66045
domain: N
Appears in sequences
- Binomial coefficient binomial(n,4) = n*(n-1)*(n-2)*(n-3)/24.at n=37A000332
- Number of intersections of diagonals in the interior of a regular n-gon.at n=36A006561
- 12-gonal (or dodecagonal) pyramidal numbers: a(n) = n*(n+1)*(10*n-7)/6.at n=34A007587
- Binomial coefficient C(37,n).at n=4A010953
- Binomial coefficient C(n,33).at n=4A010986
- Expansion of 1/((1-x)*(1-10x)*(1-11x)).at n=4A016265
- T(n,4), array T as in A050186; a count of aperiodic binary words.at n=33A050189
- Binomial coefficients binomial(2*n-3,4).at n=16A053126
- a(n) = lcm(n, n+1, n+2, n+3)/12.at n=33A067047
- Number of invertible circulant (0,1) matrices over the reals that have even determinant.at n=16A086479
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=3A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=5A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=7A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=11A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=13A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=18A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=21A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=24A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=26A104180
- Let f[n]=Prime[n+1]-Prime[n]; a(n) = Binomial[Prime[12],f[n]].at n=28A104180