103967

Properties

Appears in sequences

• Start of a string of exactly 3 consecutive (but disjoint) pairs of twin primes.at n=16A035791
• Smaller of two consecutive primes whose sum is a square.at n=29A061275
• Smaller member of a twin prime pair with a square sum.at n=13A069496
• Six-digit distinct-digit primes.at n=31A074669
• Lesser of the first pair of three successive prime pairs (no isolated primes occur in between). Least of the six successive primes which are member of prime pairs.at n=23A090953
• Lesser of consecutive primes whose sum is a perfect power (A001597).at n=35A091624
• Twin prime pairs that sum to a power.at n=30A119768
• First of six consecutive primes that are three sets of twin primes.at n=22A136143
• Lesser p of twin primes (p,q) such that there exists an integer between sqrt(2p) and sqrt(2q).at n=34A145701
• a(n) = 72*n^2 - 1.at n=37A158738
• Primes of the form 2*p^2 + 4*p + 1, where p is also prime.at n=19A164041
• Lesser member p of a twin prime pair (p, p + 2) such that 2p + 3(p + 2) is a perfect square.at n=11A174370
• Number of 4 X n 0..1 arrays with rows nondecreasing and antidiagonals unimodal.at n=21A224135
• Twin prime pairs which sum to perfect squares.at n=26A232878
• Primes which have one or more occurrences of exactly six different digits.at n=31A235158
• Numbers k such that 2*k + 1 divides 2^(k+1) - 1.at n=39A246648
• Initial members of prime sextuples (p, p+2, p+12, p+14, p+24, p+26).at n=6A253624
• Smaller member of a twin prime pair with a perfect power sum.at n=15A270231
• Decimal representation of the x-axis, from the left edge to the origin, of the n-th stage of growth of the two-dimensional cellular automaton defined by "Rule 782", based on the 5-celled von Neumann neighborhood.at n=16A284026
• Primes of the form p(k)*p(k+1)*(p(k+1) - p(k)) + 1 sorted by increasing k.at n=14A383244