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Is The Answer 42?
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An infinite number of points A are placed at random on an infinitely long line. A second infinity of points B are also placed at random on the line. How many B's coincide with one or more A's on average?
Answers
My gut feeling is that the answer should be zero but I am sure there's a better way to answer this than relying on points/line = countable/ uncountable -> 0
10:51 Sat 06th Jun 2020
It's rarely so neat as all that, especially when you have to deal with the issue of countable points on an uncountable line. An example of the paradoxes involved would be to consider the following problem: take a perfect circle of radius 1 metre, start at the top, and then keep walking around its circumference in steps of exactly 1 metre. No matter how many steps you take you'll never run out of new places to visit (assuming your shoe size is 0), or to put it another way you'll never be standing in exactly the same place twice.
Depending on how you choose points A and B in this case, there is a halfway decent change that you'll never pick the same point twice -- indeed, it's virtually certain. So the probability that no points overlap is, at the very least, far greater than the probability that they all overlap.
Depending on how you choose points A and B in this case, there is a halfway decent change that you'll never pick the same point twice -- indeed, it's virtually certain. So the probability that no points overlap is, at the very least, far greater than the probability that they all overlap.