36527

Properties

Appears in sequences

• Least prime in A001359 (lesser of twin primes) such that the distance (A053319) to the next twin is 6*n.at n=41A052350
• Primes p such that the polynomial x^5-x^4-x^3-x^2-x-1 mod p has 5 distinct zeros.at n=28A106281
• Prime numbers p for which quintonacci quintic polynomial x^5-x^4-x^3-x^2-x-1 modulus p is completely factorizable.at n=29A135846
• Prime numbers p not of the form 10k+1 for which the quintonacci quintic polynomial x^5 - x^4 - x^3 - x^2 - x - 1 modulus p is factorizable into five binomials.at n=23A135847
• Primes p2 such that p1^2 + p2^3 is an average of twin primes and p1 < p2 are consecutive primes.at n=37A138716
• G.f.: sqrt( Sum_{n>=0} x^n / (1-x)^(4*n+1) * [Sum_{k=0..2*n} C(2*n,k)^2 * x^k]^2 ).at n=6A246572
• Primes p such that prime(p)^2 - 2 = prime(q) for some prime q.at n=35A261354
• Primes p such that p+2, 3*p+2 and 3*p+8 are also primes.at n=23A278138
• Numbers n such that 13^n is the highest power of 13 dividing A240751(n).at n=18A286007
• Primes p such that p+2, (p^2-1)/2+p and (p^2+3)/2+3*p are also prime.at n=11A352948
• Prime numbersat n=3872