# how to solve an xor'd system of linear equations?

I have this system of equations

a⊕0⊕c⊕0⊕0⊕0=2
0⊕b⊕0⊕d⊕0⊕0=3

a⊕0⊕0⊕0⊕x⊕0=4
0⊕b⊕0⊕0⊕0⊕y=8

0⊕0⊕c⊕0⊕x⊕0=6
0⊕0⊕0⊕d⊕0⊕y=11

⊕ is XOR
when i solve this equations using Gaussian, following Denley Bihari's method here it gives me this:

1 0 1 0 0 0 = 2
0 1 0 1 0 0 = 3
0 0 1 0 1 0 = 6
0 0 0 1 0 1 = 11
0 0 0 0 0 0 = 0
0 0 0 0 0 0 = 0

a=5
b=10
c=7
d=9
x=1
y=2
(I had the constants values first then i formed the equations ofcourse)

so what's the proper way to do this? I've searched the web high and low!

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You might want to rather ask this on math.stackexchange.com –  Tom Carter Jul 19 '12 at 11:45

Your equations are dependent (as is also shown by the Gaussian elimination leading to all `0` rows), thus you have in fact fewer constraints than variables, therefore multiple solutions.

In this particular case, you have two groups of equations, one involving `a, c, x`, the other involving `b, d, y`. Removing the `0`s, we obtain

``````a ⊕ c     =  2
a     ⊕ x =  4
c ⊕ x =  6

b ⊕ d     =  3
b     ⊕ y =  8
d ⊕ y = 11
``````

and obviously the last of these three is obtained by XORing the first two in both groups (or, any of the three is obtained by XORing the other two in the group).

So you can pick `x` and `y` as parameters, assign arbitrary values to them and find

``````a =  4 ⊕ x
c =  6 ⊕ x
b =  8 ⊕ y
d = 11 ⊕ y
``````

You can use Gaussian elimination, that either yields a reduced form giving a unique solution (if the number of independent equations equals the number of involved variables), a reduced form with all-0 rows which allows to parametrize the space of all solutions, or a reduced form with a(t least) one row with all coefficients 0 but nonzero right hand side, in which case there are no solutions.

All other methods of solving will yield the same result.

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Thank you Daniel :) –  Salma Nafady Jul 19 '12 at 18:02

What are you solving for? It looks like you have six constants and six constant equations.

Solving equations involving only xor is very easy, in general.

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yes its exactly that, yet i cant solve it. I have edited the question to show my trials. –  Salma Nafady Jul 19 '12 at 14:31
@SalmaNafady: What are you solving for? It looks like it's already solved to me. –  Charles Jul 19 '12 at 14:33
its not, im only presenting the constants' values to show that it does has a solution –  Salma Nafady Jul 19 '12 at 14:37
So write the numbers in binary and count the number of 1s in each position. If it's odd, write 1, otherwise write 0. That should equal the right-hand side. –  Charles Jul 19 '12 at 14:53