To the best of my "reading-ability" you seem to have it right in ODE-defining function. From your equations I expect them to be something like this:
% mx’’+Dx’+Kx=-f
% Tf' + f = Gx
% From which we define our 3 first order ODEs as:
% dxdt = v;
% dvdt = -D/m*v-K/m*x-f/m
% dfdt = -f/T + G/T*x
% Which we can put into a dynamical function:
ODExvf = @(t,y,m,D,K,T,G) [y(2);
-D/m*y(2)-K/m*y(1)-y(3)/m;
-y(3)/T + G/T*y(1)];
m=3;
D=2;
K=1;
T=1;
G=5;
[t,F]=ode45(@(t,y) ODExvf(t,y,m,D,K,T,G),[0,1],[0.5,0,0]);
plot(t,F);
It might be preferable to define the ODE more "easily human-readable", and sometimes it's neat to have the opportunity to modify the parameters without having to redefine the function.
HTH
