how to solve nonlinear coupled dgl second order

17 vues (au cours des 30 derniers jours)
Christian Dieterich
Christian Dieterich le 29 Mar 2018
Hello everyone,
Does anybody know how to solve the following two differential equotations using ODE45?
My Problem is, that i don't know how to rewrite the phi'' and x'' during the transformation in a system of dgl's first order.
Thanks
  1 commentaire
Christian Dieterich
Christian Dieterich le 29 Mar 2018
g, l and the masses mw and mk are constant. Fan and Fr can leave away.

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Abraham Boayue
Abraham Boayue le 30 Mar 2018
Here is an example that I have obtained using ode45; the solution seems quite logical since we a dealing with sine waves.
clear variables
close all
N = 500;
L = 5; g = 9.81; mw = 2; mk = 5; Fan = 4; FR = 2;
q1 = -1/L;
q2 = -g/L;
F1 = -(mk*L)/(mw + mk);
F2 = -F1;
S = (Fan - FR)/(mw + mk);
F = @(t,y) [ y(2) ;
(1./(1-q1*F1*(cos(y(1)).^2))).*(0.5*q1*F2*sin(2*y(1)).*y(2).^2+...
q1*S*cos(y(1)) + q2*sin(y(1)))];
t0 = -2*pi;
tf = 2*pi;
tspan = t0:(tf-t0)/(N-1):tf;
ic = [0 0];
[t,y] = ode45(F, tspan, ic);
figure
plot(t,y(:,1),'-o')
hold on
plot(t,y(:,2),'-o')
a = title('\theta vs \theta_{prime}');
legend('\theta','\theta_{prime}');
set(a,'fontsize',14);
a = ylabel('y');
set(a,'Fontsize',14);
a = xlabel('t [-2\pi 2\pi]');
set(a,'Fontsize',14);
xlim([t0 tf])
grid
grid minor;

Plus de réponses (2)

Abraham Boayue
Abraham Boayue le 30 Mar 2018
Can you provide some values for the constants?
  1 commentaire
Christian Dieterich
Christian Dieterich le 30 Mar 2018
Hello Abraham Boayue,
First of all, Thanks for your help. Let's say that mw is 1000 kg and mw is 10 kg. L is 1 m and the initial condition of x' und x are 0, the initial condition of phi' is 0 and the initial condition of phi is 0.4 rad.

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Abraham Boayue
Abraham Boayue le 30 Mar 2018

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