ode23 and ode45 problem
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Suppose we have a differential equation dy/dx=-2x+4y^2 over the range x=0 to 1 with y(0)=0. I need to solve this question with 'ode23' and ode45 in matlab. Does anybody help me?
2 Commenti
John D'Errico
il 26 Mag 2019
Next time, why not make an effort to do your homework yourself? Then show what you tried and ask for someone to help fix it, if you do not succeed.
baran erbas
il 26 Mag 2019
Risposta accettata
Stephan
il 26 Mag 2019
% Solve symbolic (blue line in plot)
syms y(x) x
eqn = diff(y,x) == -2*x+4*y^2
sol_symbolic = dsolve(eqn,y(0)==0);
fplot(sol_symbolic,[0 1])
hold on
% solve numeric with ode45 (red dots in plot)
[V, S] = odeToVectorField(eqn);
fun = matlabFunction(V,'vars', {'x','Y'});
[x, sol_numeric] = ode45(fun,[0 1], 0);
plot(x, sol_numeric,'or')
hold off
With this example code it should be possible to use ode23 also
4 Commenti
baran erbas
il 26 Mag 2019
baran erbas
il 26 Mag 2019
Jan
il 27 Mag 2019
Almost nice.
function main
[y,x] = ode45(@H, [0,1], [0,1]);
% ^ ^ round parentheses
end
function xl = H(x,y)
xl = zeros(2,1);
xl(1) = x(2);
xl(2) = -2 * x + 4 * y^2;
end
Use @H instead of defining the function to be integrated as char 'H'. The latter is still working, but outdate for 15 years now.
baran erbas
il 27 Mag 2019
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