The problem posers are saying that if:

sqrt((your_answer - their_answer)^2) < 1*10^-6

Then you are "correct"

It is very problematic to compare floating point values to be exact. This is because of rounding in a limited precision machine (i.e. some math answers cannot be represented in a finite number of digits, such as 1.0/3.0).

Many solutions to problems performed on a computer are iterative. This means, you start with a first guess, and calculate how much to change your guess. You then repeat this, calculating how much to change your guess. After you repeat this procedure, the amount you change your guess will get smaller and smaller (it will converge). Once the change is smaller than some specified amount, you can consider your answer to have converged and you now have a "correct" answer. Gradient decent algorithms are a classic example of this technique. I haven't looked closely at the links provided, but perhaps to obtain the answer you need an iterative solution, which in this case you should use 1.0 * 10^-6 as your limit to test if your solution has converged.

http://en.wikipedia.org/wiki/Gradient_descent

It appears that the links to the site you posted are problems that would lend them self to numerical methods:

http://en.wikipedia.org/wiki/Numerical_analysis

It seems like an interesting site with some challenging problems.