A022187 Triangle of Gaussian binomial coefficients [ n,k ] for q = 23.
1, 1, 1, 1, 24, 1, 1, 553, 553, 1, 1, 12720, 293090, 12720, 1, 1, 292561, 155057330, 155057330, 292561, 1, 1, 6728904, 82025620131, 1886737591440, 82025620131, 6728904, 1, 1, 154764793, 43391559778203, 22956018300670611
Offset: 0
References
- F. J. MacWilliams and N. J. A. Sloane, The Theory of Error-Correcting Codes, Elsevier-North Holland, 1978, p. 698.
Links
- G. C. Greubel, rows n=0..50 of triangle, flattened
- Kent E. Morrison, Integer Sequences and Matrices Over Finite Fields, Journal of Integer Sequences, Vol. 9 (2006), Article 06.2.1.
Crossrefs
Row sums give A015215.
Programs
-
Mathematica
Table[QBinomial[n,k,23], {n,0,10}, {k,0,n}]//Flatten (* or *) q:= 23; T[n_, 0]:= 1; T[n_,n_]:= 1; T[n_,k_]:= T[n,k] = If[k < 0 || n < k, 0, T[n-1, k -1] +q^k*T[n-1,k]]; Table[T[n,k], {n,0,10}, {k,0,n}] // Flatten (* G. C. Greubel, May 30 2018 *) -
PARI
{q=23; T(n,k) = if(k==0,1, if (k==n, 1, if (k<0 || n
Formula
T(n,k) = T(n-1,k-1) + q^k * T(n-1,k), with q=23. - G. C. Greubel, May 30 2018