59281

Properties

Appears in sequences

• a(n) = T(n, 2*n-6), T given by A027926.at n=18A027929
• a(n) = T(n,n-6), array T as in A055801.at n=37A055806
• Smallest prime p of two consecutive primes, p < q, such that gcd( p-1, q-1 ) = 2n.at n=25A058264
• a(n) = n^3 - n + 1.at n=39A061600
• Largest prime < n^3.at n=37A077037
• The last number for which a determinant of base-n numbers is nonzero.at n=37A079505
• Primes p such that (r-p)/log(p) > 4, where r is the next prime after p.at n=24A082889
• Primes of the form k^3 - k + 1.at n=15A100698
• prime(k) for those k where floor((2*(prime(k+1)-prime(k))*PrimePi(k) mod (8*k))/k) = m with m = 13.at n=4A109567
• Partial sums of A137701.at n=2A111096
• Sums of two or more distinct terms from A137701.at n=3A125850
• Number of nX3 0..4 arrays with values 0..4 introduced in row major order and each element equal to one or two horizontal and vertical neighbors.at n=4A198664
• Number of nX5 0..4 arrays with values 0..4 introduced in row major order and each element equal to one or two horizontal and vertical neighbors.at n=2A198666
• T(n,k) is the number of n X k 0..4 arrays with values 0..4 introduced in row major order and each element equal to one or two horizontal and vertical neighbors.at n=23A198669
• T(n,k) is the number of n X k 0..4 arrays with values 0..4 introduced in row major order and each element equal to one or two horizontal and vertical neighbors.at n=25A198669
• Primes of the form 10n^2 - 9.at n=27A201964
• Primes p such that q-p = 52, where q is the next prime after p.at n=5A204665
• Centered 13-gonal (or tridecagonal) primes.at n=20A262493
• a(n) = 137*n^2 - 4043*n + 27277.at n=36A267706
• Primes of the form (k - 1) * k * (k + 1) +- 1, k >= 1.at n=33A293861