8553103
domain: N
Appears in sequences
- Numerators of Bernoulli numbers B_2n.at n=13A000367
- Numerator of Bernoulli number B_n.at n=26A027641
- Numerators of Bernoulli twin numbers C(n).at n=26A051716
- a(n)=numerator(B(2*prime(n))) where prime(n)=n-th prime and B(k) denotes the k-th Bernoulli number.at n=5A090817
- Numerators of the "original" Bernoulli numbers; also the numerators of the Bernoulli polynomials at x=1.at n=26A164555
- 1, followed by numerators of first differences of Bernoulli numbers (B(i) - B(i-1)).at n=26A172083
- Numerators of sum (C(n) = A051716/A051717) + (1 followed by first differences A172083/A051717 of Bernoulli numbers).at n=26A172086
- a(2n) = A164555(n). a(2n+1) = A027641(n).at n=52A176144
- a(2n) = A164555(n). a(2n+1) = A027641(n).at n=53A176144
- Numerators of the rational sequence with e.g.f. (x/2)*(1+exp(-x))/(1-exp(-x)).at n=26A176327
- Bernoulli numerators A000367 with an additional 1 inserted to represent B_1.at n=14A176546
- Numerator of ez(n-1)*n!/(4^n-2^n) where ez(n) is the n-th coefficient of sec(t)+tan(t) for n>0, a(0) = 1.at n=26A193472
- a(n) = BS(n) * W(n) where BS = Sum_{k=0..n} ((-1)^k*k!/(k+1)) S(n, k) and S(n, k) the Stirling subset numbers A048993(n, k). W(n) = Product_{ p primes <= n+1 such that p divides n+1 or p-1 divides n } = A225481(n).at n=26A226156
- Numerators of rationals with e.g.f. D(3,x), a Debye function.at n=26A227570
- Numerators of rationals with e.g.f. D(4,x), a Debye function.at n=26A227573
- Numerators corresponding to A237425(n).at n=26A237717
- a(2n) = numerator of |Bernoulli(2n)|, a(2n+1) = Euler(2n).at n=26A246006
- a(n) = 0 followed by numerators of 2*A176327(n)/A176289(n).at n=27A256003
- Numerators of the inverse binomial transform of Bernoulli(n+2).at n=25A256671
- Incrementally largest numerators of the Bernoulli numbers.at n=5A281386