1860480
domain: N
Appears in sequences
- a(n) = 3*(n+1)*binomial(n+5,6).at n=14A027811
- Product of 5 consecutive integers.at n=20A052787
- E.g.f.: x^5*exp(x)-x^5.at n=20A052800
- a(n) = 5n*(5n-1)*(5n-2)*(5n-3)*(5n-4).at n=4A054778
- Number of combinations in card games with 4 suits and 4 players.at n=5A061924
- Denominator of b(n) = (50*n-6)/(binomial(3n,n)*2^n).at n=7A072973
- a(n) = (n-1)!*binomial(3*n,n)/(3*(2*n+1)).at n=5A076151
- Smallest product (n+1)(n+2)...(n+k) which is a multiple of n, where n+k is given by A061243.at n=14A081470
- a(n) = (32/2)*(n-1)*(n-2)*(n-3)*(n-4).at n=20A134175
- Number of arrangements of n indistinguishable balls in n boxes with the maximum number of balls in any box equal to 9.at n=7A180289
- Number of arrangements of n indistinguishable balls in n boxes with the maximum number of balls in any box equal to n-7.at n=8A180297
- a(n) = Product_{k=0..n} (n^2 + k).at n=4A272180