Message from @Fully Buckminstered
Discord ID: 669758171920728073
endless supply of feet tho
fake feet
đ đ đ
đŠ” đŠ”
<:tucker:587843675413807106>
<:vargsmug:639999539192922123>
Maximize rate of slaughter
multitrack drifting
While its true both have the same sum, the top one takes longer
When in doubt
Those infinities are the same size I believe yes
Itâs been a while since I did math with Hebrew alphabet
Another sign pure math is for jews
They claim theyâre different infinities but higher level alephs are infinite sets of infinity
Lol
Itâs pretty trivially easy to prove there are different infinities
Cantors diagonalization
Those two particular infinities arenât different
I agree real numbers are strange and probably donât correspond to anything that truly exists theyâre just a useful concept
Real numbers themselves can only exist as the limit of an infinite Cauchy series
As I was saying those two arenât different
Youâre intellectually masturbating right now
You donât think integers and real numbers have different cardinality?
đŠ
Theyâre the same set of aleph
No
To be a higher order youâd need an infinite set of infinities
Yes
This is a classic problem
So classic even Iâve heard of it đ
That doesnât even link, but it doesnât matter because theyâre not even infinitely filled in with people
So itâs non analogous
How does the preview work if it doesnât link lmao
Click it
In set theory, Cantor's diagonal argument, also called the diagonalisation argument, the diagonal slash argument or the diagonal method, was published in 1891 by Georg Cantor as a mathematical proof that there are infinite sets which cannot be put into one-to-one correspondence with the infinite set of natural numbers.[1][2]:20â[3] Such sets are now known as uncountable sets, and the size of infinite sets is now treated by the theory of cardinal numbers which Cantor began.
Read the article I just linked