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Ultrifinity or Ђ is equal to ℘{x^℘}℘, where ℘ is gigifinity.

Ultrifinity (Ђ) is a paradoxical number created by Goodels and Spelpotatis. Ultrifinity' main definiton is "Ultrifinity > 0; Ultrifinity + 1 = 0." This can be expressed as "the looping point" in number lines. Ultrifinity Implies that the number line is circular and loops back. Of course, this is not the end, because each loop allows you to go higher. Mathis R.V calls this number Ultrifinity

Relations[]

  • Ultrifinity is eligible to be possible in finite number lines.
  • "0 - 1 = Ultrifinity" and "Ultrifinity + 1 = 0" would be equal in non-negative number lines.
  • There are multiple kinds of Ultrifinity, where it comes with multiple kinds of zeros.
  • There is a Ultrifinity number in 16-bit computing, which is 32,767. Adding 32,767 would loop back to -32,768.
  • If you multiply this number by itself, you will get Truifinity.

Looping and Notations[]

We can define a loop function:

La[b] = The ath loop of b. This means that L1[0] = Ђ+1. This allows us to do L1[2] and eventually we will reach L1[Ђ], L1Ђ[+1] = L2[0] which is the second loop of Ultrifinity, each loop makes the limit (Ultrifinity) a little higher (a Ultrifiniteth or 1/Ђ higher each time), so Ђ < L1[Ђ]. Eventually we reach LЂ[Ђ] which is no problem. We can even do LLЂ[Ђ][Ђ] and so on.

TN(1) = Ђ. Then, TN(2) = LLL...(0)...(0) with an infinite nesting of Ls. TN(3) = TN(2)+1TN(2)+1TN(2)+1TN(2)+1... with an infinite nesting. TN(n+1) = TN(n)+1TN(n)+1TN(n)+1TN(n)+1...

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