• xavier666@lemm.ee
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    1 year ago

    Assume there is a Michael, who on race day was mysteriously cloned 4 times in a perfect manner such that biologically and psychologically they are a perfect copy to the original. So there are now 4 Michaels plus one proto Michael.

    Now they are put to a 100m race on a standard race track. Assume that the universe has normal randomness in wind and temperature variation. What is the probability that proto Michael wins the race?

    • wumpus@latte.isnot.coffee
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      1 year ago

      Still not enough info. The race is legally a tie if the times are within a certain (I think a millisecond) interval, and with runners this similar in ability, the probability that nobody wins is non-zero.

      • xavier666@lemm.ee
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        1 year ago

        The randomness in the air molecules are enough to case minor variation in finish timings. I think I should add that the observer can see the finish line with an accuracy of one Planck length and that observation uses a mysterious method which avoids Heisenburgs uncertainty principle. That should make the question well-defined 😆

    • MonkderZweite@feddit.ch
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      1 year ago

      10%. With exact clones it would be 0%, a draw. But with random influences, either of them has a 50% chance.

      And /s if i’m wrong.