90458382169

domain: N

Appears in sequences

a(n) = (3*n+1)^6.at n=22A016782
a(n) = (4*n + 3)^6.at n=16A016842
a(n) = (5*n + 2)^6.at n=13A016878
a(n) = (6*n + 1)^6.at n=11A016926
a(n) = (7*n + 4)^6.at n=9A017034
a(n) = (8*n+3)^6.at n=8A017106
a(n) = (9*n + 4)^6.at n=7A017214
a(n) = (10*n + 7)^6.at n=6A017358
a(n) = (11n+1)^6.at n=6A017406
a(n) = (12*n + 7)^6.at n=5A017610
Numbers with 7 divisors. 6th powers of primes.at n=18A030516
Let the prime factorization of m be m = product p(m,k)^b(m,k), where p(m,j)<p(m,j+1) for all j, the p's are the distinct primes dividing m, and each b is a positive integer. Then a(n) = product_k {p(A165713(n), k)^b(n,k)}.at n=62A165714
a(n) = the largest n-digit number with exactly 7 divisors, a(n) = 0 if no such number exists.at n=10A182674
a(n) = (2^n + 3)^n.at n=6A251657