Using ode45 to solve a Second Order Non-linear ODE
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I'm trying to solve a part of the following equation :
The part i'm trying to solve is or
I've rewritten itt in the form of two first order equations, like so:
In vector form,
And my code is as follows:
tspan = 0:0.0033:100;
a=10*(pi/180);
b=0;
s0 = [a; b];
[t,s] = ode45(@pend_P,tspan,s0);
S1 = s(:,1);
S2 = s(:,2);
plot(t,S1*180/pi)
function sdot = pend_P(t,s)
a=10*(pi/180);
b=0;
% Expansion of s(1) or p :
p1 =0.000000001906*a^3 + (-0.0000007948)*a^2 + 0.00009188*a + (-0.003481);
p2 =0.00000915*a^2 + (-0.0009381)*a + 0.05331;
p3 =1*((-0.0001542)*a^2 + (-0.006078)*a + (-2.089));
p4 =a;
s(1) =( (p1*t.^3) + (p2*t.^2) + (p3*t) + (p4) );
sdot = [s(2); (2*s(2).^2/s(1))];
end
The curve I'm getting is a horixontal line though, as the value of S1 appears to be constant. Any idea where I've gone wrong?
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Respuestas (1)
Alan Stevens
el 4 de Abr. de 2021
Within your function pend you have
function sdot = pend_P(t,s)
a=10*(pi/180);
b=0;
...etc
This resets a and b to the initial conditions every time pend is called. You should have
function sdot = pend_P(t,s)
a=s(1);
b=s(2);
...etc
Also, if you start b (s(2)) at zero, then there is no way for anything to change given that
sdot = [s(2); (2*s(2).^2/s(1))];
i.e. both terms in sdot will stay at zero.
2 comentarios
Alan Stevens
el 4 de Abr. de 2021
You pass a and b to the function as initial conditions, so, because b is zero, this means s(2) is intially zero, which means sdot returns 0, which means nothing changes! Because of the structure of sdot, the initial value of s(2) must be non-zero if you want anything to change.
If you intend that the values of p are calculated by the initial value of a only, and are unchanged after that, they are better calcuated outside of pend, and then passed in, otherwise they are recaculated on every call to pend, which is inefficient.
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