Simple Undamped Forced Vibration Problem
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I am trying to replicate a solution in Matlab for the following problem
x¨+k*x/m=Fo*sin*wo*t/m
using 2 first order linear differential equations in Matlab as shown below
tspan=[0 4];
y0=[.02;1]; %Initial Conditions for y(1)=x and y(2)= x dot
[t,y]=ode45(@forced1,tspan,y0); %Calls forced1.m
plot(t,y(:,2)); %y(:,1) represents the displacement and y(:,2) the velocity
grid on
xlabel('time')
ylabel('Displacement')
title('Displacement Vs Time')
hold on;
function yp = forced1(t,y)
m=20;
k=800;
f=8;
w=8;
yp = [y(2);(((f/m)*sin(w*t))-((k/m)*y(1)))];
The problem is I dont know whether Matlab considers both the complementary and particular solution. The theoretical solution is given as
x=A*sin(wn*t)+B*cos(wn*t)+(Fo*sin(wo*t)/k)/(1−(wo/wn)^2)
where the 3rd term is the particular solution assumed of the form xp=C*sin(wo*t). I am not sure how to implement this correctly in Matlab
Any ideas?
Thanks
if true
% code
end
0 commentaires
Réponses (1)
Mischa Kim
le 1 Août 2014
bugatti79, your code looks fine. In other words, you correctly implemented the differential equation and, yes, MATLAB does return the correct solution: general plus particular.
3 commentaires
Mischa Kim
le 1 Août 2014
If you solve the DE numerically (as you do right now) MATLAB returns numeric values. You could, of course, integrate the DE twice, once with F0=0 and then subtract the two solutions from each other. But again, you will only get numeric values.
I believe what you want is to go symbolic. E.g.
syms x(t) k m F0 w0
DxDt = diff(x);
D2xDt2 = diff(x,2);
% Define differential equation
my_DE = D2xDt2 + k*x/m == F0*sin(w0*t)/m;
% Set initial conditions
x0 = x(0) == 0.02;
Dx0 = DxDt(0) == 1;
% Solve differential equation and display
x_sol = dsolve(my_DE, x0, Dx0);
display(['x(t) = ',char(10),char(x_sol),char(10)])
pretty(x_sol)
Does that help?
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