Azzera filtri
Azzera filtri

Solving first order ODE with initial conditions and symbolic function

1 visualizzazione (ultimi 30 giorni)
Valerie
Valerie il 1 Dic 2023
Commentato: Valerie il 2 Dic 2023
The code returns a solution involving a complex number. I know this is not correct because I have solved it in Mathematica. Is there a way to solve it in MATLAB? Below is my code with all variables defined:
% input parameters
Tinf=70+273.15;
Ti=20+273.15;
d=15e-2;
r=d/2;
cdepth=10/1100;
Tf=50+273.15;
cp=4183;
rho=994;
g=9.81;
mew=0.007196;
k=0.6107;
Pr=4.929
Beta=0.00347;
L=10e-2;
% define equations
kv=mew/rho;
Asc=pi*r^2;
V=pi*r^2*L;
m=rho*cp*V;
% Calculate the Ray Number
Gr =@(T) (g*Beta*(Tinf-T)*L^(3))/(kv^(2))
Ray =@(T) Gr(T)*Pr
Nu =@(T) 0.15*(Ray(T)^(1/3))
h =@(T) (Nu(T)*k)/(L)
syms T(t) ;
ode = m*diff(T) == Asc*h(T)*(Tinf-T)
cond = T(0) == Ti;
TSol(t) = dsolve(ode,cond)
disp(TSol)
  2 Commenti
Dyuman Joshi
Dyuman Joshi il 1 Dic 2023
Please share the mathematical definition of ODE that you are trying to solve.
Also, please share the output from Mathematica, along with the code used there.
Valerie
Valerie il 1 Dic 2023
Above if the ODE I'm attempting to solve ^.
Output from Mathematica alongside code is:

Accedi per commentare.

Accedi per rispondere a questa domanda.

Risposta accettata

Torsten
Torsten il 1 Dic 2023
Modificato: Torsten il 1 Dic 2023
Ran in:
You solved it in your code. The second solution out of the three MATLAB returned is the "correct" one giving real-valued temperatures. You can ignore the complex component of size 1e-71. The three solutions result from the T^1/3 term in the Nusselt number.
% input parameters
Tinf=70+273.15;
Ti=20+273.15;
d=15e-2;
r=d/2;
cdepth=10/1100;
Tf=50+273.15;
cp=4183;
rho=994;
g=9.81;
mew=0.007196;
k=0.6107;
Pr=4.929;
Beta=0.00347;
L=10e-2;
% define equations
kv=mew/rho;
Asc=pi*r^2;
V=pi*r^2*L;
m=rho*cp*V;
syms T(t) t
% Calculate the Ray Number
Gr = g*Beta*(Tinf-T)*L^3/kv^2;
Ray = Gr*Pr;
Nu = 0.15*Ray^(1/3);
h = Nu*k/L;
ode = m*diff(T) == Asc*h*(Tinf-T);
Tsol = dsolve(ode,T(0)==Ti);
fplot(real(Tsol(2)),[0 10000])
tq = 2000;
Tq = double(subs(Tsol(2),t,tq))
Tq = 3.3454e+02 + 1.2336e-71i
  4 Commenti
Mostra 2 commenti meno recenti
Torsten
Torsten il 1 Dic 2023
Modificato: Torsten il 1 Dic 2023
It asks to derive the temperature Tq at time tq = 2000 from the solution Tsol(2).

Accedi per commentare.

Più risposte (1)

Alan Stevens
Alan Stevens il 1 Dic 2023
Ran in:
You can do it numerically as follows:
% input parameters
Tinf=70+273.15;
Ti=20+273.15;
d=15e-2;
r=d/2;
cdepth=10/1100;
Tf=50+273.15;
cp=4183;
rho=994;
g=9.81;
mew=0.007196;
k=0.6107;
Pr=4.929;
Beta=0.00347;
L=10e-2;
% define equations
kv=mew/rho;
Asc=pi*r^2;
V=pi*r^2*L;
m=rho*cp*V;
% Calculate the Ray Number
Gr =@(T) g*Beta*(Tinf-T)*L^3/kv^2;
Ray =@(T) Gr(T)*Pr;
Nu =@(T) 0.15*Ray(T)^(1/3);
h =@(T) Nu(T)*k/L;
dTdt = @(t,T)Asc/m*h(T)*(Tinf-T);
tend = 10^4;
tspan = [0 tend];
[t,Tsol] = ode45(dTdt, tspan, Ti);
plot(t,Tsol,[0 tend],[Tinf Tinf],'--'), grid
xlabel('t'), ylabel('T')

Categorie

Scopri di più su Symbolic Math Toolbox in Help Center e File Exchange

Tag

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by