Two different solutions for one differential equation (population model)
Mostra commenti meno recenti
I'll try solving the ODE:
Substituting 
Transforming to: 
Solving I get: 
Finally, after back substitution: 
complete solution: 
what's equivalent to: 
Now same stuff with MATLAB:
syms u(t); syms c1 c2 u0 real;
D = diff(u,t,1) == c1*u-c2*u^2;
k2 = u;
cond = k2(0) == u0;
S = dsolve(D,cond);
pretty(S)
Receiving: 
I was hoping these expressions have some equivalence so I was plotting them:
c1 = 4; c2 = 2; u0 = 1;
syms t
P1 = (c1)/(1-exp(-c1*t)+c1/u0*exp(-c1*t));
fplot(P1)
hold on
P2 = -(c1*(tanh(atanh((c1 - 2*c2*u0)/k1) - (c1*t)/2) - 1))/(2*c2);
fplot(P2)
but no luck there. I know that's again a quite complex question, but on MathStack one told me these solutions are equvialent, so I don't see a reason for the dissonance.
3 Commenti
Niklas Kurz
il 29 Mag 2021
Modificato: Niklas Kurz
il 29 Mag 2021
Sulaymon Eshkabilov
il 3 Giu 2021
Most welcome. We learn by making mistakes.
Please just keep it. So others can learn.
Risposta accettata
Sulaymon Eshkabilov
il 29 Mag 2021
Besides k1, in your derivations, there are some errs. Here are the corrected formulation in your derivation part:
c1 = 4; c2 = 2; u0 = 1;
syms t
P1 = c1/(c2 - exp(-c1*t)*(c2 - c1/u0)); % Corrected one!
fplot(P1, [0, pi], 'go-')
hold on
P2 = -(c1*(tanh(atanh((c1 - 2*c2*u0)/c1) - (c1*t)/2) - 1))/(2*c2);
S = eval(S);
fplot(S, [0, pi], 'r-')
Good luck.
Più risposte (0)
Categorie
Scopri di più su Ordinary Differential Equations in Centro assistenza e File Exchange
il 29 Mag 2021
il 3 Giu 2021
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
