Solve nonlinear equation with different parameters
2 visualizzazioni (ultimi 30 giorni)
Mostra commenti meno recenti
letoppina
il 14 Feb 2019
Commentato: Walter Roberson
il 19 Feb 2019
Hello,
I would like to solve a (quite complicated) equation that looks like this:
pi/2*C*x + 0.5*(3 - gamma^2 - 2*gamma)*C*V^2 + 2*A*V + 2*x*B^2 - pi/2*F;
where gamma is also a function of x and it's defined as following:
gamma = gamma0*exp(-D*atan((B*x)./(C*Vdc)))*sqrt(1+((B*x)/(C*V)));
So, in the end, it can be considered as one (long) equation.
The unkowns are x and Vdc. I was thinking of defining the value of Vdc as a linsopace vector, for example, and see the value of x for each variation of Vdc (by making a loop). The question is: how can I solve the equation?
Also, would it be possible to solve the same equation by making varying other parameters of it (by making a loop on them)?
Thank you in advance for your help!
0 Commenti
Risposta accettata
Star Strider
il 14 Feb 2019
Do something like this (although with the correct values for the constants):
A = 13;
B = 5;
C = 7;
D = 3;
F = 11;
V = 42;
gamma0 = 31;
gamma = @(x,Vdc) gamma0*exp(-D*atan((B*x)./(C*Vdc)))*sqrt(1+((B*x)/(C*V)));
eqn = @(x,Vdc) pi/2*C*x + 0.5*(3 - gamma(x,Vdc).^2 - 2*gamma(x,Vdc))*C*V^2 + 2*A*V + 2*x*B^2 - pi/2*F;
Vdc = linspace(0, 10, 5);
for k1 = 1:numel(Vdc)
xs(k1) = fsolve(@(x) eqn(x,Vdc(k1)), 1);
end
figure
plot(Vdc, xs)
grid
Experiment to get the result you want.
12 Commenti
Star Strider
il 19 Feb 2019
‘the order of magnitude of my solution has to be anyway between 10^-6 and 10^-4’
True. However fsolve is a zero-finding function, so if you give it something very close to 0 initially, it is satisfied that it has solved the problem and stops iterating. The solution it arrives at is the value of the parameter of interest in your function that makes your function sufficiently close to 0.
You can change the various options with the optimoptions (link) function. However there is no need for you to do that, since fsolve is functioning normally, and delivers a reasonable result if you let it find the value of the parameter that results in your function being sufficiently close to 0.
Walter Roberson
il 19 Feb 2019
Note that instead of passing a scalar x0 you can pass a vector with two elements; fsolve will only search within the given range. This does require that the function has a different sign at the two endpoints.
Più risposte (0)
Vedere anche
Categorie
Scopri di più su Surrogate Optimization in Help Center e File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!