36401
domain: N
Appears in sequences
- Expansion of e.g.f.: sin(log(1+sin(x))).at n=13A009450
- Apply (1+Shift)^3 to Bell numbers.at n=9A011970
- Aitken's array: triangle of numbers {a(n,k), n >= 0, 0 <= k <= n} read by rows, defined by a(0,0)=1, a(n,0) = a(n-1,n-1), a(n,k) = a(n,k-1) + a(n-1,k-1).at n=48A011971
- Sequence formed by reading rows of triangle defined in A011971.at n=39A011972
- Mirror image of the Bell triangle A011971, which is also called the Pierce triangle or Aitken's array.at n=51A123346
- Number of "ON" cubic cells at n-th stage in simple 3-dimensional cellular automaton: a(n) = A160428(n)/8.at n=41A161342
- Run length of the n-th run of Fibonacci composites.at n=35A182600
- Number of nX2 nonnegative integer arrays with new values 0 upwards introduced in row major order and no element equal to any knight-move neighbor (colorings ignoring permutations of colors).at n=4A207998
- T(n,k)=Number of n X k nonnegative integer arrays with new values 0 upwards introduced in row major order and no element equal to any knight-move neighbor (colorings ignoring permutations of colors).at n=16A208001
- T(n,k)=Number of n X k nonnegative integer arrays with new values 0 upwards introduced in row major order and no element equal to any knight-move neighbor (colorings ignoring permutations of colors).at n=19A208001
- Number of horizontal, diagonal and antidiagonal neighbor colorings of the even squares of an nX3 array with new integer colors introduced in row major order.at n=6A216457
- T(n,k)=Number of horizontal, diagonal and antidiagonal neighbor colorings of the even squares of an nXk array with new integer colors introduced in row major order.at n=42A216460
- Number of horizontal, diagonal and antidiagonal neighbor colorings of the even squares of a 7Xn array with new integer colors introduced in row major order.at n=2A216465
- Numbers k such that 3^k + 34 is prime.at n=31A219050
- Partial sums of A299894.at n=42A299895
- Number of integer partitions of n with more than one part of least multiplicity.at n=41A362609
- G.f. satisfies A(x) = 1 / (1 - x^4*A(x)^4 * (1 + x)).at n=24A376487