How to solve ODE's in Matrix Form?

2 views (last 30 days)
Benjamin Watson
Benjamin Watson on 26 Feb 2019
Commented: Benjamin Watson on 27 Feb 2019
Hi,
I have a set of equations like this and am clueless on how to solve on MATLAB and hope someone can help. The intial conditions are P0(0) = 1; P1(0) = 0.
MATLAB.PNG
  4 Comments
James Tursa
James Tursa on 26 Feb 2019
Please post what you have tried and what problems you are having with your code and we can help.
Benjamin Watson
Benjamin Watson on 27 Feb 2019
Hi James Tursa,
I've finally got it working using the dsolve function but is there anyway for it to solve in symbolically as I have Lam values and Mu values which I've had to input a numerical value for but is there anyway to keep these in sysmbolic form. Also is there anyway to get an output which limits t to infinty? Thanks Ben
syms P0(t) P1(t)
Lam = 2000
Mu = 1000
eqns = [diff(P0,t) == -Lam*P0+Mu*P1,...
diff(P1,t) == Lam*P0-Mu*P1];
sol = dsolve(eqns, P0(0) == 1, P1(0) == 0)
solP0(t)= sol.P0
solP1(t)= sol.P1

Sign in to comment.

Answers (1)

Star Strider
Star Strider on 26 Feb 2019
For a linear system such as yours, another option is the expm (link) function. It is the term in the solution for a linear system:
where = expm(A*t).
This requires a loop for the inputs and for values of ‘t’, however that is more of an inconvenience than a problem.

Categories

Find more on Symbolic Math Toolbox in Help Center and File Exchange

Products


Release

R2016b

Community Treasure Hunt

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

Start Hunting!