solving a nonlinear equation with complex numbers

35 vues (au cours des 30 derniers jours)
Mimo T
Mimo T le 7 Nov 2024 à 19:37
Modifié(e) : Paul le 7 Nov 2024 à 22:15
I want to get the values of resistance and reactance of a parallal impedance that gives me specific value for magnitude and phase of the reflection coefficient. Resistance must be positive only while X must be a real number. This is my code
syms R
syms X
Z=(R*1i*X/(R+1i*X));
r=(Z-Zo)/(Z+Zo);
assume(R,'positive')
assume(X,'real')
eqn=[abs(r)==0.5, angle(r)==55*pi/180];
[R1,X1]=vpasolve(eqn,[R,X])
I can not add these constains like solve function and sometimes R becomes negative. (solve function can't be used here because it gives me a warning that vpasolve is used).
Trying to add R>0 in cases vpasolve gives positive R, leads to empty solution.
  2 commentaires
Walter Roberson
Walter Roberson le 7 Nov 2024 à 20:15
Unfortunately your code does not define Zo.
Mimo T
Mimo T le 7 Nov 2024 à 21:47
Yes, I missed it when I copied the code.
Zo=50;

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Walter Roberson
Walter Roberson le 7 Nov 2024 à 22:09
Modifié(e) : Walter Roberson le 7 Nov 2024 à 22:10
Zo = 50;
syms R
syms X
Z=(R*1i*X/(R+1i*X));
r=(Z-Zo)/(Z+Zo);
assume(R,'positive')
assume(X,'real')
eqn=[abs(r)==0.5, angle(r)==55*pi/180];
[R1,X1]=vpasolve(eqn,[R,X], [0 inf; -inf inf]);
disp(char(R1))
121.57176242340307307386879418841
disp(char(X1))
111.30878870807649324383788998856

Plus de réponses (2)

Paul
Paul le 7 Nov 2024 à 22:14
Modifié(e) : Paul le 7 Nov 2024 à 22:15
Does this solution work?
syms R
syms X
Zo = sym(50);
Z=(R*1i*X/(R+1i*X));
r=(Z-Zo)/(Z+Zo);
assume(R,'positive')
assume(X,'real')
eqn=[abs(r)==0.5, angle(r)==55*pi/180];
[R1,X1]=vpasolve(eqn,[R,X],[0,inf;-inf,inf]) % specify initial search bounds
double([R1,X1])
ans = 1×2
121.5718 111.3088
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%sol = solve(eqn,[R,X],'ReturnConditions',true)

John D'Errico
John D'Errico le 7 Nov 2024 à 21:00
Modifié(e) : John D'Errico le 7 Nov 2024 à 21:03
syms R positive % positive implicitly implies real also
syms X real
syms Zo
Z=(R*1i*X/(R+1i*X));
r=(Z-Zo)/(Z+Zo)
r = simplify(r)
Suppose we knew the value of Zo? I'll pick 0.5 as an example.
r_Zo = subs(r,Zo,0.5)
eqn = [abs(r_Zo)==0.5, angle(r_Zo)==55*pi/180]
Now, can we solve this?
RX = solve(eqn,[R,X],returnconditions = true)
RX = struct with fields:
R: z1 X: z2 parameters: [z1 z2] conditions: abs((z1*1i)/2 - z2/2 + z1*z2)/abs(z2/2 - (z1*1i)/2 + z1*z2) - 1/2 == 0 & - (11*pi)/36 + angle(((z1*1i)/2 - z2/2 + z1*z2)/(z2/2 - (z1*1i)/2 + z1*z2)) == 0 & 0 < z1
Essentially, solve is telling us it cannot find an algebraic form for the solution. However, as long as Zo is known, we can use a numerical tool like vpasolve.
RX = vpasolve(eqn,[R,X])
RX = struct with fields:
R: 1.2157176242340307307386879418841 X: 1.1130878870807649324383788998856
The problem is, if Zo is left unknown, then there will be no analytical solution for the problem. You cannot use solve, as I just showed, and vpasolve cannot be employed to solve problems with unknown symbolic dependencies.
(Sadly, Answers is bugged, and it is not showing the symbolic output. One year they will fix this, what was working nicely only a month or so ago, and what does OCCASIONALLY work to this day. SIGH.)
  2 commentaires
Mimo T
Mimo T le 7 Nov 2024 à 22:01
but vpasolve returns R with a negative value. This is my question that vpasolve doesn't take into account the conditions
Mimo T
Mimo T le 7 Nov 2024 à 22:02
I am also sure that there is an admittance (which is Z) on smith chart with positive value of R that is the solution

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