36288
domain: N
Appears in sequences
- Denominator of (2/Pi)*Integral_{0..inf} (sin x / x)^n dx.at n=9A002298
- a(n) = n! with trailing zeros omitted.at n=10A004154
- a(n) = n! with trailing zeros omitted.at n=9A004154
- a(n) is the concatenation of n and 8n.at n=35A009470
- Numbers n such that n is a substring of its square in base 6 (written in base 10).at n=47A018830
- Numbers that are the sum of 3 positive cubes in exactly 3 ways.at n=20A025397
- Numbers that are the sum of 3 positive cubes in 3 or more ways.at n=21A025398
- Numbers that are the sum of 3 distinct positive cubes in exactly 3 ways.at n=17A025401
- Numbers that are the sum of 3 distinct positive cubes in 3 or more ways.at n=18A025402
- Triangle read by rows, the Bell transform of n!*binomial(4,n) (without column 0).at n=29A049424
- A simple grammar: sequences of pairs of cycles.at n=7A052811
- Product of numbers < n which do not divide n (or 1 if no such numbers exist).at n=9A055067
- (n-1)!/n or 0 if n does not divide (n-1)!.at n=9A055637
- a(n) = T(2*n+4,n), array T as in A055807.at n=5A055816
- Numbers that are the products of distinct substrings (>1) of themselves and do not end in 0.at n=36A059470
- Triangle T(s,t), s >= 1, 1 <= t <= s (see formula line).at n=50A059836
- Divide n! by largest power of n which will leave the result an integer.at n=9A060068
- a(n) = 18*(n - 2)*(2*n - 5).at n=32A060787
- Denominator of Sum_{k=0..n} 1/k!.at n=9A061355
- Sum of non-unitary divisors of central binomial coefficient C(n, floor(n/2)).at n=17A064141