94143178827
domain: N
Appears in sequences
- Powers of 3: a(n) = 3^n.at n=23A000244
- 23rd powers: a(n) = n^23.at n=3A010811
- a(n) = 3^(2*n+1).at n=11A013708
- a(n) = 3^(3n+2).at n=7A013733
- a(n) = 3^(4*n + 3).at n=5A013779
- a(n) = 3^(5*n + 3).at n=4A013828
- Denominator of sum of -23rd powers of divisors of n.at n=2A017710
- a(n) = Sum_{k=0..2n} (k+1) * A026323(n, 2n-k).at n=22A027313
- Number of labeled trees with 3-colored nodes.at n=9A038062
- Earliest sequence where a(a(n))=3^n.at n=23A038756
- Next-to-last diagonal of A024462.at n=22A038765
- Number of ternary Lyndon words whose digits sum to 1 (or 2) mod 3; number of trace 1 (or 2) monic irreducible polynomials over GF(3).at n=26A046211
- Expansion of g.f. (2-3*x-x^2)/((1-x^2)*(1-3*x)).at n=23A052929
- Powers of 3 which are not powers of 3^3.at n=15A055156
- a(n) = 3^prime(n).at n=8A057901
- Floor[ Sum_{1..n} 1/i ]^n.at n=22A067053
- Integers of the form phi(n^n)/phi(n)^n where phi is the Euler totient function A000010(n).at n=8A067583
- Consider the power series (x+1)^(1/3)=1+x/3-x^2/9+5x^3/81+...; sequence gives denominators of coefficients.at n=17A067623
- Denominators of coefficients in (1+x)^(1/3)-(1-x)^(1/3) power series.at n=8A068562
- Powers of 3 with strictly increasing sum of digits.at n=6A069028