170064
domain: N
Appears in sequences
- Number of ways of writing n as a sum of 24 squares.at n=4A000156
- Least positive unitary linear combination of distinct numbers in row n of Pascal's triangle; i.e., least positive sum of form d(0)C(n-1,0) + d(1)C(n-1,1) + ...+ d(m)C(n-1,m), d(i)=+-1, m = floor((n+1)/2).at n=43A004795
- Theta series of Niemeier lattice of type D_24.at n=2A008688
- Theta series of D_24 lattice.at n=2A022055
- Theta series of D*_24 lattice.at n=4A022077
- Triangle of trinomial logarithmic coefficients: A027907(n,k) = Sum_{i=0..k} T(k,i)*n^i/k!.at n=47A136590
- Column 2 of triangle A136590.at n=7A136592
- Integers N such that the digits of N occur starting at the N-th place in N^N.at n=8A159003
- Expansion of theta_4(q)^24 in powers of q = exp(Pi i t).at n=4A319309
- a(n) = (2/3)*n*(n^3 - 6*n^2 + 11*n - 3).at n=24A319575