46655
domain: N
Appears in sequences
- a(n) = 6^n - 1.at n=6A024062
- Numbers whose sum of the squares of divisors is also a square number.at n=18A046655
- Numbers that are repdigits in base 6.at n=30A048331
- a(n) = n^n - 1.at n=5A048861
- Fourth step in Goodstein sequences, i.e., g(6) if g(2)=n: write g(5)=A059934(n) in hereditary representation base 5, bump to base 6, then subtract 1 to produce g(6).at n=3A059935
- Positive numbers which are one less than a perfect square that is also another power.at n=18A062965
- Numbers k such that the sum of unitary divisors of k^2 is a square.at n=19A064498
- a(n) = n^3 - 1.at n=35A068601
- Numbers n such that (i) the sum of the distinct primes dividing n is divisible by the largest prime dividing n and (ii) n has exactly 4 distinct prime factors and (iii) n is squarefree.at n=17A071143
- a(n) = (n^7 - n)/6.at n=6A108495
- Number of terms in s(n), where s(n) is defined in A114483.at n=17A112361
- a(n) = n^3 + (-1)^(n+1).at n=36A123363
- a(n) = n^6 - 1.at n=5A123866
- Numbers of the form Abs[m^m - n^n], where integers m,n>0.at n=15A124076
- n^3 - 1 divided by its largest cube divisor.at n=34A128972
- a(n) = 36n^2 - 1.at n=35A136017
- RMS numbers: numbers n such that root mean square of divisors of n is an integer.at n=14A140480
- Odd squarefree numbers n such that the cyclotomic polynomial Phi(n,x) is not coefficient convex.at n=27A146960
- Integers N such that by inserting + or - or * or / or ^ between each of their digits, without any grouping parentheses, you can get N (the ambiguous a^b^c is avoided).at n=23A156954
- Composite RMS numbers: composite numbers c such that root mean square of divisors of c is an integer.at n=10A158287