60015

Appears in sequences

• Coefficient array for certain polynomials N(5; k,x) (rising powers in x).at n=21A062986
• Numbers k such that k^3 divides 14^(k^2) + 1.at n=26A177814
• Let P1 >= 5, P2, P3 be consecutive primes, with P2 - P1 = 2. a(n) = (P1 + P2)/12 for the first occurrence of (P3 - P2)/2 = n.at n=34A329252
• 6*a(n) + 1 is the least upper prime p of a pair of twin primes p - 2, p, for which the prime gap immediately following p achieves the size 2*A007494(n).at n=23A337436