76104
domain: N
Appears in sequences
- Number of graphical partitions of 2n.at n=24A000569
- Expansion of theta series of {E_7}* lattice in powers of q^(1/2).at n=52A003781
- Expansion of theta series of E_7 lattice in powers of q^2.at n=13A004008
- Nonzero coefficients in theta series of {E_7}* lattice.at n=26A030443
- Number of binary words of length n with exactly one occurrence of the subword given by the binary expansion of n.at n=18A229905
- Number of (n+1) X (2+1) arrays of permutations of 0..n*3+2 with each element having directed index change -1,1 -1,2 1,0 or 0,-1.at n=15A264544
- Triangle T(n,m) (n >= 1, 0 <= m < n) giving coefficients of (n-1)! P_n, where P_n is the polynomial formula for row n of A213086.at n=51A273528
- Number T(n,k) of binary words of length n containing exactly k (possibly overlapping) occurrences of the subword 01101; triangle T(n,k), n>=0, k=0..max(0,floor((n-2)/3)), read by rows.at n=54A277751
- Number of binary words of length n containing exactly one occurrence of the subword 01101.at n=13A317780