10320 is the number following 10319 and preceding 10321.
Properties[]
- Its factors are 1, 2, 3, 4, 5, 6, 8, 10, 12, 15, 16, 20, 24, 30, 40, 43, 48, 60, 80, 86, 120, 129, 172, 215, 240, 258, 344, 430, 516, 645, 688, 860, 1032, 1290, 1720, 2064, 2580, 3440, 5160 and 10320, making it a composite number.[1][2][3]
- 10320 is an even number[4][5] .
- 10320 is an unhappy number.[6][7]
- 10320 is abundant.[8]
- Its prime factorization is 24 × 31 × 51 × 431.
Approximations[]
| Notation | Lower bound | Upper bound | |
|---|---|---|---|
| Up-arrow notation | 102 ↑ 2 | ||
| Scientific notation | 1.032 x 104 | 1.033 x 104 | |
| Slow-growing hierarchy | \(g_{\omega^{\omega}}(5)\) | \(g_{\omega^{\omega}}(6)\) | |
| Copy notation | 9[4] | 1[5] | |
| Chained arrow notation | 102 → 2 | ||
| Bowers' Exploding Array Function/Bird's array notation | {102,2} | ||
| Fast-growing hierarchy | f2(10) | f2(11) | |
| Hardy hierarchy | Hω(5160) | Hω(5160) | |
| Middle-growing hierarchy | m(ω,13) | m(ω,14) | |
| Hyper-E notation | E4.0137 | ||
| Hyper-E notation (non-10 base) | \(E[102]2\) | ||
| Hyperfactorial array notation | 7! | 8! | |
| X-Sequence Hyper-Exponential Notation | 102{1}2 | ||
| Steinhaus-Moser Notation | 5[3] | 6[3] | |
| PlantStar's Debut Notation | [2] | [3] | |
| H* function | H(0.3) | H(0.4) | |
| Bashicu matrix system with respect to version 4 | (0)[101] | (0)[102] | |
| m(n) map | m(1)(5) | m(1)(6) | |
| s(n) map | \(s(1)(\lambda x . x+1)(5159)\) | \(s(1)(\lambda x . x+1)(5160)\) | |
Sources[]
- ↑ OEIS A002808 - Composite numbers
- ↑ Wolfram Alpha Is 10320 composite?
- ↑ Wolfram Alpha 10320's factors
- ↑ OEIS A005843 - Even numbers
- ↑ Wolfram Alpha Is 10320 even?
- ↑ Wolfram Alpha Unhappy Numbers
- ↑ OEIS A031177 - Unhappy Numbers
- ↑ OEIS A005101 - Abundant numbers