32043
domain: N
Appears in sequences
- Number of relations on an infinite set.at n=7A000663
- Numbers whose sum of divisors is a sixth power.at n=18A019424
- a(n)^n is the least n-th power containing every digit.at n=1A020666
- Numbers whose sum of divisors is 6^6 = 46656.at n=15A048256
- Numbers k such that k^2 contains every digit at least once.at n=0A054038
- a(n)^2 is the least square to contain n different decimal digits.at n=9A054039
- a(1) = 1; set of digits of a(n)^2 is a subset of the set of digits of a(n+1)^2.at n=33A066825
- a(1) = 1; set of digits of a(n)^2 is a proper subset of the set of digits of a(n+1)^2.at n=9A067635
- Smallest positive integer whose n-th power contains an equal number of each digit (0-9) when represented in base 10.at n=1A074205
- Number of isomeric aza-benzenoids with three nitrogen atoms and n hexagons.at n=5A121951
- Binomial transform of A127358.at n=8A126932
- Numbers n such that n^2 contains every decimal digit exactly once.at n=0A156977
- Smallest number having a power that in decimal has exactly n copies of all ten digits.at n=0A217368
- a(n) = (Sum_{i=1..n-1} i^(n-2)) mod n^3.at n=32A284759
- Numbers whose square contains all of the digits 1 through 9.at n=30A294661
- Twice the total area of all (open or closed) Deutsch paths of length n.at n=9A333017
- Odd numbers k for which A003961(k)-2k divides A003961(k)-sigma(k), where A003961 shifts the prime factorization one step towards larger primes, and sigma is the sum of divisors function.at n=14A349753
- Square roots of least pandigital squares with n digits.at n=0A359343
- Numbers k such that (A003961(k)-2*k) divides (A003961(k)-sigma(k)), where A003961 is fully multiplicative with a(prime(i)) = prime(i+1), and sigma is the sum of divisors function.at n=29A378980