# Using unspecified constants in matlab

I'm trying to solve a system of equations in the s-domain. So set up this system of equations in matrix form:

``````a=[.4*s+s+5 -5; -5 .5*s+5]
c=[3/s; 3/(2*s)]
(1/s)*a*b=c
``````

I just get the error that s is undefined. How can I solve for b in terms of s?

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Matlab does not (naturally) do symbolic calculations --- which is what your code is trying to do. Matlab's variables need to be concrete numbers, or arrays, or structures, etc. They cannot just be placeholders for arbitrary numbers.

(UNLESS: You use the symbolic computing toolbox for Matlab. I haven't really used this because I prefer to do symbolic computing in environments such as Maple or Mathematica. You could even solve your problem on the Wolfram Alpha website)

But if you pick a specific value of s, computing what you want is easy:

``````s = 5;
a=[.4*s+s+5 -5; -5 .5*s+5];
c=[3/s; 3/(2*s)];
b = s*(a\c);
``````

Where I have used the backslash operator for doing linear inversion.

You should now have that

``````(1/s)*a*b-c
``````

is the zero vector.

EDIT: I looked into the symbolic toolbox. It looks like this is what you want (but you need to have the symbolic toolbox licensed and installed for it to work):

``````syms s;
a=[.4*s+s+5 -5; -5 .5*s+5];
c=[3/s; 3/(2*s)];
b = simple(s*(a\c))
``````
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exactly what I was looking for, thanks! – Free_D Feb 15 '12 at 2:15

The code to perform your calculation using symbolic operators is:

``````syms s;                           %This defines 's' as a symbolic token
a=[.4*s+s+5 -5; -5 .5*s+5];       %a and c inherit the symbolic properties from s
c=[3/s; 3/(2*s)];
result = solve('(1/s)*a*b=c','b') %Solve is the general symbolic toolbox algebraic solver.
``````

This produces

``````result =
(c*s)/a
``````

Generally speaking, Matlab performs best as a numerical toolbox. So depending on your application I would go with another approach, such as that demonstrated by Ian Hincks in another answer. But sometimes the situation demands a symbolic solution.

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