These theta1 and theta2 values represent the angles between the vertical and two point masses on a double pendulum, how can I use theta1 and theta2 to plot the path the bottom pendulum takes?
Solving system of second order differential equations with ode45
3 visualizaciones (últimos 30 días)
Mostrar comentarios más antiguos
I have two second equations
theta1''= [-29.4sin(theta1)- 9.8sin(theta1 -2*theta2) - 2*sin(theta1-theta2)*(theta1'^(2)*cos(theta1-theta2)]/(3-cos(2*theta1-2*theta2))
theta2''=[2*sin(theta1-theta2)[(2*theta1')+19.6cos(theta1)+theta2'*cos(theta1-theta2)]]/(3-cos(2*theta1-2*theta1))
I think these should be written as a system of 4 first order equations, recast as a matrix and put into ode45 but I cannot figure out hwo to write these equatuons as 4 first first order due to the trig functions. I think I know to use ode45 once I have them in this form. Any help on how to rewrite these would be appreaciated.
2 comentarios
Star Strider
el 29 de Abr. de 2019
The angles will be the ‘y’ output of your ode45 call:
[t,y] = ode45(odesfcn, tspan, theta0);
With those and the geometry of your system, you can plot the trajectories of the point masses. You would have to model the masses as functions of the angles.
That is the best I can do in terms of a description.
Respuesta aceptada
Star Strider
el 28 de Abr. de 2019
I prefer to let the Symbolic MAth Toolbox do the ‘heavy lifting’:
syms theta1(t) theta2(t) t Y
% theta1'' = -29.4sin(theta1)- 9.8sin(theta1 -2*theta2) - 2*sin(theta1-theta2)*(theta1'^(2)*cos(theta1-theta2)]/(3-cos(2*theta1-2*theta2))
% theta2'' = 2*sin(theta1-theta2)[(2*theta1')+19.6cos(theta1)+theta2'*cos(theta1-theta2)]]/(3-cos(2*theta1-2*theta1))
Dt11 = diff(theta1);
Dt12 = diff(Dt11);
Dt21 = diff(theta2);
Dt22 = diff(Dt21);
Eqn1 = Dt12 == (-29.4*sin(theta1)- 9.8*sin(theta1 -2*theta2) - 2*sin(theta1-theta2)*(Dt11^(2)*cos(theta1-theta2)))/(3-cos(2*theta1-2*theta2));
Eqn2 = Dt22 == (2*sin(theta1-theta2)*((2*theta1')+19.6*cos(theta1)+Dt21*cos(theta1-theta2)))/(3-cos(2*theta1-2*theta1));
Eqns = [Eqn1; Eqn2];
[VF,Sbs] = odeToVectorField(Eqns);
Sbs
odesfcn = matlabFunction(VF, 'Vars',{t, Y})
producing:
Sbs =
theta2
Dtheta2
theta1
Dtheta1
odesfcn =
function_handle with value:
@(t,Y)[Y(2);-sin(Y(1)-Y(3)).*(conj(Y(3)).*2.0+cos(Y(3)).*(9.8e+1./5.0)+cos(Y(1)-Y(3)).*Y(2));Y(4);-(sin(Y(1).*2.0-Y(3)).*(4.9e+1./5.0)-sin(Y(3)).*(1.47e+2./5.0)+cos(Y(1)-Y(3)).*sin(Y(1)-Y(3)).*Y(4).^2.*2.0)./(cos(Y(1).*2.0-Y(3).*2.0)-3.0)]
or:
odesfcn = @(t,Y)[Y(2);-sin(Y(1)-Y(3)).*(conj(Y(3)).*2.0+cos(Y(3)).*(9.8e+1./5.0)+cos(Y(1)-Y(3)).*Y(2));Y(4);-(sin(Y(1).*2.0-Y(3)).*(4.9e+1./5.0)-sin(Y(3)).*(1.47e+2./5.0)+cos(Y(1)-Y(3)).*sin(Y(1)-Y(3)).*Y(4).^2.*2.0)./(cos(Y(1).*2.0-Y(3).*2.0)-3.0)];
Use the ‘Sbs’ vector in your legend call.
NOTE — I did not test this with an actual ode45 call. You may need to experiment with it to get it to work correctly.
4 comentarios
Más respuestas (0)
Ver también
Categorías
Más información sobre Ordinary Differential Equations en Help Center y File Exchange.
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
También puede seleccionar uno de estos países/idiomas:
América
- América Latina (Español)
- Canada (English)
- United States (English)
Europa
- Belgium (English)
- Denmark (English)
- Deutschland (Deutsch)
- España (Español)
- Finland (English)
- France (Français)
- Ireland (English)
- Italia (Italiano)
- Luxembourg (English)
- Netherlands (English)
- Norway (English)
- Österreich (Deutsch)
- Portugal (English)
- Sweden (English)
- Switzerland
- United Kingdom(English)
Asia-Pacífico
- Australia (English)
- India (English)
- New Zealand (English)
- 中国
- 日本Japanese (日本語)
- 한국Korean (한국어)