1679617
domain: N
Appears in sequences
- a(n) = n^4 + 1.at n=36A002523
- Numbers that are the sum of 2 nonzero 8th powers.at n=15A003380
- Numbers that are the sum of at most 2 nonzero 8th powers.at n=22A004875
- Cyclotomic polynomials at x=6.at n=16A019324
- Cyclotomic polynomials at x=-6.at n=16A020505
- Numbers k such that k^2 is palindromic in base 6.at n=36A029990
- Sums of 2 distinct powers of 6.at n=28A038478
- Numbers whose cube is palindromic in base 6.at n=9A046235
- Sums of two powers of 6.at n=36A055257
- a(n) = n^8 + 1.at n=6A060890
- a(n) = 6^n + 1.at n=8A062394
- 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=15A064082
- Numbers of the form (6^{mr}-1)/(6^r-1) for positive integers m, r.at n=17A076285
- Generalized Fermat numbers: 6^(2^n) + 1, n >= 0.at n=3A078303
- Modulo 2 binomial transform of 6^n.at n=8A100309
- Numbers that are sums of 8th powers of 2 distinct positive integers.at n=10A155468
- a(n) = smallest number that leads to a new cycle under the base-6 Kaprekar map of A165051.at n=15A165068
- 5 followed by the generalized Fermat numbers 6^(2^n)+1 (A078303).at n=4A178428
- Semiprimes of the form n^4 + 1.at n=19A186688
- Sum of the 8th powers of the digits of n.at n=16A210840