2 y + xy 2 x 3 + y 3 = x 3 y xy 3 x 2 y + xy 2 x 3 + y 3 = 15 xy (x y) (x + y) xy (x y) (x y) ( x 2 + xy + y 2) = 15 (x y)
x, y x 3 y xy 3 x 2 y + xy 2 x 3 + y 3 = 15 1 1977 x 3 y xy 3 x 2 y + xy 2 x 3 + y 3 = 15 xy (x y) (x + y) xy (x y) (x y) ( x 2 + xy + y 2) = 15 (x y) ( x 2 y + xy 2 x 2 2xy y 2) = 15 (x y) (x + y) (xy
30 I .............................................2........................................3................................................4.......................................... 2.5..........................................
newmain.dvi
数論 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/008142 このサンプルページの内容は, 第 2 版 1 刷発行当時のものです. Daniel DUVERNEY: THÉORIE DES NOMBRES c Dunod, Paris, 1998, This book is published
ばらつき抑制のための確率最適制御
( ) http://wwwhayanuemnagoya-uacjp/ fujimoto/ 2011 3 9 11 ( ) 2011/03/09-11 1 / 46 Outline 1 2 3 4 5 ( ) 2011/03/09-11 2 / 46 Outline 1 2 3 4 5 ( ) 2011/03/09-11 3 / 46 (1/2) r + Controller - u Plant y
(4) P θ P 3 P O O = θ OP = a n P n OP n = a n {a n } a = θ, a n = a n (n ) {a n } θ a n = ( ) n θ P n O = a a + a 3 + ( ) n a n a a + a 3 + ( ) n a n
3 () 3,,C = a, C = a, C = b, C = θ(0 < θ < π) cos θ = a + (a) b (a) = 5a b 4a b = 5a 4a cos θ b = a 5 4 cos θ a ( b > 0) C C l = a + a + a 5 4 cos θ = a(3 + 5 4 cos θ) C a l = 3 + 5 4 cos θ < cos θ < 4
my18_q5_di_1801
Data Information Q5Audi Q5 Audi SQ5 Audi Q5/SQ5 Specifications SQ5 DBA-FYDAXS DBA-FYDAXA ABA-FYCWGS - - - : mm 4,680 4,680 4,685 : mm 1,900 1,900 1,900 : mm 1,665 1,640 1,635 mm 2,825 2,825 2,825 mm 1,620
1W II K =25 A (1) office(a439) (2) A4 etc. 12:00-13:30 Cafe David 1 2 TA appointment Cafe D
1W II K200 : October 6, 2004 Version : 1.2, kawahira@math.nagoa-u.ac.jp, http://www.math.nagoa-u.ac.jp/~kawahira/courses.htm TA M1, m0418c@math.nagoa-u.ac.jp TA Talor Jacobian 4 45 25 30 20 K2-1W04-00
p q p q p q p q p q p q p q p q p q x y p q t u r s p q p p q p q p q p p p q q p p p q P Q [] p, q P Q [] P Q P Q [ p q] P Q Q P [ q p] p q imply / m
![p q p q p q p q p q p q p q p q p q x y p q t u r s p q p p q p q p q p p p q q p p p q P Q [] p, q P Q [] P Q P Q [ p q] P Q Q P [ q p] p q imply / m](/thumbs/86/94163521.jpg "p q p q p q p q p q p q p q p q p q x y p q t u r s p q p p q p q p q p p p q q p p p q P Q [] p, q P Q [] P Q P Q [ p q] P Q Q P [ q p] p q imply / m")
P P N p() N : p() N : p() N 3,4,5, L N : N : N p() N : p() N : p() N p() N p() p( ) N : p() k N : p(k) p( k ) k p(k) k k p( k ) k k k 5 k 5 N : p() p() p( ) p q p q p q p q p q p q p q p q p q x y p q
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!
[ ] Table
![[ ] Table](/thumbs/96/130290982.jpg "[ ] Table")
[] Te P AP OP [] OP c r de,,,, ' ' ' ' de,, c,, c, c ',, c mc ' ' m' c ' m m' OP OP p p p ( t p t p m ( m c e cd d e e c OP s( OP t( P s s t (, e e s t s 5 OP 5 5 s t t 5 OP ( 5 5 5 OAP ABP OBP ,, OP t(
B. 41 II: 2 ;; 4 B [ ] S 1 S 2 S 1 S O S 1 S P 2 3 P P : 2.13:
![B. 41 II: 2 ;; 4 B [ ] S 1 S 2 S 1 S O S 1 S P 2 3 P P : 2.13:](/thumbs/94/118646867.jpg "B. 41 II: 2 ;; 4 B [ ] S 1 S 2 S 1 S O S 1 S P 2 3 P P : 2.13:")
B. 41 II: ;; 4 B [] S 1 S S 1 S.1 O S 1 S 1.13 P 3 P 5 7 P.1:.13: 4 4.14 C d A B x l l d C B 1 l.14: AB A 1 B 0 AB 0 O OP = x P l AP BP AB AP BP 1 (.4)(.5) x l x sin = p l + x x l (.4)(.5) m d A x P O
simx simxdx, cosxdx, sixdx 6.3 px m m + pxfxdx = pxf x p xf xdx = pxf x p xf x + p xf xdx 7.4 a m.5 fx simxdx 8 fx fx simxdx = πb m 9 a fxdx = πa a =
II 6 ishimori@phys.titech.ac.jp 6.. 5.4.. f Rx = f Lx = fx fx + lim = lim x x + x x f c = f x + x < c < x x x + lim x x fx fx x x = lim x x f c = f x x < c < x cosmx cosxdx = {cosm x + cosm + x} dx = [
DVIOUT
A. A. A-- [ ] f(x) x = f 00 (x) f 0 () =0 f 00 () > 0= f(x) x = f 00 () < 0= f(x) x = A--2 [ ] f(x) D f 00 (x) > 0= y = f(x) f 00 (x) < 0= y = f(x) P (, f()) f 00 () =0 A--3 [ ] y = f(x) [, b] x = f (y)
GZ-HD40_GZ-HD30
GZ-HD40/GZ-HD30 440 CBR 3 4 5 4 3 3 4 3 5 5 XP SP EP Z 3 4 6 6-3 7 8 6-3 4 5 XP SP EP 440 CBR 7-3 440 CBR 4 5 9 7-6 9 0 7 8 0 8-3 440 CBR 4 5 8-6 9 7 8 0 440 CBR 440 CBR 8-3 3 3 4 3 4 5 8-4 3 9- XP SP
商学 66‐5☆/11.吉川
797 1 2 2 1 2 2004 1998 7 1 50 57 2 50 55 798 1 4 1 3 4 5 1 Sexual Workplace Sexual Harassment Non-Sexual Workplace Bullying* Campus Sexual Harassment Academic Harassment 1 power harassmentworkplace bullying
i 6 3 ii 3 7 8 9 3 6 iii 5 8 5 3 7 8 v...................................................... 5.3....................... 7 3........................ 3.................3.......................... 8 3 35
II 1 3 2 5 3 7 4 8 5 11 6 13 7 16 8 18 2 1 1. x 2 + xy x y (1 lim (x,y (1,1 x 1 x 3 + y 3 (2 lim (x,y (, x 2 + y 2 x 2 (3 lim (x,y (, x 2 + y 2 xy (4 lim (x,y (, x 2 + y 2 x y (5 lim (x,y (, x + y x 3y
Gmech08.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