5311735
domain: N
Appears in sequences
- a(n) = binomial coefficient C(n,10).at n=16A001287
- Binomial coefficients C(2n,n-3).at n=10A002696
- Binomial coefficient C(26,n).at n=10A010942
- Binomial coefficient C(26,n).at n=16A010942
- a(n) = binomial(n,16).at n=10A010969
- Binomial coefficients: C(n,k), 10 <= k <= n-10, sorted.at n=21A024754
- Binomial coefficients: C(n,k), 10 <= k <= n-10, sorted.at n=22A024754
- Binomial coefficients: C(n,k), 9 <= k <= n-9, sorted, duplicates removed.at n=22A024761
- Binomial coefficients: C(n,k), 10 <= k <= n-10, sorted, duplicates removed.at n=12A024762
- a(n) = binomial(n, floor((n-5)/2)).at n=26A037953
- a(n) = binomial(n, floor((n-6)/2)).at n=26A037957
- Maximum over k of the largest squarefree number dividing a value of binomial(n,k).at n=25A048681
- a(n) is the n-th primorial divided by squarefree kernel of corresponding central binomial coefficient.at n=8A056607
- a(n) = binomial(composite(n), n), where composite = A002808, composite numbers.at n=15A064813
- a(n) = max{ C(n,0), C(n-1,1), C(n-2,2), ..., C(n-n,n) }.at n=36A073028
- Staircase on Pascal's triangle.at n=16A081205
- Numerators of odd raw moments in the distribution of a triangle picked at random from points on the circumference of a unit circle.at n=4A093583
- Number triangle T(n,k)=binomial(2(n+k),4k).at n=49A111805
- a(n) = binomial(s(n), n) where s(n) = n-th semiprime.at n=9A117927
- a(n) = binomial(floor(n*(sqrt(5)+3)/2), n) for n>=0.at n=10A135963