959595
domain: N
Appears in sequences
- Denominators of cosecant numbers: -2*(2^(2*n-1)-1)*Bernoulli(2*n).at n=18A001897
- Denominator of |Bernoulli(2n+2)| - |Bernoulli(2n)|.at n=17A029765
- Denominator of |Bernoulli(2n+2)| - |Bernoulli(2n)|.at n=18A029765
- Denominators of column 3 of table described in A051714/A051715.at n=34A051721
- Denominators of column 3 of table described in A051714/A051715.at n=35A051721
- Denominators of column 3 of table described in A051714/A051715.at n=36A051721
- Numbers k such that phi(k)/lambda(k) increases to a record value, where phi(k) is the Euler totient function (A000010) and lambda(k) is the Carmichael lambda function (A002322).at n=34A066605
- a(n) = Product_{p-1 divides n} p, where p is an odd prime.at n=36A141459
- A001897 with terms repeated.at n=36A172087
- A001897 with terms repeated.at n=37A172087
- Denominator of a-sequence for Sheffer triangle A060081.at n=36A176727
- Numbers k such that k^2+2, k^3+2, k^4+2 and k^5+2 are all prime.at n=15A214001
- Numbers k such that k + 2, k^2 + 2, k^3 + 2, k^4 + 2 and k^5 + 2 are all prime.at n=4A216930
- a(n) = 2*binomial(5*n+10, n)/(n+2).at n=6A233738
- Denominators of the inverse binomial transform of Bernoulli(n+2).at n=34A256675
- Denominators of the inverse binomial transform of Bernoulli(n+2).at n=35A256675
- Denominators of the inverse binomial transform of Bernoulli(n+2).at n=36A256675
- a(n) = denominators of A255935(n) * triangle T(n,k) for Bernoulli(k+2), k=0 to n-1.at n=35A257372
- From higher-order Bernoulli numbers: denominator of D Number D2n(2n).at n=18A261274
- Denominators of the z-sequence for the Sheffer matrix S2*P = A048993*A007318 = A049020.at n=36A288868