1961256
domain: N
Appears in sequences
- a(n) = binomial coefficient C(n,10).at n=14A001287
- Binomial coefficients C(2n, n-2).at n=10A002694
- Binomial coefficient C(24,n).at n=14A010940
- Binomial coefficient C(24,n).at n=10A010940
- a(n) = binomial coefficient C(n,14).at n=10A010967
- a(n) = greatest residue of S(n,m) mod C(n-1,m-1), for m = 1,2,...,n; S(n,m) are Stirling numbers of second kind.at n=24A024424
- Binomial coefficients: C(n,k), 9 <= k <= n-9, sorted.at n=23A024753
- Binomial coefficients: C(n,k), 9 <= k <= n-9, sorted.at n=24A024753
- Binomial coefficients: C(n,k), 10 <= k <= n-10, sorted.at n=11A024754
- Binomial coefficients: C(n,k), 10 <= k <= n-10, sorted.at n=10A024754
- Binomial coefficients: C(n,k), 8 <= k <= n-8, sorted, duplicates removed.at n=24A024760
- Binomial coefficients: C(n,k), 9 <= k <= n-9, sorted, duplicates removed.at n=13A024761
- Binomial coefficients: C(n,k), 10 <= k <= n-10, sorted, duplicates removed.at n=6A024762
- a(n) = binomial(n, floor((n-3)/2)).at n=24A037951
- a(n) = binomial(n, floor((n-4)/2)).at n=24A037956
- a(n) = LCM(binomial(n,0), ..., binomial(n,n)) / binomial(n,floor(n/2)).at n=48A048619
- a(n) = binomial(composite(n), n), where composite = A002808, composite numbers.at n=13A064813
- a(n) = binomial(sigma(n), n).at n=13A066090
- a(n) = binomial(a,b) where a>=b and one of a and b is the product of the nonzero decimal digits of n and the other is the sum of the decimal digits of n.at n=46A067453
- Binomial(a,b) where a = n! and b = sum of first n natural numbers.at n=4A067454