solve nonlinear system of equations issue.
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I`m trying to make this code bellow to work but, seems like i've got some error and I don't know how to solve. This code should give me the solution of a 6x6 nonlinear system of equations. I'm using the "solve" function, should I use another one? It would be usefull too if I can get the symbolic solution of the R's and C's parameters, in function of the the a's.
if true
A = -0.0084;
B = 12.4815;
C = -0.15931;
D = 56.4282;
E = -0.37668;
F = 2.23716;
G = 4.56831;
syms R1 R2 R3 C1 C2 C3
a0 = C/B+E/B+G/B+A/D+E/D+G/D+A/F+C/F+G/F;
a1 = E/(B*D)+G/(B*D)+C/(B*F)+G/(B*F)+A/(D*F)+G/(D*F);
a2 = G/(B*D*F);
a3 = 1/B+1/D+1/F;
a4 = 1/(B*D)+1/(B*F)+1/(D*F);
a5 = 1/(B*D*F);
S = solve('1/(20000*C1) + 1/(20000*C2) + 1/(20000*C3)=a0','(C1*R1*R2 + C2*R1*R2 + C2*R1*R3 + C2*R2*R3 + C3*R1*R3 + C3*R2*R3)/(20000*C1*C2*C3*R1*R2*R3) = a1','(R1 + R2 + R3)/(20000*C1*C2*C3*R1*R2*R3) = a2','1/(100000*C1) + 1/(100000*C2) + 1/(100000*C3) + 1/(C1*R1) + 1/(C2*R2) + 1/(C3*R3) = a3','(C3 + (C1*R1)/100000 + (C2*R2)/100000 + (C3*R1)/100000 + (C3*R2)/100000)/(C1*C2*C3*R1*R2) + (C1*R1 + C2*R2 + (C1*R1*R2)/100000 + (C2*R1*R2)/100000)/(C1*C2*C3*R1*R2*R3) = a4','(R1 + R2 + R3 + 100000)/(100000*C1*C2*C3*R1*R2*R3) = a5','R1','R2','R3','C1','C2','C3');
end
1 Comment
Star Strider
on 18 Jun 2015
When I attempted to solve your system (using solve with the lower-case ‘s’), it just gave up (in R2015a).
What is your original network? (It is always possible that you may not have analysed or characterised it correctly.)
Answers (2)
Azzi Abdelmalek
on 18 Jun 2015
Use solve not Solve
Walter Roberson
on 18 Jun 2015
0 votes
A = -0.0084; B = 12.4815; C = -0.15931; D = 56.4282; E = -0.37668; F = 2.23716; G = 4.56831;
syms R1 R2 R3 C1 C2 C3 a0 = C/B+E/B+G/B+A/D+E/D+G/D+A/F+C/F+G/F; a1 = E/(B*D)+G/(B*D)+C/(B*F)+G/(B*F)+A/(D*F)+G/(D*F); a2 = G/(B*D*F); a3 = 1/B+1/D+1/F; a4 = 1/(B*D)+1/(B*F)+1/(D*F); a5 = 1/(B*D*F); S = solve(1/(20000*C1) + 1/(20000*C2) + 1/(20000*C3) - a0, (C1*R1*R2 + C2*R1*R2 + C2*R1*R3 + C2*R2*R3 + C3*R1*R3 + C3*R2*R3)/(20000*C1*C2*C3*R1*R2*R3) - a1, (R1 + R2 + R3)/(20000*C1*C2*C3*R1*R2*R3) - a2, 1/(100000*C1) + 1/(100000*C2) + 1/(100000*C3) + 1/(C1*R1) + 1/(C2*R2) + 1/(C3*R3) - a3, (C3 + (C1*R1)/100000 + (C2*R2)/100000 + (C3*R1)/100000 + (C3*R2)/100000)/(C1*C2*C3*R1*R2) + (C1*R1 + C2*R2 + (C1*R1*R2)/100000 + (C2*R1*R2)/100000)/(C1*C2*C3*R1*R2*R3) - a4, (R1 + R2 + R3 + 100000)/(100000*C1*C2*C3*R1*R2*R3) - a5, R1, R2 , R3, C1, C2, C3);
1 Comment
Walter Roberson
on 19 Jun 2015
Edited: Walter Roberson
on 19 Jun 2015
The solutions are:
[C1 = -0.4461646544e-2, C2 = -0.1784004227e-3, C3 = 0.1882728654e-4, R1 = 1.174062707*10^6, R2 = -9781.547493, R3 = -1.060426096*10^5] [C1 = -0.3389681642e-2, C2 = -0.3913004980e-3, C3 = 0.1994594956e-4, R1 = 1.179017807*10^6, R2 = -5055.827149, R3 = -1.157234305*10^5] [C1 = 0.2119389587e-4, C2 = 0.1945650375e-2, C3 = -0.2424439526e-2, R1 = -1.301221986*10^5, R2 = 1181.689443, R3 = 1.187179066*10^6] [C1 = 0.2352974075e-4, C2 = 0.1208655909e-3, C3 = -0.2883195751e-3, R1 = -3.687309804*10^5, R2 = 43614.63767, R3 = 1.383356769*10^6] [C1 = 0.1487214168e-3, C2 = 0.1412855522e-4, C3 = -0.3309343282e-4, R1 = 54482.22349, R2 = -1.749572795*10^6, R3 = 2.753329868*10^6], [C1 = 0.2495289258e-4-0.1993032731e-4*I, C2 = 0.2304846111e-4+0.2178925031e-4*I, C3 = -0.9106413699e-4-0.6114544012e-3*I, R1 = 5.293758021*10^5-2.330764531*10^5*I, R2 = 5.457018310*10^5+1.484636723*10^5*I, R3 = -19142.11257+83314.07280*I] [C1 = 0.2495289258e-4+0.1993032731e-4*I, C2 = 0.2304846111e-4-0.2178925031e-4*I, C3 = -0.9106413699e-4+0.6114544012e-3*I, R1 = 5.293758021*10^5+2.330764531*10^5*I, R2 = 5.457018310*10^5-1.484636723*10^5*I, R3 = -19142.11257-83314.07280*I] [C1 = 0.2589774071e-4-0.1494241798e-4*I, C2 = 0.2441752825e-4-0.2269921972e-4*I, C3 = -0.2355944763e-5+0.2649938508e-4*I, R1 = 5.408541893*10^5-5.177244909*10^5*I, R2 = 1.594864338*10^5+1.193413097*10^6*I, R3 = 3.560509102*10^5-6.782605561*10^5*I] [C1 = 0.2589774071e-4+0.1494241798e-4*I, C2 = 0.2441752825e-4+0.2269921972e-4*I, C3 = -0.2355944763e-5-0.2649938508e-4*I, R1 = 5.408541893*10^5+5.177244909*10^5*I, R2 = 1.594864338*10^5-1.193413097*10^6*I, R3 = 3.560509102*10^5+6.782605561*10^5*I] [C1 = 0.2629006112e-4-0.1271208704e-3*I, C2 = 0.4656771904e-4-0.2584409754e-4*I, C3 = 0.2572753326e-4+0.1462101062e-4*I, R1 = 49938.56523+86025.15396*I, R2 = 6.993322548*10^5-8.451832209*10^5*I, R3 = 3.102562631*10^5+7.589662188*10^5*I] [C1 = 0.2629006112e-4+0.1271208704e-3*I, C2 = 0.4656771904e-4+0.2584409754e-4*I, C3 = 0.2572753326e-4-0.1462101062e-4*I, R1 = 49938.56523-86025.15396*I, R2 = 6.993322548*10^5+8.451832209*10^5*I, R3 = 3.102562631*10^5-7.589662188*10^5*I] [C1 = 0.3126409254e-4-0.1130524733e-4*I, C2 = 0.2719003443e-4+0.1343640581e-4*I, C3 = -0.6769445217e-4-0.3992079749e-4*I, R1 = 6.699418194*10^5-8.693515341*10^5*I, R2 = 5.684122552*10^5+7.330220343*10^5*I, R3 = -1.715059477*10^5+1.473101172*10^5*I] [C1 = 0.3126409254e-4+0.1130524733e-4*I, C2 = 0.2719003443e-4-0.1343640581e-4*I, C3 = -0.6769445217e-4+0.3992079749e-4*I, R1 = 6.699418194*10^5+8.693515341*10^5*I, R2 = 5.684122552*10^5-7.330220343*10^5*I, R3 = -1.715059477*10^5-1.473101172*10^5*I] [C1 = 0.3268603575e-4-0.2050052106e-4*I, C2 = 0.2601243075e-4-0.1483290392e-4*I, C3 = -0.6409913350e-5+0.3174125142e-4*I, R1 = 3.162201919*10^5+1.098023223*10^6*I, R2 = 5.280644453*10^5-5.322842026*10^5*I, R3 = 2.160466849*10^5-5.599731990*10^5*I] [C1 = 0.3268603575e-4+0.2050052106e-4*I, C2 = 0.2601243075e-4+0.1483290392e-4*I, C3 = -0.6409913350e-5-0.3174125142e-4*I, R1 = 3.162201919*10^5-1.098023223*10^6*I, R2 = 5.280644453*10^5+5.322842026*10^5*I, R3 = 2.160466849*10^5+5.599731990*10^5*I] [C1 = 0.3626803089e-4-0.1531205361e-4*I, C2 = 0.4303851920e-4+0.2121447799e-4*I, C3 = 0.2149151458e-3+0.2596669209e-4*I, R1 = 1.646432179*10^5-2.379573937*10^5*I, R2 = 1.754620505*10^5+1.267408248*10^5*I, R3 = 7.166551907*10^5+1.114847563*10^5*I] [C1 = 0.3626803089e-4+0.1531205361e-4*I, C2 = 0.4303851920e-4-0.2121447799e-4*I, C3 = 0.2149151458e-3-0.2596669209e-4*I, R1 = 1.646432179*10^5+2.379573937*10^5*I, R2 = 1.754620505*10^5-1.267408248*10^5*I, R3 = 7.166551907*10^5-1.114847563*10^5*I] [C1 = 0.4061952768e-4-0.1439124973e-4*I, C2 = 0.2455921515e-3+0.4192753332e-5*I, C3 = 0.4148528628e-4+0.1492861648e-4*I, R1 = 1.391654638*10^5-1.802886574*10^5*I, R2 = 7.781320811*10^5+10537.29881*I, R3 = 1.409404199*10^5+1.697533909*10^5*I] [C1 = 0.4061952768e-4+0.1439124973e-4*I, C2 = 0.2455921515e-3-0.4192753332e-5*I, C3 = 0.4148528628e-4-0.1492861648e-4*I, R1 = 1.391654638*10^5+1.802886574*10^5*I, R2 = 7.781320811*10^5-10537.29881*I, R3 = 1.409404199*10^5-1.697533909*10^5*I] [C1 = 0.7960958164e-4-0.5732134278e-4*I, C2 = 0.6294576649e-4-0.6131454147e-4*I, C3 = 0.2693945078e-4+0.1213272754e-4*I, R1 = 8.187046281*10^5-5.991012132*10^5*I, R2 = 1.176185691*10^5+29404.68843*I, R3 = 1.219147323*10^5+5.697014313*10^5*I] [C1 = 0.7960958164e-4+0.5732134278e-4*I, C2 = 0.6294576649e-4+0.6131454147e-4*I, C3 = 0.2693945078e-4-0.1213272754e-4*I, R1 = 8.187046281*10^5+5.991012132*10^5*I, R2 = 1.176185691*10^5-29404.68843*I, R3 = 1.219147323*10^5-5.697014313*10^5*I]
where I is sqrt(-1).
This question is closed.
on 18 Jun 2015
Closed:
on 20 Aug 2021
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