293930
domain: N
Appears in sequences
- a(n) = binomial coefficient C(n,9).at n=12A000582
- Binomial coefficient C(2n+1, n-1).at n=9A002054
- Expansion of (1-x^13) / (1-x)^13.at n=9A008495
- 11-dimensional centered tetrahedral numbers.at n=9A008505
- Binomial coefficient C(21,n).at n=9A010937
- Binomial coefficient C(21,n).at n=12A010937
- a(n) = binomial(n,12).at n=9A010965
- Binomial coefficients: C(n,k), 8 <= k <= n-8, sorted.at n=18A024752
- Binomial coefficients: C(n,k), 8 <= k <= n-8, sorted.at n=17A024752
- Binomial coefficients: C(n,k), 9 <= k <= n-9, sorted.at n=6A024753
- Binomial coefficients: C(n,k), 9 <= k <= n-9, sorted.at n=7A024753
- Binomial coefficients: C(n,k), 7 <= k <= n-7, sorted, duplicates removed.at n=20A024759
- Binomial coefficients: C(n,k), 8 <= k <= n-8, sorted, duplicates removed.at n=10A024760
- Binomial coefficients: C(n,k), 9 <= k <= n-9, sorted, duplicates removed.at n=4A024761
- Dimensions of multiples of minimal representation of complex Lie algebra E7.at n=4A030649
- a(n) = binomial(n, floor((n-3)/2)).at n=21A037951
- a(n) = binomial(n, floor(n/2)-1).at n=21A037955
- Maximum over k of the largest squarefree number dividing a value of binomial(n,k).at n=20A048681
- Binomial coefficients C(2*n+9,9).at n=6A053138
- a(n) = binomial(composite(n), n), where composite = A002808, composite numbers.at n=11A064813