Extension:
[8,8,1] to [39,8,9]
Number of the matrices for extension:1
{self-orthogonal  no}
Number of ones  to add in the first row in the generator matrix of the codes: 8

Weights:
9 18 27 36 
Maximal number for proportional coordinates in the output codes:Till dimension 1--39;
Till dimension 2--39;
Till dimension 3--39;
Till dimension 4--39;
Till dimension 5--39;
Till dimension 6--39;
Till dimension 7--39;
Till dimension 8--39;

 The minimum distance of the dual codes is:
2
========================

Start matrix
1 40 E
1111111100000000000000000000000100000001
0000000000000000000000000000000010000002
0000000000000000000000000000000001000003
0000000000000000000000000000000000100004
0000000000000000000000000000000000010005
0000000000000000000000000000000000001006
0000000000000000000000000000000000000107
0000000000000000000000000000000000000018
?8 39 3  _8 1
111111110000000000000000000000010000000
111222002222222222200000000000001000000
111222001112222220022000000000000100000
111222001201222201212000000000000010000
111222000000222000000222222220000001000
111222000000222000000111222002200000100
111222000000222000000120120121200000010
120120120000120000000000000000000000001
AUT: 967458816 $1z^{0}+24z^{9}+678z^{18}+5858z^{27}  dd-3$\\
?8 39 3  _8 2
111111110000000000000000000000010000000
111222002222222222200000000000001000000
111222001112222220022000000000000100000
111222001201222201212000000000000010000
120120120000120000000000000000000001000
000000000000000000000222222220000000100
000000000000000000000111222002200000010
000000000000000000000120120121200000001
AUT: 8384643072 $1z^{0}+42z^{9}+642z^{18}+5876z^{27}  dd-2$\\

DIFFERENT ENUMERATORS :2   ALL CODES: 2

    1 1 AUT: 967458816 $1z^{0}+24z^{9}+678z^{18}+5858z^{27}  dd-3$\\
    2 1 AUT: 8384643072 $1z^{0}+42z^{9}+642z^{18}+5876z^{27}  dd-2$\\