229824
domain: N
Appears in sequences
- Quintuple factorial numbers: Product_{k = 0..n-1} (5*k + 4).at n=5A008546
- Triangle read by rows, the inverse Bell transform of n!*binomial(4,n) (without column 0).at n=15A011801
- a(n) = (11*n+5)*(n+4)*(n+3)*(n+2)*(n+1)/120.at n=17A056118
- Quintuple factorials, 5-factorials, n!!!!!, n!5.at n=24A085157
- Numbers whose set of base 8 digits is {0,7}.at n=36A097254
- Triangle read by rows: T(n, m) = number of painted forests on labeled vertex set [n] with m trees. Also number of painted forests with exactly n - m edges.at n=30A106834
- Binomial transform of A079260.at n=20A143980
- Partition number array, called M32(-4), related to A011801(n,m)= |S2(-4;n,m)| ( generalized Stirling triangle).at n=18A144267
- Partition number array, called M32hat(-4)= 'M32(-4)/M3'= 'A144267/A036040', related to A011801(n,m)= |S2(-4;n,m)| (generalized Stirling triangle).at n=18A144284
- Partition number array, called M32hat(-4)= 'M32(-4)/M3'= 'A144267/A036040', related to A011801(n,m)= |S2(-4;n,m)| (generalized Stirling triangle).at n=30A144284
- Partition number array, called M32hat(-4)= 'M32(-4)/M3'= 'A144267/A036040', related to A011801(n,m)= |S2(-4;n,m)| (generalized Stirling triangle).at n=49A144284
- Lower triangular array called S2hat(-4) related to partition number array A144284.at n=15A144285
- Triangle sequence: T(n, k) = -Product_{j=0..k+1} ((n+1)*j - 1).at n=14A153187
- A partition product of Stirling_2 type [parameter k = 4] with biggest-part statistic (triangle read by rows).at n=20A157404
- Number of nX2 1..5 arrays containing at least one of each value, all equal values connected, rows considered as a single number in nondecreasing order, and columns considered as a single number in nondecreasing order.at n=9A166798
- Expansion of (x*exp(x)/(exp(x)-1))^3 = sum(n>=0, a(n)/(n!*(n+1)!)*x^n).at n=8A191577
- Triangular array: the fusion of polynomial sequences P and Q given by p(n,x) = (2x+1)^n and q(n,x) = (2x+1)^n.at n=49A193730
- Mirror of the triangle A193730.at n=50A193731
- 1/4 the number of n X n 0..3 symmetric matrices with every element equal to zero, one, two or three horizontal and vertical neighbors.at n=3A211086
- Numbers n such that for positive integers i, the union of sequences n+22i contains the positive roots of floor(tan(k)) = 1 (A293698).at n=33A295285