Upload
vincent02hk57881301
View
261
Download
6
Embed Size (px)
DESCRIPTION
Fx 5800P 簡中說明書
Citation preview
fx-5800P
http://world.casio.com/edu/
RJA516651-001V01
Ck
Ck-1
k
Pull to remove引き抜いてください
k
Nc3 3•E
• J E
•
•
PP
Ck-2
k• 1 S
1s(sin–1)1E
•
z – PROG – /
•
z – MATH1( ∫dX)
•
••
•
k
•
B b
•
v V
sin–1D
ssin–1D
s
Ck-3
•
•••
• k l••
•
Ck-4
•
•
•
•
•
•
•
••
•••
Ck-5
f
Ck-6
π π π
Σ ↔
Ck-7
Ck-8
Ck-9
ko
A
Nc3 1•
d e
J
N d e
A1o
k
1
2 % 1
3 S
4
k
A
% BIN [% BIN [
Ck-10
A
7
7
k
AN
• c f
1
2
3
4
5
6
7
8
1
2
3
• N
Ck-11
k
1N
f c
A
π π π
1N1
1N2
A
1N3
1N4
1N5
˚ π
Ck-12
A
1N6 0 9
1N7 1 9 0
1N8 12
•
•
–
–
•
– > x x >– > x x >
–
A
1Nc1
1Nc2
A
1Nc3 1
1Nc3 2
< x <
Ck-13
A
1Nc4 1 a bi
1Nc4 2 r∠
A
1Nc5 1
1Nc5 2
A
1Nc6 1
1Nc6 2
k
Nc3 2 E
E J
a bi
Ck-14
Az z
AJ
kE
– –
b2(5+4)-
2*-3E
A ')
– – – – – –
' ' ∫ d dx d dx Σ
bs30)E
Ck-15
A
•• '•• π i
Aw
–
b(2+3)(4-1E
A
b123456789+123456789E
A
|k
Ck-16
k
A
•
•
'
1'(
z – c7
x 1l$
e x 1i %
' !
' 1(#
x
1) x–
6
16"
z – c1
z – 1 ∫ z – 2
z – 3
Σ z – 4 Σ
( )
Ck-17
•
×B
'1+2c2*3E
•
•
A
]
B
• ] d• '
' e
A
'
'
B
1Y(INS)
Ck-18
!
•
•
•
k
A
+
|
1Y
AY
Bb 369*13
Y
2
Ck-19
Ad e
Y Y Y
Bb 369**12
dd
Y
b 369**12
ddd
Y
Ad e Y
Bb c60)
dddY
s
b c60)
dddd
Ck-20
s
Ad e
kE
J d e
b
14/0*2E
J e d
D5
E
• J e d o
E 1E
E
1E
Ck-21
E 1E
k
' ' '
B!2e+!8E
!2e+!81E
ff ' π
• f• f
k
b
111/33E
f
f
Ck-22
• f•
B
111/33E
f
f
π
B
15 π *'2c5E
f
k+ - * /
Ck-23
–
b2.5+1-2E
–
b7*8-4*5E
•
k
'7c373
1'(2e1c3
13
2
7'37 3
2'1'32 1 3
••
Ck-24
A
B
'2c3
e+
'1c2
E
b2'3+1'2
E
b3'1'4+1'2'3E
B
1'(3e1c4e+
1'(1e2c3E
Ck-25
•
••
A1f ⇔
A
b1.5E
f
f
k
Ab
21,(%)E
Ck-26
150*201,(%)E
660/8801,(%)E
2500+2500*151,(%)E
3500-3500*251,(%)E
k
A
$ $ $
° ´ ˝
b2e30e30eE
•
° ´ ˝ 0$0$30$
Ck-27
A•
° ´ ˝ ´ ˝ ° ´ ˝
b 2e20e30e+0e39e30eE
° ´ ˝ ° ´ ˝
b 2e20e*3.5E
A' '
b
100/3Ez – ANGLE 4('DMS)E
A$
b2.255E
e
Ck-28
k`
f f
B 1+1E2+2E
3+3E
f
f
$
c
••
kd e e
d
E
–b 4*3+2.5E
Ck-29
d
YYYY
-7.1E
^
nE
b
123+4561!(:)1000-1-(Ans)
E
^ ^ ^ nE ^
E ^
b
123+4561x(^)1000-1-(Ans)
Ck-30
E
E
• ^ Q
•
• ^
•• α ω Α Ω • ω ∆
o
Ck-31
k
A
b3*4E
/30E
/
2 2
b
3x+4xE
!E
•
• E
•o
1-
Ck-32
A1-
–
b123+456E
789-1-(Ans)E
2 2
b
3x+4xE
!1-(Ans))+5E
k
Al
b
105/3l
A1l –
Ck-33
b
3*21l(M–)
l 1l
E l 1l
A~9
A01~ 9
A01~ 9
23+9m
53-6m
45*21m(M–)
99/3m
t9(M)
k
A
3+51~ 0
Ck-34
A~ S
E
~0 S0 E
A
5+S0 E
A
01~ 0
A
k
z – – E
k
•N1
•
Ck-35
A
b10z – PROG – /1.(Dim Z) E
•
oS5(Z)Si([)10S6(])E
k
•••
A/ E
b 3+5z – PROG – /S5(Z)Si([)5S6(])E
Ck-36
An E
bS5(Z)Si([)5a6(])E
A
b5+S5(Z)Si([)5S6(])E
A
0z – – /S5 ai 5S6 E
A
0z – – /1. E
π π
k π π π
π π 1Z π
Ck-37
kπ
Az
•
• c f
c f
1 8•
1
• E
A
c0 = 1/ 0 0µεb
1/!
z – CONST ccc8(ε )
z – CONST cccc1( ))
Ck-38
E
A
•
Ck-39
•
• @
••
k
sin(, cos(, tan(, sin–1(, cos–1(, tan–1(
A
n
–1
bvs30)E
1s(sin–1)0.5)E
A
Ck-40
k
z –
1 °2 r
3 g
π
bv (15(π )/2)z – ANGLE 2(r)E
k
sinh(, cosh(, tanh(, sinh –1(, cosh –1(, tanh –1(
A
n
bz – MATH cc1(sinh)1)
Az – cc
k
10^(, e^(, log(, ln(
A
n n e
n 10 n
m n m n m
n e n
Ck-41
2
bl2,16)E
l16)E
B
z – MATH c7(logab)2e16E
e
bi90)E
k
x2, x–1, ^(,'(, 3'(, x'(
A
n x2 n 2
n x–1 n –1
m n m n
' n n3' n 3 n
m x' n m n
' ' – 2+2
b(!2)+1)
(!2)-1)E
Ck-42
(1+1)62+2)E
B
(!2e+1)(!2e-1)E
(1+1)62+2E
–23
b(-2)6(2'3)E
k
∫ (
A
∫ f x a b tolf x x
•ab
tol
• –5
∫ x e tol
Bz – MATH 1(∫ dX)
iS0(X))c1f1i(%)1E
Ck-43
b
z – MATH 1(∫ dX)iS0(X)),1,1i(%)1))E
A• ∫ • f x a b tol ∫ d dx d2 dx2 Σ f x
• a < x < b f x∫ 2 – – –
••• tol
–14 tol• tol•
• o
A• f x/
S
S
S S
•/
∫ ∫ ∫a
b f(x)dx =
a
c f(x)dx + (–
c
b f(x)dx)∫ ∫ ∫a
b f(x)dx =
a
c f(x)dx + (–
c
b f(x)dx)
Ck-44
a
b f(x)dx =
a
x1
f(x)dx + x1
x2
f(x)dx + .....+x4
b
f(x)dx∫ ∫ ∫ ∫
k
d/dx(
A
d dx f x a tolf x x
•atol
• –10
x π y x tol
V z – MATH 2(d/dX)sS0(X)).....1
B1
e'1Z(π )c2E
b1
,1Z(π )'2)E
A• d dx• f x a tol ∫ d dx d2 dx2 Σ f x
•• tol
–14 tol• tol•
Ck-45
• o
kf x d2 dx2 f x |x a x a
d2/dx2(
A
d 2 dx2 f x a tolf x x
•atol
• –10
x y x3 x2 x –
B
z – MATH 3(d2/dX2)S0(X)63e+4S0(X)x+S0(X)-6e3E
tol –12
tol
bz – MATH 3(d2/dX2)S0(X)63)+4
S0(X)x+S0(X)-6,3,1Z-12)E
A
k Σ f x
Σ (
Ck-46
Σ
Σ ( f (x), x, a, b) = f (a) + f (a+1) + ....+ f (b)
A
Σ f x x a bf x xx
• x
ab
• a b – 10 a < b 10
•
Σ
B z – MATH 4(Σ ()S0(X)+1ea0(X)e1e5E
b
z – MATH 4(Σ ()S0(X)+1,a0(X),1,5)E
A• Σ • f x a b ∫ d dx d2 dx2 Σ f x
• o Σ
k ↔
Pol(, Rec(
oo
Ck-47
A
x yx xy y
rr r
''
bv
1+(Pol) !2),!2))E
Bv
1+(Pol) !2e,!2e)E
˚
bv
1-(Rec)2,30)E
A•• r x y• – ˚ < ˚• r x
''
Ck-48
k
Ran#, RanInt#(
A
B
z – MATH 6(Ran#)E
E
E
A
n n
Bz – MATH 6(Ran#)0E
z – MATH 6(Ran#)1E
Ck-49
E
E
A
m n m n m n m n E n – m E
Bz – MATH c8(RanInt)0,5)E
E
E
k
x!, Abs(, nPr, nCr, Rnd(, Int(, Frac(, Intg(
A
n n
b(5+3)
z – MATH 5(X!)E
Ck-50
A
n
–
Bz – MATH c1(Abs)2-7E
b
z – MATH c1(Abs)2-7)E
A n r n r
n m n m
b
10z – MATH 7(nPr)4E
10z – MATH 8(nCr)4E
A
b200/7*14E
Ck-51
1N(SETUP)6(Fix)3E
200/7E
*14E
o200/7E
10(Rnd)E
*14E
A
n
–
bz – MATH c2(Int)-1.5)E
Ck-52
A
n
–
bz – MATH c3(Frac) -1.5)E
A
n
–
b
z – MATH c4(Intg)-1.5)E
k
/ ,
ENG/ 1/(ENG)
ENG, 1*(ENG)
k/
B
1234E
Ck-53
1/(ENG)
1/(ENG)
,
B
123E
1*(ENG)
1*(ENG)
k
A
A
500
z – MATH ccc
Ck-54
6(k)
A
←
b
999z – MATH ccc6(k)+25z – MATH ccc6(k)E
1/(ENG)
N1
k
A ii i
i
2+3i
Ar ∠
∠ 51i(∠ )30
Ck-55
k
k
A a bi1N c4 1 a bi
' i ' i i
Bv2*(!3e+i)E
b
2*(!3)+i)E
'∠ i
Bv!2e1i(∠ )45E
A r ∠ 1N c4 2 r∠
' i ' i ∠ Bv
2*(!3e+i)E
b
2*(!3)+i)E
i ' ∠ Bv
1+iE
Ck-56
kz a bi z a – bi
i
Bz – COMPLX 3(Conjg)2+3i)E
k|z| z
z a bi
i
bv
z – COMPLX 1(Abs)2+2i)E
z – COMPLX 2(Arg)2+2i)E
ka bi a b
i
Bz – COMPLX 4(ReP)2+30)E
z – COMPLX 5(ImP)2+30)E
b = 2
a = 2o
b = 2
a = 2o
Ck-57
k
Az – 7 'a bi
' ∠ i
Bv2!2e10(∠ )45
z – COMPLX 7('a+bi)E
Az – 6 'r∠
i '∠ Bv
2+20z – COMPLX 6('r∠ )E
N1
k
2 00 2
+ 1 23 4
2 00 2
1 23 4
k
Ck-58
••
•
•
• E• + -
k
/
Az – 1
•
c f
E
• mn
E
e z1 E
• m En
• n E• c f m n
Ck-59
E•
• E
J
A /
a11 a12 ... a1n
a21 a22 ... a2n
am1 am2 ... amn
... ... ...
[[a11, a12, ..., a1n][a21, a22, ..., a2n] ... [am1, am2, ..., amn]]
• 1 23 4
Si([)Si([)1,2S6(])Si([)3,4S6(])S6(])
/z – – /
•z – 2 Si
E•
• J
→
Ck-60
Az – 1
c f E
• E
J
Az – 1
c f
Y z2•
E
J
k
•
•
Mat A z – 2 S0
Mat B z – 2 S'
Mat C z – 2 S$
•
A
2 00 2
+ 1 23 4
2 00 2
1 23 4
Mat A + Mat B
E
Ck-61
A
2 00 2
+ 1 23 4
× 35
2 00 2
1 23 4
35
Mat A + Mat B E
* Mat C
E
z – 2 1-
A
n × Mat A, n Mat A, Mat A × n, Mat A ÷ n
•• n π
2 00 2
+ 1 23 4
×3
2 00 2
1 23 4
3*( Mat A + Mat B )
E
Ck-62
A
1 –25 0
1 –25 0
z – MATH c1(Abs) Mat C
E
A
det a11 = a11
det = a11a22 – a12a21
a11 a12
a21 a22
det = a11a22a33 + a12a23a31 + a13a21a32 – a13a22a31 – a12a21a33 – a11a23a32
a11 a12 a13
a21 a22 a23
a31 a32 a33
1 –25 0
1 –25 0
z – MATRIX 3(det) Mat C )E
A
1 2 34 5 6
1 2 34 5 6
z – MATRIX 4(Trn) Mat B )
E
Ck-63
A
a11–1 = a11
1
a11 a12–1
a21 a22
a22 –a12
–a21 a11
a11a22 – a12a21
=
a11 a12 a13–1
a21 a22 a23
a31 a32 a33
=
a22a33 – a23a32 –a12a33 + a13a32 a12a23 – a13a22
–a21a33 + a23a31 a11a33 – a13a31 –a11a23 + a13a21
a21a32 – a22a31 –a11a32 + a12a31 a11a22 – a12a21
a11a22a33 + a12a23a31 + a13a21a32 – a13a22a31 – a12a21a33 – a11a23a32
•• !) x–1 –1
1 –25 0
1 –25 0
Mat C !)(x–1)E
A
x
1 –25 0
1 –25 0
Mat C xE
Ck-64
N6
k
1 an
an f n2 an+1
an+1 f an
A
an z – 1 an
an+1 z – 2 an+1
A
an an+1
an+1 an n
z – TYPE 2(an+1)z2(an)+z1(n)+1
an nz – TYPE 1(an)z1(n)+5
o
Ck-65
AE
an an+1
n
c f
• o
• J
E•• E
J
AE
an an+1
••
•
•
n n
an n an
Ck-66
Σ an n n an
n n
an+1 n an+1
Σ an+1 a1 n an+1
J
k
A an+1
an+1 an n < n < na1
N6(RECUR)
an+1
z – TYPE 2(an+1)
z2(an)+z1(n)+1
E
a1
2E1E10E
E
Ck-67
A an
an n2 n – < n < n
B
N6(RECUR)
an
z – TYPE 1(an)
'1c2ez1(n)x+2z1(n)-3
E
2E6E
E
k
•••• d dx d 2 dx2 ∫ Σ • l 1l
• 1~
•
•
•
Ck-68
k
N8•
1•
1E0.5E3E2E3E4E
E•
Ck-69
• c f
• J
k
N8 1
N8 2
N8 3
N8 4
N8 c12
N8 c23 2
k
A•
• o
• E
E• E
•
Ck-70
kE
• c f• E E
• J
•
e ab
k
,3 ,4
A
Ck-71
A
N3(SD)
24.5E25.5E26.5E
ce
4E6E2E
•
• E••
•
Σ y
Ck-72
A
E
z5 1 1••
z5 1 2•
E
J
z5 1 3•
•
z5 1 4•
•
Ck-73
k• N3•
A
z6(RESULT) c f
•• J
•
Az1 /
•E
• o
z7(STAT) 2(VAR)
2(o)E
Ck-74
A
n z7 2 1
n = xi
x z7 2 2
xσ n z7 2 3
xσ n–1 z7 2 4
x2 z7 2 c1
Σ x2 = Σ xi2
x z7 2 c2
Σ x = Σ xi
z7 2 cc1
z7 2 cc2
oΣxi
n=o Σxi
n=
xσnn
= Σ(xi – o)2
xσnn
= Σ(xi – o)2
xσn–1n – 1
= Σ(xi – o)2
xσn–1n – 1
= Σ(xi – o)2
Ck-75
z7 3 1
t t
z7 3 2
t t
z7 3 3
t t
' z7 3 4
t
k• N4•
P (t)
0 t
P(t) = e dx2π1
−∞∫ t2
2x−
P (t)
0 t
P(t) = e dx2π1
−∞∫ t2
2x−
Q(t) = e dx2π1 ∫ t
2
2x−
Q(t)
0 t
0Q(t) = e dx
2π1 ∫ t
2
2x−
Q(t)
0 t
0
R(t) = e dx2π1 ∫t
2
2x−
R(t)
0 t
+∞R(t) = e dx
2π1 ∫t
2
2x−
R(t)
0 t
+∞
X't = X – oX't = X – o
Ck-76
A
•• J
•
z6(RESULT) 1(S-Var)c f
z6(RESULT) 2(Reg)
•
Ck-77
y ax b 1
y ax2 bx c 2
y a b x 3
e y aebx 4 e
ab y abx 5 ab
y axb 6
y a b x 7
1
Az1 /
•E
• o p
z7(STAT) 2(VAR)
2(o)E
z7(STAT) 2(VAR) 5(p)E
Ck-78
A
x y
x y
z6(RESULT) 2(Reg)3(Log)
J
z1 /x y
•
z7(STAT) 2(VAR) ccc4(r)E
• x y
100z7(STAT) 2(VAR)ccc7(n)E
• n
•
A
n z7 2 1
n = xi
Ck-79
x z7 2 2
x
xσ n z7 2 3
x
xσ n–1 z7 2 4
x
y z7 2 5
y
yσ n z7 2 6
y
yσ n–1 z7 2 7
y
yσn–1n – 1
= Σ(yi – y)2
x2 z7 2 c1
x
Σ x2 = Σ xi2
x z7 2 c2
x
Σ x = Σ xi
oΣxi
n=o Σxi
n=
xσnn
= Σ(xi – o)2
xσnn
= Σ(xi – o)2
xσn–1n – 1
= Σ(xi – o)2
xσn–1n – 1
= Σ(xi – o)2
pΣyin=p
Σyin=
yσnn
= Σ(yi – y)2
yσnn
= Σ(yi – y)2
Ck-80
y2 z7 2 c3
y
Σ y2 = Σ yi2
y z7 2 c4
y
Σ y = Σ yi
xy z7 2 c5
x y
Σ xy = Σ xiyi
x3 z7 2 c6
x
Σ x3 = Σ xi3
x2y z7 2 c7
x y
Σ x2y = Σ xi2yi
x4 z7 2 c8
x
Σ x4 = Σ xi4
z7 2 cc1
x
z7 2 cc2
x
z7 2 cc3
y
z7 2 cc4
y
Ck-81
z7 2 ccc1
z7 2 ccc2
z7 2 ccc3
z7 2 ccc4
x 1 z7 2 ccc5
y x
x 2 z7 2 ccc6
y x
m1
y z7 2 ccc7
x y
A
e
ab
Ck-82
k
1
2
–––––––––––
N3(SD)
1N(SETUP)c5(STAT)1(FreqOn)
55E57E59E61E63E65E
67E69E71E73E75E
ce1E2E2E5E8E
9E8E6E4E3E2E
z1(/COMP)z7(STAT) 2(VAR) 2(o)E
z7(STAT) 2(VAR) 4(xσ n–1)E
z7(STAT) 3(DISTR)3(R()70z7(STAT) 3(DISTR)4('t))E
Ck-83
1
2
3
N4(REG)
1N(SETUP)c5(STAT)2(FreqOff)
20E50E80E110E140E170E
200E230E260E290E320E
ce3150E4800E6420E7310E
7940E8690E8800E9130E
9270E9310E9390E
z6(RESULT) 2(Reg)1(Line)
Jz6(RESULT) 2(Reg)3(Log)
x n
Jz1(/COMP)350z7(STAT) 2(VAR) ccc7(n)E
Ck-84
N2
kN2
A
x
l
i
6
A
2 2
oi(BIN)1+1E
••
w^ DEC
l$ HEX
i 6OCT]"% BIN [
w^ DEC
l$ HEX
i 6OCT]"% BIN [
Ck-85
A
i∠ A
'( B
$ s c tsin–1D cos–1E tan–1F, C
ol(HEX)1t(F)+1E
A
< x <
< x <
< x << x <
– < x <
< x << x <
< x <
< x <
< x <
< x <
•
kx l I 6
Ck-86
ox(DEC)30E
i(BIN)
6(OCT)
l(HEX)
k
A
z1(BASE-N)
1(d)3
Ck-87
A
oi(BIN)z1(BASE-N)1(d)5+z1(BASE-N)2(h)5E
k
i
A
1010z1(BASE-N)c3(and)1100E
A
1011z1(BASE-N)c4(or)11010E
A
1010z1(BASE-N)c5(xor)1100E
A
Ck-88
1111z1(BASE-N)c6(xnor)101E
A
z1(BASE-N)c2(Not)1010)E
A
z1(BASE-N)c1(Neg)101101)E
N1
ks
E
A
•
Ck-89
b3*S0(A)+S'(B)
s
A = 5 B = 3
5E3E
E
s
c10E
E
•• c f
••
Ck-90
A
B 1S(;-LOCK)!(")i(A)/(R)c(E)i(A)!(")1!(:)S1(S)S~(=)
S0(A)*S'(B)/2
s
7E8EE
N1
k
•Σ
•
k.
E
A
y ax b x y a b –
B S.(Y)S~(=)S0(A)S0(X)x+S'(B)
Ck-91
.
0E1E1E
– -2E
f
.
• E•
•• c f
A
z6
e d
J
A•
••
y xy ex y 1
xy 'x
Ck-92
A
b
–
•• –
e d• –
A
E
b
o
N7
kx f x f x x
A
Ck-93
f x x
BS0(X)x+'1c2
• o
•
AE
x
c f
• o
• J
E•• E
J
AE
••
Ck-94
•
•
x
x f x
J
k
x x
x
TABLE N7(TABLE)
f x x
100000(1+0.03)6S0(X)
E
1E5E2E
E
k
Ck-95
N1
k
AG
•
• 1
c f
1(S)
•
AG
c f
A
b
G)(H)c(HeronFormula)
E
Ck-96
8E5E5E
E
•• /Q E
Q
• Q E
Az6
e d
J w z6
k
Ck-97
/ /
/ /
Ck-98
Ck-99
Ck-100
k
AG
•z2
•1S
w
•
• w
J
,53
•• e
→
c f
w
•
e d
J
•
Ck-101
AN51
• 1S
E•
3•
•
J
•
A
A
•
•α
z4
1
2 ΑΒΓ 3 αβγ 4 123
5 ABC
6 abc
Si
Ck-102
A
N5
k
A
A
Ck-103
k
A
'2 ' 3
→ '
2^
'3
•
N5•
1•
1S
E•
5(O)$(C)2(T)i(A))(H)c(E)s(D)/(R)5(O)4(N)E
• 1
AA
Ck-104
•S!(")Si(A)S!(")
z3(PROG) 1(?)z3(PROG) 2(→ )Si(A)E2*!3)*Si(A)x1x(^)
!2)/3*Si(A)63)
• E _
J
•
J 2• E
E
E
7E
^
E
J E
• N1
• E
•
Ck-105
Az –
z – PROG
•
•
/•
AN5 3
•e d
c f E•
c f
c f
c f
c f
Ck-106
e d
• 1f 1c
J
k
• E J
E• E
J
• o
A
2/
•e d
c f E•
o
J
Ck-107
A
bo1/(Prog)
1S(;-LOCK)!(")5(O)e(C)2(T)0(A))(H)c(E)
s(D)/(R)5(O)4(N)!(")
E
AJ d e
Ck-108
k
• 2
• 3
• 4 1
A
5
5(O)
c f
c f
Ck-109
A
z1•
•
•••
A
z1
A
z2•
E
o J d e
k
AN5 4 1
•e d
Ck-110
c f E•
E J
AN5 4 2
•E
J
•• _ ^
E• ^
kz –1! ^ 1x 1/
A
(1!)
→
Ck-111
^ (1x)
^
Q
→ ^
^ E ^
→ →
→
→ E
→
→
→
A
≠ > <
S
S
Ck-112
A
n n n n n
n n→ → ^
n n
→ → → →
S
1 S
2 S
≠ > <
1 S
S
2 S
S
→ > S' ^
A
Ck-113
•
•
•
••
→ ^ ^
→ →
A
→
→ → ^
→
→ → ^
Ck-114
A
→ ^ → •
•
→ → ^
A
(1/)
•
•
•
Ck-115
••
••
→
A
^
→ ^ → →
→
A
Ck-116
81
71 72 73 74 75 76
61 62 63 64 65 66
51 52 53 54 55 56
41 42 43 44 45 46
31 32 33 34
21 22 23 24 87
35 36 37 77 67
25 26 27 57 47
8384
8586
82
≠
A
< < < <
•
•
Ck-117
A
→ →
^ → →
→ → ^
Az –
→
Ck-118
kz –
x z – 1
→
1 → 2 →
3
S0 S. z – 1 2
1 → → 2 → → → 3 → ^
A z – 4
eab
Ck-119
k
A
n n
n nn
Ck-120
∠
∠ a bi r∠
A
A
Ck-121
k
A
k
A
Nc1(LINK)2(Receive)
•
Nc1(LINK)1(Transmit) 1(All)
E•
Ck-122
•
A
Nc1(LINK)2(Receive)
Nc1(LINK)1(Transmit) 2(Select)
c f 1• '
1 '
• '
0•
E•
•
Ao
A
Ck-123
10
••
Nc2
•
k
••
Ck-124
k
Ac f
1• '
• 1 '
•
Ac f
E•
c f 1• '
J
• '
•
•
A
0
Ck-125
k
••
1 Pol(, Rec( ∫ (, d/dx(, d2/dx2(, Σ (, P(, Q(, R(sin(, cos(, tan(, sin –1(, cos –1(, tan –1(, sinh(, cosh(, tanh(, sinh –1(, cosh –1(, tanh –1(log(, ln(, e^(, 10^(,'(, 3
'(Arg(, Abs(, ReP(, ImP(, Conjg(Not(, Neg(, Det(, Trn(, Rnd(Int(, Frac(, Intg(
2 x 2, x–1, x!, °’ ”, °, r, g
^(, x'('t%m, , n, p, f, k, M, G, T, P
3 a b / c4 –
d, h, b, o
5 m, n, m , m
6 nPr, nCr
∠ 7
π π π i '
8 –
9 ≠ > <
10
11
Ck-126
• –
– x
-2wE – –
(-2)wE –
•
b/c0w i ib/(c0)w i – i
k
k
–
1 2 3 4 5
1 2 3 4 5 6 7
1 2 3 4 5
1 2 3 4 5 6 7
1
2
3
4
5
2
3
4
5
4
1
2
3
4
5
6
7
1
2
3
4
5
2
3
4
5
4
1
2
3
4
5
6
7
Ck-127
A
sinx
DEG 0 < | x | < 9×10 9
RAD 0 < | x | < 157079632.7
GRA 0 < | x | < 1×10 10
cosx
DEG 0 < | x | < 9×10 9
RAD 0 < | x | < 157079632.7
GRA 0 < | x | < 1×10 10
tanx
DEG sin x | x | = (2 n–1)×90
RAD sin x | x | = (2 n–1)×π /2GRA sin x | x | = (2 n–1)×100
sin–1x0 < | x | < 1
cos–1xtan–1x 0 < | x | < 9.999999999×10 99
sinhx0 < | x | < 230.2585092
coshx
sinh–1x 0 < | x | < 4.999999999×10 99
cosh–1x 1 < x < 4.999999999×10 99
tanhx 0 < | x | < 9.999999999×10 99
tanh–1x 0 < | x | < 9.999999999×10 –1
logx/lnx 0 < x < 9.999999999×10 99
10x –9.999999999×1099 < x < 99.99999999
ex –9.999999999×1099 < x < 230.2585092
'x 0 < x < 1×10 100
x2 | x | < 1×10 50
1/x | x | < 1×10 100 ; x G 0 3'x | x | < 1×10 100
x! 0 < x < 69 x
nPr0 < n < 1×10 10, 0 < r < n n, r1 < n!/(n–r)! < 1×10 100
nCr 0 < n < 1×10 10, 0 < r < n n, r1 < n!/r!< 1×10 100 1 < n!/(n–r)! < 1×10 100
Pol( x, y)| x | , | y | < 9.999999999×10 99
x2+y2< 9.999999999×10 99
Ck-128
Rec(r, θ )0 < r < 9.999999999×10 99
θ sin x
°’ ”| a | , b, c < 1×10 100
0 < b, c| x | < 1×10 100
10 ↔ 60 0°0´0˝ < | x | < 9999999°59´59˝
^(xy)
x > 0: –1×10 100 < ylog x < 100x = 0: y > 0x < 0: y = n,
m2n+1
m, n
–1×10100 < ylog | x | < 100
x'y
y > 0: x G 0, –1×10 100 < 1/ x logy < 100y = 0: x > 0y < 0: x = 2 n+1, 2n+1
m m G 0 m, n
–1×10100 < 1/ xlog | y | < 100
a b/c
• xy x'y ' x n r n r
•
k
A
• J d e
• o
Ck-129
A
•
••
•
••
•
•
•
•
•
• •
• •
••
••
’ • •
•
• • tol
•
• •
• nn
•
• n nn
•
Ck-130
•
•
•
•
• ••
• •
•
•
• •
1
••
•
• •
k
1
2
3
Nc3
2
E
J
N
Ck-131
4
5 4 Nc3 3 E
•
•
k
•
•
A
PP
Ck-132
1o
•
•
•
k
l
A
o
˚ ˚
LR03 OR “AAA” SIZE(ALKALINE)LR03 OR “AAA” SIZE(ALKALINE)
Ck-133
MEMO
Ck-134
MEMO
Ck-135
MEMO
Ck-136
MEMO
CASIO Europe GmbHBornbarch 10, 22848 Norderstedt, Germany
CASIO COMPUTER CO., LTD.
6-2, Hon-machi 1-chomeShibuya-ku, Tokyo 151-8543, Japan
SA0609-A Printed in China