39373

Properties

Appears in sequences

• Numbers that are the sum of 9 positive 9th powers.at n=19A003398
• Numbers k such that the continued fraction for sqrt(k) has odd period and if the last term of the periodic part is deleted the two central terms are both 30.at n=5A031618
• Primes with 22 as smallest positive primitive root.at n=8A061334
• Primes p such that p's set of distinct digits is {3,7,9}.at n=29A108385
• Row sums of triangle A135858.at n=34A135859
• Replace 3^i with n^i in ternary representation of n.at n=33A193760
• Primes of the form 2n^3+7.at n=10A201110
• Primes of the form 6n^2 + 7.at n=32A201601
• Primes of the form 7n^2 - 2.at n=15A201848
• Primes p such that b=2*p+1 is semiprime, c=2*b+1 is 3-almost prime and d=2*c+1 is 4-almost prime.at n=35A235646
• Number of partitions p of n not including round(mean(p)) as a part. (This is "Mathematica round"; for round(x) defined as floor(x + 1/2), see A241734.)at n=45A241339
• Number of integer partitions of n whose multiplicities have multiplicities that cover an initial interval of positive integers.at n=45A325330
• Consecutive states of the linear congruential pseudo-random number generator 39373*s mod (2^31-1) when started at s=1.at n=1A384402
• Prime numbersat n=4146