J E S G I Sw K Ch Ck fx-5800P Supplement Suplemento Ergänzung Supplemento Tillägg http://edu.casio.jp/ http://world.casio.com/edu/ RJA516833-001V01 #01 1-1 mp 1.67262171×10­27 kg 1-2 mn 1-4 mµ 1-6 h 1.67492728×10­27 kg 1.8835314×10­28 kg 6.6260693×10­34 Js T ­1 1-3 me 9.1093826×10­31 kg 1-5 a0 0.5291772108×10­10 m 1-7 µ N 5.05078343×10­27 J T ­1 1-8 µ B 2-1 H 2-2 2-3 2-4 2-5 c 927.400949×10­26 J 7.297352568×10­3 2.426310238×10­12 m m 1.05457168×10­34 J s 3-5 µµ 3-6 3-7 3-8 4-1 4-2 4-3 4-4 4-5 4-6 4-7 4-8 5-1 5-2 5-3 5-4 5-5 5-6 5-7 F e k R ­4.49044799×10­26 J T ­1 96485.3383 C mol ­1 1.60217653×10­19 C 1.3806505×10­23 J K­1 8.314472 J mol ­1 K ­1 NA 6.0221415×1023 mol ­1 Vm 22.413996×10­3 m3 mol ­1 C0 299792458 m s­1 C1 3.74177138×10­16 W m2 C2 1.4387752×10­2 m K 5.670400×10­8 W m­2 K­4 0 8.854187817×10­12 F m­1 re 2.817940325×10­15 m p 2.67522205×108 s­1 T ­1 1.3214098555×10­15 µ 0 12.566370614×10­7 N A­2 0 2.06783372×10­15 Wb g 9.80665 m s­2 G0 7.748091733×10­5 S Z0 376.730313461 t G 273.15 K 6.6742×10­11 m3 kg­1 s­2 2-6 cp 2-7 cn 1.3195909067×10­15 m 2-8 R 10973731.568525 3-1 u m­1 1.66053886×10­27 kg 3-2 µ p 1.41060671×10­26 J T­1 3-3 µ e ­928.476412×10­26 J T­1 3-4 µ n ­0.96623645×10­26 J T­1 5-8 atm 101325 Pa ­­ #02 a= b= r= m= yi ­ a.xi n.xiyi ­ xi.yi n.xi2 ­ (xi)2 n.xiyi ­ xi.yi .xi2 ­ (xi)2}{n.yi2 ­ (yi)2} {n n y­b a n = ax + b #03 Sxx.Sx2x2 ­ (Sxx2)2 Sxy.Sx2x2 ­ Sx2y.Sxx2 b= Sxx.Sx2x2 ­ (Sxx2)2 c= 2 a= Sx2y.Sxx ­ Sxy.Sxx2 yi ­ a xi ­ b xi n n n 2 ()() (xi)2 (xi .yi) n Sxx = xi ­ Sxy = xiyi ­ m1 = n ­ b + b2 ­ 4a(c ­ y) 2a ­ b ­ b2 ­ 4a(c ­ y) m2 = 2a n = ax2 + bx + c #04 a= (xi.xi2) n (x 2)2 Sx2x2 = xi4 ­ ni (xi2.yi) Sx2y = xi2yi ­ n Sxx2 = xi3 ­ n n.(lnxi)yi ­ lnxi.yi b= n.(lnxi)2 ­ (lnxi)2 n.(lnxi)yi ­ lnxi.yi r= .(lnxi)2 ­ (lnxi)2}{n.yi2 ­ (yi)2} {n yi ­ b.lnxi m=e b n = a + blnx ­­ y­a #05 n.xilnyi ­ xi.lnyi b= n.xi2 ­ (xi)2 n.xilnyi ­ xi.lnyi r= .xi2 ­ (xi)2}{n.( lnyi)2 ­ (lnyi)2} {n lny ­ lna m= b a = exp ( lny ­n b.x ) i i n = aebx #06 a = exp b = exp r= m= lny ­ lna lnb n.xilnyi ­ xi.lnyi .xi2 ­ (xi)2}{n.(lnyi)2 ­ (lnyi)2} {n (lny ­n .x ) ( n.x.x ­­x .lny ) n x i lnb i ilnyi i 2 ( i i) 2 i n = abx #07 a = exp b= r= n.lnxilnyi ­ lnxi.lnyi n.(lnxi)2 ­ (lnxi)2 n.lnxilnyi ­ lnxi.lnyi ln y ­ ln a b ( lny ­n .lnx ) i b i {n.(lnxi)2 ­ (lnxi)2}{n.(lnyi)2 ­ (lnyi)2} m=e n = axb ­­ #08 a= n Sxy b= Sxx Sxy r= Sxx.Syy yi ­ b.xi­1 Sxx = (xi­1)2 ­ Syy = yi ­ 2 (xi­1)2 (yi)2 n n Sxy = (xi ­1)yi ­ xi­1.yi n m= y­a x b y b n=a+ #09 1 mm tan = 2 ­ 1 1 + m1 m2 y = m2 x + k2 y = m 1 x + k1 x (m1 m2 G 1) 2 3 4 a= 2 ­ 1 t2 ­ t1 (t2 > t1 > 0) 2 (t > 0) A S = 0 t + 1 at 2 2bc 2 2 2 cos A = b + c ­ a 2 2 2 cos B = c + a ­ b 2ca c B b C 2 2 2 cos C = a + b ­ c 2ab 5 S= n{2a + (n ­ 1)d} 2 ­­ a 6 7 = 3RT M (M, T > 0) y Y (xp, yp) [(xp, yp)(Xp, Yp)] (Xp, Yp) Xp = (xp­x0)cos + (yp­y0)sin Yp = (yp­y0)cos ­ (xp­x0)sin X (x0, (0, 0) y0) x 8 P [ + 2g 2 + Z = Const.] P2 = P1 + 9 P [ + 2g 2 ( 12 ­ 22 + Z ­ Z 1 2 2g ) (, P, , Z > 0) + Z = Const.] ( , P, , Z > 0) 2 = 10 2g(P1 ­ P2) + 12 + 2g( Z1 ­ Z2) 2 P [ + 2g + Z = Const.] 2g 2 2 Z2 = P1 ­ P2 + 1 ­ 2 + Z1 11 Px = nCx Px ( 1 ­ P)n­x 0 < P < 1 x = 0, 1, 2······ Pol(XB ­ XA, YB ­ YA) YP = Rsin + YA Q1 ­ Q2 Q1 XP = Rcos + XA ( (, P, , Z > 0) ) 12 (XB, YB) R (XA, YA) (Xp, Yp) 13 = ( Q1 G 0) ­­ 14 15 16 = F = mr 2 (m, r, > 0) 2 F=m r T1 ­ T2 T1 ( T1 G 0) (r, m, > 0) ( T, > 0 ) 17 18 19 20 21 22 23 24 25 26 27 = S0 = rR (r,R> 0) V = 1 r2h 3 (r, h > 0) (r, h > 0) (r, h > 0) ( G 0) ( G 0) ( f > 0) T S0 = 2 rh V = r 2h T = 2 T= 1 f R= R S 1 1 1 T = 2 r S = r 2 (r > 0) (S,R, > 0) 2 2 2 [ A = A = Const. ] 2 = A1 1 1 A2 2 1 (A2, 2 > 0) 2 2 28 [ A = A = Const. ] 1 1 A2 = A1 1 1 2 2 2 (2 G 0, 2 > 0) ­­ 29 R1 = R4R5 + R5R6 + R6R4 R5 R4R5 + R5R6 + R6R4 R2 = R6 R4R5 + R5R6 + R6R4 R3 = R4 R4 = (R4, R5, R6 > 0) 30 R1R2 R2R3 R 3R 1 , R5 = , R6 = R1 + R2 + R3 R1 + R2 + R3 R1 + R2 + R3 X (R1, R2, R3 > 0) 31 [(XA, YA), Rec(R, )(Xp, Yp)] XP = Rcos + XA YP = Rsin + YA (XA, YA) R (Xp, Yp) 32 33 a = b + c ­ 2bc cos A a = b + c ­ 2bc cos A b2 = c2 + a2 ­ 2ca cos B (b, c > 0, 0° < A < 180°) c2 = a2 + b2 ­ 2ab cos C Qq F= 1 (r > 0) 4 0 r2 2 2 2 2 2 34 S = 13 + 23 + ······ + n3 = Ai [d B] = 20 log10 35 36 y = x ­ xA × 10 + 50 () 2 1 { n(n + 1) 2 } 2 [d B] ( > 0) (2 / 1 > 0) ­­ 37 Pol(XB ­ XA, YB ­ YA) X (XB, YB) (XA, YA) R 38 39 40 41 42 43 44 45 46 47 48 u f = f0 ­ ­0 ( ­u G 0, f0 > 0, ­ 0 > 0 ) S = 0 t + 1 gt 2 2 (t > 0) (k, x > 0) Up = 1 kx 2 2 W = 1 CV 2 Q2 W= 1 2C W = 1 QV 2 2 (C > 0) W = 1 ED 2 2 (E, D > 0) W = 1 E 2 ( , E > 0) E= f= 4 0r2 1 2 LC Q ( = 9 × 10 9 Q ) r2 ( r > 0) (L, C > 0) (a, b > 0) a b S = ab 49 H = U + PV (U, P, V> 0) ­­ 50 y = e­ x x > 0 y=0 x<0 Px = ( 1 ­ P)x P S= a (r n ­1) r­1 Q = mcT ( > 0) 51 ( x = 0, 1, 2······ 0c >0 b+c>a >0 c+a>b >0 ) (0 < k < N, 0 < n < N ) V = nRT P PV T= nR n = PV RT 1 sin ic = n 2 12 P = nRT V Ve = BR ( , B,R> 0) (n, T, V > 0) (n, T, P > 0) (P, V, n > 0) (P, V, T > 0) (1 < n12 ) W = 1 L I2 (L , I > 0) ­­ 63 x = nX3 ­ mX1 + Y1 ­ Y3 n­m y = m (x ­ X1) + Y1 (X4, Y4) (X1, Y1) 64 nX3 ­ mX1 + Y1 ­ Y3 n­m y = m (x ­ X1) + Y1 x= ( m = Y2 ­ Y1 X2 ­ X1 Y4 ­ Y3 n= X4 ­ X3 ) (x, y) (X2, Y2) (X3, Y3) X (X1, Y1) ( m = Y2 ­ Y1 X2 ­ X1 n = tan ) (x, y) (X2, Y2) (X3, Y3) 65 66 67 P = RI2 P= V R 2 (R > 0) (R > 0) (m, > 0) 1 1 ( = L ­ = XL ­ XC ) C 2 f C Uk = 1 m2 2 68 69 70 X = 2 f L ­ ( f, L, C > 0) Z = R2 + (2 f L )2 (= R2 + 2 L2 ) Z= (R, f, L > 0) (R, f, C, L > 0) 71 Z= ( R) ( f C R ( fL 1 2 1 + 2 ­ 1 2 f L 2 + 2 ­ 1 2 f C ) ) 2 2 ( = R2 + L ­ 1 C ( (R, f, L, C > 0) ) ) 72 F = mH (m, H > 0) ­ 0 ­ 73 74 75 T = 1 m2 = 1 2 2 q2 B2 2 R m Z1 Z 1­ 1 Z0 Z0 ­1 Z1 (m > 0, B > 0, R > 0) F = iBRsin R1 = Z0 1­ (R> 0, 0°< < 90°) R1 Z1 ,R = Z0 2 L min = 20 log 76 77 (D, Z > 0) M= D Z P [ M = D11 = D22 = ] Z Z [M = D Z 1 = 1 D2 = P Z2 ( Z0 + Z1 ) Z0 R2 (Z0 > Z1 > 0) Z1 [d B] ] M= P (P > 0) 1 78 [M = D Z D2 = = D1Z2 Z1 1 1 D2 = P Z2 ] ] ( > 0) 1 2 f L (D1, Z1, Z2 > 0) = 79 [M = D Z D = PZ 1 D2 = P Z2 (x ­µ) (P, Z > 0) 2 80 81 82 y= 1 e­ 2 2 2 YR = R 1, YX = 2 f C ­ (R, f , C , L > 0) S = ab sin ( a, b > 0 0°< < 180° ) ­ ­ 83 C= d= S d (S, d > 0) (a, b G 0) P(x1, y1) 84 ax1 + by1 + c a2 + b2 d ax1 + by1 + c = 0 85 R= (x2 ­ x1)2 + (y2 ­ y1)2 y y2 y1 R 86 87 88 89 90 91 ­µ Px = µ e x! x Up = mgh cos = R = P EI Z Ap [dB] = 10 V = 1 Ah 3 () log ( P ) P 10 2 1 (m, h > 0) (R > 0) (x ...