999001
domain: N
Appears in sequences
- Cyclotomic polynomials at x=10.at n=17A019328
- Cyclotomic polynomials at x=-10.at n=9A020509
- Divisors of 10^9 + 1.at n=20A027901
- Numbers m such that m^2 is a concatenation of two consecutive decreasing numbers.at n=4A054216
- a(n) = n^6 - n^3 + 1.at n=10A060891
- Multipliers resulting from A068664.at n=12A068971
- Multipliers resulting from A068665.at n=11A068972
- Multipliers resulting from A068665.at n=14A068972
- Multipliers resulting from A068665.at n=15A068972
- Multipliers resulting from A068667.at n=9A068974
- a(n) = A083147(n+1)/A083147(n).at n=10A083148
- a(n) = A083153(n+1)/A083153(n).at n=9A083154
- a(n) = A083155(n+1)/A083155(n).at n=9A083156
- a(n) = A082780(n+1)/A082780(n).at n=5A088775
- a(n)=A082781(n+1)/A082781(n).at n=5A088776
- a(n)=A082783(n+1)/A082783(n).at n=5A088778
- a(n) = A088780(n+1)/A088780(n).at n=5A088779
- Legendre-binomial transform of 10^n for p=3.at n=6A117611
- a(n) = 1 - 10^n + 100^n.at n=3A168624
- Primitive cofactor of n-th repunit A002275(n).at n=17A204847