43777

Properties

Appears in sequences

• Initial members of prime 5-tuples (p, p+4, p+6, p+10, p+12).at n=8A022007
• Initial member of prime sextuples (p, p+4, p+6, p+10, p+12, p+16).at n=4A022008
• Primes arising in A053782.at n=35A053872
• Primes p such that three (the maximum number) primes occur between p and p+12.at n=16A086140
• Primes of the form 512n+257.at n=16A105131
• Primes followed by at least five consecutive primes as closely as possible.at n=24A156114
• a(n) = 76*n^2 + 1.at n=24A158767
• Primes containing 777 as a substring.at n=9A167282
• a(0) = 0 and a(n) = (4*n^3 - 12*n^2 + 20*n - 9)/3 for n >= 1.at n=33A174794
• Primes having only {3, 4, 7} as digits.at n=35A199347
• Initial primes in prime sextuplets (p, p+4, p+6, p+10, p+12, p+16) preceding the maximal gaps in A200503.at n=3A200504
• Initial primes in prime 5-tuples (p, p+4, p+6, p+10, p+12) preceding the maximal gaps in A201062.at n=5A201063
• Primes of the form 256*k + 1.at n=33A208178
• Number of partitions of n+9 with largest inscribed rectangle having area <= n.at n=32A218630
• Primes of the form 384*k + 1.at n=32A229854
• Primes p in prime sextuplets (p, p+4, p+6, p+10, p+12, p+16) at the end of the maximal gaps in A200503.at n=2A233426
• Primes p in prime 5-tuples (p, p+4, p+6, p+10, p+12) at the end of the maximal gaps in A201062.at n=4A233433
• Numbers k such that k!!! - 3^k is prime.at n=35A261316
• Table read by rows: list of prime 5-tuples of the form (p, p+4, p+6, p+10, p+12).at n=40A270999
• Table read by rows: list of prime sextuplets (p, p+4, p+6, p+10, p+12, p+16).at n=24A271000