Quadrantonismic chords

Quadrantonismic chords are essentially tempered dyadic chords tempered by the quadrantonisma, 1156/1155.

Quadrantonismic chords are numerous. There are seven pairs of quadrantonismic triads of inverse relationship in the no-13 21-odd-limit:

1-5/4-17/11 with steps 5/4-21/17-22/17, and its inverse
1-5/4-34/21 with steps 5/4-22/17-21/17;
1-21/16-17/11 with steps 21/16-20/17-22/17, and its inverse
1-21/16-17/10 with steps 21/16-22/17-20/17;
1-17/11-7/4 with steps 17/11-17/15-8/7, and its inverse
1-17/15-7/4 with steps 17/15-17/11-8/7;
1-17/11-15/8 with steps 17/11-17/14-16/15, and its inverse
1-17/14-15/8 with steps 17/14-17/11-15/8;
1-11/8-17/10 with steps 11/8-21/17-20/17, and its inverse
1-11/8-34/21 with steps 11/8-20/17-21/17;
1-17/14-11/8 with steps 17/14-17/15-16/11, and its inverse
1-17/15-11/8 with steps 17/15-17/14-16/11;
1-12/11-30/17 with steps 12/11-34/21-17/15, and its inverse
1-12/11-21/17 with steps 12/11-17/15-34/21.

They can be extended to the following palindromic tetrads:

1-5/4-17/11-34/21 with steps 5/4-21/17-22/21-21/17;
1-21/16-17/11-17/10 with steps 21/16-20/17-11/10-20/17;
1-17/15-17/11-7/4 with steps 17/15-15/11-17/15-7/4;
1-17/14-17/11-15/8 with steps 17/14-14/11-17/14-16/15;
1-11/8-34/21-17/10 with steps 11/8-20/17-21/20-20/17;
1-17/15-17/14-11/8 with steps 17/15-15/14-17/15-16/11;
1-12/11-21/17-30/17 with steps 12/11-17/15-10/7-17/15.

As well as the following inversely related tetrads:

1-17/14-3/2-30/17 with steps 17/14-21/17-20/17-17/15, and its inverse
1-21/17-3/2-17/10 with steps 21/17-17/14-17/15-20/17;
1-17/14-3/2-15/8 with steps 17/14-21/17-5/4-16/15, and its inverse
1-21/17-3/2-8/5 with steps 21/17-17/14-16/15-5/4;
1-21/16-3/2-17/10 with steps 21/16-8/7-17/15-20/17, and its inverse
1-8/7-3/2-30/17 with steps 8/7-21/16-20/17-17/15;
1-17/14-11/8-3/2 with steps 17/14-17/15-12/11-4/3, and its inverse
1-12/11-21/17-3/2 with steps 12/11-17/15-17/14-4/3;
1-11/8-3/2-17/10 with steps 11/8-12/11-17/15-20/17, and its inverse
1-12/11-3/2-30/17 with step 12/11-11/8-20/17-17/15;
1-5/4-17/11-7/4 with steps 5/4-21/17-17/15-8/7, and its inverse
1-21/17-17/11-30/17 with steps 21/17-5/4-8/7-17/15;
1-21/16-17/11-15/8 with steps 21/16-20/17-17/14-16/15, and its inverse
1-20/17-17/11-28/17 with steps 20/17-21/16-16/15-17/14.
1-5/4-21/16-17/11 with steps 5/4-21/20-20/17-22/17, and its inverse
1-20/17-21/17-17/11 with steps 20/17-21/20-5/4-22/17;
1-17/11-7/4-15/8 with steps 17/11-17/15-15/14-16/15, and its invere
1-17/11-28/17-30/17 with steps 17/11-16/15-15/14-17/15;
1-17/14-11/8-17/10 with steps 17/14-17/15-21/17-20/17, and its inverse
1-17/15-11/8-34/21 with steps 17/15-17/14-20/17-21/17;
1-5/4-11/8-34/21 with steps 5/4-11/10-20/17-21/17, and its inverse
1-11/10-11/8-17/10 with steps 11/10-5/4-21/17-20/17;
1-21/16-11/8-17/10 with steps 21/16-22/21-21/17-20/17 and its inverse
1-22/21-11/8-34/21 with steps 22/21-21/16-20/17-21/17;
1-17/15-11/8-7/4 with steps 17/15-17/14-14/11-8/7, and its inverse
1-17/14-11/8-11/7 with steps 17/14-17/15-8/7-14/11;
1-17/14-11/8-15/8 with steps 17/14-17/15-15/11-16/15, and its inverse
1-17/15-11/8-22/15 with steps 17/15-17/14-16/15-15/11.

For pentads, there are

1-17/14-3/2-30/17-15/8 with steps 17/14-21/17-20/17-17/16-16/15, and its inverse
1-21/17-3/2-8/5-17/10 with steps 21/17-17/14-16/15-17/16-20/17;
1-21/17-21/16-3/2-17/10 with steps 21/17-17/16-8/7-17/15-20/17, and its inverse
1-8/7-17/14-3/2-30/17 with steps 8/7-17/16-21/17-20/17-17/15;
1-17/14-11/8-3/2-15/8 with steps 17/14-17/15-12/11-5/4-16/15, and its inverse
1-12/11-21/17-3/2-8/5 with steps 12/11-17/15-17/14-16/15-5/4;
1-21/16-11/8-3/2-17/10 with steps 21/16-22/21-12/11-17/15-20/17, and its inverse
1-12/11-8/7-3/2-30/17 with steps 12/11-22/21-21/16-20/17-17/15;
1-17/14-11/8-3/2-17/10 with steps 17/14-17/15-12/11-17/15-20/17, and its inverse
1-12/11-21/17-3/2-30/17 with steps 12/11-17/15-17/14-20/17-17/15.