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Euler's Method check

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Thierry Kayiranga
Thierry Kayiranga on 3 Jun 2013
Hello, I am trying to model a first order ODE using Euler's Method. I have shown the Euler's step in the code below and I wanted somebody to double-check it and see if it is written correctly. All the R,C,L, Ron values are given. Thankx for the help
h = 0.0001; % Adjustable time-step
t = 0:h:0.002;
for i = 1:length(t)-1
switch (switch_state)
case 1
k11 = x2(i)*1/L - x1(i)*1/(R*C);
k12 = x2(i)*-Ron/L - x1(i)*1/L + Vi*1/L;
otherwise
k11 = x2(i)*1/L - x1(i)*1/(R*C);
k12 = x2(i)*-Ron/L - x1(i)*1/L;
end
x1(i+1) = x1(i) + h*k11;
x2(i+1) = x2(i) + h*k12;
end
plot(t,x1)
plot(t,x2)

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Accepted Answer

Iain
Iain on 3 Jun 2013
You've implemented euler's method correctly. Whether or not you have calculated k11 and k12 correctly, and chosen sensible values for h, and LCR is another question.
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Iain
Iain on 5 Jun 2013
Edited: Iain on 5 Jun 2013
They're not the same equations.
Remember, matrix multiplication is Row times column
But, yes, the euler implementation is correct providing that k1 is the differential of x.
Thierry Kayiranga
Thierry Kayiranga on 6 Jun 2013
Right. Row times column. Correct me if I'm wrong. So basically, the loop would take each row of A and multiply it by the corresponding column of x and add it B*Vi. And k1 would be [k11 k12]' from the earlier code. right?

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