29567

Properties

Appears in sequences

• "Sloping binary representation" of Fibonacci numbers, slope = +1.at n=8A037093
• Number of self-avoiding walks on the cubic lattice trapped after n steps.at n=5A077817
• Primes p such that 11 is the largest of all prime factors of the numbers between p and the next prime (cf. A052248).at n=23A080187
• Numbers n which are divisors of the number produced by concatenating (n-5), (n-4), ... (n-1) in that order.at n=3A088870
• Smallest sequence of odd primes such that no sum of at least two terms is prime.at n=6A153138
• a(n) = b_f(n) where f is the 3-periodic sequence [-1,1,5] (see comments).at n=17A186267
• Primes of the form 7n^2 - 8.at n=9A201853
• Primes that are the sum of 51 consecutive primes.at n=20A215992
• Equals one maps: number of nX3 binary arrays indicating the locations of corresponding elements equal to exactly one of their king-move neighbors in a random 0..2 nX3 array.at n=4A220965
• T(n,k)=Equals one maps: number of nXk binary arrays indicating the locations of corresponding elements equal to exactly one of their king-move neighbors in a random 0..2 nXk array.at n=23A220967
• T(n,k)=Equals one maps: number of nXk binary arrays indicating the locations of corresponding elements equal to exactly one of their king-move neighbors in a random 0..2 nXk array.at n=25A220967
• Primes p with p + 2, p + 6 and prime(p) + 6 all prime.at n=27A236509
• Positions of records in A263455.at n=16A263926
• Decimal representation of the diagonal from the origin to the corner of the n-th stage of growth of the two-dimensional cellular automaton defined by "Rule 593", based on the 5-celled von Neumann neighborhood.at n=14A289580
• Primes of a056240-type 3.at n=17A300359
• Odd numbers k such that the four consecutive odd numbers starting with k have a total of 5 prime factors counting multiplicity.at n=38A328489
• Partial sums of A334136.at n=37A332264
• Lowest prime p in a ladder of 4 consecutive primes p, p+2, p+6, p+14.at n=16A372247
• Prime numbersat n=3208