Sharp EL-501XBWH Operation Manual - Page 2
ttittPHF
View all Sharp EL-501XBWH manuals
Add to My Manuals
Save this manual to your list of manuals |
Page 2 highlights
IMMO ENGLISH EL-501X CALCULATION EXAMPLES ANWENDUNGSBEISPIELE EXEMPLES DE CALCUL EJEMPLOS DE CALCULO EXEMPLOS DE CALCULO ESEMPI DI CALCOLO REKENVOORBEELDEN PELDASZAMITASOK PfliKLADY VYPOCTU RAKNEEXEMPEL LASKENTAESIMERKKEJA r1P11MEPbl BbIlik1CTIEHHA UDREGNINGSEKSEMPLER irla1114nilfi-nratu c31.4 ttittPHF CONTOH-CONTOH PENGHITUNGAN CONTOH-CONTOH PERHITUNGAN CAC Vi DU PHEP TINH [1] (ON/C]( CE ( ) 3x 3( x ) 3. [own) 0. 4x5 4( x )5 5. (Ca) 0. 4x6+7= 6( + )7 = 31. 134 134 134. (..) 1. 123 23 123. 34_>43 3 ( ) 4 (2ndF)( )( = ) 64. [2] X (=) I ) )+1-)(El)) 45+285+3= IONIC) 45 ( + ) 285 ( ) 3 ( = ) 140. 18+6 15-8 ) 18 ( +)6 ( ÷ ) ( )15( - )8( = ) 3.428571429 42x(-5)+120= 42 x ) 5 (-e/- ) ) 120 ( = ) -90. (5x103)÷(4x104)= 5 Exp 3( +)4 (av) 3 (+/-)( = 1250000. [3] 34+57= 45+57= 79-59= 56-59= 56+8= 92+8= 68x25= 68x40= 34 ( + ) 57 = 45 = ) 79 - ) 59 ( = ) 56 ( = ) 56 (+) 8 = ) 92 ( = ) 68 ( x ) 25 = 40 = ) 91. 102. 20. -3. 11.5 1700. 2720. [4] ( sin (cos ( tan) sin-, (cos-1(tan-1) it (DRG)( hyp arc hyp)( in ) log )( ex )[1ox]( ix )( 72 (NY Psi- ( sin60[°]= (oNic) 60 ( sin) 0.866025403 coi[rad]= (DRG)(2ndF)(n) ( 3 ) 4 ( = )(cos) 0.707106781 tan-11=[g] (DRG 1 (2ndF)(tan-') 50. (DRG) (cosh 1.5 + sinh 1.5)2 = tanh-17 = (mac)( ) 1.5 (v) [cos)( + ) 1.5 (hyp)( sin )( )( x2 ) 20.08553692 5 (+) 7 ( = ) (2ndF)(arc hyp)(tan) 0.895879734 In 20 = 20 ( In ) 2.995732274 log 50 = 50 Hoe ) 1.698970004 e3 = 101.7 = 3 (2ndF)(e`) 1.7 [2ndF)( 1a, 20.08553692 50.11872336 1 1 ;'7= 6 (2ndF)(ux)( + 7 (2ndF) (ux) = ) 0.309523809 8 2 -34x52 = 1 (123)4. 8 ( y, )2 (+1-() -)3( yr) 4( x )5 ( x2 )( = -2024.984375 12 yr 3 ( yx)4 (2ndF)(a) = 6.447419591 49 4 81= 49 (4- )( - 81 (2ndF) ) 4( = ) 4. 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. • 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 gamma dei risultati di funzioni trigonometriche inverse • 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 • ritIoto4Ndimitimfiguallnunsinank • ;aw esul ju.1 •REAMiti-FXSANMIN • Julat hasil fungsi trigonometri songsang • Kisaran hasil fungsi trigonometri inversi • Giai hen caa cac ket qua caa cdc ham so kking gidc nghjch ciao DEG RAD GRAD 0 = sin-' x, 0 = tan-' x -9050590 -77t ≤0≤ 77t -100505100 0 = cos-1 x 0505180 0 50 ≤n 0505200 [5] (DROP. 90°-> [rad] -3 [9] + 1°1 sin-10.8 = [O] -3 [rad] -9 [9] ->I°1 IONIC 90 (2ndF) (DRGe) (2ndF (DRGe (2ndF (DRGe 0.8 (2ndF) ( sin-1) (2ndF (DRGe (2ndF (DRGe (2ndF (DRGe 1.570796327 100. 90. 53.13010235 0.927295218 59.03344706 53.13010235 [6] ( RCL) ( STO ( M+) IONIC (sTo 8( x )2 ( = ) STO) 16. 24:(8x2)= 24 ÷ ( RCL 1.5 (8x2)x5= ( RCL x 5 ( 80. IONIC ( sm 12+5 12 5 =( 17. -) 2+5 2 ( + ) 5 ( = )(+/-)(M-r) -Z +)12x2 12 x 2 ( = ( 24. M (RCL 34. $1= ¥140 ¥33,775=$? $2,750=¥? 140 (sm 33775 ( ( RCL ( 2750 x ( RCL 140. 241.25 385000. r = 3cm nr2 = ? 3 STO) (2ndF it ( x2 ) = X ( RCL 3. 28.27433388 [7] 6+4=ANS = 6( + )4 (ON/C) 10. ANS+5 ( + )5 15. 44+37=ANS 44 ) 37 81. 1/AllS= (4- ) 9. [8] (*DEG) 12°39'18"05 (mac) 12.391805 (*DEG) 123.678 -> [60] 123.678 (2ndF).cons sin62°12'24" = [10] 62.1224 (*DE6)( sin ) 12.65501389 123.404080 0.884635235 [9] ( ) Hre 6[ )4 (2ndF) [r] b )(e] ( a )[r] 14 ( a ) 36 (2ndF (-•.Y)[x] 0 = 36[1 y = b )[Y] ( a )[x] 7.211102551 33.69006753 7.211102551 11.32623792 8.228993532 11.32623792 [10] (*OCT) (OeHEX DEC(25)->BIN IONIC) (2ndF) 25 (2ndF) (*BIN) 11001. HEX(1AC) IONIC) (2ndF) (*HEX) 1AC (2ndF) (*BIN) (2ndF) (*cal (2ndF) (*DEC) 110101100. 654. 428. BIN(1010-100) x11 = IONIC) (2ndF) (*BIN) x ) 11 1010 ( - ) 100 ) 10010. HEX(1FF)+ OCT(512)= HEX(?) IONIC) (2ndF) (*FIEX) 1FF (2ndF) 512 (2ndF) 1511. 349. 2FEC2C9E=(A) +)20001901=(B) (C) -> DEC IONIC) (sr()) (2ndF) (*HEX) 2FEC 2C9E 54+) 2000 ) 1901 (KA+) ( RCL) [2ndF) (*DEC) ) 34E. 6FF. A4d. 2637. [11] (c x) a b 1-.Y) LEM (2ndF) (cpLx) 0. (12-6i) + (7+15i) 12 ( a ) 6 (+/-)( b )( + 7( a )15 b ) - (11+4i) = ( - ) 11 a ) 4 ( b )( = ) 8. b ) 5. ( a ) 8. 6x(7-9i) x (-5+8i) = 6 a )( x ) 7 ( a)9 (+/-( b )( x ) 5 (+/-)( a ) 8 b ) = 222. ( b ) 606. 16x(sin30°+icos30°)_ 16 ( a )( x ) 30 ( sin)( a ) 30 (cos)( b ) (sin60°+icos60°) 60 ( sin )( a ) 60 ( cos)( b ) ( = ) b ) 13.85640646 8. 8 ( a ) 70 ( b (2ndF)(-•.Y) A ( + ) 12 ( a ) 25 b )(2ndF)( = )(2ndF)(-ere [r] 18.5408873 ( b ) [0] 42.76427608 = 8, 01 = 70° r2 = 12, 02 = 25° r = ?, 0= ?° (1 + i) r = ?, 0 = ?° 1 a )1 b ) = (2ndF)(-ere [r] ( b ) (IA 1. 1.414213562 45. [12] STAT](DATA) CD )( X ) Sx [ax]( n ) - DATA 95 80 80 75 75 75 50 7= crx= ?I= Ix= 1x2= sx= sx'= (2ndF)(STAT) 95 (DATA 80 ( x ) 2 (DATA) 75 ( x 3 (DATA 50 (DATA) ) (2ndF)( (Tx ) (^ ) [2ndF)[ Is ) (2ndF)( 1,x ) ( ax ( x2 ) DIM 0. 1. 3. 6. 7. 75.71428571 12.37179148 7. 530. 41200. 13.3630621 178.5714286 - [ DATA (2ndF) (STAT) (2ndF) (STAT) 0. 30 30 [DATA) 1. 40 40( x ) 2 [DATA) 3. 40 50 (DATA) 4. 50 50 (2ndF)( CD) 3. 40 x ) 2 (2ndF)( co) 1. - DATA - 30 45 45 45 ( x ) 3 (DATA) 4. 45 60 [DATA) 5. 60 [13] X _nXX n sx - n- 1 GX -P X2 ta2 n Ix= + X2 + "• + Ex2 = X12 + X22 xn2 [14] Function Funktion Fonction Funci6n Funcao Funzioni Functie F0ggvany Funkce Funktion Funktio GiyHKU,MR Funktion thfciu :au' Eft Fungsi Fungsi Ham so sin x, tan x cos x sin-'x, cos-'x tan-1x, 3. In x, log x e 10x sinh x, cosh x Dynamic range zulassiger Bereich Plage dynamique Rango dinamico Gama dinamica Campi dinamici Rekencapaciteit Megengedett szamitasi tartomany Dynamick9 rozsah Definitionsomrade Dynaaminen ala gmHampmeckm8 amanaaoH Dynamikomrade rigalunisfrantu ',51..q.sll ju.ar WOMEN Julat dinamik Kisaran dinamis Gil:3i han D6ng DEG: I x I ≤ 4.499999999 x 1070 RAD: (tanx: IxIo 90 (2n31))* Ix' ≤ 785398163.3 (tanx : Ix' Oi (2n-1))° GRAD: I x I ≤ 4.999999999 x 1070 (tan x: IxIo 100 (2n-1))* DEG: RAD: GRAD: I x I ≤ 4.500000008 x 1070 I x I ≤ 785398164.9 I x I ≤ 5.000000009 x 1070 I x I ≤ 1 I x I < 10'" 10-99 ≤x 0: • y=0: •y 0: -101°2 < x Iny 5 230.2585092 0