How to solve a second order ODE with variable coefficients with an excitation.

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Enterprixe am 28 Feb. 2017

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https://de.mathworks.com/matlabcentral/answers/327377-how-to-solve-a-second-order-ode-with-variable-coefficients-with-an-excitation

Bearbeitet: Enterprixe am 1 Mär. 2017

Hello, after knowing how to solve an homogeneous 2nd order ODE i was wondering how to solve the same problem just adding and armonic excitation. I would also like to have it solved using the symbolic math toolbox. The problem will be like the following:

 y'' + sen(10*t)y' + 5y = p(t)
p(t) = sen( 0.5*t + 2*t^2)
y(0)= 0
y'(0)= 1

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Jan am 28 Feb. 2017

What have you tried so far?

Enterprixe am 1 Mär. 2017

Bearbeitet: Enterprixe am 1 Mär. 2017

In MATLAB Online öffnen

i try this

 syms t y(t) Y
D1y = diff(y,t);
D2y = diff(y,t,2);
Eqn = D2y + [-0.11674*(1-exp(-10*t)) + 0.5351*(1-cos(10*t))]*D1y + 3.2137*y == 0.2029*sin((0.89634+0.8102476*t)*t);
yode = odeToVectorField(Eqn);
Yodefcn = matlabFunction(yode, 'Vars',[t Y]);
% Yodefcn = @(t,Y) [Y(2);-exp(t.*-1.0e1)-sin(t.*1.0e1).*Y(2)-Y(1)];
tspan = [0:0.0254:50];
Y0 = [0 1.8989];
[T,Y] = ode45(Yodefcn, tspan, Y0);
plot(T, Y(:,1))
ylabel('coordenada 1')
xlabel('tiempo')
grid

but the problem is that the solution is almost equal to the homogeneous one( without the sin at the right side of the equation) and that makes me doubt im making things right. Also it would be nice how to program the excitation to a p(t) which after solving the equations gives me the values of it for each time.

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