How about ANY FINITE SEQUENCE AT ALL?

    • ProfessorScience@lemmy.world
      link
      fedilink
      English
      arrow-up
      14
      ·
      2 days ago

      Rare in this context is a question of density. There are infinitely many integers within the real numbers, for example, but there are far more non-integers than integers. So integers are more rare within the real.

          • Urist@lemmy.ml
            link
            fedilink
            English
            arrow-up
            5
            ·
            2 days ago

            They should look up the classic example of rationals in the real numbers. Their statement could hardly be more wrong.

              • Urist@lemmy.ml
                link
                fedilink
                English
                arrow-up
                7
                ·
                2 days ago

                I most assuredly am talking about your false statement regarding density.

                  • Urist@lemmy.ml
                    link
                    fedilink
                    English
                    arrow-up
                    8
                    ·
                    2 days ago

                    Weird to flex when you have nothing to show off. Let me show you how you do it, buddy: I am a mathematician. Infinity, density and cardinality of sets are not mysterious to me because I read a lot of books. If you read a few then you might discover your very cool comment above was actually not so cool and true.

    • Sas [she/her]@beehaw.org
      link
      fedilink
      arrow-up
      1
      ·
      2 days ago

      Yes, compared to the infinitely more non exceptions. For each infinite number that doesn’t contain the digit 9 you have an infinite amount of numbers that can be mapped to that by removing all the 9s. For example 3.99345 and 3.34999995 both map to 3.345. In the other direction it doesn’t work that way.