solving ordinary differential equation
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Hello , I am trying to solve an ode in matlab
but i'm getting syntax errors. pls help!!
my actual ODE is : m*d2xdt2 + a*(dxdt)^2 + k*x= Fcos(omega*t)
and i need a solution for x which is displacement for an object.
i am trying this way please correct me where i'm wrong
tspan=[0:1800];
x0=0;
[t,x]=ode45(@(t,x)EQ(tspan,x0,a,k,m,F,omega);
plot(t,x);
function sol= EQ(t,x)
a=1;
k=20;
m=0.5;
F=0.01;
omega=2*pi;
x=[(F/k)*cos(omega*t)- (m/k)*d2xdt2- (a/k)*(dxdt)^2]
sol=x ;
end
Accepted Answer
James Tursa
on 19 Feb 2021
Starting with this differential equation:
m*d2xdt2 + a*(dxdt)^2 + k*x= F*cos(omega*t)
The first step is to solve the equation for the highest order derivative appearing in the equation. This results in:
d2xdt2 = (F*cos(omega*t) - a*(dxdt)^2 - k*x)/m
Now rewrite this as two first order equations using a 2-element vector y, where y(1) is defined to be x and y(2) is defined to be dxdt:
dy(1)dt = dxdt = y(2)
dy(2)dt = d(dxdt)dt = d2xdt2 = (F*cos(omega*t) - a*(dxdt)^2 - k*x)/m = (F*cos(omega*t) - a*(y(2))^2 - k*y(1))/m
From that you can define a derivative function. E.g., expressed in a function handle:
a = 1;
k = 20;
m = 0.5;
F = 0.01;
omega = 2*pi;
dydt = @(t,y) [y(2);(F*cos(omega*t) - a*y(2)^2 - k*y(1))/m];
This function handle is what you can pass to ode45( ).
13 Comments
Jasneet Singh
on 19 Feb 2021
Walter Roberson
on 19 Feb 2021
Edited: Walter Roberson
on 19 Feb 2021
No. y is defined as whatever ode45 passes in as the second parameter.
Jasneet Singh
on 19 Feb 2021
Jasneet Singh
on 19 Feb 2021
James Tursa
on 19 Feb 2021
Edited: James Tursa
on 19 Feb 2021
Just use your initial conditions and tspan with this. But your initial conditions need to include both x and dxdt, not just x as you have shown. So something like
tspan = [0:1800];
y0 = [0;0]; % both x and dxdt initial conditions
[t,y]=ode45(dydt,tspan,y0);
plot(t,y(:,1));
Jasneet Singh
on 20 Feb 2021
James Tursa
on 20 Feb 2021
Please show your current code.
Jasneet Singh
on 20 Feb 2021
tspan=[0:1800];
x0=0;
[t,x]=ode45(@(t,x)EQ(tspan,x0,a,k,m,F,omega);
function sol= EQ(t,x)
a=1;
k=20;
m=0.5;
F=0.01;
omega=2*pi;
dx2dt2=[(F*cos(omega*t))/m - (k/m)*x - (a/m)*(dxdt)^2];
sol=dx2dt2;
end
Walter Roberson
on 20 Feb 2021
The syntax of ode45() is:
[t,x] = ode45(FUNCTION_HANDLE, TSPAN, INITIAL_CONDITIONS);
For example,
OBJ = @(t,y) [y(2); y(2).^2 - y(1)];
[t,x] = ode45(OBJ, [0 10], [.1, -.03])
plot(t, x)
James Tursa
on 20 Feb 2021
@Jasneet Singh You seem to have ignored all of the code I suggested. Why not give it a try?
Jasneet Singh
on 20 Feb 2021
More Answers (1)
Walter Roberson
on 19 Feb 2021
[t,x]=ode45(@(t,x)EQ(tspan,x0,a,k,m,F,omega);
That line tells us that ode45 is to call an anonymous function passing in two parameters, and that it is to throw away the parameters and call EQ passing in 7 variables whose values had to exist at the time the @ function handle was constructed
But ode45 must be passed at least 3 parameters not just one. The second passed to ode45 must be the time span and the third must be the initial conditions. So ode45 would fail.
If you were to pass the time span and initial conditions to ode45 then it would try to call the anonymous function, which would require recalling those 7 variables. However only tspan and x0 exist, and it would fail trying to find the other ones.
function sol= EQ(t,x)
If the variables did all exist then matlab would try to call EQ but would fail because EQ only expects two parameters.
1 Comment
Jasneet Singh
on 19 Feb 2021
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