35279

Properties

Appears in sequences

• Numbers whose least quadratic nonresidue (A020649) is 29.at n=1A025029
• Primes of form k! - (k-1)! - 1.at n=3A049985
• Primes p such that number of primes produced according to rules stipulated in Honaker's A048853 is 2.at n=8A050664
• Smaller of twin primes whose middle term is a multiple of A002110(4)=210.at n=31A060230
• Primes with 29 as smallest positive primitive root.at n=6A061733
• Primes p such that 7 is the largest of all prime factors of the numbers between p and the next prime (cf. A052248).at n=23A080186
• Primes p such that (p-7)/8 and 8p + 7 are both prime.at n=32A158238
• a(n) = 20*n^2 - 1.at n=41A158491
• a(n) = 80*n^2 - 1.at n=20A158774
• Numbers m such that m mod k is k-1 for all k = 2..9.at n=13A166931
• a(n) is the least integer such that the iterated modulus chain m_1=mod(a(n),m),m_2=mod(a(n),m_1),m_3=mod(a(n),m_2),..., m_n= (0 or 1) reaches a length n. The companion value m, associated to a(n), is given in A177968.at n=31A177967
• Primes of the form highly abundant number - 1.at n=54A181562
• Smallest number requiring n terms to be expressed as a sum of factorials.at n=27A200748
• Primes of the form 5n^2 - 1.at n=23A201783
• Primes of the form 7n^2 - 8.at n=10A201853
• a(n) = 7*n! - 1.at n=7A229828
• Triangle T(n,k) giving the largest member of "the infinite trunk of factorial beanstalk" (A219666) whose factorial base representation contains n digits (A084558) and the most significant such digit (A099563) is k.at n=26A230429
• a(n) is the smallest prime having exactly n consecutive primitive roots.at n=21A261438
• Primes p such that p+2 is prime with prime(p+2)-prime(p)=6.at n=16A261533
• a(n) is the smallest prime with at least n consecutive primitive roots.at n=21A268397