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I have been tasked with figuring out a state space for a problem based on the area of a rectangle. It seems that I have made my state space far too large and need some feedback.
So far I have an area that has a value fo 600 for a y axis and 300 for an x axis. I determined the number of points to be

(600 x 300) ! or 180,000!

Therefore my robot would need to inspect this many potential spaces, before I apply an algorithm.

This number seems quite high and if that is the case it would make my problem unsolveable before I die especially if I implement the algorithm incorrectly. Any help would be greatly appreciated especially if my math is off in determining the number of points.

EDIT I was under the impression to see how many pairs of points you would have to take the cartesian product of the total available points. Which in turn would be (600x300)! . If this is incorrect please let me know.

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@Henk Holterman As the ultimate answer is 42, I guess a (6x7)! is a better answer :) –  belisarius Sep 12 '10 at 16:04
i cant use 6x3 as there are 600 x 300 possible points. I suppose the better question is what could I apply to show that it scaled properly? –  Woot4Moo Sep 12 '10 at 16:12
@Woot4Moo: If there are 600 X 300 possible points the number of points is unmistakably 180000. Unless you give us some more info about the problem, there's really not much we can do. –  Oren A Sep 12 '10 at 16:16
Why is 180000 infeasible? Robots are immortal, so it doesn't matter that you'll be dead long before it figures out the answer. The robot will eventually figure it out, and science will stagger forward! –  Cerin Sep 12 '10 at 19:41
@MAK I think it was a miscommunication on my part, I did mean pair. Thanks for your clarifications –  Woot4Moo Sep 13 '10 at 15:09
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1 Answer

up vote 5 down vote accepted

First of all, the number of "points" (as defined in mathematics - the only relevant definition) in a rectangle of any size (non-zero area) is infinity. Why? Because a point does not necessarily have to have integer coordinates - there can be a point at (0,0), (0,0.1), (0.001), (0,0.0001) and so on. I think what you mean by points in your question is that all points must have integer coordinates (i.e. lattice points), or alternately, "cells" in a rectangular grid (like cells on a chess board). Please let me know if I misunderstood your question.

There are 600 rows and 300 coloumns. This means that there are 600 * 300 = 180,000 different cells. It follows that there are nCr(180,000,2) = 16,199,910,000 unique pairs in the grid. I am assuming you consider the pair ((1,1),(2,2)) and ((2,2),(1,1)) equivalent. Otherwise, there are 180,000*180,000 = 32,400,000,000 pairs.

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I guess (!) means (factorial) in the question. –  belisarius Sep 12 '10 at 21:03
@belisarius: I thought so too. Doesn't make sense as punctuation :). –  MAK Sep 12 '10 at 21:04
@MAK sorry if it was trivial. I just don't understand what is a "state" for the OP. –  belisarius Sep 12 '10 at 21:11
@belisarius: From what I understand of the question, the state space is the set of pairs of cells in the grid. Each state is a pair of the form ((x1,y1),(x2,y2)). –  MAK Sep 12 '10 at 21:23
@MAK: That is what I read too, but how is such a vector/move a 'State' ? –  Henk Holterman Sep 12 '10 at 21:41
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