29003
domain: N
Appears in sequences
- Number of partitions of n into 10 unordered relatively prime parts.at n=44A023030
- Frobenius number of the numerical semigroup generated by three consecutive hexagonal numbers.at n=15A069758
- A triangular sequence of coefficients of polynomials: p(x,n)=(3*(x - 1)^(n)*Sum[(((-1)^(n)*(2*k + 1)^(n - 1)))*x^k, {k,0, Infinity}] -(x - 1)^(n + 1)*Sum[((-1)^(n + 1)*k^n)*x^k, {k, 0, Infinity}]/x)/2.at n=46A154337
- A triangular sequence of coefficients of polynomials: p(x,n)=(3*(x - 1)^(n)*Sum[(((-1)^(n)*(2*k + 1)^(n - 1)))*x^k, {k,0, Infinity}] -(x - 1)^(n + 1)*Sum[((-1)^(n + 1)*k^n)*x^k, {k, 0, Infinity}]/x)/2.at n=53A154337
- Number of binary arrangements of total n 1's, without adjacent 1's on n X n array connected nw-se.at n=5A244288
- Number T(n,k) of words on {1,1,2,2,...,n,n} with longest increasing subsequence of length k; triangle T(n,k), n>=0, 0<=k<=n, read by rows.at n=23A267480
- Partial sums of A080715.at n=39A268403
- Number of n X n 0..1 arrays with each 1 adjacent to 3 or 4 king-move neighboring 1's.at n=5A296108
- Number of nX6 0..1 arrays with each 1 adjacent to 3 or 4 king-move neighboring 1s.at n=5A296113
- T(n,k)=Number of nXk 0..1 arrays with each 1 adjacent to 3 or 4 king-move neighboring 1s.at n=60A296115
- MM-numbers of labeled graphs with loops spanning an initial interval of positive integers.at n=35A320461