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2584 is the number following 2583 and preceding 2585[1].
Properties[]
- Its factors are 1, 2, 4, 8, 17, 19, 34, 38, 68, 76, 136, 152, 323, 646, 1292 and 2584, making it a composite number.[2][3][4]
- 2584 is an even number[5][6] .
- 2584 is a happy number.[7][8]
Approximations[]
| Notation
|
Lower bound
|
Upper bound
|
| Up-arrow notation
|
51 ↑ 2
|
| Scientific notation
|
2.584 x 103
|
2.585 x 103
|
| Slow-growing hierarchy
|
\(g_{\omega^{\omega}}(4)\)
|
\(g_{\omega^{\omega}}(5)\)
|
| Copy notation
|
25[2]
|
26[2]
|
| Chained arrow notation
|
51 → 2
|
| Bowers' Exploding Array Function/Bird's array notation
|
{51,2}
|
|
| Fast-growing hierarchy
|
f2(8)
|
f2(9)
|
| Hardy hierarchy
|
Hω(1292)
|
Hω(1292)
|
| Middle-growing hierarchy
|
m(ω,11)
|
m(ω,12)
|
| Hyper-E notation
|
E3.4123
|
| Hyper-E notation (non-10 base)
|
\(E[51]2\)
|
| Hyperfactorial array notation
|
6!
|
7!
|
| X-Sequence Hyper-Exponential Notation
|
51{1}2
|
|
| Steinhaus-Moser Notation
|
4[3]
|
5[3]
|
| PlantStar's Debut Notation
|
[2]
|
[3]
|
| H* function
|
H(0.1)
|
H(0.2)
|
| Bashicu matrix system with respect to version 4
|
(0)[50]
|
(0)[51]
|
| m(n) map
|
m(1)(4)
|
m(1)(5)
|
| s(n) map
|
\(s(1)(\lambda x . x+1)(1291)\)
|
\(s(1)(\lambda x . x+1)(1292)\)
|
Sources[]
