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1 J fx-570ms fx-991ms CA V06

2 Eng n 1

3 fx-95ms/fx-100ms/fx-570ms/ fx-912ms (fx-115ms)/fx-991ms 2

4 fx-570ms/fx-991ms <fx-570ms/fx-991ms> COMP F 1 CMPLX F 2 SD F F 1 REG F F 2 n BASE F F 3 EQN F F F 1 MAT F F F 2 VCT F F F 3 F Deg, Rad CMPLX A B 2(Mode) = COMP Deg Norm 1/Eng OFF a bi 3

5 a b /c Dot n BASEEng BASE Disp COMPCMPLXSDREG SD REG COMP CMPLXDeg Rad Gra COMP COMP COMP... F = = = 3 [ ] A [(COPY) : :

6 = COMP 1 79 COMP CMPLX - Y = X 2 + 3X 12 X 7 Y 58 X 8 Y 76 p y p u p x K + 3 p x, 12 C X? 7 7 = X? 8 C 8 = CMPLX - A B C B=14 m C=2 s D=9.8 m s 2 A A= B AC DC 2 2 5

7 p 2 p u p 1 - p k, R 1 \ 2 T - p h - p k K A I (B?) 14 = (A?) ] (C?) 2 = (D?) 9 l 8 = [ [ (A?) A I u u u y = sin x u y e x y 1/x u y x 0 COMP COMP COMP... F 1 6

8 COMP EQN CMPLX Eng F Disp 1 1 Eng1 2 1 Eng ON Eng Eng 2 Eng OFF Eng Eng Eng Eng 9 Eng k ( ) A k 10 3 M ( ) A M 10 6 G ( ) A g 10 9 T ( ) A t m ( ) A m 10-3 µ () A N 10-6 n ( ) A n 10-9 p ( ) A p f () A f Eng Eng 1 100m ( ) 5µ () = 500n ( ) F... Eng 1 Disp m 5 n 100 A m - 5 A N = 500. µ = 0.9m ( ) F... 1 Disp Eng

9 Eng Eng 9 1 m 9 \ 10 = k ( ) 1k ( ) = 1M ( ) A P m J 900. F... Eng 1 Disp k 1 k M 1 A k - 1 A k = T ( ) = F... Eng 1 Disp T 1 1 A t = Eng CMPLX CMPLX CMPLX... F 2 Deg,Rad,Gra CMPLX A, B, C, M D, E, F, X, Y R I A r CMPLX 8

10 - 2+3i) 4+5i) 6 8 i i i = 8i A r z a bi r r 1 3+4i r Deg r (r 5) A A R i T = ( ) A a R i T = r i L 2 A Q 45 = (Deg ) A r r A r 9

11 - 1 i (Deg ) 1 + i A Y = A r L 2 A Q 45 A Z = A r a bi r F Disp 1 1r1 2 1(a+bi): 2(r ): r z = a+bi z = a bi i i A S R 1 l l 34 i T = A r n BASE nbase BASE... F F n 10

12 n and or xor xnor Not Neg < x < < x < < x < < x < < x < < x < FFFFFFFF 0 < x < 7FFFFFFF ( ) 2 11 t b = 0. b (516 8 ) 8 t o 0. o l l l 4(o) 7654 \ l l l 1(d)12 = or (12d 16, ) 16 t h 120 l 2(or) 0. H l l l 3(b)1101= K ( , 26 8, ) 10 2 t b 0. b

13 l l l 1(d) 22 = b 8 o 26. o 16 h 16. H t b 0. b l l l 1(d) 513 = Ma th ERROR b Math ERROR SD REG SD SD SD... F F 1 SD REG S A D P ( Q ( R ( t P(t) Q(t) R(t) 12

14 - x x = 53 ( t ) P(t ) 55, 54, 51, 55, 53, 53, 54, 52 ( t = , P(t) = ) 55 S 54 S 51 S 55 S 53 S S 54 S 52 S 53 A D 4( t) = A D 1( P( ) D 0.28 F = COMP COMP COMP... F 1 x a x x 3 A J P a P x T - y 3x 2 5x + 2 x 2 x x = A J 3 p x K, 5 p x + 2 P 2 P 2 e D 4 T = x Rad Radian 13

15 COMP COMP COMP... F 1 x a, b n N = 2 n 4 d P a P b P n F 5-1(2 x x + 8) dx = n = 6 d 2 p x K + 3 p x + 8 P 1 P 5 P 6 T = n 1~9 Rad Radian MAT MAT MAT... F F F 2 14

16 A, B, C 3 MatAns 2 1 A j 1 Dim A, B, C MatA t A j 2 Edit A, B, C [ ] - A = B = [ 2 4 1] ([ ])

17 ( A 3 2) A j 1(Dim) 1(A) 3 = 2 = ( ) 1 = 2 = 4 = 0 = D 2 = 5 = t ( B 2 3) A j 1(Dim) 2(B) 2 = 3 = ( ) D 1 = 0 = 3 = 2 = D 4 = 1 = t (MatA MatB) A j 3(Mat) 1(A) - A j 3(Mat) 2(B) = C = C 15 9 ( C 2 2) A j 1(Dim) 3(C) 2 = 2 = ( ) 2 = D 1 = D 5 = 3 = t (3 MatC) 3 - A j 3(Mat) 3(C) = A = ( A 3 3) A j 1(Dim) 1(A) 3 = 3 = ( ) 2 = D 1 = 6 = 5 = 0 = 1 = 3 = 2 = 4 = t (DetMatA) [ ] ([ ]) [ ] A j r 1(Det) A j 3(Mat) 1(A) = 16

18 B = ( B 2 3) A j 1(Dim) 2(B) 2 = 3 = ( ) (TrnMatB) 5 8 ([ ]) [ ] ( [ ]) 5 = 7 = 4 = 8 = 9 = 3 = t A j r 2(Trn) A j 3(Mat) 2(B) = C = ( C 3 3) A j 1(Dim) 3(C) 3 = 3 = ( ) D 3 = 6 = D 11 = 3 = D 4 = 6 = 4 = D 8 = 13 = t (MatC 1 ) A j 3(Mat) 3(C) a = 0 [ ] 17

19 ([ ]) (AbsMatAns) A A A j 3(Mat) 4(Ans) = VCT 3 3 VCT VCT... F F F 3 A,B,C 3 VctAns A z 1 DimA, B, C Vc ta

20 er t A z 2 EditA, B, C - A= 1 2 3B= (5 3 3) (3 A) A z 1(Dim) 1(A) 3 = ( ) 1 = D 2 = 3 = t (3 B) A z 1(Dim) 2(B) 3 = ( ) 4 = 5 = D 6 = t (VctA + VctB) A z 3(Vct) 1(A) + A z 3(Vct) 2(B) = - C= C ( 39 45) (2 C) A z 1(Dim) 3(C) 2 = ( ) 19 D 7 l 8 = 9 = t (5 VctC) 5 - A z 3(Vct) 3(C) =

21 2 - A B 24 (VctA VctB) A z 3(Vct) 1(A) A z r 1(Dot) A z 3(Vct) 2(B) = 2 - A B ( 3, 18,13) (VctA VctB) A z 3(Vct) 1(A) - A z 3(Vct) 2(B) = - C (AbsVctC) A A A z 3(Vct) 3(C) = - A= B= Deg A B (A B) (A B) cos cos 1 A B A B A, B1 20 A B A B

22 (3 A) A z 1(Dim) 1(A) 3 = ( ) D 1 = 0 = 1 = t (3 B) A z 1(Dim) 2(B) 3 = ( ) (VctA VctB) 1 = 2 = 0 = t A z 3(Vct) 1(A) A z r 1(Dot) A z 3(Vct) 2(B) = (Ans (AbsVctA AbsVctB)) \ R A A A z 3(Vct) 1(A) - A A A z 3(Vct) 2(B) T = (cos 1 Ans) ( ) A V g = (VctA VctB) A z 3(Vct) 1(A) - A z 3(Vct) 2(B) = (AbsVctAns) A A A z 3(Vct) 4(Ans) = (VctAns Ans) ( ( )) A z 3(Vct) 4(Ans) \ g = COMP COMP COMP... F R T 21

23 - 31 C F ( 31 ) C F R D 31 T A c 38 = C F NIST Special Publication in cm 1in = 2.54cm 02 cm in 03 ft m 1ft = m 04 m ft 05 yd m 1yd = m 06 m yd 07 mile km 1mile = km 08 km mile 09 n mile m 1n mile = 1852m 10 m n mile 11 acre m 2 1acre = m 2 12 m 2 acre 13 gal (US) r 1gal (US) = r 14 r gal (US) 15 gal (UK) r 1gal (UK) = r 16 r gal (UK) 17 pc km 1pc = km 18 km pc 19 km / h m / s 1km / h = 5 m / s 20 m / s km / h oz g 1oz = g 22 g oz 23 lb kg 1lb = kg 24 kg lb 25 atm Pa 1atm = Pa 26 Pa atm 22

24 27 mmhg Pa 1mmHg = Pa 28 Pa mmhg 29 hp kw 1hp = kW 30 kw hp 31 kgf / cm 2 Pa 1kgf / cm 2 = Pa 32 Pa kgf / cm 2 33 kgf m J 1kgf m = J 34 J kgf m 35 lbf / in 2 kpa 1lbf / in 2 = kPa 36 kpa lbf / in 2 37 F C C = (5 / 9) ( F-32) 38 C F 39 J cal 1cal 15 = J 40 cal J COMP COMP COMP... F kg E = mc 2 = ) 65 L 28 K = Co

25 ISO 1992CODATA mp E mn E me E µ mµ E a E h E µ N E µ B E E α E re E λ c E γ p E08 14 λ cp E λ cn E R u E µ p E µ e E µ n E µ µ µ E F e E NA E23 25 k E Vm E R C C E C E σ E ε E-12 24

26 33 µ E φ E g G E Z t G E atm < fx-991ms > G13 LR44 2 TWO WAY POWER k

27 < fx-570ms > G13 LR Ai k

28 kl

29 < fx-570ms > G13LR44 1 < fx-991ms > G13LR44 1 < fx-570ms > u 9,000 u 3OFF < fx-991ms > u W mm 105g 28

30 SHIFT SHIFT 4 A ALPHA ALPHA E p MODE CLR F CLR COMP SD/REG ON ON ON 5 COPY REPLAY e r [ ] A[ 29

31 Rnd T Ran#! FIX SCI!R ! f T COMP EQN CMPLX f: T: 10 12! S-SUM! S-VAR SD REG DISTR SD REG MAT MAT VCT VCT!7 π OFF!O OFF OFF 30

32 INS![ Re lm Re lm CMPLX!& DRG DRG SOLVE CALC COMP CMPLX SOLVE SOLVE a= COMP CMPLX 31

33 d/dx : i!d a: CONV COMP CMPLX 40 CONV COMP CMPLX 40 x! LOGIC!" LOGIC BASE!# COMP SD REG 0 i CMPLX i 32

34 !/ x 3 DEC & 10 BASE 10 HEX!q ( 16 BASE BIN!0 10 x 10 x! 2 BASE 2 33

35 e OCTe!e e x e x % 8 BASE 8 e A CMPLX r B 60 60! C M hyp 34

36 sin -1 D cos-1 E tan-1 F!S,!C,!T A F 16 BASE 16 A F j, 0, p A F STO!' X arg Abs!A CMPLX! ] CMPLX j, 0, p X Conjg Y!; Conjg CMPLX j, 0, p 35

37 M- M DT CL M!m M 7 SD REG!8 SD REG j, 0, p M Pol( Rec( npr ncr / CMPLX!r!q!}!{ 36

38 MEMO 37

39 SA0403-E Printed in China

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(Compton Scattering) Beaming 1 exp [i (k x ωt)] k λ k = 2π/λ ω = 2πν k = ω/c k x ωt ( ω ) k α c, k k x ωt η αβ k α x β diag( + ++) x β = (ct, x) O O x Compton Scattering Beaming exp [i k x ωt] k λ k π/λ ω πν k ω/c k x ωt ω k α c, k k x ωt η αβ k α x β diag + ++ x β ct, x O O x O O v k α k α β, γ k γ k βk, k γ k + βk k γ k k, k γ k + βk 3 k k 4 k 3 k

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.5 z = a + b + c n.6 = a sin t y = b cos t dy d a e e b e + e c e e e + e 3 s36 3 a + y = a, b > b 3 s363.7 y = + 3 y = + 3 s364.8 cos a 3 s365.9 y =, [ ] IC. r, θ r, θ π, y y = 3 3 = r cos θ r sin θ D D = {, y ; y }, y D r, θ ep y yddy D D 9 s96. d y dt + 3dy + y = cos t dt t = y = e π + e π +. t = π y =.9 s6.3 d y d + dy d + y = y =, dy d = 3 a, b

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