68903

Properties

Appears in sequences

• Second term of weak prime sextet: p(m)-p(m-1) < p(m+1)-p(m) < p(m+2)-p(m+1) < p(m+3)-p(m+2) < p(m+4)-p(m+3).at n=24A054829
• Third term of weak prime sextet: p(m-1)-p(m-2) < p(m)-p(m-1) < p(m+1)-p(m) < p(m+2)-p(m+1) < p(m+3)-p(m+2).at n=23A054830
• Third term of weak prime septet: p(m-1)-p(m-2) < p(m)-p(m-1) < p(m+1)-p(m) < p(m+2)-p(m+1) < p(m+3)-p(m+2) < p(m+4)-p(m+3).at n=3A054836
• Smallest prime p such that the maximum run length of consecutive quadratic nonresidues modulo p is n.at n=24A129201
• Number of walks within N^3 (the first octant of Z^3) starting at (0,0,0) and consisting of n steps taken from {(-1, -1, 1), (-1, 0, 1), (-1, 1, 1), (1, 0, 1), (1, 1, -1)}.at n=9A149421
• Smallest of 3 consecutive prime numbers such that p1*p2*p3*d1*d2=average of twin prime pairs; p1,p2,p3 consecutive prime numbers; d1(delta)=p2-p1, d2(delta)=p3-p2.at n=32A153409
• Primes p such that (p reversed)-10 is a square.at n=42A167475
• Number of n X 2 0..4 arrays with each element x equal to the number its horizontal and vertical neighbors equal to 2,0,1,0,0 for x=0,1,2,3,4.at n=12A197531
• Primes of the form k+(k+3)^2 where k is a nonnegative integer.at n=45A248697
• a(n) is the smallest prime having exactly n consecutive primitive roots.at n=23A261438
• Prime numbersat n=6848