22624
domain: N
Appears in sequences
- Nearest integer to Gamma(n + 4/5)/Gamma(4/5).at n=8A020037
- a(n) = floor( Gamma(n + 4/5)/Gamma(4/5) ).at n=8A020082
- Numbers k such that the continued fraction for sqrt(k) has even period and if the last term of the periodic part is deleted the central term is 75.at n=34A031573
- Numbers whose set of base-12 digits is {1,4}.at n=31A032824
- Number of flips between the d-dimensional tilings of the unary zonotope Z(D,d). Here d=3 and D varies.at n=4A060608
- Number of flips between the d-dimensional tilings of the unary zonotope Z(D,d). Here the codimension D-d is equal to 4 and d varies.at n=3A060622
- Triangle T(n,k) (0 <= k <= n) giving number of edges in the "flip graph" whose nodes are tilings of the k-dimensional zonotope constructed from n vectors.at n=31A060638
- Starts for strings of at least five consecutive nonsquarefree numbers.at n=12A078144
- Series expansion for end-to-end distance of self-avoiding walks on the triangular lattice.at n=5A121791
- Number of partitions of n in which each even part has odd multiplicity.at n=41A130126
- a(n) = 686*n - 14.at n=32A157363
- Number of collinear point triples in an n X n .. X n 5-dimensional cubical grid.at n=3A178275
- Number of collinear point triples in a 4 X 4 X 4 X... n-dimensional cubic grid.at n=5A178294
- Number of (n+1) X 3 0..3 arrays with every 2 X 3 or 3 X 2 subblock having exactly two counterclockwise and two clockwise edge increases.at n=2A206112
- Number of (n+1) X 4 0..3 arrays with every 2 X 3 or 3 X 2 subblock having exactly two counterclockwise and two clockwise edge increases.at n=1A206113
- T(n,k) = number of (n+1) X (k+1) 0..3 arrays with every 2 X 3 or 3 X 2 subblock having exactly two counterclockwise and two clockwise edge increases.at n=7A206118
- T(n,k) = number of (n+1) X (k+1) 0..3 arrays with every 2 X 3 or 3 X 2 subblock having exactly two counterclockwise and two clockwise edge increases.at n=8A206118
- Number of (n+1)X(5+1) 0..2 arrays with the upper median of every 2X2 subblock differing from its horizontal and vertical neighbors by exactly one.at n=9A237634
- Numbers that are representable in at least two ways as sums of four distinct nonvanishing cubes.at n=7A259060
- Earliest start of a run of n numbers divisible by a cube larger than one.at n=3A271443