46873
domain: N
Appears in sequences
- Cyclotomic polynomials at x=6.at n=9A019324
- Strong pseudoprimes to base 6.at n=16A020232
- Cyclotomic polynomials at x=-6.at n=18A020505
- Numbers k such that k^2 is palindromic in base 6.at n=22A029990
- Values of Newton-Gregory forward interpolating polynomial (1/6)*(4*n^4 - 60*n^3 + 347*n^2 - 927*n + 978).at n=20A030442
- Base-6 digits are, in order, the first n terms of the periodic sequence with initial period 1,0,0.at n=6A033142
- Sums of 3 distinct powers of 6.at n=23A038479
- a(n) = n^6 + n^3 + 1.at n=6A060883
- Zsigmondy numbers for a = 6, b = 1: Zs(n, 6, 1) is the greatest divisor of 6^n - 1^n (A024062) that is relatively prime to 6^m - 1^m for all positive integers m < n.at n=8A064082
- Value of n-th cyclotomic polynomial at phi(n).at n=8A070524
- Numbers of the form (6^{mr}-1)/(6^r-1) for positive integers m, r.at n=12A076285
- G.f.: A(x) = R_2(x)/R_1(x), where R_2(x) and R_1(x) are the g.f.s of row 2 (A124542) and row 1 (A124531), respectively, of table A124540.at n=8A124541
- Numbers with all different digits such that each digit leaves the same nonzero remainder when each is divided into the number.at n=19A152852
- Number of unimodal functions [1..n]->[0..2].at n=31A223718
- Numbers, a(n) where binomial(a(n), 5n-1) == 0 (mod 5) and binomial(a(n), k) != 0 (mod 5) for k != 5n - 1.at n=21A224251
- a(n) = 1 + sigma(n)^3 + sigma(n)^6.at n=4A259369
- Cyclotomic polynomial value Phi(9,n!).at n=3A260076
- a(n) = Sum_{i=1..n} prime(n*(i - 1) + i).at n=23A319012
- Numbers k such that k and k+1 are both divisible by the total binary weight of their divisors (A093653).at n=20A338514