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I am trying to use solve() to solve a system of equations of the following form

eq1=a1x+a2y;
eq2=b1x+b2y;

where a1 = .05 for values of x<5, .1 for values of 5

Is there a way to solve for this using solve? As in sol = solve(eq1,eq2);

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why are you not solving it analytical? Should be trivial to see if any solution exist and if it is consistent. –  bdecaf Mar 13 '12 at 9:54

1 Answer 1

I'm not sure what you're trying to do here. Can you please post a real example (with numbers) and what you would like the output to be?


I think you're trying to solve linear simultaeneous equations. Assuming that is what you are trying to do:

I would suggest multiplying all of your equations by 20, so that your minimum quanta size of 0.05 becomes 1.00. Your problem then becomes the solution of linear equations for integer values.

Note that if the system is fully constrained (that is, if there are n independent constraints on the n equations you want to solve) then there will only be one solution and it may not necessarily be an integer solution. For example the system:

1 = 2a + 4b
3 =  a +  b

has the solution a = 5.5, b = -2.5. No other solution is possible.

For under-constrained systems, i.e.

0 = 3x + y
x > 0

Then there will be an infinite number of solutions, some of which may have both x and y being integer values. (Or there may be no integer solutions at all.)

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I should have phrased my question differently, the functions are piecewise functions. I figured out how to put a piecewise function in equation form, but am having issues with matlab solve. I am using the following code to piecewise define my equation eq3 = m-['(heaviside(x)-heaviside(x-1))*x^3/6 ']; I am having issues with that code though, I also tried this method of piecewise definition eq1 = -m+... (0 ) .* (x < 0 ) + ... (-2*x.^2.*(x-3/2)) .* (0 <= x & x < 1 ) + ... (1+(x-1).^2 ) .* (1 <= x & x < 3/2) + ... (x-1/4 ) .* (x >= 3/2 ); –  user1265868 Mar 14 '12 at 9:08
    
@user1265868: as you can see, StackOverflow doesn't allow proper formatting in comments (which makes your code a mess to look at.) Could you please revise your question to include this new information? –  Li-aung Yip Mar 14 '12 at 10:11

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