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fx-5800P

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RJA516651-001V01

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k

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Ck-36

An E

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sin(, cos(, tan(, sin–1(, cos–1(, tan–1(

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1s(sin–1)0.5)E

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Ck-40

k

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bv (15(π )/2)z – ANGLE 2(r)E

k

sinh(, cosh(, tanh(, sinh –1(, cosh –1(, tanh –1(

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n

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k

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n n e

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bl2,16)E

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k

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a

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c

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b

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k

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b1

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tol –12

tol

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S0(X)x+S0(X)-6,3,1Z-12)E

A

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Σ (

Ck-46

Σ

Σ ( f (x), x, a, b) = f (a) + f (a+1) + ....+ f (b)

A

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• x

ab

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•

Σ

B z – MATH 4(Σ ()S0(X)+1ea0(X)e1e5E

b

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A• Σ • f x a b ∫ d dx d2 dx2 Σ f x

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Ck-49

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x!, Abs(, nPr, nCr, Rnd(, Int(, Frac(, Intg(

A

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b(5+3)

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Ck-50

A

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b

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A n r n r

n m n m

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10z – MATH 8(nCr)4E

A

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Ck-54

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1/(ENG)

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k

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b

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b

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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

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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

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2 00 2

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k

Ck-58

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k

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Ck-59

E•

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J

A /

a11 a12 ... a1n

a21 a22 ... a2n

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... ... ...

[[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•

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→

Ck-60

Az – 1

c f E

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J

Az – 1

c f

Y z2•

E

J

k

•

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Mat B z – 2 S'

Mat C z – 2 S$

•

A

2 00 2

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2 00 2

1 23 4

Mat A + Mat B

E

Ck-61

A

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1 23 4

35

Mat A + Mat B E

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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

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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

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an nz – TYPE 1(an)z1(n)+5

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Ck-65

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n

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J

k

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N6(RECUR)

an+1

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z2(an)+z1(n)+1

E

a1

2E1E10E

E

Ck-67

A an

an n2 n – < n < n

B

N6(RECUR)

an

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E

2E6E

E

k

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A

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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

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Ck-88

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Ck-133

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Ck-134

MEMO

Ck-135

MEMO

Ck-136

MEMO

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