ODE45 how can I format this system of equations?

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onamaewa
onamaewa el 17 de Jun. de 2019
Editada: Adriano Filippo Inno el 17 de Jun. de 2019
How can these four equations be arranged for ODE45 solution?
xd1 = v1;
xd2 = v2;
vd1 = (1/m1) * (P - R1*(xd1 - xd2) - K1*(x1-x2));
vd2 = (1/m2) * (-R2*xd2 - K2*x2 + R1*(xd1-xd2) + K1*(x1-x2));
I tried following the documentation, but couldn't apply it.
ODE45

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Adriano Filippo Inno
Adriano Filippo Inno el 17 de Jun. de 2019
Editada: Adriano Filippo Inno el 17 de Jun. de 2019
Assuming your parameters are constants, create the dynamics function as follows:
function dY = DinFun(~,Y,parameters)
% constants
P = parameters.P;
m1 = parameters.m1;
m2 = parameters.m2;
R1 = parameters.R1;
R2 = parameters.R2;
K1 = parameters.K1;
K2 = parameters.K2;
% states
x1 = Y(1);
x2 = Y(2);
v1 = Y(3);
v2 = Y(4);
% state derivatives
dY(1) = v1;
dY(2) = v2;
dY(3) = (1/m1) * (P - R1*(v1 - v2) - K1*(x1-x2));
dY(4) = (1/m2) * (-R2*v2 - K2*x2 + R1*(v1-v2) + K1*(x1-x2));
dY = dY';
end
than you need a script like the following:
clc; close all; clear
%% defining the parameters involved
parameters.P = 1;
parameters.m1 = 10;
parameters.m2 = 1;
parameters.R1 = 0.1;
parameters.R2 = 0.3;
parameters.K1 = 100;
parameters.K2 = 80;
%% Initial state
% Assuming you want to start from 0,0 with null velocities
x1_0 = 0;
x2_0 = 0;
v1_0 = 0;
v2_0 = 0;
Y_0 = [x1_0; x2_0; v1_0; v2_0];
%% ode settings
% assuming your time starts from 0
t0 = 0;
tf = 10;
%% ODE
[T,Y] = ode45(@DinFun, [t0 tf], Y_0, [], parameters);
%% What ever else you need
You just need to change the value of the constants and the final time
Star Strider
Star Strider el 17 de Jun. de 2019
Try this:
function vd = YourODE(t,v,K1,K2,m1,m2,P,R1,R2,x1,x2)
xd1 = v(1);
xd2 = v(2);
vd(1,:) = (1/m1) * (P - R1*(xd1 - xd2) - K1*(x1-x2));
vd(2,:) = (1/m2) * (-R2*xd2 - K2*x2 + R1*(xd1-xd2) + K1*(x1-x2));
end
I created some values for the constants, then tested it with:
[T,V] = ode45(@(t,v)YourODE(t,v,K1,K2,m1,m2,P,R1,R2,x1,x2), tspan, v0);
where ‘v0’ is a (2x1) vector of initial conditions.
That should get you started

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