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by pfortuny
1753 days ago
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“Cutting” it is certainly not: none of those sets is given by the zeroes of a continuous function (they would be measurable, and they cannot be). So the paradox breaks down when you start to realize that you are not CUTTING but “choosing some points” and rearranging them. The fact that this rearrangement can be done with Euclidean moves is the surprise. |
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