您好,欢迎访问三七文档
当前位置:首页 > 商业/管理/HR > 企业文化 > 理想媒质中的声波方程
THREEBASICEQUATIONS理想媒质中的三个基本方程1.Theequationofmotion•1.theequationofmotion(Euler'sequation)•First,wewritetherelationbetweensoundpressureandvelocity,•ConsiderafluidelementzyxVABCDEFGHyxzzxyF1F2ABCDEFGHyxzzxyF1F2Whenthesoundwavespass,thepressureis0(,,,)Ppxyzt10()FPpyz0Pp20()FPpPyzSotheforceonareaABCDwillbeistheforceofperunitareaTheforceonareaEFGHwillbeThenetforceexperiencedbythevolumedVinthexdirectionis•AccordingtoNewton’ssecondlawF=ma,theaccelerationofsmallvolumeinxdirectionwillbe12xFFFPyztudtduxxdtdzzudtdyyudtdxxutudtduxxxxxForsmallamplitude,wecanneglectthesecondordervariableterms,zyxVm•WhenxuPyzxyztxuPxt0xxPxPx0limtuxPx00ForsmallamplitudeSimilarly,inthedirectionofyandz,wecanobtaintuyPy0tuzPz0•Nowletthemotionbethree–dimensional,sowrite0uPtPp0dupdtijkxyzppppijkxyzisgradientoperatorSinceP0isaconstant,andobtainThisisthelinearinviscidequationofmotion,validforacousticprocessesofsmallamplitude2.TheequationofcontinuityrestatementofthelawoftheconservationofmatterTorelatethemotionofthefluidtoitscompressionordilatation,weneedafunctionalrelationshipbetweentheparticlevelocityuandtheinstantaneousdensityp.•Considerasmallrectangular-parallelepipedvolumeelementdV=dxdydzwhichisfixedinspaceandthroughwhichelementsofthefluidtravel.•Thenetratewithwhichmassflowsintothevolumethroughitssurfacemustequaltheratewiththemasswithinthevolumeincreases.tzyxuxuxx])([Thatthenetinfluxofmassintothisspatiallyfixedvolume,resultingfromflowinthexdirection,istzyxuxx)(Similarexpressionsgivethenetinfluxfortheyandzdirections,tzyxuyy)(tzyxuzz)(Sothatthetotalinfluxmustbe[()()()]xyzmxyzuuuxyztxyz)]()()([zyxuzuyuxt0tttt0lim)]()()([zyxuzuyuxtWeobtaintheequationofcontinuity•Notethattheequationisnonlinear;therightterminvolvestheproductofparticlevelocityandinstantaneousdensity,bothofwhichareacousticvariables.•Considerasmallamplitudesoundwave,ifwewritep=p0(1+s).Usethefactthatp0isaconstantinbothspaceandtime,andassumethatsisverysmall,0•Weobtainxuuxuxxxx00)()(yuuyyy0)(zuuzzz0)()(0zuyuxutzyx0utSimilarexpressionsgibethenetinfluxfortheyandzdirections,()yxzaaaaxyzWhereisthedivergenceoperator0ut3.Theequationofstate•WeneedonemorerelationinordertodeterminethethreefunctionsP,,andu.•Itisprovidedbytheconditionthatwehaveanadiabatic(绝热的)process,(thereisinsignificantexchangeofthermalenergyfromoneparticleoffluidtoanother).Undertheseconditions,itisconvenientlyexpressedbysayingthatthepressurepisuniquelydeterminedasafunctionofthedensity(ratherthanadependingseparatelyonbothandT)()PP=Generallytheadiabaticequationofstateiscomplicated.Inthesecasesitispreferabletodetermineexperimentallytheisentropic(等熵)relationshipbetweenpressureanddensityfluctuations.•WewriteaTaylor’sexpansion0220S,00d1()()()()()d2!PdPPPd0S,2=WhereSisadiabaticprocess,thepartialderivativesareconstantsdeterminedforadiabaticcompressionandexpansionofthefluidaboutitsequilibriumdensity.0,()SdPdPdd00S,0d()()()dPPP=Ifthefluctuationsaresmall,onlythelowestordertermin0Needberetained.ThisgivesalinearrelationshipbetweenthepressurefluctuationandthechangeindensityWesuppose•Inthecaseofgasesatsufficientlylowdensity,theirbehaviorwillbewellapproximatedbytheidealgaslaw.Anadiabaticprocessinanidealgasisgovernedby02,()SdPcd00VPPVHereristheratioofspecificheatatconstantpressuretothatatconstantvolume.Air,forinstance,hasr=1.4atnormalconditions•Forideagas,00VV00VPPV00000000dPPPPPdInthesoundfieldofsmallamplitude01d2000PpdPPPdcd0PPp0'<<Speedofsoundinfluids2'dpdcdtdtThisistheequationofstate,givestherelationshipbetweenthepressurefluctuationandthechangeindensity.Wegetathermodynamicexpressionforthespeedofsound0,sddPc•Wherethepartialderivativeisevaluatedatequilibriumconditionsofpressureanddensity.•Forasoundwavepropagatesthroughaperfectgas,thespeedofsoundis:002PcForair,at00CandstandardpressureP0=1atm=1.013*105Pa.Substitutionoftheappropriatevaluesforairgives•Thisisinexcellentagreementwithmeasuredvaluesandtherebysupportsourearlierassumptionthatacousticprocessesinafluidareadiabatic.•Theoreticalpredictionofthespeedofsoundforliquidsisconsiderablymoredifficultthanforgases.Aconvenientexpressionforthespeedofsoundinliquidsis51.4021.10310331.6/1.293cms01ScBsisadiabaticcompressionconstantThewaveequationFromtherequirementofconservationofmatterwehaveobtainedtheequationofcontinuity,relatingthechangeindensitytothevelocity;formthethermodynamiclawswehaveobtainedtheequationofstate,relatingthechangeinpressuretothechangeindensity•Byusingonemoreequation(theequationofmotion),thatrelatingthechangeinvelocitytopressure.•Weshallhaveenoughequationtosolveforallthreequantities.Thethreeequationsmustbecombinedtoyieldasingledifferentialequationwithonde
本文标题:理想媒质中的声波方程
链接地址:https://www.777doc.com/doc-3613584 .html