352529

Appears in sequences

• Numbers m such that DivisorSigma(4*k-2, m) mod m = 0 holds presumably for all k; that is, (4k-2)-power-sums of divisors of m are divisible by m for all k.at n=29A066290
• Sum of the elements in any transversal of a prime(n) X prime(n) array containing the numbers from 1 to prime(n)^2 in standard order.at n=23A066886
• For every positive integer m, let u(m) = (d(1),d(2),...,d(k)) be the unitary divisors of m. The sequence (a(n)) consists of successive numbers m which d(k)/d(1) + d(k-1)/d(2) + ... + d(k)/d(1) is an integer.at n=28A229996
• Numbers that divide the average of the sum of the squares of their divisors.at n=12A255244
• Numbers such that A017666(n) = A017668(n).at n=10A261989
• a(n) = Sum_{d|n} phi(d)^4.at n=38A342470