19952
domain: N
Appears in sequences
- Numbers k such that k divides the (left) concatenation of all numbers <= k written in base 3 (most significant digit on right and removing all least significant zeros before concatenation).at n=6A029520
- Multiplicity of highest weight (or singular) vectors associated with character chi_93 of Monster module.at n=38A034481
- Base 7 digits are, in order, the first n terms of the periodic sequence with initial period 1,1,2.at n=5A037532
- Maximum of |det(A)| where A is an n X n circulant (0,1) matrix over the integers.at n=13A086432
- a(n) = 997*n + 1009.at n=19A100776
- McKay-Thompson series of class 36g for the Monster group.at n=45A103262
- Twice 13-gonal numbers: a(n) = n*(11*n - 9).at n=43A152997
- Triangle of coefficients of polynomials u(n,x) jointly generated with A209776; see the Formula section.at n=51A209775
- Number of (n+1) X (3+1) 0..5 arrays with every 2 X 2 subblock having its diagonal sum differing from its antidiagonal sum by 5, with no adjacent elements equal (constant-stress tilted 1 X 1 tilings).at n=4A235181
- Number of (n+1) X (5+1) 0..5 arrays with every 2 X 2 subblock having its diagonal sum differing from its antidiagonal sum by 5, with no adjacent elements equal (constant-stress tilted 1 X 1 tilings).at n=2A235183
- T(n,k) is the number of (n+1) X (k+1) 0..5 arrays with every 2 X 2 subblock having its diagonal sum differing from its antidiagonal sum by 5, with no adjacent elements equal (constant-stress tilted 1 X 1 tilings).at n=23A235186
- T(n,k) is the number of (n+1) X (k+1) 0..5 arrays with every 2 X 2 subblock having its diagonal sum differing from its antidiagonal sum by 5, with no adjacent elements equal (constant-stress tilted 1 X 1 tilings).at n=25A235186
- a(n) is the index of the first occurrence of the Euclidean distance prime(n) from a point on a square spiral to its starting point at 1.at n=19A336335
- a(n) is the number of integers that can be represented in a 7-segment display by using only n segments (version A006942).at n=20A350437
- Consecutive states of the linear congruential pseudo-random number generator 254*s mod (2^16+1) when started at s=1.at n=8A384934