37463

Properties

Appears in sequences

• a(n) = Sum_{k=0..floor(n/2)} T(n-k,k), T given by A026769.at n=19A026779
• Primes which can be represented as the sum of a prime and its reverse.at n=31A072385
• Safe primes (A005385) (p and (p-1)/2 are primes) such that 12*p+1 is also prime.at n=63A075707
• Basis for code in A075934.at n=6A075935
• Home primes whose homeliness is greater than 4.at n=31A133963
• Home primes whose homeliness is greater than 5.at n=11A133965
• Home primes whose homeliness is 6.at n=4A133966
• Prime numbers p for which the quintic polynomial x^5 - x - 1 modulo p completely factors into linear polynomials.at n=30A135844
• Prime numbers p not of the form 10*k+1 for which the quintic polynomial x^5-x-1 modulus p is factorizable into five binomials.at n=24A135845
• Larger of pairs of emirps (A006567) whose difference with the (smaller) reversal is a triangular number (A000217).at n=33A217286
• Primes p with prime(p)^3 + 2*p^3 and p^3 + 2*prime(p)^3 both prime.at n=13A236574
• a(n) = 1 + Sum_{m >= 1} (m + 1)^n/2^(m - 1).at n=6A299404
• Primes p such that p^3 - 1 has 8 divisors.at n=33A341659
• Reversible primes with k digits, of the form concat(a,b), such that, with all the possible k-1 concatenation of two numbers a and b, we get k-1 primes (a mod b) and the sum of these k-1 primes is a reversible prime itself.at n=8A346559
• Prime numbersat n=3965