42950

Appears in sequences

• Numbers that are the sum of 9 positive 9th powers.at n=26A003398
• Number of positive integers <= 10^n that are divisible by no prime exceeding 19.at n=8A108276
• a(n) = Sum_{d|n} A007955(d) * A000027(d) = Sum_{d|n} A007955(d) * (d), where A007955(m) = product of divisors of m.at n=34A174933
• Numbers k such that 8k+1, 12k+1 and 24k+1 are primes and the last two are also of the form x^2 + 27y^2, so the tetrahedral number T(24k+1) is a Fermat pseudoprime to base 2.at n=29A321867
• a(n) is the largest integer k such that there is an integer m with exactly n nonunitary prime factors and m + A005117(i) is squarefree for 1 <= i <= k.at n=27A390138