101011

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101011 < 101010 | 101012 >
All Numbers
101000	101001	101002	101003	101004	101005	101006	101007	101008	101009
101010	101011	101012	101013	101014	101015	101016	101017	101018	101019
101020	101021	101022	101023	101024	101025	101026	101027	101028	101029
101030	101031	101032	101033	101034	101035	101036	101037	101038	101039
101040	101041	101042	101043	101044	101045	101046	101047	101048	101049
101050	101051	101052	101053	101054	101055	101056	101057	101058	101059
101060	101061	101062	101063	101064	101065	101066	101067	101068	101069
101070	101071	101072	101073	101074	101075	101076	101077	101078	101079
101080	101081	101082	101083	101084	101085	101086	101087	101088	101089
101090	101091	101092	101093	101094	101095	101096	101097	101098	101099

101011 is the number following 101010 and preceding 101012.

Properties

• Its factors are 1, 83, 1217 and 101011, making it a composite number.^[1][2][3] It is also a squarefree number.^[4]
• 101011 is an odd number^[5][6] .
• 101011 is an unhappy number.^[7][8]
  

• 101011 is deficient.^[9]
  
• Its prime factorization is 83¹ × 1217¹.
  

Approximations

Notation	Lower bound	Upper bound
Up-arrow notation	318 ↑ 2
Scientific notation	1.01 x 105
Slow-growing hierarchy	\(g_{\omega^{\omega}}(6)\)	\(g_{\omega^{\omega}}(7)\)
Chained arrow notation	318 → 2
Bowers' Exploding Array Function/Bird's array notation	{318,2}
Hardy hierarchy	Hω(50505)	Hω(50506)
Middle-growing hierarchy	m(ω,16)
Hyper-E notation	E5.0044
Hyper-E notation (non-10 base)	\(E[318]2\)
X-Sequence Hyper-Exponential Notation	318{1}2
PlantStar's Debut Notation	[2]	[3]
H* function	H(0.6)	H(0.7)
Bashicu matrix system with respect to version 4	(0)[317]	(0)[318]

Sources

1. OEIS A002808 - Composite numbers
2. Wolfram Alpha Is 101011 composite?
3. Wolfram Alpha 101011's factors
4. OEIS A005117 - Squarefree numbers
5. OEIS A005408 - Odd numbers
6. Wolfram Alpha Is 101011 odd?
7. Wolfram Alpha Unhappy Numbers
8. OEIS A031177 - Unhappy Numbers
9. OEIS A005100 - Deficient numbers