22219
domain: N
Appears in sequences
- Numerators of continued fraction convergents to sqrt(114).at n=7A041206
- Rectangular table, read by antidiagonals, where the g.f.s of row n, R(x,n), satisfy: R(x,n+1) = R(G(x),n) for n>=0 and x*R(x,0) = G(x) = x + x*G(G(x)) is the g.f. of A030266.at n=61A128325
- The main diagonal in the table of coefficients of iterations of G(x), where G(x) = x + x*G(G(x)) = g.f. of A030266.at n=5A141141
- a(n) = 42*n^2 + 1.at n=23A158604
- Table of elementary symmetric functions a_k(1,2,5,6,...,n+2) (no 3,4).at n=32A196846
- a(n) = Sum_{i=0..n} digsum_8(i)^4, where digsum_8(i) = A053829(i).at n=22A231683
- For k in {2,3,...,9} define a sequence as follows: a(0)=0; for n>=0, a(n+1)=a(n)+1, unless a(n) ends in k, in which case a(n+1) is obtained by replacing the last digit of a(n) with the digit(s) of k^2. This is k(4).at n=35A237341
- Composite numbers in A381019 which are immediately followed by another composite number, in order of their appearance.at n=28A379810
- Consecutive states of the linear congruential pseudo-random number generator 20403*s mod 2^15 when started at s=1.at n=27A384196
- G.f. satisfies A(x) = A(x^2) - A(x^3)/A(-x^2).at n=57A385908