383594
domain: N
Appears in sequences
- Numbers k such that k and k+1 have the same number and sum of divisors.at n=12A054004
- Numbers k such that sigma(k)*omega(k) = sigma(k+1)*omega(k+1), where omega(k) is the number of distinct prime divisors of n (A001221).at n=27A063071
- Numbers k such that k and k+1 have the same sum of unitary divisors and the same number of divisors.at n=20A064348
- Numbers k such that k and k+1 have the same sum of unitary and nonunitary divisors.at n=21A064729
- Numbers k such that A065608(k) = A065608(k+1).at n=17A065062
- Numbers k such that sigmawt(k) = sigmawt(k+1), where sigmawt(k) is the sum of the divisors of k weighted by divisor multiplicity in k.at n=22A171183
- Runs of consecutive numbers with the same number and sum of divisors.at n=24A225758
- Numbers k such that the average of the divisors of k and k+1 is the same.at n=33A238380
- Numbers n such that floor(antisigma(n) / sigma(n)) = floor(antisigma(n+1) / sigma(n+1)).at n=27A244666
- Numbers n such that Product_{d|n} sigma(d) = Product_{d|n+1} sigma(d).at n=10A280087
- Numbers k such that t(k) = t(k+1) where t(k) = tau(k) + sigma(k) = A007503(k) is the number of subgroups of the dihedral group of order 2k.at n=12A322256
- Numbers k such that s(k) = s(k+1) where s(k) is the sum of unitary, squarefree divisors of k, including 1 (A092261).at n=36A327875