Solve first order nonlinear ODE

22 views (last 30 days)
Missael Hernandez
Missael Hernandez on 8 Sep 2020
Commented: Missael Hernandez on 8 Sep 2020
Hello I am tryin to solve this nonlinear ODE
with the IC
This is my code
tspan = [0 5];
x0 = 3;
[t,x] = ode45(@(t,x) (x^4)-(7*x^2)+6*x, tspan, x0);
plot(t,x,'b')
My problem is that I get the following error: Warning: Failure at t=2.004757e-02. Unable to meet integration tolerances without reducing the step size below the smallest value allowed (5.551115e-17) at time t. What should I do because the graph of the solution looks worng. Thanks.
  2 Comments
J. Alex Lee
J. Alex Lee on 8 Sep 2020
If you have a solution form that you expect, what is it? It's not surprising that the thing explodes for x(0)>1, for which your rate of change increases to produce a snowball effect.
Missael Hernandez
Missael Hernandez on 8 Sep 2020
Well is should be in the form
Wolfram doesn't give the solution Matlab does. Matlab gives this, which I think is wrong

Sign in to comment.

Sign in to answer this question.

Accepted Answer

Alan Stevens
Alan Stevens on 8 Sep 2020
The value of x increases far too quickly, and reaches a value beyond the numerics ability to cope with when x(0) > 2. Works just fine if x(0) = 1.5, or 0.5, say.

More Answers (1)

Sam Chak
Sam Chak on 8 Sep 2020
Edited: Sam Chak on 8 Sep 2020
The x(t) response rises rapidly. It cannot go pass t = 0.0463782 sec.
The x(t) response diverges for x(0) > 2 and converges to some steady-state points for x(0) < 2.
tspan = [0 0.046378];
x0 = 2.5;
[t, x] = ode45(@(t,x) (x^4) - (7*x^2) + 6*x, tspan, x0);
plot(t, x, 'b')
  2 Comments
J. Alex Lee
J. Alex Lee on 8 Sep 2020
so there you go, taken together with my comment and Alan's answer, looks like you are all set.
Missael Hernandez
Missael Hernandez on 8 Sep 2020
Oh ok I see. Thank you guys so much!

Sign in to comment.

Categories

Find more on Ordinary Differential Equations in Help Center and File Exchange

Tags

Community Treasure Hunt

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

Start Hunting!