9592993410
domain: N
Appears in sequences
- Largest n-digit number with exactly n distinct prime divisors. There are no further terms.at n=9A070843
- Let omega(m) be the number of distinct prime divisors of m. Then a(n) is the largest n-digit squarefree number such that omega(n) > omega(j) for all j < n.at n=9A074112
- Smallest number with n prime divisors such that the sum of the prime divisors is also a divisor, or 0 if no such number exists.at n=9A086487
- Largest n-digit number with maximal number of distinct prime divisors.at n=9A091800
- a(n) is the least k with n distinct prime factors such that the sum of its prime factors (counting multiplicity) divides k, or 0 if no such k exists. First member of A036844 with n distinct prime factors.at n=9A104466
- Products of 10 distinct primes (squarefree 10-almost primes).at n=5A281222
- Largest positive integer m with n digits and such that omega(m) = bigomega(m) = n.at n=9A342109
- Numbers whose unitary divisors have a mean unitary abundancy index that is larger than 2.at n=8A374785