Filter löschen
Filter löschen

Symbolic manipulation and integration / not enough input argument

1 Ansicht (letzte 30 Tage)
Mauro De Francesco
Mauro De Francesco am 9 Okt. 2018
Kommentiert: Stephan am 10 Okt. 2018
Hello, I have two symbolic functions that i want to integrate. I have converted with matlabFunction the equations into a file here reported:
function DY = Pendulum(theta,w,l)
%PENDULUM
% DY = PENDULUM(THETA,W,L)
% This function was generated by the Symbolic Math Toolbox version 8.2.
% 09-Oct-2018 12:30:20
DY = [w;(sin(theta).*(-9.81e2./1.0e2))./l];
Where the variables are theta and w and l is a constant. Now I want to integrate like this:
X0 = [90*pi/180 ; 1.2];
[tout,yout] = ode45(@Pendulum, [0 5], X0, 2 );
and i get the error Not enough input arguments.
Can someone please explain what is the problem?

Melden Sie sich an, um diese Frage zu beantworten.

Antworten (3)

madhan ravi
madhan ravi am 9 Okt. 2018
Bearbeitet: madhan ravi am 9 Okt. 2018
X0 = [90*pi/180 ; 1.2];
[tout,yout] = ode45(@Pendulum, [0 5], X0)
plot(tout,yout(:,1),'r' )
hold on
plot(tout,yout(:,2),'b')
function DY = Pendulum(theta,w,l)
%PENDULUM
w=1; % error was here because w and l were not defined , I gave w and l as an example change it according to your values
l=2;
% DY = PENDULUM(THETA,W,L)
% This function was generated by the Symbolic Math Toolbox version 8.2.
% 09-Oct-2018 12:30:20
DY = [w;(sin(theta).*(-9.81e2./1.0e2))./l];
end
  8 Kommentare
6 ältere Kommentare anzeigen
Stephan
Stephan am 10 Okt. 2018
Bearbeitet: Stephan am 10 Okt. 2018
@Madhan: The ode of pendulum is a second order ode. The system of odes given here is the converted first order sytem which is equivalent to the equation of pendulum i think.
madhan ravi
madhan ravi am 10 Okt. 2018
@stephen maybe but I’m stuck at this point .

Melden Sie sich an, um zu kommentieren.

Walter Roberson
Walter Roberson am 9 Okt. 2018
ode45(@(theta, w) Pendulum(theta, w, SomeValueForL)
  3 Kommentare
1 älteren Kommentar anzeigen
Walter Roberson
Walter Roberson am 9 Okt. 2018
You are copying all of w into the output and another value as well. w is length 2 so the result is length 3. You should probably be using w(2) instead of w in constructing the output
Walter Roberson
Walter Roberson am 9 Okt. 2018
w = sym('w', [2 1]);
syms theta L
om_d = .... something involving w, theta, and L
Y = [w(1) ; om_d];
matlabFunction(Y, 'File', 'Pendulum', 'Vars', {theta w L},...
'Outputs',{'DY'});
X0 = [90*pi/180 ; 1.2];
L = 2;
[tout,yout] = ode45(@(theta, w) Pendulum(theta, w, L) , [0 5], X0);
... When I am typing on my phone in the middle of the night, I sometimes only give the outline of the change, as editing by poking with one figure is not all that productive.

Melden Sie sich an, um zu kommentieren.

Stephan
Stephan am 9 Okt. 2018
Bearbeitet: Stephan am 10 Okt. 2018
Edit
Here is another approach, inspired by Walters answer:
syms phi(t) g l
eqn = diff(phi,t,2) + g/l * sin(phi) == 0;
eqn = odeToVectorField(eqn);
Pendulum = matlabFunction(eqn, 'File', 'Pendulum','vars',{'t','Y','g','l'},'Outputs',{'DY'});
X0 = [90*pi/180, 1.2];
l = 2;
g = 9.81;
[tout,yout] = ode45(@(t,Y)Pendulum(t,Y,g,l), [0 5], X0);
plot(tout,yout(:,1),'r',tout,yout(:,2),'b')
With the resulting Pendulum.m file:
function DY = Pendulum(t,Y,g,l)
%PENDULUM
% DY = PENDULUM(T,Y,G,L)
% This function was generated by the Symbolic Math Toolbox version 8.2.
% 10-Oct-2018 08:21:21
DY = [Y(2);-(g.*sin(Y(1)))./l];
Theta and w are Y(1) and Y(2) here.
Best regards
Stephan
  3 Kommentare
1 älteren Kommentar anzeigen
Stephan
Stephan am 9 Okt. 2018
Then you should use the answer from Walter.

Melden Sie sich an, um zu kommentieren.

Kategorien

Mehr zu Programming finden Sie in Help Center und File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by