I'm looking to take a linear equation, such as

0.4x + 0.2y + 0.4z = 1

where each coefficient is non-negative. Then, I want to tweak one variable by ± 0.1 (easy enough). The problem is that the equation will now be unbalanced in that 1.1 != 1. Does anyone have a simple method of adjusting the other coefficients so that these equations be balanced.

0.4x + 0.2y + 0.4z = 1 0.5x + 0.15y + 0.35z = 1

It is important that each coefficient is adjusted by a minimal amount (so that the entire unbalance of 0.1 is not dumped onto one coefficient), because I'm intending to use this function in a genetic algorithm and I need to keep the other variables pretty constant. Does anyone have any ideas (preferably in pseudo code)??

Thanks

`y`

and`z`

via`x`

. – Victor Sorokin Mar 19 '12 at 21:05`x`

,`y`

, and`z`

are your variables. When you change the value of a weight, you don't get an unbalanced equation, but just a different equation. For each equation, there are infinite possibilities of`(x, y, z)`

values that would "balance" the equality and all those points form a plane in 3D: you could plot them to understand what you are looking at. I doubt you will get much help here or on a math forum unless you reformulate your problem. Good luck. – flodel Mar 20 '12 at 11:27