11943936
domain: N
Appears in sequences
- Triangle whose (i,j)-th entry is binomial(i,j)*8^(i-j)*12^j.at n=26A038290
- Triangle whose (i,j)-th entry is binomial(i,j)*12^(i-j)*8^j.at n=22A038334
- 20-almost primes (generalization of semiprimes).at n=22A069281
- Denominators of partial sums of Catalan numbers scaled by powers of 1/12.at n=7A120783
- Denominators of partial sums of Catalan numbers scaled by powers of -1/12.at n=7A120793
- a(n) = Product_{k=1..n} A002109(k).at n=4A125760
- Numbers that are products of distinct terms in A000312.at n=20A156223
- Number of (n+2)X(n+2) symmetric binary matrices without the pattern 0 1 1 antidiagonally.at n=4A190532
- Number of nX6 0..1 arrays avoiding 0 0 1 and 0 1 1 horizontally and 0 0 1 and 1 0 0 vertically.at n=8A207750
- Rolling cube footprints: number of nX7 0..5 arrays starting with 0 where 0..5 label faces of a cube and every array movement to a horizontal or vertical neighbor moves across a corresponding cube edge.at n=1A223201
- T(n,k)=Rolling cube face footprints: number of nXk 0..5 arrays starting with 0 where 0..5 label faces of a cube and every array movement to a horizontal or vertical neighbor moves across a corresponding cube edge.at n=29A223202
- T(n,k)=Rolling cube face footprints: number of nXk 0..5 arrays starting with 0 where 0..5 label faces of a cube and every array movement to a horizontal or vertical neighbor moves across a corresponding cube edge.at n=34A223202
- T(n,k)=Rolling cube face footprints: number of nXk 0..5 arrays starting with 0 where 0..5 label faces of a cube and every array movement to a horizontal, diagonal or antidiagonal neighbor moves across a corresponding cube edge.at n=34A223269
- Rolling cube footprints: number of 7 X n 0..5 arrays starting with 0 where 0..5 label faces of a cube and every array movement to a horizontal, diagonal or antidiagonal neighbor moves across a corresponding cube edge.at n=1A223275
- Numbers representable as x^x * y^y, with x > y > 1.at n=9A228174
- a(n) = phi(n^7).at n=11A239442
- Number of n X 1 arrays of permutations of 0..n-1 with rows nondecreasing modulo 2 and columns nondecreasing modulo 6.at n=21A264701
- Squares whose arithmetic derivative is a square.at n=7A266890
- a(n) is denominator of rational z(n) associated with the non-orientable map asymptotics constant p((n+1)/2).at n=6A278121
- Start with 1; multiply alternately by 4 and 3.at n=13A282023