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From here, I'm trying to solve a symbolic system of equations like this

syms x y z;
[x, y, z] = solve('z = 4*x', 'x = y', 'z = x^2 + y^2')
x =

y =

z =

except that my equations are generated at different points in the m-file and with random coefficients. My question is how can I accomplish the following...

// Generate the first equation.
n = *random number generated here*;
E1 = (z == n*x + 2*n);   // <--- How to save this symbolic equation to use in "solve(...)" later?

// Other work, generate other eqs.

// Solve system of eqs.
[x, y, z] = solve( E1 , E2, E3)   // What/How to call/use the previously saved symbolic equations.

Thanks for the help!


Updated to better explain objective.

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1 Answer 1

up vote 1 down vote accepted

Use sprintf if you want to keep the randomly generated value of n for later use with solve:

n = *random number generated here*;
E1 = (z == n*x + 2*n);
Eq1 = sprintf('z == %f*x + 2*%f',n,n);

You can play with the parameters on %f to see how much precision you want to include.

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Thanks for the suggestion, I'm using 2011a if that makes any difference. I'm creating a few symbolic equations at different points in the script and I want to save them so, in the end, I can solve for the 'syms' values. I updated my original post to better reflect this. Any additional help on how this can be accomplished would be appreciated! –  john Aug 30 '12 at 19:57
How can I convert the symbolic equation to a string immediately after it is created so I don't have to keep "x" in the workspace the whole time (or if I want to reuse it to generate another number for another equation)? –  john Aug 30 '12 at 21:17
It is saved as a string so you can clear x if you want ; the variable name x is stored, not the value. –  Jacob Aug 30 '12 at 21:22
Exactly. So say I write Eq1 = 'A^2 + B + 2C -x == D';, the string will include x not the random number (e.g. 3.839). Then, if I clear x and eventually get to solve(E1, E2,...) it won't be able to find the value x, correct? Or am I missing something... –  john Aug 30 '12 at 21:30
No, you're right. So you want Eq1 = 'A^2 + B + 2C - 3.839 == D? –  Jacob Aug 30 '12 at 21:32

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