63611
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- a(n) = A000040(A096480(n)).at n=38A096481
- Let p_(3,2)(m) be the m-th prime == 2(mod 3). Then a(n) is the smallest p_(3,2)(m) such that the interval(p_(3,2)(m)*n, p_(3,2)(m+1)*n) contains exactly one prime == 2 (mod 3).at n=30A210467
- Primes which become palindromic primes when the digits are rotated once to the right.at n=31A235000
- Number of length n+5 0..5 arrays with every six consecutive terms having the maximum of some two terms equal to the minimum of the remaining four terms.at n=1A250078
- T(n,k)=Number of length n+5 0..k arrays with every six consecutive terms having the maximum of some two terms equal to the minimum of the remaining four terms.at n=16A250081
- Number of length 2+5 0..n arrays with every six consecutive terms having the maximum of some two terms equal to the minimum of the remaining four terms.at n=4A250083
- Primes that can be generated by the concatenation in base 8, in descending order, of two consecutive integers read in base 10.at n=21A287311
- Prime numbersat n=6377