39097

Properties

Appears in sequences

• Numerators of continued fraction convergents to sqrt(381).at n=6A041722
• Fourth term of strong prime sextets: p(m-2)-p(m-3) > p(m-1)-p(m-2) > p(m)-p(m-1) > p(m+1)-p(m) > p(m+2)-p(m+1).at n=11A054816
• Primes p such that the differences between the 5 consecutive primes starting with p are (6,4,6,6).at n=9A078964
• Prime septets of form k, k+2100, k+4200, k+6300, k+8400, k+10500, k+12600.at n=20A123107
• Smaller member p of a pair (p,p+6) of consecutive primes in different centuries.at n=28A160370
• Primes p such that Sum_{k=primes<p} (k mod p) and Sum_{k=primes<p} (p mod k) are both prime.at n=16A274025
• Primes p such that the concatenation of p^3, p^2, p and 1 is prime.at n=42A323428
• Beginning with 11, least prime such that concatenation of first n terms and its digit reversal both are primes.at n=27A380227
• Prime numbersat n=4115