How to get real and imaginary terms from an expression?

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Aditya Zade on 11 Dec 2022

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Commented: Aditya Zade on 12 Dec 2022

I am trying to get real and imaginary terms from the following expression TF. But real(), imag() is not able to give me any solution.

syms s real
ws = 2 * pi * 85000 ;
Lp = 27.13e-6 ;
Cpp = 129.23e-9 ;
Zp = s * Lp + ws * Lp * 1i ;
Zpp = 1 / ( s * Cpp + ws * Cpp * 1i ) ; 
TF = Zpp * Zp / ( Zp + Zpp ) ;

These two commands give me following answers.

TFreal = real(TF)

TFreal =

TFimag = imag(TF)

TFimag =

You can observe that the answers have real, imag commands in them instead of answers.

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Paul on 11 Dec 2022

Hi Aditya,

Normally, a transfer function, which I assume is what TF means, is defined as a function of s, which is a complex variable, and all other terms in the tansfer function are all real. But here, we have s defined as real, and other terms in the TF are complex. Can you clarify exactly what this code is intened for?

Aditya Zade on 11 Dec 2022

Hey Paul,

Only 's' is a variable which I have defined as a real number.

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Answer 1

Walter Roberson on 11 Dec 2022

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Open in MATLAB Online

syms s real

ws = 2 * pi * 85000 ;

Lp = 27.13e-6 ;

Cpp = 129.23e-9 ;

Zp = s * Lp + ws * Lp * 1i ;

Zpp = 1 / ( s * Cpp + ws * Cpp * 1i ) ;

TF = Zpp * Zp / ( Zp + Zpp ) ;

TFreal = real(TF)

TFreal =

TFimag = imag(TF)

TFimag =

simplify(TFreal)

ans =

simplify(TFimag)

ans =

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Aditya Zade on 11 Dec 2022

Edited: Aditya Zade on 11 Dec 2022

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Hi Walter,

Thanks for the comment.

I have more complex expressions where simplify command is not helping me. Can you help me with that?

Id = 2.1467 - 51.0287i ;
Req = 17.5865 ;
Vm = 277 * sqrt(6) ;
ws = 2 * pi * 85000 ;
Lp = 27.13e-6 ;
Cpp = 129.23e-9 ;
Cps = 175.29e-9 ;
Ll = 34.69e-6 ;
Lm = 782.76e-6 ;
syms s real
Zp = s * Lp + ws * Lp * 1i ;
Zpp = 1 / ( s * Cpp + ws * Cpp * 1i ) ; 
Zps = 1 / ( s * Cps + ws * Cps * 1i ) ; 
Zl = s * Ll + ws * Ll * 1i ; 
Zm = s * Lm + ws * Lm * 1i ; 
Kp1 = ( Req * ( 1 + ( ( Zps + Zl ) / Zm ) ) ) + Zps + Zl ;
Kp2 = 1 + ( Zp / Zpp ) + ( Zp / ( Zps + Zl ) ) ;
Kp3 = Zp / ( Zps + Zl ) ;
H_mi_idcap = ( 2 * sqrt(3) / pi ) * Vm / ( ( Kp1 * Kp2 ) - ( Req * Kp3 ) ) ;
H_mi_idenvcap = ( simplify( real( H_mi_idcap ) ) * ( real ( Id ) ) + simplify( imag( H_mi_idcap ) ) * ( imag( Id ) ) ) / ( abs( Id ) ) ;

This gives me the following answer where you can see imag and real commands instead of a proper solution. Everything is a function of 's' which I have defined as a real number :

H_mi_idenvcap =

(172683135000208604551535223026586347005871322726587908178108096625276636501114880000000*imag(1/((260655775425866130589094142874939721854279679342140669722801980358790866066735104000000000000*((4003681333757921*s)/147573952589676412928 + (pi*46121i)/10000))/(3199587759584921875*s + pi*543929919129436693725184i + 3484491437270409865864955980101306485309440000/(6622268966257761*s + 3536760160863479398400i)) + (((2441085682324977*s + 1303712463883813781504i)*(2502300833598700625*s + pi*425391141711779115040768i) + (160693804425899027554196209234116260252220299378279283530137600000000*((4003681333757921*s)/147573952589676412928 + (pi*46121i)/10000))/(3199587759584921875*s + pi*543929919129436693725184i + 3484491437270409865864955980101306485309440000/(6622268966257761*s + 3536760160863479398400i)) + 1742245718635204932932477990050653242654720000)*(s*(4619058782255093538217914766794407636638949233813262172160000 - 21168034995631362998836147051869896922367328720757068922880000i) + pi*(78011169021401466968879757554262818755122444066860299426830745600 + 1854409792978907913925284668047915815504542811708541297105253171200i) + pi*s*(6944434942837917949164811082012024629727852242338660690690048 - 146068978425098581708069587328360702057061537084478402330624i) - pi*s^2*6501418518427872464610362653183025793653342863217393664i - s^2*(20247246437114752669473895744275033930756435040419840000 + 40849617310811283933296436264138582256579234682880000000i) - 38243638343693369198375882169918233116530201328125*s^3 + (5388772738081004572469698920051915105680717877468455087175106560000 - 3358895989106063476910444219158740309232214042176845740119162880000i)))/(11952676787541737523111330423471*s^2 + s*12767150139401286081539645192745910272i - 3409280732243783574557653655779097234636800))))/1437601757967713 - (7264420886176792199257085734292880601658091595116561440468289605814950758973440000000*real(1/((260655775425866130589094142874939721854279679342140669722801980358790866066735104000000000000*((4003681333757921*s)/147573952589676412928 + (pi*46121i)/10000))/(3199587759584921875*s + pi*543929919129436693725184i + 3484491437270409865864955980101306485309440000/(6622268966257761*s + 3536760160863479398400i)) + (((2441085682324977*s + 1303712463883813781504i)*(2502300833598700625*s + pi*425391141711779115040768i) + (160693804425899027554196209234116260252220299378279283530137600000000*((4003681333757921*s)/147573952589676412928 + (pi*46121i)/10000))/(3199587759584921875*s + pi*543929919129436693725184i + 3484491437270409865864955980101306485309440000/(6622268966257761*s + 3536760160863479398400i)) + 1742245718635204932932477990050653242654720000)*(s*(4619058782255093538217914766794407636638949233813262172160000 - 21168034995631362998836147051869896922367328720757068922880000i) + pi*(78011169021401466968879757554262818755122444066860299426830745600 + 1854409792978907913925284668047915815504542811708541297105253171200i) + pi*s*(6944434942837917949164811082012024629727852242338660690690048 - 146068978425098581708069587328360702057061537084478402330624i) - pi*s^2*6501418518427872464610362653183025793653342863217393664i - s^2*(20247246437114752669473895744275033930756435040419840000 + 40849617310811283933296436264138582256579234682880000000i) - 38243638343693369198375882169918233116530201328125*s^3 + (5388772738081004572469698920051915105680717877468455087175106560000 - 3358895989106063476910444219158740309232214042176845740119162880000i)))/(11952676787541737523111330423471*s^2 + s*12767150139401286081539645192745910272i - 3409280732243783574557653655779097234636800))))/1437601757967713

Walter Roberson on 12 Dec 2022

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format long g

Id = 2.1467 - 51.0287i ;

Req = 17.5865 ;

Vm = 277 * sqrt(6) ;

ws = 2 * pi * 85000 ;

Lp = 27.13e-6 ;

Cpp = 129.23e-9 ;

Cps = 175.29e-9 ;

Ll = 34.69e-6 ;

Lm = 782.76e-6 ;

syms s real

Zp = s * Lp + ws * Lp * 1i ;

Zpp = 1 / ( s * Cpp + ws * Cpp * 1i ) ;

Zps = 1 / ( s * Cps + ws * Cps * 1i ) ;

Zl = s * Ll + ws * Ll * 1i ;

Zm = s * Lm + ws * Lm * 1i ;

Kp1 = ( Req * ( 1 + ( ( Zps + Zl ) / Zm ) ) ) + Zps + Zl ;

Kp2 = 1 + ( Zp / Zpp ) + ( Zp / ( Zps + Zl ) ) ;

Kp3 = Zp / ( Zps + Zl ) ;

H_mi_idcap = ( 2 * sqrt(3) / pi ) * Vm / ( ( Kp1 * Kp2 ) - ( Req * Kp3 ) ) ;

H_mi_idenvcap = ( ( real( H_mi_idcap ) ) * ( real ( Id ) ) + ( imag( H_mi_idcap ) ) * ( imag( Id ) ) ) / ( abs( Id ) );

[N, D] = numden(H_mi_idenvcap)

N =

D =

19758232616516474986477649920000

N = collect(simplify(N), s);

[N1, D1] = numden(N);

c1 = sym2poly(N1);

c2 = sym2poly(D1);

D = simplify(D);

H_mi_idenvcap = tf(c1./double(D), c2)

H_mi_idenvcap = 2.205e188 s^7 + 8.513e195 s^6 + 3.049e201 s^5 + 5.943e207 s^4 + 1.696e213 s^3 + 1.181e219 s^2 + 2.349e224 s + 5.088e229 ---------------------------------------------------------------------------------------------------------------------------------------------------------------------- 8.527e170 s^10 + 9.029e176 s^9 + 2.602e183 s^8 + 1.91e189 s^7 + 2.231e195 s^6 + 1.11e201 s^5 + 6.483e206 s^4 + 2.105e212 s^3 + 6.002e217 s^2 + 9.105e222 s + 9.863e227 Continuous-time transfer function.

Aditya Zade on 12 Dec 2022

Thanks for your help.

Aditya Zade on 12 Dec 2022

One of my transfer function is mentioned below. The problem is matlab is considering it as inf/inf which is giving me NaN in TF. How can I reduce the accuracy of each cofficients such that matlab doesn't consider numerator and denominator as inf.

In other words, how can I make this expression into a TF to generate bode plots.

H_mi_idenvecap = (3198609293274692543065653067624214930931010880602439324145398125122373719207088478979647504147912365379393279754941675512836511355487782993690473574523041631084160518721751172162257705176739868804951103644988270056301183639951764002961292649184871320805158132898539453590562021769463423670681600*s^10 + 528394964584010682783572570459412119664515594164049190345558269437867459470515176667326104615180103456012477355413596835172119921200079260151617877500088502992749340415451742149406277381474643891231659256544455164436234396533126019809440535921033867151082644616021673572586341975274322902549476147200*s^9 + 3364815264139209882761251038034730020362043044801573317888318745671317862412400497423209337541418420521260443952869134388981445799336993041335421299405549089717062472469931053659028441787475552139751801731258711488308627072509140489498330224609031510667147325022465839409185515146370263699813850219632656384*s^8 + 563685908110931596054975975789145169901513780980290358304128472564818439113945323667367115971977027594918152558869188644661828289297726904892093313231476094308350368709481298326017516778957422345680859263591644269304648598798995637702553858174358334141567592255906469564947805207135557231654360809390637347504128*s^7 + 1490257685171315468981773939159767624935105379546903549767553901546757666260988184536138242660525137524427599600907269172197568037353264870592893757184448550843993106896014192025989160859007053395078824566748256700430184559758347451096212214570755769067612673807213370221663874574993990956271545381513459363454956601344*s^6 + 224411121359031406238956529185520395250362431900419601379549724354175300141779807782002787175390937335420258029478904711464033857382032746518758309250170139544602989872581677894407504342046674752426946975585667274279454218538522463096065609371083080593692625877514805336214723108899068335933784036977289350835195383669325824*s^5 + 313435614540771365005472378788015656763925845027971206036651498864090340592352682307018010940557769472344445076584267523825439903337732769841322691195467198038852610063857978387582140881350878878314891681041745284058278276910429225911095101311401498430011153223268796705288141506966312381716632816295470628030364360123375283077120*s^4 + 33052372310506629010656599121147115620859961521559341305146351113127420214834631202990344435993579760702170846892190791973857746526095679537107762472443219962883772363971249591309331211286424393764376285694816602968673940014673553192267278248106274456921340775937053409889209132481984880619358508372583085903071902984276537872895442944*s^3 + 10554849876610050019218981278396688996628674897403163356241700611846899932472970866934831849299194775963827696479104585836123032305509546783003015154442878237125239205963612543055962962608195786274300100491480333594963695160464423230708118733213297370805489181822237410178521006221240286568706063689875376392244199192804233754948767114592256*s^2 + 753392467992893717086282360117150962316839153406675455633706582201238077981189206904259370759701924447550938546700321591834810653022526799241547416036382680758251634390626464710218582595943371303498239715517551074690452253677797215333441705005554261781839683641360100743141925156332627926700008050827621415436588867603559400388725106077190848512*s + 40393566359665865213299995369702801378786875218724874851168023401021269156066673958605743192955287230615526894469312967897474790091218367504457257709499999902912836650529949891815535967261169141147611466577851052777443496008708518428106932969186262475588373778567341855852815573620320080624013993765045842114972784171785710233396747569200139998330880)/(8796093022208*(1736567701589301145136648268745070267169586006463452702588095291310545287345936191207231693796554822487658048259058768341620886269302733511008839672446368759925297181964446329483562182298316297460367920025475136735375318177318220152446938927265225*s^16 + 717181706990849576639378846143604344747449411096706760755432781269930354932423747033964722181786892343713490722151365999943109079738204766382874076277599763531511760836188464560773573023546208271499106196789947712108879925411040105198246484299810406400*s^15 + 8474902337396137452537172814758191980658242868146989657851391747578894251875032832065877742822364594666025855664179609126663161480336968740345550831115764290784755921679756769231426450016836146980279285273763923555792818972379443730261637462558119995610497024*s^14 + 3060326629338539947795355844711670424230830104533914727180539407962588796854615013646350523884347125794176122078030819700072795725888050006338552712785006937280184063404052729170190527501487957786817505885405810768143497607256181752489430834429438245071731940130816*s^13 + 15335444336168058219053185629448334708949063277544031136997077132483020621337637079802757161722640630404872281753614633056555568331414532672223094357966529046772826765042453467781257350997846896530993396891805695459960227266764332535793736164051751621607630139917288341504*s^12 + 4711858733362574057644866067860734266890167073692817480732992906997138035715344442510025574475777812882693974120674123611995382178060815482516053616266140291523815161417712375969402534241363378219168042007415040048566795665071810311976396545823703304132119454866433941966946304*s^11 + 12461014205963250065638676548329519983986852678656821442028223071451986862953854290657145129348903622243955644402794979315564378889686689969794544728780606414037860400637500820387005456202310836355975107206149920656892865375979089113148380105538910212977991189672316595043017557016576*s^10 + 3153610764893990481124174423558310705947546643632994209428020901123162737494351255973870435414198228754915355165434369521635012685859083006757509655278714956660143488334593307926704075313537591188840386118802653628117669854992826061562111167065459384377864567395435560227329653331202146304*s^9 + 4196412284794922572702360089303675577340283804488759850189612200368294017368398595914096366806020918778693395129234114128153062192604212478313975760328409295684988085937308175782203157955672589220365686768906199996621051328446913656225084261462685321058494326091046314623083166983844470867361792*s^8 + 839696424033259323305277259210900820320478003816838709480281015945809199296634999150590387829225143482425327884290937963213529918958215499963010050257883261661116698672089983062272555691561771948624741135615136402177972155830430074599923524875698012649853320313826785826359259368579738843006040539136*s^7 + 341072015811716244581240425181942419448756068895024422843527961260011128604733215760197603405155010453702864279995268573154131226786824324708691134950163294295325223338672708909939254713696078247686589394867848835471068071716381633979836751951857567203826189555176612717339907046903740670679827717512232960*s^6 + 51476173533824520781908853124919012872558430328391461780218775183986801463554817939279579606358525500680300575053075911956606069305313326101015765941389705874779285216218534083105540702681692717458081833490789076288368074605827448462551175726017448688748586848426830311404300308080734687142200861235996885254144*s^5 + 9228963476387818526423807612115148970316248169275808385076365503267308598269819401998734036439982463217524876484624976388723299159343094174914050928582387570266303834881596621229787172099209884856109159135095077583516660315341853942084463079767357281710097403352648761070698296853785890788932711840594861082305101824*s^4 + 911043127300211915454447709952136661126629354017481583423569852460766841727455715209418097330189535279221498687673228467765980464696556517614401815146230080830691482821416104568196921957378920491489758562441974400120279545914620076777651283757517630045507906342397020857506949542233013765663031850658377453871364193648640*s^3 + 75868678050389397096199117807278223110751098365028855498075829798267143867014386665936900343279698677835660735344427396694303631098532043960596038629673009001621357014913910492452492780815641595686087435829590661675243076354379570729851910901126879665446131462508434640539917488307446180193941439583412905434367223985904549888*s^2 + 3174513831849780742601338555460290943793994469034596358746253922613510616605561379821305476696010693727089813475729119325248586731428000109372903713452154026995530738937814787974412887244775242394586804120936971001141865477711946150235680311292016446655479884972049090441497967508802274262026411582423828562014806418492161112670208*s + 85101763546936457815360949157574484179847571907787276421705398659175650996907399114220574701462894693638387449557772198429740759814194738572525547329802602231403046298633131911713278866661938182354784531853129097941253657184023638815783627856915654844607628228041193047656641242417683444772761706726371526915906514106247461005512671232))

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How to get real and imaginary terms from an expression?

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How to get real and imaginary terms from an expression?

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