35960
domain: N
Appears in sequences
- Binomial coefficient binomial(n,4) = n*(n-1)*(n-2)*(n-3)/24.at n=32A000332
- Binomial coefficient C(2n,n-12).at n=4A004318
- Binomial coefficient C(4n,n-4).at n=4A004334
- Binomial coefficient C(8n,n).at n=4A004381
- Binomial coefficient C(32,n).at n=4A010948
- Binomial coefficient C(n,28).at n=4A010981
- a(n) = floor(n*(n-1)*(n-2)*(n-3)/21).at n=31A011931
- Theta series of D*_31 lattice.at n=12A022084
- Number of partitions of n that do not contain 3 as a part.at n=45A027337
- Binomial coefficients C(2*n+4,4).at n=14A053134
- a(n) = binomial(4*n,4).at n=7A060541
- a(n) = binomial(n,floor(n/7)).at n=32A062947
- a(n) = lcm(n, n+1, n+2, n+3)/12.at n=28A067047
- a(n) = binomial(sigma(n),tau(n)), where sigma(n) is the sum and tau(n) the number of divisors of n (A000203, A000005).at n=20A068904
- First differences of A048093.at n=31A084919
- Numbers n such that 2*p(n)+3, 2*p(n+1)+3, 2*p(n+2)+3 are consecutive primes, where p(i) denotes the i-th prime.at n=26A088066
- Number of partitions of n-th composite number not containing the smallest prime factor.at n=29A091094
- a(n) = binomial(2^n, n-1).at n=4A101346
- a(n) = phi(Padovan(n+4)).at n=41A107797
- Weight enumerator of [32,31,2] Reed-Muller code RM(4,5).at n=2A110847