• Gobbel2000@programming.dev
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            4 days ago

            Writing the same number a different way does not make it rational. There are no two natural numbers p and q so that p/q = 1 base pi.

          • very_well_lost@lemmy.world
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            4 days ago

            Even in base π, π is still considered an irrational number; using an irrational based doesn’t change the fundamental identity of whole numbers or irrational numbers, it just changes the way we write them.

          • wewbull@feddit.uk
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            3 days ago

            1 is always 1. It’s 1 × b⁰ where b is the base. Anything raised to the zeroth power is 1.

            10 is the base. 1 × b¹ + 0 × b⁰

          • mexicancartel@lemmy.dbzer0.com
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            3 days ago

            That doesn’t make it rational but simply makes it writable in 2 digits(10)

            Also you should have 3.1415… “number of characters” in that base… The base becoming irrational will make the number irrational

      • Kinda. Technicaly no since an irrational number is a number that cannot be defined as a ratio of 2 existing rational numbers. Any number that can be represented in any rational base can by definition be represented as a ratio of somthing/base^n. This ignore the case of an irrational base but its practically useless cos any rational and most other irrational numbers will be irrational.

        What u think ur trying to say is that some numbers cannot be represented in one base but can in another for example 1/3 can be represented as a decimal in base 3 but cannot jn base 10 ie u get 0.333(3 repeating forever).

        Tieing back to floating point which uses base 2 u end up with simmillar issues with base10 base2 conversions hence most of the errors with floating point errors (yes at very large and very small numbers u lose accuracy but in practice most errors arise from base convention).