• Crul@lemm.ee
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    1 year ago

    Doesn’t it depends on whether we are talking about real or integer numbers?

    EDIT: I think it also works with p-adic numbers.

    • Moobythegoldensock@lemm.ee
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      1 year ago

      No. In the set of real numbers it is still very possible to randomly select a number that can be written with finite digits.

      • lntl
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        1 year ago

        op is right, infinity is larger than you’re imagining

        • Moobythegoldensock@lemm.ee
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          1 year ago

          OP is wrong. A truly random real number does have a much higher probability of being an irrational number or repeating rational number, but it is certainly not the case that a truly random number “will be” one of these two as terminating rational numbers are still possible to select.

          • lntl
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            1 year ago

            There an infinite number of numbers that have infinite length and are not irrational or repeating. Infinity is larger than youre imagining.

            • Moobythegoldensock@lemm.ee
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              1 year ago

              Are you referring to arbitrarily large numbers? Still essentially the same as decimals in the other direction.

              Do you have a mathematical proof for the OP’s claim that a truly random number must have infinite digits?

              • lntl
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                1 year ago

                you’re claiming OP is wrong, you need the proof homie

                • Moobythegoldensock@lemm.ee
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                  1 year ago

                  OP actually has the burden to prove their own claim, but here you go:

                  Suppose we create an algorithm to generate a random number, such that:

                  • The first digit is the ones
                  • The second digit is the tenths
                  • The third digit is the tens

                  And so on. For example, if we generated the sequence 1, 2, 3, 4, 5, 6 it would represent the number 531.246.

                  For a number to be non-infinite, there must be at some point be a digit where all digits after it generate a 0.

                  For all numbers in our sequence, the probability of generating a 0 is 1/10: there is no point at which we cannot generate a 0. Furthermore, after the first 0 is generated at a, the odds of a+1 being 0 are also 1/10, as are the odds of a+2, a+3, and a+n. So we cannot identify a b, such that entry a+b must be >0, since the odds of any given a+b generating 0 are also 1/10.

                  Based on this, we can use induction to show that it is possible to generate a truly random number that is a terminating rational number, and indeed it is possible to show this for any specific number as well. For example, the number 2 can be generated by simply rolling “2, 0, 0, 0, 0, …” and there is no nth digit in the sequence that cannot be generated at 0, since the odds of any given n being 0 are still 1/10.

                  • lntl
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                    1 year ago

                    For a number to be non-infinite, there must be at some point be a digit where all digits after it generate a 0.

                    For all numbers in our sequence, the probability of generating a 0 is 1/10: there is no point at which we cannot generate a 0. Furthermore, after the first 0 is generated at a, the odds of a+1 being 0 are also 1/10, as are the odds of a+2, a+3, and a+n. So we cannot identify a b, such that entry a+b must be >0, since the odds of any given a+b generating 0 are also 1/10.

                    the odds of randomly selecting 0 exactly an infinite number of times is exactly zero which is why OP is right

                    Probability of a=0 is (1/10)

                    • Pa = (1/10)
                    • Pb = (1/10)

                    Probability of both being 0:

                    • Pa AND Pb =(1/10)*(1/10)

                    then for n 0s

                    Pn = (1/10)^n

                    as n -> inf, Pn -> 0

                    put another way, (1/10)^inf = 0