EL5250

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1 EL-5250

3 SHARP EL

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11 "... i F... k ;... i ; s ; A k s@ ` ;; 5 NORMAL MODE 0. πrœ 10_ 9

12 10

13 y zall DATA CL?z z YES [DEL] z z NO [ENTER]z NORMAL MODE o o@ S LCD CONTRAST [+] [-] DARK LIGHT 11

14 12

15 ; 13

16 : BUSY : 2ndF xy/rθ : HYP : ALPHA: a x t FIX/SCI/ENG: DEG/RAD/GRAD: M : : 14

17 b b d <MODE-1 ƒnormal STAT PROG EQN <MODE-2 CPLX 0 NORMAL MODE 0. 15

18 e e A * - k S -S l r u d e e NORMAL MODE 0. NORMAL MODE 0. 8Œ _ 0. 8Œ =

19 d r u l r ) e 8Œ = Œ Œ = Œ Œ ( Œ ( )=

20 θ j 1 x j x θ NORMAL MODE 0. 2 Ò_ 2 ÒR r S = πr 2 s ; A NORMAL MODE 0. π_ NORMAL MODE 0. πrœ_ 18

21 e ; t 0. πrœ= j s ; A G I e r V = 1 3 h 2 πr h NORMAL MODE 0. 1ı3πRŒH_ 1ı3πRŒH H=z 0. 1ı3πRŒH R=z 8. 19

22 e 1ı3πRŒH= e 1ı3πRŒH H=8_ e 1ı3πRŒH R=z 8. e 1ı3πRŒH= h 20

23 h j ; < x r V = πr h 0. AnsÒV ; ; = e ; =m I 5 d e u u AnsÒV V=1ı3πRŒH_ V=1ı3πRŒH H=z 8. V=1ı3πRŒH V=z V=1ı3πRŒH H=z 8. 21

24 @ h H= R L

25 P P 1 P 2 P 3 y RESET : : A~Z, θ* 1 * 2 ANS* 3 STAT* 4 STAT VAR* 5 * 6 * 1 * 2 * 3 * 4 * 5 n x sxσxσxσx 2 ȳsyσyσyσy 2 Σxyabc, r * 6 j P 0 <M-CLR ƒdisp MEMORY STAT RESET 23

26 1 y 2 y 3 y l r u d j NORMAL MODE _ y e = y l@ O 24

27 @ O P 1 y 3(5+2)= 3 5+2= = j ( + ) e k + e k + k e = 17. g =

28 @ g = g = 3(5+2) J <SET UP ƒdrg FSE j --- DEG( ) J 0 0 RAD (rad) J 0 1 GRAD (g) J 0 J 1 0@ J 1 J

29 x x = J z 3 J 1 0 J 1 1 J 1 2 J = j 3 z 1000 J 1 J θ ; NORMAL MODE 0. 27

30 @ a ; x θ j x x ; 6ÒA t t ; v ƒz fl fi A=

31 e d j ` S v 0 v 0 e e ƒa fl fi E 5ÒA A1= P 1 y 29

32 1 A1 1000A j k NORMAL MODE 0. v 0 -; e k k ƒa fl fi 0. 1ıA -1000A= e x (S = 3 2 π) (V = 5S) h = 5 r = 3 j s e j ; < e 0. 3Œπ= Ans=

33 @ P 1 y $150 3:Ma +)$250:Mb=Ma+250 )Mb 5% M j x M k 3 m m 250. t M k % M t M 665. M ANS M A~L, N~Z, θ * 1 * 1 * 1 rθ xy r θθ x y ; t 31

34 j y y e zall DATA CL?z z YES [DEL] z z NO [ENTER]z z ALL DATA z z CLEARED! z z z NORMAL MODE P 3 y 32

35 b 0 P = j z 3 e 18+6 = ( ) z 15 8 ( 15-8 ) e 42 ( 5)+120= 42 k S e ( ) ( )= 5 ` 3 z 4 ` S 3 e

36 34+57= e 45+57= 45 e 68 25= 68 k 25 e 68 40= 40 e sin60 [ ]= j v 60 e J 0 1 $ cos [rad]= s k 4 e tan 1 1 J 0 y 1 e P 0 θ = sin 1 x, θ= tan 1 x θ = cos 1 x DEG 90 = < θ = < 90 0 = < θ = < 180 RAD π θ π 2 = < = < 2 0 = < θ= < π GRAD 100 = < θ = < = < θ = <

37 (cosh sinh 1.5) 2 = j ( H $ H v 1.5 ) A e t ( 5 tanh 1 = 7 z 7 ) e ln 20 = i 20 e log 50 = l 50 e e 3 " 3 e Y 1.7 e Z + + = 6 7 Z e = 8 m S 2-3 m 4 k 5 A e (12 3 ) 4 = = 8 1 e = 27 = 4! = B e P 3 = e 3 e C 2 = c 2 e %= 500 k % =?% 120 z % (500 25%)= % (400 30%)= 12 m 3 m Z * D 81 q 27 e %

38 I <MATH MENU-1 ƒabs ipart int fpart d <MATH MENU-2 ÒRAND fisolve flωsec Ωmin d u 0 I 4 I 0 S 7 e I 1 S 7.94 e I 2 S 7.94 e I 3 S 7.94 e I w 0 e abs 7= 7. ipart 7.94= 7. int 7.94= 8. fpart 7.94= ÒRAND random=

39 5: SOLVE 6: Ωsec I 5 24 [ I 6 24 Ωsec : Ωmin 0 [ 0 [ 1500 I Ωmin

40 dx 1 S= h{f (a)+4{f (a+h)+f (a+3h)+ +f (a+(n 1)h)} 3 +2{f (a+2h)+f (a+4h)+ +f (a+(n 2)h)}+f(b)} h= b a N N=2n a x b = < = < dx dx f(x+ ) f(x ) 2 2 f (x)= dx b 3 e dx e 38

41 j h d/dx (x 4 0.5x 3 +6x 2 ) j ; X* m ; X ; X 3 X^4-0.5X +6XŒ X=z 0. dx: x = 2 dx = d/dx =? x = 3 dx = d/dx =? 2 e e e 3 e e X^4-0.5X +6XŒ d/dx= 50. X^4-0.5X +6XŒ d/dx= * ;3 b 0 { e e e j h 39

42 8 2 (x2 5)dx j ; X A - 5 { a=z 0. b= 0. n= 100. n = 100 dx =? 2 e 8 e e XŒ-5 dx= 138. n = 10 dx =? e e e 10 e XŒ-5 dx= 138. j y a b x x x1 xx 0 2 a x 0 x y x 2 x b 1 3 x 3 40

43 @ w 0 e e w 1 e w 2 e w 3 e e j w 0 k 10 e 0. random 10=

44 @ ]. 90 [rad] j ] ] 100. [ ] 90. sin = [ w 0.8 e ] ] [ ] j 6+4=ANS j e 10. ANS e =ANS 8 k 2 e 16. ANS 2 A e =ANS e 81. * e 9. 42

45 = [a ] b j 3 k 1 k c 4 k 3 e 4ı5ı6 * [a.xxx] k F 29ı Y 2 k 3 e ( ) 5 = 5 7 k 5 m 5 e 16807ı3125 ( ) 1 1 = 8 1 k 8 m 1 k 3 e 1ı2 64 * 64 k 225 e 8ı ( 2 m 3 ) k = 3 4 ( 3 m 4 ) e 8ı = k 2.3 e 12ı = 2 1 [ 2 [ 3 k 2 e = ` 3 k 2 ` 3 e 1ı2 A = 7 j 7 x A 7. 4 = 4 k ; A e 4ı7 A = [a.xxx] k 5 e 1.65 [a ] b 5 c k 1ı13ı20 * 4ı5ı6=

46 @ h? q f /? q f 6,mA1l i 44

47 DEC(25) BIN / z b a 1AC z b r P g / 428. BIN(1010 z ( = ) k 11 e b BIN(111) NEG d 111 e b a g + OCT(512)= 512 e a 349. H 2FEC j x a 2FEC 2C9E=(A) - 2C9E m 34E. H +) =(B) 1901 m 6FF. H (C) t M A4D. H 1011 AND z = (BIN) 101 e 1. b 5A OR C3 = a 5A p C3 e DB. H NOT z n e b (BIN) 24 XOR 4 = g 24 x 4 e B3 a B3 C 2D = (HEX) 2D e FFFFFFFF61. H /

48 j 12 [ 39 [ : [60] : h30m45s + 3 [ 30 [ [ 6h45m36s = [60] 45 [ 36 e [ 56 [ = [60] 0 [ 0 [ e h45m 3 [ e 1.69h = : sin = [10] v 62 [ 12 [ 24 e [ ] 24 [ I [ ] 0 [ 0 [ 1500 I

49 Y P (x, y) y 0 x X 0 Y P (r, θ) r θ X r θ θ x y r x x = 6 r = j 6, 4 r= y = 4 θ = [ u = r = 14 14, 36 x = x= θ = 36[ ] y E y=

50 @ c c, c 0 m s 1 G m 3 kg 1 s µ gn m s 2 me kg mp kg mn kg mµ kg lu kg e C h J s k J K 1 µ 0 N A 2 ε 0 F m 1 re α a 0 m m m 1 R Φ 0 Wb µ B J T 1 µe J T 1 µ N J T 1 µp J T 1 µn J T 1 48

51 24 m mm J T lc lc, p s N A, L m m W m 2 K 4 mol 1 29 Vm m 3 mol 1 R J mol 1 K 1 F C mol 1 R K Ohm -e/me C kg 1 h/2me m 2 s 1 gp 1 1 s T K J Hz V 1 ev J t K AU m pc m M( 12 C) kg mol 1 h- J s Eh J s G 0 a 1 mp/me Mu lc, n c 1 c 2 Z 0 kg mol 1 m W m 2 mk W Pa V 0 = 15.3 m/s t = 10 s 1 V 0 t + gt 2 =? m 2 j 15.3 k 10 + Z c 03 k 10 A e

52 E P T G M k m µ n p f a (Exa ) (Peta ) (Tera ) (Giga ) (Mega ) (kilo ) (milli ) (micro ) (nano ) (pico ) (femto ) (atto j j j j j j j j j j j j B m 10k = j 6 k j 5 =

53 5 9=ANS J ANS 9= 5 z 9 e 0.6 [FIX,TAB=1] k 9 e* z 9 n 0.6 k 9 e* 2 P 0 * *

54 b 0 I h j NORMAL MODE 0. TŒ=(4π GM)R_ e j R= R 9. L 9. e TŒ=(4π GM)R G=z 1.5 d u j NORMAL MODE 0. TŒ=(4π GM)R_ 52

55 A B = C D b 0 ; k ; ; = ; k ; I 5 e e h NORMAL MODE 0. A B=C D_ A B=C D A=z 0. A B=C D B=z 0. A B=C D C=z 0. A B=C D D=z 0. D= 20. R 50. L

56 @ h e A B=C D A=z 10. d e A B=C D C=z h C= 4. R 80. L 80. j - ERROR 02 - CALCULATION 54

57 b G j e j πrœh= e πrœh H=z 5. d u j NORMAL MODE 0. πrœh_ 55

58 b J 0 0 j ; ; v ; z b A S NORMAL MODE 0. BCsinA 2_ c S = bc sin A G e BCsinA 2 A=z 0. BCsinA 2 B=z 0. e BCsinA 2 C=5_ e BCsinA 2=

59 ee h e d h 2BCsinA 2 B=z 3. BCsinA 2= BCsinA 2=

60 f <EQTN FILE ƒload SAVE DEL f 1 SAVE:TITLE? ; j e f SAVE:RING_ 58

61 f 0 2 d u e y e DEL º RING º AREA-3 º CIRCUIT TITLE:RING DELETE [DEL] QUIT [ENTER] 59

62 60

63 b b

64 Q W n x x sx x σx x Σx x Σx 2 x ȳ y sy y σy y Σy Σ y 2 y y Σ xy xy a b c y=a+bx+cx 2 r I 0 0 I 0 1 I 0 2 I 0 3 I 0 4 I 0 5 I 0 6 I 0 7 I 0 8 I 0 9 I 0 A I 0 B I 2 0 I 2 1 I 2 2 I 2 3 I cxy y yxx cxy y yxx a b 62

65 y = a + bx +cx 2 a b c P 2 y _,_ x, y _ x, y,_ _ j 63

66 _ u d d u X= Y= N:N X=z x X=z 4. Y= x y u d _e u # j _ b _ 40 40, 2 _ _ Stat 0 [SD] 0. DATA SET= 1. DATA SET= 2. DATA SET= d d d _ X= _ d 60 _ X=

67 y = a + bx y = a e bx y = a + b ln x y = a x b 1 y = a + b x y = a + bx + cx 2 x = Σx n σx = Σx 2 nx 2 n sx = Σx 2 nx 2 n 1 Σx = x 1 + x x n Σx = x 1 + x x n Σy Σy y = y = 2 ny σ 2 n n Σxy = x 1 y 1 + x 2 y x n y n Σy = y 1 + y y n Σy sy = 2 ny 2 n 1 Σy = y 1 + y y n 65

68 x x t = σx 66

69 @ P 2 y b _ 80 75, 3 _ 50 _ Stat 0 [SD] 0. DATA SET= 1. DATA SET= 2. DATA SET= 3. DATA SET= 4. DATA SET= 5. x = I 0 1 e σx = I 0 3 e n = I 0 0 e Σx = I 0 4 e Σx 2 = I 0 5 e sx = I 0 2 e sx 2 = A e (95 x) 10+50= ( 95 - I 0 1 ) sx z I 0 2 k e x = 60 P(t)? I I 1 0 ) e t = 0.5 R(t)? I 1 3 S 0.5 ) e = σ = n= 7. Í = 530. Í Œ= sx=

70 @ P 2 y x y b , 5 _ 2 5 _ , 24 _ , 40, 3 _ , 25 _ Stat 1 [LINE] 0. DATA SET= 1. DATA SET= 2. DATA SET= 3. DATA SET= 4. DATA SET= 5. a = b = r = sx = sy = I 2 0 e I 2 1 e I 2 3 e I 0 2 e I 0 7 e a= b= r= sx= sy= x=3 y'=? 3 I 2 5 y=46 x' =? 46 I 2 4 x y P 2 y b , 41 _ 8, 13 _ 5, 2 _ 23, 200 _ 15, 71 _ Stat 2 [QUAD] 0. DATA SET= 1. DATA SET= 2. DATA SET= 3. DATA SET= 4. DATA SET= 5. a = b = c = I 2 0 e I 2 1 e I 2 2 e a= b= c= x=10 y'=? 10 I 2 5 y=22 x'=? 22 I : :

71 b 3 0 a 1 x + b 1 y = c 1 a 1 b 1 D = a 2 x + b 2 y = c 2 a 2 b 2 b 3 1 a 1 x + b 1 y + c 1 z = d 1 a 2 x + b 2 y + c 2 z = d 2 a 3 x + b 3 y + c 3 z = d 3 D = a 1 b 1 c 1 a 2 b 2 c 2 a 3 b 3 c 3 2x+3y = 4 x =? 5x+6y = 7 Ò y =? det(d) =? b 3 0 a z 0. b 0. c 0. e e e e e j d d@ u 69

72 e e h x= 1. y= 2. D= 3. x+y-z = 9 x =? 6x+6y-z = 17 Ò y =? 14x-7y+2z = 42 z =? det(d) =? b 3 1 e e S e e e e S ee e S e e j d d@ u e d e h a z 0. b 0. c 0. x= y= Z= 7.4 D=

73 a x 2 + b x + c = 0ax 3 +bx 2 +cx+d=0 1 b b 3 3 3x 2 + 4x 95 = 0 x =? b 3 2 e e S j a=z 0. b= 0. c= 0. X 5. X d d@ u e h 71

74 5x 3 + 4x 2 +3x + 7 = 0 x =? b 3 3 e e e j d e e h a=z 0. b= 0. c= 0. X X i 72

75 b 4 E xy urθ + Q + Q R θ θ θ I 0 73

76 (12 6i) + (7+15i) (11+4i) = b 4 ( 12-6 Q ) + ( Q ) - ( Q ) e i 6 (7 9i) 6 k ( 7-9 Q ) ( 5+8i) = k ( S Q ) e (sin k ( v 30 + icos30 ) (sin60 + Q $ 30 ) z ( icos60 )= v 60 + Q $ 60 ) e COMPLEX MODE i u 8 R R 25 e r1 = 8, θ1 = 70 r2 = 12, θ2 = 25 r =?, θ =? (1 + E 1 + Q e i r =?, θ u (2 3i) 2 = E ( 2-3 Q ) A e i 1 ( 1 + Q = 1 + i Z e i conj(5+2i) = I 0 ( Q ) e 5. 2.i

77 b PROGRAM MODE ƒrun NEW EDIT DEL b 2 1 i ; 75

78 if b ; e MODE ƒnormal NBASE TITLE? :NORMAL SLOPE_ :NORMAL SLOPE :NORMAL PROGRAM? eu d i 76

79 v SLOPE :NORMAL Y=M X+5 _ SLOPE :NORMAL M =? b AREA e AREA :NORMAL PROGRAM? 77

80 Print B =BASE Print H =HEIGHT A=1ı2B H Print AREA Print A i v B1 e a = BASE ; e i v d H1 e a = HEIGHT ; e ; A ; = 1 k v v d e e i a AREA ; e i 0 ; A a ; j 0 ( ) RUN º AREA e 4 e 3 e AREA A= j e 78

81 I i d u <COMMAND-1 ƒprint Print" Input Wait Print i 0 Print A Print B Print i 1 Print SHARP Input i 2 Input A Input B Wait i 3 Wait 5 Wait FF ( ) Wait 1010 () 79

82 Rem i 4 Rem TIME TABLE End i 5 End 80

83 Label i 6 Label LOOP1 Label LOOP2 Clrt i 7 Clrt If Goto i 8 i 9 ; s If B =1 Goto LOOP1 Goto i 9 Goto LOOP2 Gosub i A Gosub PART1 Return i B Return 81

84 ; = = i C If B=0 Goto ZERO A=A+1 < i D If B<0 Goto NGTV <= i E If B <=0 Goto CALC = i F If B=0 Goto RECALC i G If B 0 Goto PSTV i H If A B Goto DIF 82

85 x xy STATx i I STATx STATxy i J STATxy Data <x Data <x, Data <x, y Data <x, y, i K Data 5 Data 25,2 Data 72,175 Data 9,96,3 83

86 b 22 O e d u e j jd u e y y u e j 84

87 r l j j - ERROR 04 - LBL DUPLICATE BREAK! 85

88 b 2 PROGRAM MODE ƒrun NEW EDIT DEL 3 DEL º AREA º TEMP º STAT e ye TITLE:AREA DELETE [DEL] QUIT [ENTER] 86

89 b e TEMP :NORMAL PROGRAM? Label START Print (1) C TO F Print (2) F TO C Input T 1 2 i a START ; e i 1 ( 1 a s C s TO s F ; e i 1 ( 2 a s F s TO s C ; e i 2 ; T e 87

90 If T=1 Goto CTOF i 8 ; T ; = 1 ; s i a CTOF ; e If T=2 Goto FTOC i 8 ; T ; = 2 ; s i a FTOC ; e Goto START i a START ; e Label CTOF i a CTOF ; e F=(9 5)C +32 ; F ; = ( 9 z 5 v C0 e e + 32 e Print F End i 0 ; F e i 5 e Label FTOC i a FTOC ; e C=(5 9) (F -32) ; C ; = ( 5 z 9 ) k v d F0 e e - 32 ) e Print C End i 0 ; C e i 5 e j 0 e PROGRAM MODE ƒrun NEW EDIT DEL 88

91 b e A S C S = T (T A) (T B) (T C) A + B + C T = 2 B Label START i a START ; e Print SIDE LENGTHS Input A Input B Input C If (A+B)<=C Goto ERROR If (B+C)<=A Goto ERROR If (C+A)<=B Goto ERROR i a SIDE s LENGTHS ; e i 2 ; A e i 2 ; B e i 2 ; C e i 8 ( ; A + ; B ) i E ; C ; s i a ERROR ; e i 8 ( ; B + ; C ) i E ; A ; s i a ERROR ; e i 8 ( ; C + ; A ) i E ; B ; s i a ERROR ; e T=(A+B+C) 2 ; T ; = ( ; A + ; B + ; C ) z 2 e 89

92 S= (T(T-A)(T-B)(T-C)) ; S ; * ( ; T ( ; T - ; A ) ( ; T - ; B ) ( ; T - ; C ) ) e Print S End i 0 ; S e i 5 e Label ERROR i a ERROR ; e Print NO TRIANGLE Wait 1 i a NO s TRIANGLE ; e i 3 1 e Print REENTER i a REENTER ; e Goto START i a START ; e j 0 e j HERON :NORMAL SIDE LENGTHS A=? 40 S=

93 b e NBASE :NBASE PROGRAM? Print ENTER A Print DECIMAL NUMBER Input Y Y BIN i a ENTER s A ; e i a DECIMAL s NUMBER ; e i 2 ; Y e ; z e Print BINARY i a BINARY ; e Print Y Wait Y PEN i 0 ; Y e i 3 e ; r e Print PENTAL i a PENTAL ; e Print Y Wait i 0 ; Y e i 3 e 91

94 Y OCT ; g e Print OCTAL i a OCTAL ; e Print Y Wait Y HEX Print HEXADECIMAL Print Y i 0 ; Y e i 3 e ; h e i a HEXADECIMAL ; e i 0 ; Y e j 0 e 92

95 b e 93

96 STATx i I e Data 102 Data 95 Data 107 Data 93 Data 110 Data 98 Print MEAN Input M i K 102 e i K 95 e i K 107 e i K 93 e i K 110 e i K 98 e i a MEAN ; e i 2 ; M e T=( -M) (sxœ ) ; T ; = ( I ; M ) * ( I 5 2 A z I 5 0 ) e Print T End i 0 ; T e i 5 e j 0 e e 100 T=

97 Q (X2, Y2) P (X1, Y1) R R Y1 Y X1 X PO = QO = SO = R O (X, Y) R PO 2 = (X1 X) 2 + (Y1 Y) 2 = R 2 QO 2 = (X2 X) 2 + (Y2 Y) 2 = R 2 SO 2 = (X3 X) 2 + (Y3 Y) 2 = R 2 S (X3, Y3) (X1 2 +Y1 2 -X2 2 -Y2 2 )(Y2 Y3) (X2 2 +Y2 2 -X3 2 -Y3 2 )(Y1 Y2) X = {(X1 X2)(Y2 Y3) (X2 X3)(Y1 Y2)} (X1 2 +Y1 2 -X2 2 -Y2 2 )(X2 X3) (X2 2 +Y2 2 -X3 2 -Y3 2 )(X1 X2) Y = {(Y1 Y2)(X2 X3) (Y2 Y3)(X1 X2)} R = (X X1) 2 + (Y Y1) X = GM HK 2 (IM JK) Y = GJ HI 2 (KJ MI) b e Print ENTER COORDS G=X Œ+Y Œ-X Œ-Y Œ i a ENTER s COORDS ; e ; G ; v X1 e e A v d Y1 e e A v d d X2 e e A v d d d Y2 e e A e 95

98 H=X Œ+Y Œ-X Œ-Y Œ ; H ; v 2 A v 3 A v d d d d X3 e e A v d d d d d Y3 e e A e I=X -X ; I ; v 0 v 2 e J=X -X ; J ; v 2 v 4 e K=Y -Y ; K ; v 1 v 3 e M=Y -Y ; M ; v 3 v 5 e X=(GM-HK) 2(IM-JK) ; X ; = ( ; G ; M - 1 ; H ; K ) z 2 ( ; I ; M - ; J ; K ) e Print X Wait i 0 ; X e i 3 e Y=(GJ-HI) 2(KJ-MI) ; Y ; = ( ; G ; J - 2 ; H ; I ) z 2 ( ; K ; J - ; M ; I ) e Print Y Wait R= ((X-X )Œ+(Y-Y )Œ) 3 Print R i 0 ; Y e i 3 e ; R ; * ( ( ; X v 0 ) A + ( ; Y v 1 ) A ) e i 0 ; R e j 0e 96

99 b e DECAY :NORMAL PROGRAM? Print ORIGINAL MASS Input M Print CURRENT MASS Input M i a ORIGINAL s MASS ; e i v M0 e e e i a CURRENT s MASS ; e i v d M1 e e e 97

100 T=-(ln(M M )) œ-4 Print T ; T ; = S ( i v 1 v 0 ) ) z ` S 4 e i 0 ; T e Print YEARS i a YEARS ; e End i 5 e j 0 e DECAY :NORMAL ORIGINAL MASS Mº=? T= YEARS 98

101 b e Print (1)DELTA TO Y Print (2)Y TO DELTA Input X i 1 ( 1 a DELTA s TO s Y ; e i 1 ( 2 a Y s TO s DELTA ; e i 2 ; X e If X=1 Goto DTOY i 8 ; X ; = 1 ; s i a DTOY ; e If X=2 Goto YTOD i 8 ; X ; = 2 ; s i a YTOD ; e Label DTOY i a DTOY ; e 99

102 Z=Z +Z +Z R =Z Z Z Print R Wait R =Z Z Z Print R R =Z Z Z Print R End ; Z ; v Z1 e e v d Z2 e e v d d Z3 e e v d d d R1 e e ; v v 1 z ; Z e i v 3 e i 3 v d d d d R2 e e ; v v 2 z ; Z e i v 4 v d d d d d R3 e e ; v v 0 z ; Z e i v 5 e i 5 e Label YTOD i a YTOD ; e R=R R +R R +R R ; R ; v v 4 v v 5 v v 3 e Z =R R Print v 0 ; = ; R v 4 e i v 0 e 100

103 Wait Z =R R Print Z Wait Z =R R Print Z End i 3 v 1 ; = ; R v 5 e i v 1 e i 3 v 2 ; = ; R v 3 e i v 2 e i 5 e j 0 e 1 e (1)DELTA TO Y (2)Y TO DELTA X=? 101

104 S = T = W sin A sin B sin (A + B) T = W sin B sin (A + B) S = W sin A sin (A + B) W: T, S: A, B: G: b e A S T A B T W G W S B Print ANGLES i a ANGLES ; e Input A Input B i 2 ; A e i 2 ; B e Print WEIGHT i a WEIGHT ; e Input W i 2 ; W e C=AΩDEG ; C ; = ; : e D=BΩDEG ; D ; = ; : e 102

105 E=sin(C+D) S=W sinc E T=W sind E ; E ; = v ( ; C + ; D ) a S = W ; k v ; C z ; E a T = W ; k v ; D z ; E e Print TENSIONS i a TENSIONS ; e Print S Wait Print T End i 0 ; S e i 3 e i 0 ; T e i 5 e J 0 J b 2 0 e [[[e [[[e e e T=

106 S = (P D) i 1 (1 + i) n S: n: P: D: i: b e Print PRICE i a PRICE ; e Input P Print DOWN PAYMENT Input D i 2 ; P e i a DOWN s PAYMENT ; e i 2 ; D e Print MONTHS i a MONTHS ; e Input N i 2 ; N e Print RATE i a RATE ; e Input I i 2 ; I e I=I 100 ; I ; = ; I z 100 e S=(P-D) I (1-(1+I)^(-N)) ; S ; = ( ; P - ; D ) k ; I z ( 1 - ( 1 + ; I ) m ( S ; N ) ) e 104

107 Print S i 0 ; S e j 0 e PAYBYMN:NORMAL PRICE P=? 1 S=

108 b e Print NO OF DICE i a NO s OF s DICE ; e Input N Label PLAY i 2 ; N e i a PLAY ; e M=1 ; M ; = 1 e X=0 ; X ; = 0 e Label ROLL X=X+r.dice i a ROLL ; e ; X ; = ; X w 1 e M=M+1 If M<=N Goto ROLL Print X Wait Goto PLAY ; M ; = ; M + 1 e i 8 ; M i E ; N ; s i a ROLL ; e i 0 ; X e i 3 e i a PLAY ; e 106 j 0e e e j

109 b e M=1 ; M ; = 1 e A=0 ; A ; = 0 e Print HOW MANY DIGITS Label NINE Print LESS THAN 9 DIGITS Input N i a HOW s MANY s DIGITS ; e i a NINE ; e i a LESS s THAN s ; a s DIGITS ; e i 2 ; N e If N9 Goto NINE i 8 ; N i G 9 ; s i a NINE ; e Print HOW LONG Input T i a HOW s LONG ; e i 2 ; T e Label QUESTION i a QUESTION ; e Label AGAIN i a AGAIN ; e S=ipart(randomx10^3) ; S ; = I 1 w 0 Y 3 ) e 107

110 If S<100 Goto AGAIN i 8 ; S i D 100 ; s i a AGAIN ; e S=S 10^(-3) ; S ; = ; S Y ( S 3 ) e If N6 Goto SIX i 8 ; N i G 6 ; s i a SIX ; e If N3 Goto THREE i 8 ; N i G 3 ; s i a THREE ; e Q=ipart(Sx10^N) ; Q ; = I 1 ( ; S Y ; N ) e Goto DISPLAY i a DISPLAY ; e Label SIX Q=ipart(S 10^(N-6)) 10^6 +random 10^6+random 10^3 i a SIX ; e ; Q ; = I 1 ( ; S Y ( ; N - 6 ) ) Y 6 w 0 Y 6 w 0 Y 3 e Goto DISPLAY i a DISPLAY ; e Label THREE Q=ipart(S 10^(N-3)) 10^3 +random 10^3 i a THREE ; e ; Q ; = I 1 ( ; S Y ( ; N - 3 ) ) Y 3 w 0 Y 3 e Label DISPLAY i a DISPLAY ; e Clrt Print Q i 7 e i 0 ; Q e 108

111 Wait T Clrt i 3 ; T e i 7 e Print ANSWER i a ANSWER ; e Input X i 2 ; X e If X Q Goto WRONG A=A+int(10 N T 3) i 8 ; X i H ; Q ; s i a WRONG ; e ; A ; = ; A + I 2 ( 10 k ; N z ; T k 3 ) e Label WRONG i a WRONG ; e M=M+1 ; M ; = ; M + 1 e If M<=10 Goto QUESTION i 8 ; M i E 10 ; s i a QUESTION ; e Print YOUR SCORE IS Print A End i a YOUR s SCORE s IS ; e i 0 ; A e i 5 e j 0e e e 109

112 b 0[[[ I 6 J j ; A ; = s A ) z ( ; ; ) k ; Ωse c AnsÒT TŒ=(4πŒ) (GM) R _ I 5 TŒ=(4πŒ) (GM) R G=z

113 @ ce `e TŒ=(4πŒ) (GM) R R=z h R= R L

114 L2 = 10 L1 0.4 (M1 M2) b 0@ P Y ( k ( - ) ) e 1Î^(0.4 ( ))= ( lz ) 4.8-(log )=

115 59, , , b 1 0,_, _,_, _ I 0 4 e Σx DATA SET= ,108DATA DATA SET= 4. DATA SET= 4. Í =

116 1 2 1 b 0@ N e Ç6= e e =

117 j 115

118 o 116

119 zall DATA CL?z z YES [DEL] z z NO [ENTER]z e y y 117

120 @ os j <OPTION ƒctrst M.CHK DELETE o LCD CONTRAST [+] [-] DARK LIGHT 624BYTES FREE EQTN: 15 PROG:

121 2 0 1 y e <<DELETE ƒeqtn PROG j 119

122 SYNTAX CALCULATION NESTING LBL DUPLICATE LBL UNDEFINED LBL OVER GOSUB STACK CAN T RETURN MEMORY OVER STORAGE FULL DATA OVER BREAK! j 120

123 @ h y y = f(x) - ERROR 02 - CALCULATION x 121

124 I J RANGE:a<b a= 1. b= 1. a: b: h 122

125 y y x yx y x 3 x 2 x y x xx y =10 x 5 1 y = sin x 2 y x y = x 3 3x 2 + x

126 y x n e x ln DEG: x < (tan x : x =/ 90 (2n 1))* sin x, cos x, π RAD: x < π tan x (tan x : x =/ (2n 1))* 2 GRAD: x < (tan x : x =/ 100 (2n 1))* sin 1 x, cos 1 x x = 1 tan 1 x, 3 x x < In x, log x = x < y 0: < x log y < 100 y = 0: 0 < x < y x y < 0: x = n 1 (0 < l x l < 1: = 2n 1, x = / 0)*, x < x log y < 100 y 0: < log y < 100 (x = / 0) x y = 0: 0 < x < x y y < 0: x = 2n 1 1 (0 < x < 1 : = n, x = / 0)*, x < log y < 100 x 124

127 e x < x = x < x < 100 sinh x, cosh x, tanh x x = sinh 1 x x < cosh 1 x 1 = x < tanh 1 x x < 1 x 2 x < x 3 x < x 0 = x < x 1 x < (x 0) n! 0 = n = 69* npr 0 = r = n = * n! < 10 (n-r)! = r = n = * ncr 0 = r = 69 n! < 10 (n-r)! 100 DEG, D M S = x < x, y r, θ x 2 + y 2 < = r < DEG: θ < π r, θ x, y RAD: θ < GRAD : θ < DEG RAD, GRAD DEG: x < DRG π RAD GRAD: x < (A+Bi)+(C+Di) A+ C < , B + D < (A+Bi) (C+Di) A C < , B D < (A+Bi) (C+Di) (AC BD) < (AD + BC) < AC + BD < C 2 + D 2 (A+Bi) (C+Di) BC AD < C 2 + D 2 C 2 + D 2 = / 0 125

128 DEC DEC : x = BIN BIN : = x = PEN 0 = x = OCT PEN : = x = HEX 0 = x = AND OCT : = x = OR 0 = x = XOR HEX : FDABF41C01 = x = FFFFFFFFFF XNOR 0 = x = 2540BE3FF BIN : = x = = x = PEN : = x = NOT 0 = x = OCT : = x = = x = HEX : FDABF41C01 = x = FFFFFFFFFF 0 = x = 2540BE3FE BIN : = x = = x = PEN : = x = x NEG = = OCT : = x = = x = HEX : FDABF41C01 = x = FFFFFFFFFF 0 = x = 2540BE3FF * n, r: 126

129 If A=0Goto ABC A =A x x n Y x rθxy 127

130 128

131 129

132 130

133 131

134

135 04MGK(TINSJ0815EHZZ)

fx-3650P_fx-3950P_J

fx-3650P_fx-3950P_J SA1109-E J fx-3650p fx-3950p http://edu.casio.jp RCA500002-001V04 AB2 Mode