Sharp EL-501XBWH Operation Manual - Page 2

IMMO

ENGLISH

[3]

[7]

CALCULATION

EXAMPLES

ANWENDUNGSBEISPIELE

EXEMPLES

DE

CALCUL

EJEMPLOS

DE

CALCULO

EXEMPLOS

DE

CALCULO

ESEMPI

DI

CALCOLO

REKENVOORBEELDEN

P

ELDASZAMITASOK

P

fliKLADY

VYPOCTU

RAKNEEXEMPEL

LASKENTAESIMERKKEJA

r1P11MEPbl

BbIlik1CTIEHHA

UDREGNINGSEKSEMPLER

irla

1114

nilfi

-

nratu

c31.4

ttittPHF

CONTOH-CONTOH

PENGHITUNGAN

CONTOH-CONTOH

PERHITUNGAN

CAC

Vi

DU

PHEP

TINH

[1]

(ON/C]

(

CE

(

)

3x

4x5

4x6+7=

3

(

x

)

[own)

4

(

x

)

5

(Ca)

6(

+

)7

=

3.

0.

5.

0.

31.

134

123

134

23

(..)

134.

1.

123.

34_

>

43

3

(

)

4

(2ndF)

(

)

(

=

)

64.

[2]

X

(=)

I

)

)

+1—)

(El))

45+285+3=

IONIC)

45

(

+

)

285

(

)

3

(

=

)

140.

18+6

(

)

18

(

+)6

(

÷

)

15-8

)

1

5

(

-

)

8

(

=

)

3.428571429

42x(-5)+120=

42

x

)

5

(-e/

-

)

)

120

(

=

)

-90.

(5x10

3

)÷(4x10

4

)=

5

Exp

3(

3

(+/—)

(

=

+)4

(av)

1250000.

34+57=

34

(

+

)

57

=

91.

45+57=

45

=

)

102.

79-59=

79

-

)

59

(

=

)

20.

56-59=

56

(

=

)

—3.

56+8=

56

(+)

8

=

)

92+8=

92

(

=

)

11.5

68x25=

68

(

x

)

25

=

1700.

68x40=

40

=

)

2720.

[4]

(

sin

arc

hyp)

(NY

(cos

(

in

)

Psi

-

(

tan)

log

)

sin

-,

(

ex

)

(

(cos

-1

[1ox]

(tan

-1

)

(

ix

)

it

(

7

2

(DRG)

(

hyp

sin60[°]=

(oNic)

60

(

sin)

0.866025403

coi[rad]=

(DRG)

(

=

)

(2ndF)

(cos)

(n)

(

3

)

4

0.707106781

tan

-1

1=[g]

(DRG

(DRG)

1

(2ndF)

(tan-')

50.

(cosh

1.5

+

sinh

1.5)

2

=

(mac)

1.5

(

)

(hyp)

1.5

(

sin

)

(v)

(

)

[cos)

(

x2

)

(

+

)

20.08553692

tanh

-1

7

=

5

(2ndF)

(+)

7

(

=

)

(arc

hyp)

(tan)

0.895879734

In

20

=

20

(

In

)

2.995732274

log

50

=

50

Hoe

)

1.698970004

e

3

=

3

(2ndF)

(e`)

20.08553692

10

1

.

7

=

1.7

[2ndF)

(

1

a

,

50.11872336

1 1

;'7=

6

(ux)

(2ndF)

(ux)

=

)

(

+

7

(2ndF)

0.309523809

8

2

-3

4

x5

2

=

8

(

y

,

)2

4(

x

)5

(+1—)

(

x2

)

(—)

(

=

3(

yr)

—2024.984375

1

(12

3

)

4

.

12

(2ndF)

yr

(a)

3

(

yx)4

=

6.447419591

49

4

81=

49

4(

=

)

4.

(4

—

)

(

—

81

(2ndF)

)

3

27-

27

(2ndF)

)

3.

4!

=

4

(2ndF)

(

n

24.

500x25%=

500

x

)

25

(2ndF

(

%

)(

=

)

125.

120

+400=?%

120

+

)

400

(2ndF)

(

%

)(

=

)

30.

500+(500x25%)=

500

(

+

)

25

(2ndF)(

%

=

)

625.

400-(400x30%)=

400

(

-

)

30

(2ndF)

%

=

)

280.

-

•

•

•

30

[11]

(c

x)

a

b

1-.Y)

•

(2ndF)

(STAT)

(2ndF)

(STAT)

30

[DATA)

0.

1.

LEM

(2ndF)

(cpLx)

0.

40

[

40(

x

)

2

[DATA)

3.

(12-6i)

+

(7+15i)

12

(

a

)

6

(+/—)

(

b

)

(

+

7(

a

)15

b

)

40

50

(DATA)

4.

—

(11+4i)

=

(

—

)

11

a

)

4

(

b

)

(

=

)

8.

50

b

)

5.

50

(2ndF)

(

CD)

3.

(

a

)

8.

40

x

)

2

(2ndF)

(

co)

1.

-

6x(7

-9i)

x

6

a

)(

x

)

7

(

a)9

(+/—(

b

)(

x

)

30

(-5+8i)

=

5

(+/—)

(

a

)

8

b

)

=

222.

45

(

b

)

606.

45

45

(

x

)

3

(DATA)

4.

45

60

[DATA)

5.

16x(sin30°+icos30°)_

16

(

a

)

(

x

)

30

(

sin)

(

a

)

30

(cos)

(

b

)

60

(sin60°+icos60°)

(

=

)

b

)

60

(

sin

)

(

a

)

60

(

cos)

(

b

)

13.85640646

8.

8

(

a

)

70

A

(

+

)

12

=

8,

01

=

70°

r2

=

12,

02

=

25°

r

=

?,

0=

?°

=

)

(

b

)

(

b

(

a

)

(2ndF)

[

0

]

(-ere

(2ndF)

25

[r]

(-•.Y)

b

)

(2ndF)

(

18.5408873

42.76427608

(1

+

i)

r

=

?,

0

=

?°

1

a

)

(2ndF)

(

b

)

1

(-ere

(IA

b

)

[r]

=

1.

1.414213562

45.

[12]

STAT]

(DATA)

CD

)

(

X

)

Sx

[ax]

(

n

)

-

95

80

80

75

75

75

50

(2ndF)

95

80

(

x

)

2

75

(

x

3

50

(STAT)

(DATA

(DATA)

)

(DATA)

(DATA

DIM

0.

1.

3.

6.

7.

7=

75.71428571

crx=

(2ndF)(

(Tx

)

12.37179148

?I=

(

^

)

7.

Ix=

[2ndF)

[

Is

)

530.

1x

2

=

(2ndF)(

1,x

)

41200.

sx=

(

ax

13.3630621

sx'=

(

x2

)

178.5714286

[13]

[14]

n

GX

-P

X2

ta2

XX

X

_n

sx

-

n-

1

n

Ix=

+

X2

+

"•

+

Ex

2

=

X1

2

+

X22

+•••

+

xn

2

Function

Funktion

Fonction

Funci6n

Funcao

Funzioni

Functie

F0ggvany

Funkce

Funktion

Funktio

GiyHKU,MR

Funktion

th

fciu

:au'

Eft

Fungsi

Fungsi

Ham

so

Dynamic

range

zulassiger

Bereich

Plage

dynamique

Rango

dinamico

Gama

dinamica

Campi

dinamici

Rekencapaciteit

Megengedett

szamitasi

tartomany

Dynamick9

rozsah

Definitionsomrade

Dynaaminen

ala

gmHampmeckm8

amanaaoH

Dynamikomrade

ri

ga

lunisfrantu

‘

,5

1

..q.sll

ju.ar

WOMEN

Julat

dinamik

Kisaran

dinamis

Gil:3i

han

D6ng

sin

x,

tan

x

DEG:

I

x

I

≤

4.499999999

x

10

70

(tanx:

IxIo

90

(

2

n3

1

))

*

RAD:

Ix'

≤

785398163.3

(tanx

:

Ix'

Oi

(2n-1))

°

GRAD:

I

x

≤

4.999999999

x

10

70

(tan

x:

IxIo

100

(

2

n

-1

))

*

cos

x

DEG:

I

x

≤

4.500000008

x

10

70

RAD:

I

x

≤

785398164.9

GRAD:

I

x

≤

5.000000009

x

10

70

sin

-

'x,

cos

-

'x

x

≤

1

tan

-1

x,

3

.

x

I

<

10'"

In

x,

log

x

10

-99

≤x<10

1

"

e

-ic)

,

"<x≤

230.2585092

10x

-10

10

°<x<100

sinh

x,

cosh

x

x

≤

230.2585092

•

The

range

of

the

results

of

inverse

trigonometric

functions

•

Der

Ergebnisbereich

far

inverse

trigonemetrische

Funktionen

•

Plage

des

rdsultats

des

fonctions

trigonometriques

inverses

•

El

rango

de

los

resultados

de

funciones

trigonometricas

inverses

•

Gama

dos

resultados

des

trigonometricas

inverses

•

La

dei

risultati

di

funzioni

trigonometriche

inverse

gamma

•

Het

bereik

van

de

resultaten

van

inverse

trigonometrie

•

Az

inverz

trigonometriai

funkciak

eredmeny-tartomanya

•

Rozsah

qsledka

inverznich

trigonometrickych

funkci

•

Omfang

f6r

resultaten

av

omvanda

trigonometriska

funktioner

•

Kaanteisten

trigonometristen

funktioiden

tulosten

alue

•

gmanaeori

peepurame

o6parnbix

-

rpwroHome

-

mmHeckmx

cpynkujel

•

Omrade

for

resultater

of

omvendte

trigonometriske

funktioner

•

ri

tIoto4Ndimitimfiguallnunsinank

•

;aw

e

sul

ju.1

•

REA

M

iti

-

FXSA

NM

IN

•

Julat

hasil

fungsi

trigonometri

songsang

•

Kisaran

hasil

fungsi

trigonometri

inversi

•

Giai

hen

caa

cac

ket

qua

caa

cdc

ham

so

kking

gidc

nghjch

ciao

0

=

sin

-

'

x,

0

=

tan

-

'

x

0

=

cos

-1

x

DEG

—9050590

0505180

RAD

7t

7t

—

7

≤0≤

7

0

50

≤n

GRAD

-100505100

0505200

[5]

(DROP.

90°—>

[rad]

IONIC

90

(2ndF)

(DRGe)

1.570796327

-3

[9]

(2ndF

(DRGe

100.

+

1

°

1

(2ndF

(DRGe

90.

sin

-1

0.8

=

[O]

0.8

(2ndF)

(

sin

-1)

53.13010235

-3

[rad]

(2ndF

(DRGe

0.927295218

-9

[9]

(2ndF

(DRGe

59.03344706

—

>I

°

1

(2ndF

(DRGe

53.13010235

[6]

(

RCL)

(

STO

(

M+)

24:(8x2)=

IONIC

(sTo

8(

x

)2

(

=

)

24

÷

(

RCL

(

RCL

x

5

(

STO)

16.

1.5

80.

(8x2)x5=

IONIC

(

sm

12+5

12

5

=

(

17.

-)

2+5

2

(

+

)

5

(

=

)

(+/-)

(M

-r)

-Z

+)12x2

12

x

2

(

=

(

24.

M

(

RCL

34.

$1=

¥140

140

(sm

140.

¥33,775=$?

33775

(

(

RCL

(

241.25

$2,750=¥?

2750

x

(

RCL

385000.

r

=

3cm

3

STO)

3.

nr

2

=

?

(2ndF

it

X

(

RCL

(

x2

)

=

28.27433388

tanh

x

Ix

l<

10'"

sinh

-1

x

lxl<

5

x10

0

cosh

-

'

x

1

≤x<5

x

10"

tanh

-1

x

lxl<

1

x°

lxl<10"

11x

Ixl<10

0

°(xo0)

n!

0

≤n≤

69*

—>D.MS

->DEG

Ixl<

1

x

10

,00

x,y->r,0

IxI,

IYI<

10

"

li

'

l,x

2

+y

2

<10'

m

r,

0

->

x,

y

DEG:

10

l<

4.5

x

10

1

°

RAD:

10

≤

785398163.3

GRAD:

101<5x10

1

°

DRGIII•

DEG-ARAD,

GRAD

->DEG:

1

x

I

<

10

1

"

RAD->GRAD:

1

xi<

i

x

10"

Y

x

•

y

>

0:

-10

1

°

2

<

x

Iny

5

230.2585092

•

y=0:

0<x<10

1

°

3

•y<0:

x=n

1

(0

<Ixl<1:i=

2n-1,xo

Or,

-10

,

"

<

x

In

I

y1≤

230.2585092

x,IT,

•

y

>

0:

-10m

<

4

iny

≤

230.2585092

(x

o

0)

•

y=

0:

0

<x<10

1

"

•y<0:

x=

2n-1

-10

1

"

<

i

l

x

In

I

y

5

230.2585092

(A+Bi)-(C+Di)

IB±Di<

10

1

"

AC+

BD

10

1

"

<

C

2

+

D

2

10

1

"

c2+

D2

<

C

2

+

D

2

o

0

->DEC

->BIN

->OCT

->HEX

DEC

:

1

x

1

5

9999999999

BIN

:

1000000000

≤x≤

1111111111

0

5

x

5111111111

OCT

:

4000000000

≤

x

≤

7777777777

0

≤

x

≤

3777777777

HEX

:

FDABF41C01

≤

x

≤

FFFFFFFFFF

0

≤

x

5

2540BE3FF

*

n:

integer

/

ganze

Zahlen

/

entier

/

entero

/

inteiro

/

intero

/

geheel

getal

/

egesz

szamok

/

celd

disk)

/

heltal

/

kokonaisluku

/

Lienbie

/

heltal

/

/

/

/

integer

/

bilangan

bulat

/

nguyen

6+4=ANS

(ON/C)

6(

+

)4

=

ANS+5

(

+

)

5

44+37=ANS

44

)

37

1/AllS=

(4

-

)

[8]

(*DEG)

10.

15.

81.

9.

12°39'18"05

(mac)

12.391805

(*DEG)

12.65501389

123.678

->

[60]

123.678

(2ndF).cons

123.404080

sin62°12'24"

=

[10]

62.1224

(*DE6)(

sin

)

0.884635235

[9]

(

)

Hre

(2ndF)

b

)

(

a

)

6

[

)

4

(e]

[r]

[r]

7.211102551

33.69006753

7.211102551

0

=

36[1

y

=

14

(2ndF

(

a

)

b

)

(

a

)

36

(-•.Y)

[Y]

[x]

[x]

11.32623792

8.228993532

11.32623792

[10]

(*OCT)

(OeHEX

DEC(25)—>BIN

IONIC)

(2ndF)

25

(2ndF)

(*BIN)

11001.

HEX(1AC)

IONIC)

(2ndF)

(2ndF)

(2ndF)

(2ndF)

(*BIN)

(*cal

(*DEC)

(*HEX)

1AC

110101100.

654.

428.

BIN(1010-100)

x11

=

IONIC)

x

)

(2ndF)

11

(*BIN)

1010

(

-

)

100

)

10010.

HEX(1FF)+

OCT(512)=

HEX(?)

IONIC)

512

(2ndF)

(2ndF)

(*FIEX)

1FF

(2ndF)

1511.

349.

2FEC-

2C9E=(A)

+)2000-

1901=(B)

(C)

—>

DEC

IONIC)

2C9E

2000

1901

(

RCL)

[2ndF)

(sr())

(2ndF)

54+)

)

(KA+)

(*DEC)

(*HEX)

2FEC

)

34E.

6FF.

A4d.

2637.

For

Europe

only:

SHARP

ELECTRONICS

(Europe)

GmbH

SonninstraRe

3,

D-20097

Hamburg

For

Australia

/

New

Zealand

only

:

For

warranty

information

please

see

www.sharo.net.au

Sharp EL-501XBWH Operation Manual - Page 2

ttittPHF

Page 2 highlights