50627

Properties

Appears in sequences

• a(n) = next prime after n^4.at n=14A053786
• Primes of the form k^2 + 2.at n=19A056899
• Primes p such that p - 6 is a product of two consecutive primes.at n=19A098061
• Primes of the form m^k+k, with m and k > 1.at n=26A099227
• Primes p of the form a^4+b^4+c^4 with a,b,c>=1 such that a^2+b^2+c^2 is another prime < p.at n=36A126117
• Primes that are equal to the mean of 5 consecutive squares.at n=17A129388
• 15^(2^n) + 2.at n=2A152588
• Primes of the form 15^(2^k) + 2.at n=2A152589
• Prime numbers with gaps larger than 18 towards both neighboring primes.at n=36A163111
• Primes p such that the differences between p and the closest squares surrounding p are primes.at n=27A163848
• Least prime p such that p-2 has n divisors, or 0 if no such prime exists.at n=24A167675
• Primes of the form k^4 + 2 for k >= 0.at n=4A182343
• Fajtlowicz p-primes.at n=46A185955
• Number of Grassmannian permutations of size n that avoid a pattern, sigma, where sigma is a pattern of size 10 with exactly one descent.at n=16A362197
• First of three consecutive primes p,q,r such that p+q, p+r and q+r are all triprimes.at n=17A362203
• Prime numbersat n=5192