16252897
domain: N
Appears in sequences
- Sum of divisors of n, sigma(n) (A000203), is a power of number of divisors of n, d(n) (A000005).at n=23A051281
- Semiprimes that are a product of Mersenne primes.at n=19A144482
- Semiprimes that are a product of distinct Mersenne primes.at n=15A144856
- Odd integers n such that 2^n == 2^12 (mod n).at n=9A215613
- Numbers n with the property that there are integers k, h such that sigma(n) = k^tau(n) = tau(n)^h.at n=9A225362
- Nonprime numbers k such that sum of the divisors of k is a power of 2.at n=30A254603
- a(1) = 1; for n > 1, a(n) is the smallest number m such that sigma(m) = tau(m)^n or 0 if no such m exists.at n=11A349006