371294
domain: N
Appears in sequences
- sigma_5(n), the sum of the 5th powers of the divisors of n.at n=12A001160
- a(n) = n^5 + 1.at n=14A002561
- Numerator of sum of -5th powers of divisors of n.at n=12A017673
- Sums of distinct powers of 13.at n=33A033049
- Sum of fifth powers of unitary divisors.at n=12A034679
- Numbers n such that n^3 is palindromic in base 13.at n=11A046247
- Sum of 5th powers of odd divisors of n.at n=12A051002
- Sum of 5th powers of odd divisors of n.at n=25A051002
- Sum of two powers of 13.at n=15A072390
- Sum of 5th powers of the divisors of odd numbers: a(n) = sigma_5(2n-1).at n=6A081864
- a(n) = Sum_{0<d|n, n/d odd} d^5.at n=12A096960
- a(0) = 0, a(n) = 13^(n-1) + 1.at n=6A141012
- a(n) = Sum_{d|n} (-1)^(n/d+1)*d^5.at n=12A284926
- Expansion of eta(q^2)^12 * eta(q^4)^8 / eta(q)^8 in powers of q.at n=26A286399
- a(n) = Sum_{d|n} (-1)^(d-1)*d^5.at n=12A321544
- a(n) = Sum_{d divides n} (-1)^(d + n/d) * d^5.at n=12A321561
- a(n) = Sum_{d|n, d==1 mod 4} d^5 - Sum_{d|n, d==3 mod 4} d^5.at n=12A321821
- a(n) = Sum_{d|n, d==1 mod 4} d^5 - Sum_{d|n, d==3 mod 4} d^5.at n=25A321821
- a(n) = Sum_{d|n, n/d==1 mod 4} d^5 - Sum_{d|n, n/d==3 mod 4} d^5.at n=12A321829
- Sum of the 5th powers of the squarefree divisors of n.at n=12A351268