302400
domain: N
Appears in sequences
- a(n) = n! * lcm({1, 2, ..., n+1}).at n=6A002397
- a(n) = n!*(n+2)!/2.at n=5A010791
- Multiplicity of highest weight (or singular) vectors associated with character chi_18 of Monster module.at n=49A034406
- Triangle read by rows, giving T(n,k) = number of k-member minimal ordered covers of a labeled n-set (1 <= k <= n).at n=26A049055
- Expansion of e.g.f.: x^4*(log(1-x))^2.at n=9A052799
- Largest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=34A057345
- Largest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=35A057345
- Largest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=38A057345
- Largest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=37A057345
- Largest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=39A057345
- Largest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=36A057345
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=36A057346
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=35A057346
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=37A057346
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=38A057346
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=41A057346
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=40A057346
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=39A057346
- Smallest of the most frequently occurring numbers in 1-to-n 5-dimensional multiplication table.at n=34A057346
- Triangle of nonzero coefficients of Hermite polynomials H_n(x) in increasing powers of x.at n=31A059343