190944

Appears in sequences

• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=7A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=8A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=9A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=10A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=11A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=12A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=13A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=14A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=15A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=16A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=17A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=18A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=19A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=20A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=21A092913
• a(0) = 1; a(n) = least multiple of a(n-1) such that every k with a(n)-n <= k <= a(n) + n is composite. The least distance of a prime on either side from a(n) is >n.at n=22A092913
• a(n) = 6*binomial(n+1,7).at n=11A253947
• Expansion of (1+3*x+2*x^2) / (1-4*x^2-2*x^3).at n=15A384599
• Positive integers k such that the set {d+k/d : d|k} contains three consecutive integers.at n=28A386302