How to model 3 Degrees of Freedom at once
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I have been unable to code the follwing equations in matlab-
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Answers (1)
Torsten
on 9 Nov 2022
Edited: Torsten
on 9 Nov 2022
Define a solution vector y = (y1,y2,y3,y4,y5,y6) with
y1 = y_a, y2 = y_a_dot, y3 = z_a, y4 = z_a_dot, y5 = Theta_a, y6 = Theta_a_dot
and write out the differential equations for these 6 variables.
E.g. for y1 and y2:
dy1/dt = y2
dy2/dt = (-F_y(t) - k_ay*y1 - c_ay*y2)/m_a
Then use ODE45 to solve.
2 Comments
Torsten
on 9 Nov 2022
You use Fy, Fz and T_a as functions of t. Thus you must define them as such:
Fy = @(t) 1
Fz = @(t) 1
T_a = @(t) 178
instead of
Fy=1;
Fz=1;
T_a = 178;
Torsten
on 9 Nov 2022
Edited: Torsten
on 9 Nov 2022
You defined 6 equations, not 4.
tspan = [0 1];
y0 = zeros(6,1);
[T,Y] = ode45(@reduced,tspan,y0);
plot(T,Y)
function yp = reduced(t,y)
m_a = 0.5;
c_ay=1;
c_az=1;
k_ay= 1;
k_az =1;
Fy=@(t)1;
Fz=@(t)1;
T_a = @(t)178;
I_a = 2000;
R_a=1;
yp = zeros(6,1);
yp(1) = y(2);
yp(2) = (-Fy(t) - k_ay*y(1) - c_ay*y(2))/m_a;
yp(3) = y(4);
yp(4) = (-Fz(t) - k_az*y(3) - c_az*y(4))/m_a;
yp(5) = y(6);
yp(6) = (-T_a(t) - Fy(t)*R_a)/I_a;
end
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