Sikachu said:
I don't really care about your pop. philosophy, but your argument about whether things that are infinite are measurable should have involved a comment about numbers. They are infinite in bother directions and you can still take a measurement from any one point to any other. Basically you're right and he's wrong.
No, actually it didn't need it. To be infinite all that is required is that it be without bound. Strictly speaking in terms of mathematics, infinity is defined by set theory and you'll find that infinity is difficult to precisely define. Importantly, if you exmaine even the basic notion related to set theory (or just google infinity and click around for a few hours) you'll find that there are many, many kinds of infinity. In this case however, set theory is not actually necessary to examine the problem - simpler mathematics will suffice.
Assume for a moment that you have a point a and b. Rather than placing them in space (which needlessly complicates things) we will examine the problem in one dimension (that is, on a number line). Every second (or other arbitrary measure of time) point A moves in the negative direction (or, more precisely, has it's value decreased) by a constant value (it doesn't matter what this value is) and point b moves in the positive direction (has it's value increased) by a constant value. This is the absolute simplest interpretation of the scenario that was given.
The distance between the two points can be calculated simply enough:
An = x0 + k*a*n + j*b*n
Where An is the distance between the points a and b, x0 is the initial distance between the two points, k and j are the arbitrary constant velocity with which the points are moving and n measures time.
At any finite value of n (that is, with finite time) the result of this equation is a real number. Since we cannot actually do perform math using infinity directly, if one examines the behavior of this equation as n approaches infinity (the mathematical concept of a limit), you will find that the result trends towards infinity.
The end conclusion is simple enough. At any given MOMENT in time, the distance between the two points is finite, predictbable and measurable. This is because this scenario assumes our two points are moving apart at a finite speed. Given infinite time the distance between the two points is likewise infinite because there is no limiting factor to this equation.
There are plenty of examples where infinite time does not yield infinite distance. There is a classic math problem that stumps many. In one step you cover one unit of distance. In your second you cover half the distance of the first step. In the third you cover 1/4 the distance of the first step. If this trend continues which each step covering half the distance of the previous step, how far can you travel given infinite time?
The answer is simple enough - you will travel two units.
