• UnderpantsWeevil@lemmy.world
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      5 个月前

      There’s a Real Analysis proof for it and everything.

      Basically boils down to

      • If 0.(9) != 1 then there must be some value between 0.(9) and 1.
      • We know such a number cannot exist, because for any given discrete value (say 0.999…9) there is a number (0.999…99) that is between that discrete value and 0.(9)
      • Therefore, no value exists between 0.(9) and 1.
      • So 0.(9) = 1
      • Kairos@lemmy.today
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        5 个月前

        Even simpler: 1 = 3 * 1/3

        1/3 =0.333333…

        1/3 + 1/3 + 1/3 = 0.99999999… = 1

        • UnderpantsWeevil@lemmy.world
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          5 个月前

          Even simpler

          0.99999999… = 1

          But you’re just restating the premise here. You haven’t proven the two are equal.

          1/3 =0.333333…

          This step

          1/3 + 1/3 + 1/3 = 0.99999999…

          And this step

          Aren’t well-defined. You’re relying on division short-hand rather than a real proof.

      • Swedneck@discuss.tchncs.de
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        5 个月前

        the explanation (not proof tbf) that actually satisfies my brain is that we’re dealing with infinite repeating digits here, which is what allows something that on the surface doesn’t make sense to actually be true.

        • UnderpantsWeevil@lemmy.world
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          5 个月前

          Infinite repeating digits produce what is understood as a Limit. And Limits are fundamental to proof-based mathematics, when your goal is to demonstrate an infinite sum or series has a finite total.