436273291

Properties

Appears in sequences

• Record gaps between primes (upper end) (compare A002386, which gives lower ends of these gaps).at n=29A000101
• Upper ends of record prime gaps under consideration of the prime number theorem.at n=23A060771
• Larger prime power associated with gaps in A121492.at n=34A167236
• Primes q with prime gap q - p of n-th record merit.at n=16A277552
• a(n) is the k-th prime, such that abs(prime(k) - Sum_{j=k-2..k+2} prime(j)/5) sets a new record.at n=35A337439
• a(n) is the k-th prime, such that abs(prime(k) - Sum_{j=k-1..k+1} prime(j)/3) sets a new record.at n=32A337489
• a(n) is the larger of 2 consecutive primes bounding an interval containing a record number A350097(n) of odd squarefree semiprimes (A046388).at n=25A350096
• Primitive prime powers. p is a primitive prime power iff it is an odd prime power that exceeds the preceding odd prime power by more than any smaller odd prime power does. ('Prime power' defined in the sense of A246655.)at n=31A360204
• Primes p such that the difference between p and the average of the two preceding primes sets a new record.at n=34A375096
• Smallest prime p where the absolute difference of the gaps to the adjacent primes exceeds n*log(p).at n=12A383591
• Prime numbersat n=23163299