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Chapter 8 Numbers but not as we knowthem(第1页)

Chapter8hem

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Realandbers

Itistemptingthallthisfrettingaboutparticularequationsandsimplydeclarethatwealreadyknowwhattherealheyaretheofallpossibledecimalexpansions,bothpositiveaheseareveryfamiliar,inpractiowhowtousethem,andsowefeelonsafegrouilweasksomeverybasiaiureofhatyouadd,subtract,multiply,a,forexample,howareyousupposedtomultiplytwoinfinitendecimals?Wedependondecimalsbeihsothatyou‘startfrht-hathereisnosugwithaninfinitedecimalexpansion.Ite,butitisplicatedbothintheoryandinpraumbersystemwhereyletoexplainholydoesisfactory.

Youmayioionsraisedaboryoumaygrowimpatientwithalltheiioobemakingtroubleforourselveswhenpreviouslyallwassmoothsailing.Thereisaseriouspoihematisappreciatethat,whehematicalobjetroduced,itimportanttostructthemfromkicalobjects,theway,foriioofaspairsers.Inthisway,wemaycarefullybuilduptherulesthatgovereemandkafoundatiowillebatuslater.Forexample,therapiddevelopmentofcalculus,whichwasbornoutofthestudyofmotioospectacularresults,suchasprediovemes.Houlationofihingsasiftheywereimesprovidedamazinginsightsaimespatentingyourmathematicalsystemsonarmfoundation,wehowtotellthedifferenpractice,mathematisoftenindulgein‘formal’manipulatiooseeifsheoffieisworthyofattebeprorouslybygoingbacktobasidbyihathavebeeablishedearlier.

ThisiswhyJuliusDedekind(1831-1916)tookthetroubleofformallystrugtherealembasedoisoasDedekindcutsofthereallimathemati,however,tosuccessfullydealwiththedilemmacausedbytheexisteionalnumberswasEudoxusofidus(fl380BC)whoseTheoryofProportionsallowedArchimedestousetheso-calledMethodofExhaustiorouslyderiveresultsonareasandvolumesofcurvedshapesbeforetheadventofcale1,900yearslater.

Thefiheheimaginaryunit

13.Additionofbersbyaddiedlis

&iberspresentsitselfveryheplexplahinkofthebera+biasbeihepoint(a,b)intheateplawobersz=(a,b)andw=(c,d),wesimplyaddtheirfirstariestiveusz+w=(a+c,b+d).Ifwemakeuseofthesymboli,wehaveforexample(2+i)+(1+3i)=3+4i.

Thisdstowhatiskoradditionintheplaedliors)areaddedtogether,toptotail(seeFigure13).Webeginatthein,whichhasatesof(0,0),andinthisexamplewelaydownourfirstarrowfromtheretothepoint(2,1).Toaddtheedby(1,3),wegotothepoint(2,1),anddrawanarroresentsmoving1unitrightialdire(thatisthedireoftherealaxis),and3unitsupiioical(theimaginaryaxis).Weendupatthepointwithates(3,4).Inmuchthesameway,weesubtrabersbysubtragtherealandimaginarypartssothat,forexample,(11+7i)-(2+5i)=9+2i.Thisbepicturedasstartingwiththevector(11,7),andsubtragthevector(2,5),tofinishatthepoint(9,2).

Multipliisaer.Formallyitiseasytodo:wemultiplytwoberstogetherbymultiplyis,rememberingthati2=-1.AssumiributiveLawuestohold,whichisthealgebraicrulethatallowsustoexpasintheusualway,thenmultipliproceedsasfollows:

(a+bi)(c+di)=a(c+di)+bi(c+di)=

ac+adi+bci+bdi2=(ac-bd)+(ad+bc)i

Byusiherthanspeberswethesameway,fieofageneraldivisionofbersiheirrealandimaginarypartsaswehavedoneabeneralultipli.Hastheteiqueisuhereisnoproduorizetheresultingformula.

14.Thepositionofaberinpolarates

Multiplihasageometriterpretationthatisrevealedifwealterouratesystemfromtheularatestopolarates.Inthissystem,apointzisonspecifiedbyanorderedpairofnumbers,riteas(r,θ).Thehedistanceofourpointzfrihistextthepole).Thereforerisaivequantityandallpointswiththesamevalueofrformacircleofradiusrtredatthepole.Weusethesedateθtospethiscirclebytakiheangle,measuredinananti-clockwisediretherealaxistothelihenumberriscalledthemodulus(pluralmoduli)ofz,whiletheangleθiscalledtheargumentofz.

Supposewobers,zandw,whosepolaratesare(r1,θ1)and(r2,θ2)respectively.Itturnsoutthatthepolaratesoftheirproductzwtakeonasimpleandpleasingform.Theruleofbinationbeexpressedlyine:themodulusoftheproductzwistheproduoduliofzandw,whiletheargumentofzwisthesumumentsofzandw.Insymbols,zolarates(r1r2,θ1+θ2).Themultiplioftherealnumbersissubsumeduhismeneralwayoflookingatthings:apositiverealnumberr,forinstance,haspolarates(r,0),aiplybyaheresultistheexpected(rs,totherealnumberrs.

Muchmoreofthecharaultipliplexnumbersisrevealedthroughthisrepresentation.Thepolaratesoftheplexunitiaregivenby(1,9lesarenreesinsuchthenaturalmathematiitoftheradian:thereare2πradiansiaturnofoneradiaomovialongthecirceoftheuredatthein.Oneradianisabout57.3°.)Ifwenolexnumberz=(r,θ)andmultiplybyi=(1,90°),wefindthatzi=(r,θ+90°).Thatistosay,multiplibyidstorotatiharightaheplexplaherwords,therightamostfualgeometricidea,berepresentedasanumber.

&heeffectofaddingormultiplyingbyaberzosinagiveheplexplauredgeometrically.Imagineanyregionyoufantheplaoeverypointinsideyion,wesimplymoveeatthesamedistanddireihearrow,orvectorasweoftencallit,represehatistosaywetraosomeotherpositionintheplatheshapeandsizeareexatained,asisitsattitude,bywhitheregionhasnoatioion.Multiplyiinyionbyz=(r,θ)hastwoeffects,however,onecausedbyraherbyθ.Themodulusofeatintheregionisincreasedbyafactorr,soallthedimensionsionareincreasedbyafactorofralso(soitsareaismultipliedbyafactorofr2).Ofcourse,ifr〈1thenthis‘expansioerdescribedasatraasthenewregionwillbesmallerthantheinal.Theregionwill,however,maintainitsshape-foririangleismappedontoasimilartriahesameanglesasbefore.Theeffectofθ,aslaiorotatetheregihaiclockwiseaboutthepole.Theheninmultiplyingallpointsionbyzistoexpandandrionaboutthepole.Thenewregionwillstillhavethesameshapeasbeforebutwillbeofadiffereerminedbyr,andwillbelyingiitudeasdetermiionangleθ.

Furtherces

Thereareahostofappliplexheelemeheiweeangularandpolarrepresentatiooplayinasurprisingandadvantageousway.Foriandardexerciseforstudeionofimportahaturallybytakingarbitrarybersofunitmodulus(i.e.r=1),andgpbularandthenpolarates.Equatiwoformsoftheaherigoion.

&hesameinpives:

&herealandimaginarypartsofthetwoversionsofthisothenpainlesslyyieldsthestandardanglesumformulasory:

&ively,thepolarformforultiplibederivedusirigoriulas.Ihatwehavestatedhere,withoutproof,formultiplipolarformisusuallyrstderivedfrularformbyusingtrigoriulas.

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