46957

Properties

Appears in sequences

• A sequence of primes such that {a(n)-a(n-1)}/{a(n-1)-a(n-2)} is a unique integer.at n=9A084761
• prime(k) for those k where floor((2*(prime(k+1)-prime(k))*PrimePi(k) mod (8*k))/k) = m with m = 9.at n=36A109563
• Primes p such that q-p = 36, where q is the next prime after p.at n=18A134117
• Least prime of three consecutive primes (p1,p2,p3) such that p2-p1 and p3-p2 are both perfect squares.at n=10A161002
• Prime numbers with gaps larger than 18 towards both neighboring primes.at n=33A163111
• Prime numbers with gaps larger than 20 towards both neighboring primes.at n=17A163112
• Primes p such that p*q*r + 6 and p*q*r - 6 are primes where q and r are the next two primes after p.at n=32A240715
• a(n) = prime(k-1) with k = n^2 + prime(n)^2.at n=18A243893
• Numbers k such that (7*10^k + 179)/3 is prime.at n=29A271506
• Primes p congruent to 1 modulo 13 such that x^13 = 2 has a solution modulo p.at n=28A275773
• Least number that is the start of a gap of size n between numbers that are either prime or twice a prime (A001751).at n=35A290572
• a(n) is the smallest odd prime of the form ((1 + sqrt(2*n))^k - (1 - sqrt(2*n))^k)/(2*sqrt(2*n)).at n=14A292847
• Primes P where the distance to the nearest prime is greater than 2*log(P).at n=32A330426
• Prime numbersat n=4849