How can I convert set of symbolic functions into function handle so that they can be used as input to ode45?

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Yaswanth Sai
Yaswanth Sai on 7 Nov 2018
Commented: Yaswanth Sai on 10 Nov 2018
For example, I have to solve the following equations
if true
syms x(t) y(t) z(t)
eq1 = diff(x,t) == -x+3z;
eq2 = diff(y,t) == -y+2z;
eq3 = diff(z,t) == x^2-2z;
end
I can use ode45.
if true
f = @(t,x) [-x(1)+3*x(3);-x(2)+2*x(3);x(1)^2-2*x(3)];
[t,xa] = ode45(f,[0 1.5],[0 1/2 3]);
end
Is there any way I can generate the following line automatically from the equations I get(they are symbolic).
f = @(t,x) [-x(1)+3*x(3);-x(2)+2*x(3);x(1)^2-2*x(3)];
In my case, the equation is generated inside the code, so I don't know the coefficients beforehand to write that line.
  2 Comments
Steven Lord
Steven Lord on 7 Nov 2018
You could convert the symbolic expression into a MATLAB function as madhan ravi suggested, but have you tried the functionality included in Symbolic Math Toolbox to solve systems of differential equations directly?
Yaswanth Sai
Yaswanth Sai on 10 Nov 2018
I tried that, but there is no analytical solution to the equations I am trying to solve. So I will not be able to use the standard functionalities.

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Accepted Answer

madhan ravi
madhan ravi on 7 Nov 2018
Edited: madhan ravi on 7 Nov 2018
EDITED
syms x(t) y(t) z(t)
eq1 = diff(x,t) == -x+3*z;
eq2 = diff(y,t) == -y+2*z;
eq3 = diff(z,t) == x^2-2*z;
vars = [x(t); y(t); z(t)]
V = odeToVectorField([eq1,eq2,eq3])
M = matlabFunction(V,'vars', {'t','Y'})
interval = [0 1.5]; %time interval
y0 = [0 1/2 3]; %initial conditions
ySol = ode45(M,interval,y0);
tValues = linspace(interval(1),interval(2),1000);
yValues = deval(ySol,tValues,1); %number 1 denotes first solution likewise you can mention 2 & 3 for the next two solutions
plot(tValues,yValues)
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