36901

Properties

Appears in sequences

• Numbers having four 5's in base 9.at n=21A043476
• Number of partitions of n in which the number of parts divides n.at n=47A067538
• a(n) = 997*n + 1009.at n=36A100776
• Prime numbers n such that n = p1^3 + p2^3 + p3^3, a sum of cubes of 3 distinct prime numbers.at n=22A137365
• Subsequence of A137365 where it is possible to choose p1, p2, p3 so that p1+p2+p3 = prime.at n=20A137366
• Number of n X n binary arrays symmetric under 90 degree rotation with all ones connected only in a 110-111-011 pattern in any orientation.at n=16A146254
• a(n) is the smallest prime of the form n*m^q + 1 where m is an integer and q >= 2.at n=40A213738
• Primes p such that p = 361 + 420*k for some k.at n=35A217656
• a(n) = 6*n^3 - 263*n^2 + 3469*n - 12841.at n=34A218457
• Number of (n+1) X (1+1) 0..1 arrays with every 2 X 2 subblock diagonal minus antidiagonal sum nondecreasing horizontally and vertically.at n=12A253152
• Twin primes both of which are the sum of three positive cubes.at n=29A272376
• Centered cubohemioctahedral numbers: a(n) = 2*n^3+9*n^2+n+1.at n=25A274973
• Primes p such that p+12, (p+1)/2, and (p+13)/2 are also prime.at n=18A283869
• Number of compositions (ordered partitions) of n into prime power divisors of n (including 1).at n=18A284839
• a(n) = smallest m such that A308190(m) = n, or -1 if no such m exists.at n=25A308191
• Indices of records in A308190.at n=17A308193
• Primes p such that A001175(p) = (p-1)/9.at n=18A308794
• Primes of the form A321513(k) + 1 for some k > 0.at n=40A352966
• Numbers k such that one of k, k+1, k+2 is prime and the other two are semiprimes, and one of R(n), R(n+1), R(n+2) is prime and the other two are semiprimes, where R = A004086.at n=13A354285
• Prime numbersat n=3913