10140585
domain: N
Appears in sequences
- Smallest x such that A061498(x)=n: least number in dRRS of which n distinct term occur.at n=14A076362
- Denominator of Integral_{x=0..+oo} Polylog(-n, -x)^2 for n > 0, with a(0) = 1.at n=11A181131
- Denominator of Integral_{x=0..+oo} Polylog(-n, -x)^2 for n > 0, with a(0) = 1.at n=12A181131
- The denominators of the subdiagonal in the difference table of the Bernoulli numbers.at n=11A190339
- The denominators of the subdiagonal in the difference table of the Bernoulli numbers.at n=12A190339
- a(n) is the smallest product of prime numbers such that all numbers from 6 and 2n can be written as the sum of two prime factors (duplication allowed) of a(n).at n=17A237628
- a(n) is the smallest product of prime numbers such that all numbers from 6 and 2n can be written as the sum of two prime factors (duplication allowed) of a(n).at n=18A237628
- Denominators of the sequence of rational numbers Rn+ related to Bernoulli numbers.at n=11A308402
- a(n) = denominator((prime(n)-1)/prime(n)#), where prime(n)# = A002110(n) is the n-th primorial.at n=8A356094
- Products of exactly 7 distinct odd primes.at n=10A361075
- a(n) = denominator(Sum_{j=0..n} Bernoulli(j, 1) * Bernoulli(n - j, 1)).at n=26A363151
- a(n) = denominator(Sum_{j=0..2*n} Bernoulli(j, 1) * Bernoulli(2*n - j, 1)).at n=13A363152
- Squarefree numbers k such that A322582(k) <= A276085(k) <= A348507(k).at n=17A392607