… the position of which cannot be named by positional naming. This means that while some operations (changes by addition or subtraction) have no positional name, and as such can only be represented by a function. Ergo, there exists no square root of two, only the function.
Source date (UTC): 2018-03-14 17:28:07 UTC
Original post: https://twitter.com/i/web/status/973974064791478274
Reply addressees: @ProfessorLarp @GolfNorman
Replying to: https://twitter.com/i/web/status/973973981341593602
IN REPLY TO:
Unknown author
@ProfessorLarp @GolfNorman … And because they have only one property of position, they have one unavoidable deductive property: ratio to the referent. … Now, some operations yield another positional name (a ratio), some yield a partial name (a fraction), and some yield an indivisible ratio ….
Original post: https://x.com/i/web/status/973973981341593602
IN REPLY TO:
@curtdoolittle
@ProfessorLarp @GolfNorman … And because they have only one property of position, they have one unavoidable deductive property: ratio to the referent. … Now, some operations yield another positional name (a ratio), some yield a partial name (a fraction), and some yield an indivisible ratio ….
Original post: https://x.com/i/web/status/973973981341593602
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