this post was submitted on 26 Feb 2024
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[–] Magnetar@feddit.de 15 points 8 months ago (3 children)

Call me when you found a way to encode transcendental numbers.

[–] ytg@feddit.ch 9 points 8 months ago* (last edited 8 months ago) (1 children)

Perhaps you can encode them as computation (i.e. a function of arbitrary precision)

[–] Magnetar@feddit.de 1 points 8 months ago

Hard to do as those functions are often limits and need infinite function applications. I'm telling you, math.PI is a finite lie!

[–] smeg@feddit.uk 6 points 8 months ago (2 children)

Do we even have a good way of encoding them in real life without computers?

[–] fossphi@lemm.ee 11 points 8 months ago (1 children)

Just think about them real hard

[–] Knock_Knock_Lemmy_In@lemmy.world 2 points 8 months ago

Here you go

[–] Chadus_Maximus@lemm.ee 4 points 8 months ago* (last edited 8 months ago) (1 children)

May I propose a dedicated circuit (analog because you can only ever approximate their value) that stores and returns transcendental/irrational numbers exclusively? We can just assume they're going to be whatever value we need whenever we need them.

[–] frezik@midwest.social 2 points 8 months ago (1 children)

Wouldn't noise in the circuit mean it'd only be reliable to certain level of precision, anyway?

[–] Chadus_Maximus@lemm.ee 1 points 8 months ago* (last edited 8 months ago) (1 children)

I mean, every irrational number used in computation is reliable to a certain level of precision. Just because the current (heh) methods aren't precise enough doesn't mean they'll never be.

[–] anton@lemmy.blahaj.zone 1 points 8 months ago

You can always increase the precision of a computation, analog signals are limited by quantum physics.