31469

Properties

Appears in sequences

• Record gaps between primes (upper end) (compare A002386, which gives lower ends of these gaps).at n=13A000101
• Smallest prime p such that there is a gap of 2n between p and previous prime.at n=35A001632
• Upper prime of a record difference between it and the second prime before it.at n=17A031134
• Primes followed by an [8,4,8]=[d,D-d,d] prime difference pattern of A001223.at n=12A052377
• Upper ends of record prime gaps under consideration of the prime number theorem.at n=13A060771
• a(n) = n^(n+2) mod (n+1)^(n+1).at n=5A064232
• Primes that show the slow decrease in the larger values of the Andrica function Af(k) = sqrt(p(k+1)) - sqrt(p(k)), where p(k) denotes the k-th prime.at n=10A084975
• Smallest prime which occurs exactly n times in the sequence A086527.at n=30A086528
• a(n) = (A085249(n) - 1)/6.at n=34A088349
• Sequence of primes 2*p(k) + 3 such that 2*p(k) + 3, 2*p(k+1) + 3, 2*p(k+2) + 3 are consecutive primes, where p(i) denotes the i-th prime. Sequence terms are 2*p(k) + 3.at n=3A089450
• Smallest prime(k) such that prime(k)-prime(k-1) is equal to prime(k+n)-prime(k).at n=7A089795
• Consider the least k such that prime(k) > n*composite(k). Sequence gives prime(k).at n=7A093864
• Aloof primes: Total distance between prime and neighboring primes sets record.at n=19A096265
• Smallest prime number that ends a prime gap of at least 2n.at n=27A100965
• Smallest prime number that ends a prime gap of at least 2n.at n=32A100965
• Smallest prime number that ends a prime gap of at least 2n.at n=31A100965
• Smallest prime number that ends a prime gap of at least 2n.at n=30A100965
• Smallest prime number that ends a prime gap of at least 2n.at n=29A100965
• Smallest prime number that ends a prime gap of at least 2n.at n=28A100965
• Smallest prime number that ends a prime gap of at least 2n.at n=26A100965