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This seems like an incredibly simple and silly question to ask, but everything I've found about it has been too complex for me to understand.

I have these two very basic simultaneous equations:

X = 2x + 2z
Y = z - x

Given that I know both X and Y, how would I go about finding x and z? It's very easy to do it by hand, but I have no idea how this would be done in code.

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What language are you planning on using, some languages are more suited to this sort of task than others. –  Jon Taylor Jul 23 '12 at 8:46
How do you do it by hand? Can you try to write it down as generically as possible? –  assylias Jul 23 '12 at 8:46
Do you need to solve arbitrary linear equations? –  default locale Jul 23 '12 at 8:48
@John Taylor: Python. –  Nicolas Jul 23 '12 at 8:51
By hand and by code are two very different things when it comes to simultaneous equations, or atleast to do it efficiently. I would honestly suggest using a language such as R or Matlab to solve this kind of thing because they are specifically designed for it. If not then you could just try progrmming a substitution and elimination way of doing it. –  Jon Taylor Jul 23 '12 at 8:51

4 Answers 4

up vote 11 down vote accepted

This seems like an incredibly simple and silly question to ask

Not at all. This is a very good question, and it has unfortunately a complex answer. Let's solve

a * x + b * y = u
c * x + d * y = v

I stick to the 2x2 case here. More complex cases will require you to use a library.

The first thing to note is that Cramer formulas are not good to use. When you compute the determinant

a * d - b * c

as soon as you have a * d ~ b * c, then you have catastrophic cancellation. This case is typical, and you must guard against it.

The best tradeoff between simplicity / stability is partial pivoting. Suppose that |a| > |c|. Then the system is equivalent to

a * c/a * x + bc/a * y = uc/a
      c * x +    d * y = v 

which is

cx + bc/a * y = uc/a
cx +       dy = v  

and now, substracting the first to the second yields

cx +       bc/a * y = uc/a
     (d - bc/a) * y = v - uc/a

which is now straightforward to solve: y = (v - uc/a) / (d - bc/a) and x = (uc/a - bc/a * y) / c. Computing d - bc/a is stabler than ad - bc, because we divide by the biggest number (it is not very obvious, but it holds -- do the computation with very close coefficients, you'll see why it works).

Now, if |c| > |a|, you just swap the rows and proceed similarly.

In code (please check the Python syntax):

def solve(a, b, c, d, u, v):
    if abs(a) > abs(c):
         f = u * c / a
         g = b * c / a
         y = (v - f) / (d - g)
         return ((f - g * y) / c, y)
         f = v * a / c
         g = d * a / c
         x = (u - f) / (b - g)
         return (x, (f - g * x) / a)

You can use full pivoting (requires you to swap x and y so that the first division is always by the largest coefficient), but this is more cumbersome to write, and almost never required for the 2x2 case.

For the n x n case, all the pivoting stuff is encapsulated into the LU decomposition, and you should use a library for this.

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Thanks for the enormous help, but I will admit that much of the math in there is out of my scope of understanding. I did actually manage to solve it by hand: 'x = (X - 2Y)/4' and 'z = Y + (X - 2Y)/4' –  Nicolas Jul 23 '12 at 11:13

@Alexandre , you missed one condition.. Here is the final code

void SolveLinearEquations (float a,float b,float c,float d,float u,float v, float &x, float &y)
float f;
float g;
if (abs(a) > abs(c))
     f = u * c / a;
     g = b * c / a;
     y = (v - f) / (d - g);
     if(c != 0)
        x = (f - g * y) / c;
        x = (u - b * y)/a;
    f = v * a / c;
     g = d * a / c;
     x = (u - f) / (b - g);
     if (a != 0)
        y = (f - g * x) / a ;
        y = (v - d * x)/c;
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(1)  ax + by = c    
(2)  dx + dy = f

(3)1*d     adx + bdy  = cd
(4)2*b     abx + bdy  = fb

(3)-(4)   adx - abx  = cd - fb

          x(ad-ab) = cd - fb

          x = (c*d - f*b)/(a*d-a*b) //use this equation for x

ax + by = c
     by = c - ax

     y = (c - a*x)/b    //use this equation for y
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The following might be better for most people: –  Lewiss Jun 16 '13 at 14:01

The following function might be useful for some:

function solve(s1,s2){    //only works if coefficients > 0

   str=s1 + " " +s2
   str=str.replace(/[^0123456789.-]/g, ' ') //eliminate letters
   str=str.replace( /\s\s+/g, ' ' )         //no double spaces

   var n=str.split(" ");            //put into an array
   var a=0,b=1,c=2,d=3,e=4,f=5      //see what were doing
   var x = ( n[c]*n[e] -n[b]*n[f])/(n[a]*n[e] - n[b]*n[d])
   var y= (n[c]-n[a]*x)/n[b]

   return({x:x, y:y})

To use:

result=solve("12x +  2y =32", "9x -5y=55")
alert (result.x+" ----- "+result.y)
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