September chords: Difference between revisions

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'''September chords''' are [[Dyadic chord|essentially tempered dyadic chords]] tempered by the september comma, [[715/714]].

~~September temperament contains many possibilities for essentially tempered dyadic chords including~~ 20 triads ~~in the~~ [[17-odd-limit]].

There are 20 triads, 76 tetrads, 60 pentads, and 10 hexads as [[17-odd-limit]] essentially tempered chords.

For triads, there are 10 pairs of chords in inverse relationship~~. The inversely related pairs of chords are~~:

For triads, there are 10 pairs of chords in inverse relationship:

* 1-14/11-5/3 ~~chord with~~ steps of 14/11-17/13-6/5 ~~and~~ 1-6/5-11/7 ~~chord with~~ steps of 6/5-17/13-14/11;

{| class="wikitable center-all"

* 1-12/11-10/7 ~~chord with~~ steps of 12/11-17/13-7/5 ~~and~~ 1-7/5-11/6 ~~chord with~~ steps of 7/5-17/13-12/11;

|-

* 1-14/13-5/3 ~~chord with~~ steps of 14/13-17/11-6/5 ~~and~~ 1-6/5-13/7 ~~chord with~~ steps of 6/5-17/11-14/13;

! colspan="2" | Inversely related pairs of triads

* 1-13/12-7/5 ~~chord with~~ steps of 13/12-22/17-10/7 ~~and~~ 1-10/7-24/13 ~~chord with~~ steps of 10/7-22/17-13/12;

|-

* 1-13/12-14/11 ~~chord with~~ steps of 13/12-20/17-11/7 ~~and~~ 1-11/7-24/13 ~~chord with~~ steps of 11/7-20/17-13/12;

| 1 – 14/11 – 5/3 (steps 14/11, 17/13, 6/5) || 1 – 6/5 – 11/7 (steps 6/5, 17/13, 14/11)

* 1-12/11-13/7 ~~chord with~~ steps of 12/11-17/10-14/13 ~~and~~ 1-14/13-11/6 ~~chord with~~ steps of 14/13-17/10-12/11;

|-

* 1-11/9-17/13 ~~chord with~~ steps of 11/9-15/14-26/17 ~~and~~ 1-15/14-17/13 ~~chord with~~ steps of 15/14-11/9-26/17;

| 1 – 12/11 – 10/7 (steps 12/11, 17/13, 7/5) || 1 – 7/5 – 11/6 (steps 7/5, 17/13, 12/11)

* 1-13/9-17/11 ~~chord with~~ steps of 13/9-15/14-22/17 ~~and~~ 1-15/14-17/11 ~~chord with~~ steps of 15/14-13/9-22/17;

|-

* 1-14/11-13/9 ~~chord with~~ steps of 14/11-17/15-18/13 ~~and~~ 1-18/13-11/7 ~~chord with~~ steps of 18/13-17/15-14/11;

| 1 – 14/13 – 5/3 (steps 14/13, 17/11, 6/5) || 1 – 6/5 – 13/7 (steps 6/5, 17/11, 14/13)

* 1-18/11-13/7 ~~chord with~~ steps of 18/11-17/15-14/13 ~~and~~ 1-14/13-11/9 ~~chord with~~ steps of 14/13-17/15-18/11.

|-

| 1 – 13/12 – 7/5 (steps 13/12, 22/17, 10/7) || 1 – 10/7 – 24/13 (steps 10/7, 22/17, 13/12)

|-

| 1 – 13/12 – 14/11 (steps 13/12, 20/17, 11/7) || 1 – 11/7 – 24/13 (steps 11/7, 20/17, 13/12)

|-

| 1 – 12/11 – 13/7 (steps 12/11, 17/10, 14/13) || 1 – 14/13 – 11/6 (steps 14/13, 17/10, 12/11)

|-

| 1 – 11/9 – 17/13 (steps 11/9, 15/14, 26/17) || 1 – 15/14 – 17/13 (steps 15/14, 11/9, 26/17)

|-

| 1 – 13/9 – 17/11 (steps 13/9, 15/14, 22/17) || 1 – 15/14 – 17/11 (steps 15/14, 13/9, 22/17)

|-

| 1 – 14/11 – 13/9 (steps 14/11, 17/15, 18/13) || 1 – 18/13 – 11/7 (steps 18/13, 17/15, 14/11)

|-

| 1 – 18/11 – 13/7 (steps 18/11, 17/15, 14/13) || 1 – 14/13 – 11/9 (steps 14/13, 17/15, 18/11)

|}

~~Equal temperaments with september~~ chords ~~include {{EDOs|31, 41, 46, 72, 87, 94, 103, 111, 121, 140, 183, 224 and 270}}.~~

For tetrads, there are 38 pairs of chords in inverse relationship:

[[Category:17-odd-limit]]

{| class="wikitable center-all"

|-

! colspan="2" | Inversely related pairs of tetrads

|-

| 1 – 13/12 – 7/5 – 3/2 (steps 13/12, 22/17, 15/14, 4/3) || 1 – 15/14 – 18/13 – 3/2 (steps 15/14, 22/17, 13/12, 4/3)

|-

| 1 – 7/5 – 3/2 – 11/6 (steps 7/5, 15/14, 11/9, 12/11) || 1 – 15/14 – 3/2 – 18/11 (steps 15/14, 7/5, 12/11, 11/9)

|-

| 1 – 18/13 – 3/2 – 30/17 (steps 18/13, 13/12, 20/17, 17/15) || 1 – 13/12 – 3/2 – 17/10 (steps 13/12, 18/13, 17/15, 20/17)

|-

| 1 – 17/15 – 11/9 – 4/3 (steps 17/15, 14/13, 12/11, 3/2) || 1 – 12/11 – 20/17 – 4/3 (steps 12/11, 14/13, 17/15, 3/2)

|-

| 1 – 14/11 – 14/9 – 5/3 (steps 14/11, 11/9, 15/14, 6/5) || 1 – 6/5 – 9/7 – 11/7 (steps 6/5, 15/14, 11/9, 14/11)

|-

| 1 – 14/11 – 17/11 – 5/3 (steps 14/11, 17/14, 14/13, 6/5) || 1 – 6/5 – 22/17 – 11/7 (steps 6/5, 14/13, 17/14, 14/11)

|-

| 1 – 14/11 – 13/9 – 5/3 (steps 14/11, 17/15, 15/13, 6/5) || 1 – 6/5 – 18/13 – 11/7 (steps 6/5, 15/13, 17/15, 14/11)

|-

| 1 – 14/11 – 15/11 – 5/3 (steps 14/11, 15/14, 11/9, 6/5) || 1 – 6/5 – 22/15 – 11/7 (steps 6/5, 11/9, 15/14, 14/11)

|-

| 1 – 9/7 – 18/13 – 11/7 (steps 9/7, 14/13, 17/15, 14/11) || 1 – 14/11 – 13/9 – 14/9 (steps 14/11, 17/15, 14/13, 9/7)

|-

| 1 – 14/11 – 13/9 – 17/11 (steps 14/11, 17/15, 15/14, 22/17) || 1 – 22/17 – 18/13 – 11/7 (steps 22/17, 15/14, 17/15, 14/11)

|-

| 1 – 17/14 – 10/7 – 17/11 (steps 17/14, 20/17, 13/12, 22/17) || 1 – 17/14 – 11/7 – 17/10 (steps 17/14, 22/17, 13/12, 20/17)

|-

| 1 – 13/11 – 13/9 – 17/11 (steps 13/11, 11/9, 15/14, 22/17) || 1 – 15/14 – 17/13 – 17/11 (steps 15/14, 11/9, 13/11, 22/17)

|-

| 1 – 17/15 – 13/9 – 17/11 (steps 17/15, 14/11, 15/14, 22/17) || 1 – 17/15 – 22/15 – 11/7 (steps 17/15, 22/17, 15/14, 14/11)

|-

| 1 – 17/13 – 17/12 – 11/6 (steps 17/13, 13/12, 22/17, 12/11) || 1 – 13/12 – 17/12 – 17/11 (steps 13/12, 17/13, 12/11, 22/17)

|-

| 1 – 17/13 – 17/11 – 5/3 (steps 17/13, 13/11, 14/13, 6/5) || 1 – 6/5 – 22/17 – 26/17 (steps 6/5, 14/13, 13/11, 17/13)

|-

| 1 – 17/13 – 20/13 – 5/3 (steps 17/13, 20/17, 13/12, 6/5) || 1 – 6/5 – 13/10 – 26/17 (steps 6/5, 13/12, 20/17, 17/13)

|-

| 1 – 17/13 – 10/7 – 5/3 (steps 17/13, 12/11, 7/6, 6/5) || 1 – 6/5 – 7/5 – 26/17 (steps 6/5, 7/6, 12/11, 17/13)

|-

| 1 – 17/13 – 17/12 – 5/3 (steps 17/13, 13/12, 20/17, 6/5) || 1 – 6/5 – 24/17 – 26/17 (steps 6/5, 20/17, 13/12, 17/13)

|-

| 1 – 17/13 – 5/3 – 17/9 (steps 17/13, 14/11, 17/15, 18/17) || 1 – 17/13 – 18/13 – 11/7 (steps 17/13, 18/17, 17/15, 14/11)

|-

| 1 – 17/13 – 5/3 – 11/6 (steps 17/13, 14/11, 11/10, 12/11) || 1 – 17/13 – 10/7 – 11/7 (steps 17/13, 12/11, 11/10, 14/11)

|-

| 1 – 17/13 – 17/10 – 11/6 (steps 17/13, 13/10, 14/13, 12/11) || 1 – 14/13 – 7/5 – 11/6 (steps 14/13, 13/10, 17/13, 12/11)

|-

| 1 – 17/13 – 22/13 – 11/6 (steps 17/13, 22/17, 13/12, 12/11) || 1 – 13/12 – 7/5 – 11/6 (steps 13/12, 22/17, 17/13, 12/11)

|-

| 1 – 15/11 – 17/11 – 5/3 (steps 15/11, 17/15, 14/13, 6/5) || 1 – 6/5 – 22/17 – 22/15 (steps 6/5, 14/13, 17/15, 15/11)

|-

| 1 – 13/11 – 14/11 – 13/9 (steps 13/11, 14/13, 17/15, 18/13) || 1 – 17/15 – 11/9 – 13/9 (steps 17/15, 14/13, 13/11, 18/13)

|-

| 1 – 7/5 – 17/10 – 11/6 (steps 7/5, 17/14, 14/13, 12/11) || 1 – 17/14 – 17/10 – 13/7 (steps 17/14, 7/5, 12/11, 14/13)

|-

| 1 – 17/12 – 17/10 – 11/6 (steps 17/12, 6/5, 14/13, 12/11) || 1 – 6/5 – 17/10 – 13/7 (steps 6/5, 17/12, 12/11, 14/13)

|-

| 1 – 6/5 – 22/17 – 7/5 (steps 6/5, 14/13, 13/12, 10/7) || 1 – 13/12 – 7/6 – 7/5 (steps 13/12, 14/13, 6/5, 10/7)

|-

| 1 – 11/10 – 22/17 – 7/5 (steps 11/10, 20/17, 13/12, 10/7) || 1 – 13/12 – 14/11 – 7/5 (steps 13/12, 20/17, 11/10, 10/7)

|-

| 1 – 13/12 – 13/10 – 7/5 (steps 13/12, 6/5, 14/13, 10/7) || 1 – 14/13 – 22/17 – 7/5 (steps 14/13, 6/5, 13/12, 10/7)

|-

| 1 – 13/9 – 17/11 – 17/9 (steps 13/9, 15/14, 11/9, 18/17) || 1 – 11/9 – 17/13 – 17/9 (steps 11/9, 15/14, 13/9, 18/17)

|-

| 1 – 13/9 – 17/11 – 13/7 (steps 13/9, 15/14, 6/5, 14/13) || 1 – 15/14 – 17/11 – 5/3 (steps 15/14, 13/9, 14/13, 6/5)

|-

| 1 – 13/9 – 17/11 – 5/3 (steps 13/9, 15/14, 14/13, 6/5) || 1 – 14/13 – 15/13 – 5/3 (steps 14/13, 15/14, 13/9, 6/5)

|-

| 1 – 17/15 – 11/9 – 17/13 (steps 17/15, 14/13, 15/14, 26/17) || 1 – 15/14 – 15/13 – 17/13 (steps 15/14, 14/13, 17/15, 26/17)

|-

| 1 – 14/13 – 11/9 – 17/13 (steps 14/13, 17/15, 15/,14 26/17) || 1 – 15/14 – 17/14 – 17/13 (steps 15/14, 17/15, 14/13, 26/17)

|-

| 1 – 17/11 – 5/3 – 17/9 (steps 17/11, 14/13, 17/15, 18/17) || 1 – 17/15 – 11/9 – 17/9 (steps 17/15, 14/13, 17/11, 18/17)

|-

| 1 – 17/11 – 17/10 – 13/7 (steps 17/11, 11/10, 12/11, 14/13) || 1 – 12/11 – 6/5 – 13/7 (steps 12/11, 11/10, 17/11, 14/13)

|-

| 1 – 11/7 – 17/10 – 13/7 (steps 11/7, 13/12, 12/11, 14/13) || 1 – 13/12 – 17/10 – 11/6 (steps 13/12, 11/7, 14/13, 12/11)

|-

| 1 – 11/7 – 17/10 – 11/6 (steps 11/7, 13/12, 14/13, 12/11) || 1 – 13/12 – 17/10 – 13/7 (steps 13/12, 11/7, 12/11, 14/13)

|}

For pentads, there are 30 pairs of chords in inverse relationship:

{| class="wikitable center-all"

|-

! colspan="2" | Inversely related pairs of pentads

|-

| 1 – 13/12 – 13/10 – 7/5 – 3/2 (steps 13/12, 6/5, 14/13, 15/14, 4/3) || 1 – 15/14 – 15/13 – 18/13 – 3/2 (steps 15/14, 14/13, 6/5, 13/12, 4/3)

|-

| 1 – 13/12 – 7/6 – 7/5 – 3/2 (steps 13/12, 14/13, 6/5, 15/14, 4/3) || 1 – 15/14 – 9/7 – 18/13 – 3/2 (steps 15/14, 6/5, 14/13, 13/12, 4/3)

|-

| 1 – 7/6 – 7/5 – 3/2 – 11/6 (steps 7/6, 6/5, 15/14, 11/9, 12/11) || 1 – 15/14 – 9/7 – 3/2 – 18/11 (steps 15/14, 6/5, 7/6, 12/11, 11/9)

|-

| 1 – 15/13 – 18/13 – 3/2 – 30/17 (steps 15/13, 6/5, 13/12, 20/17, 17/15) || 1 – 13/12 – 13/10 – 3/2 – 17/10 (steps 13/12, 6/5, 15/13, 17/15, 20/17)

|-

| 1 – 11/10 – 7/5 – 3/2 – 11/6 (steps 11/10, 14/11, 15/14, 11/9, 12/11) || 1 – 15/14 – 15/11 – 3/2 – 18/11 (steps 15/14, 14/11, 11/10, 12/11, 11/9)

|-

| 1 – 13/12 – 17/12 – 3/2 – 17/10 (steps 13/12, 17/13, 18/17, 17/15, 20/17) || 1 – 18/17 – 18/13 – 3/2 – 30/17 (steps 18/17, 17/13, 13/12, 20/17, 17/15)

|-

| 1 – 13/12 – 7/5 – 3/2 – 11/6 (steps 13/12, 22/17, 15/14, 11/9, 12/11) || 1 – 15/14 – 18/13 – 3/2 – 18/11 (steps 15/14, 22/17, 13/12, 12/11, 11/9)

|-

| 1 – 13/12 – 7/5 – 3/2 – 17/10 (steps 13/12, 22/17, 15/14, 17/15, 20/17) || 1 – 15/14 – 18/13 – 3/2 – 30/17 (steps 15/14, 22/17, 13/12, 20/17, 17/15)

|-

| 1 – 17/12 – 3/2 – 17/10 – 11/6 (steps 17/12, 18/17, 17/15, 14/13, 12/11) || 1 – 18/17 – 3/2 – 18/11 – 30/17 (steps 18/17, 17/12, 12/11, 14/13, 17/15)

|-

| 1 – 7/5 – 3/2 – 17/10 – 11/6 (steps 7/5, 15/14, 17/15, 14/13, 12/11) || 1 – 15/14 – 3/2 – 18/11 – 30/17 (steps 15/14, 7/5, 12/11, 14/13, 17/15)

|-

| 1 – 18/13 – 3/2 – 18/11 – 30/17 (steps 18/13, 13/12, 12/11, 14/13, 17/15) || 1 – 13/12 – 3/2 – 17/10 – 11/6 (steps 13/12, 18/13, 17/15, 14/13, 12/11)

|-

| 1 – 15/11 – 3/2 – 18/11 – 30/17 (steps 15/11, 11/10, 12/11, 14/13, 17/15) || 1 – 11/10 – 3/2 – 17/10 – 11/6 (steps 11/10, 15/11, 17/15, 14/13, 12/11)

|-

| 1 – 13/12 – 14/11 – 17/11 – 5/3 (steps 13/12, 20/17, 17/14, 14/13, 6/5) || 1 – 14/13 – 17/13 – 20/13 – 5/3 (steps 14/13, 17/14, 20/17, 13/12, 6/5)

|-

| 1 – 14/13 – 14/11 – 14/9 – 5/3 (steps 14/13, 13/11, 11/9, 15/14, 6/5) || 1 – 15/14 – 17/13 – 17/11 – 5/3 (steps 15/14, 11/9, 13/11, 14/13, 6/5)

|-

| 1 – 17/14 – 17/13 – 10/7 – 11/7 (steps 17/14, 14/13, 12/11, 11/10, 14/11) || 1 – 11/10 – 6/5 – 22/17 – 11/7 (steps 11/10, 12/11, 14/13, 17/14, 14/11)

|-

| 1 – 6/5 – 22/17 – 22/15 – 11/7 (steps 6/5, 14/13, 17/15, 15/14, 14/11) || 1 – 15/14 – 17/14 – 17/13 – 11/7 (steps 15/14, 17/15, 14/13, 6/5, 14/11)

|-

| 1 – 6/5 – 22/17 – 18/13 – 11/7 (steps 6/5, 14/13, 15/14, 17/15, 14/11) || 1 – 17/15 – 17/14 – 17/13 – 11/7 (steps 17/15, 15/14, 14/13, 6/5, 14/11)

|-

| 1 – 6/5 – 9/7 – 18/13 – 11/7 (steps 6/5, 15/14, 14/13, 17/15, 14/11) || 1 – 17/15 – 11/9 – 17/13 – 11/7 (steps 17/15, 14/13, 15/14, 6/5, 14/11)

|-

| 1 – 17/15 – 11/9 – 22/15 – 11/7 (steps 17/15, 14/13, 6/5, 15/14, 14/11) || 1 – 15/14 – 9/7 – 18/13 – 11/7 (steps 15/14, 6/5, 14/13, 17/15, 14/11)

|-

| 1 – 17/15 – 6/5 – 22/15 – 11/7 (steps 17/15, 18/17, 11/9, 15/14, 14/11) || 1 – 15/14 – 17/13 – 18/13 – 11/7 (steps 15/14, 11/9, 18/17, 17/15, 14/11)

|-

| 1 – 17/14 – 17/13 – 10/7 – 17/11 (steps 17/14, 14/13, 12/11, 13/12, 22/17) || 1 – 13/12 – 13/11 – 14/11 – 17/11 (steps 13/12, 12/11, 14/13, 17/14, 22/17)

|-

| 1 – 13/11 – 14/11 – 13/9 – 17/11 (steps 13/11, 14/13, 17/15, 15/14, 22/17) || 1 – 15/14 – 17/14 – 17/13 – 17/11 (steps 15/14, 17/15, 14/13, 13/11, 22/17)

|-

| 1 – 17/13 – 17/11 – 5/3 – 17/9 (steps 17/13, 13/11, 14/13, 17/15, 18/17) || 1 – 13/11 – 17/11 – 18/11 – 13/7 (steps 13/11, 17/13, 18/17, 17/15, 14/13)

|-

| 1 – 17/13 – 17/12 – 5/3 – 11/6 (steps 17/13, 13/12, 20/17, 11/10, 12/11) || 1 – 13/12 – 17/12 – 17/11 – 17/10 (steps 13/12, 17/13, 12/11, 11/10, 20/17)

|-

| 1 – 17/13 – 10/7 – 17/11 – 5/3 (steps 17/13, 12/11, 13/12, 14/13, 6/5) || 1 – 14/13 – 7/6 – 14/11 – 5/3 (steps 14/13, 13/12, 12/11, 17/13, 6/5)

|-

| 1 – 17/13 – 10/7 – 20/13 – 5/3 (steps 17/13, 12/11, 14/13, 13/12, 6/5) || 1 – 13/12 – 7/6 – 14/11 – 5/3 (steps 13/12, 14/13, 12/11, 17/13, 6/5)

|-

| 1 – 17/13 – 17/12 – 17/11 – 5/3 (steps 17/13, 13/12, 12/11, 14/13, 6/5) || 1 – 14/13 – 20/17 – 14/11 – 5/3 (steps 14/13, 12/11, 13/12, 17/13, 6/5)

|-

| 1 – 13/12 – 17/12 – 17/11 – 5/3 (steps 13/12, 17/13, 12/11, 14/13, 6/5) || 1 – 14/13 – 20/17 – 20/13 – 5/3 (steps 14/13, 12/11, 17/13, 13/12, 6/5)

|-

| 1 – 13/9 – 17/11 – 5/3 – 17/9 (steps 13/9, 15/14, 14/13, 17/15, 18/17) || 1 – 17/15 – 11/9 – 17/13 – 17/9 (steps 17/15, 14/13, 15/14, 13/9, 18/17)

|-

| 1 – 11/10 – 6/5 – 22/17 – 7/5 (steps 11/10, 12/11, 14/13, 13/12, 10/7) || 1 – 13/12 – 7/6 – 14/11 – 7/5 (steps 13/12, 14/13, 12/11, 11/10, 10/7)

|}

For hexads, there are 5 pairs of chords in inverse relationship:

{| class="wikitable center-all"

|-

! colspan="2" | Inversely related pairs of hexads

|-

| 1 – 13/12 – 13/10 – 7/5 – 3/2 – 17/10 (steps 13/12, 6/5, 14/13, 15/14, 17/15, 20/17) || 1 – 15/14 – 15/13 – 18/13 – 3/2 – 30/17 (steps 15/14, 14/13, 6/5, 13/12, 20/17, 17/15)

|-

| 1 – 13/12 – 7/6 – 7/5 – 3/2 – 11/6 (steps 13/12, 14/13, 6/5, 15/14, 11/9, 12/11) || 1 – 15/14 – 9/7 – 18/13 – 3/2 – 18/11 (steps 15/14, 6/5, 14/13, 13/12, 12/11, 11/9)

|-

| 1 – 11/10 – 7/5 – 3/2 – 17/10 – 11/6 (steps 11/10, 14/11, 15/14, 17/15, 14/13, 12/11) || 1 – 15/14 – 15/11 – 3/2 – 18/11 – 30/17 (steps 15/14, 14/11, 11/10, 12/11, 14/13, 17/15)

|-

| 1 – 13/12 – 17/12 – 3/2 – 17/10 – 11/6 (steps 13/12, 17/13, 18/17, 17/15, 14/13, 12/11) || 1 – 18/17 – 18/13 – 3/2 – 18/11 – 30/17 (steps 18/17, 17/13, 13/12, 12/11, 14/13, 17/15)

|-

| 1 – 13/12 – 7/5 – 3/2 – 17/10 – 11/6 (steps 13/12, 22/17, 15/14, 17/15, 14/13, 12/11) || 1 – 15/14 – 18/13 – 3/2 – 18/11 – 30/17 (steps 15/14, 22/17, 13/12, 12/11, 14/13, 17/15)

|}

Equal temperaments with september chords include {{EDOs| 31, 41, 46, 72, 87, 94, 103, 111, 121, 140, 183, 224 and 270 }}.

[[Category:17-odd-limit chords]]

[[Category:Essentially tempered chords]]

[[Category:Triads]]

[[Category:Tetrads]]

[[Category:Pentads]]

[[Category:Hexads]]

[[Category:September]]

@@ Line 1: / Line 1: @@
 '''September chords''' are [[Dyadic chord|essentially tempered dyadic chords]] tempered by the september comma, [[715/714]].
-September temperament contains many possibilities for essentially tempered dyadic chords including 20 triads in the [[17-odd-limit]].
+There are 20 triads, 76 tetrads, 60 pentads, and 10 hexads as [[17-odd-limit]] essentially tempered chords.
-For triads, there are 10 pairs of chords in inverse relationship. The inversely related pairs of chords are:
+For triads, there are 10 pairs of chords in inverse relationship:
-* 1-14/11-5/3 chord with steps of 14/11-17/13-6/5 and 1-6/5-11/7 chord with steps of 6/5-17/13-14/11;
+{| class="wikitable center-all"
-* 1-12/11-10/7 chord with steps of 12/11-17/13-7/5 and 1-7/5-11/6 chord with steps of 7/5-17/13-12/11;
+|-
-* 1-14/13-5/3 chord with steps of 14/13-17/11-6/5 and 1-6/5-13/7 chord with steps of 6/5-17/11-14/13;
+! colspan="2" | Inversely related pairs of triads
-* 1-13/12-7/5 chord with steps of 13/12-22/17-10/7 and 1-10/7-24/13 chord with steps of 10/7-22/17-13/12;
+|-
-* 1-13/12-14/11 chord with steps of 13/12-20/17-11/7 and 1-11/7-24/13 chord with steps of 11/7-20/17-13/12;
+| 1 – 14/11 – 5/3 <br>(steps 14/11, 17/13, 6/5) || 1 – 6/5 – 11/7 <br>(steps 6/5, 17/13, 14/11)
-* 1-12/11-13/7 chord with steps of 12/11-17/10-14/13 and 1-14/13-11/6 chord with steps of 14/13-17/10-12/11;
+|-
-* 1-11/9-17/13 chord with steps of 11/9-15/14-26/17 and 1-15/14-17/13 chord with steps of 15/14-11/9-26/17;
+| 1 – 12/11 – 10/7 <br>(steps 12/11, 17/13, 7/5) || 1 – 7/5 – 11/6 <br>(steps 7/5, 17/13, 12/11)
-* 1-13/9-17/11 chord with steps of 13/9-15/14-22/17 and 1-15/14-17/11 chord with steps of 15/14-13/9-22/17;
+|-
-* 1-14/11-13/9 chord with steps of 14/11-17/15-18/13 and 1-18/13-11/7 chord with steps of 18/13-17/15-14/11;
+| 1 – 14/13 – 5/3 <br>(steps 14/13, 17/11, 6/5) || 1 – 6/5 – 13/7 <br>(steps 6/5, 17/11, 14/13)
-* 1-18/11-13/7 chord with steps of 18/11-17/15-14/13 and 1-14/13-11/9 chord with steps of 14/13-17/15-18/11.
+|-
+| 1 – 13/12 – 7/5 <br>(steps 13/12, 22/17, 10/7) || 1 – 10/7 – 24/13 <br>(steps 10/7, 22/17, 13/12)
+|-
+| 1 – 13/12 – 14/11 <br>(steps 13/12, 20/17, 11/7) || 1 – 11/7 – 24/13 <br>(steps 11/7, 20/17, 13/12)
+|-
+| 1 – 12/11 – 13/7 <br>(steps 12/11, 17/10, 14/13) || 1 – 14/13 – 11/6 <br>(steps 14/13, 17/10, 12/11)
+|-
+| 1 – 11/9 – 17/13 <br>(steps 11/9, 15/14, 26/17) || 1 – 15/14 – 17/13 <br>(steps 15/14, 11/9, 26/17)
+|-
+| 1 – 13/9 – 17/11 <br>(steps 13/9, 15/14, 22/17) || 1 – 15/14 – 17/11 <br>(steps 15/14, 13/9, 22/17)
+|-
+| 1 – 14/11 – 13/9 <br>(steps 14/11, 17/15, 18/13) || 1 – 18/13 – 11/7 <br>(steps 18/13, 17/15, 14/11)
+|-
+| 1 – 18/11 – 13/7 <br>(steps 18/11, 17/15, 14/13) || 1 – 14/13 – 11/9 <br>(steps 14/13, 17/15, 18/11)
+|}
-Equal temperaments with september chords include {{EDOs|31, 41, 46, 72, 87, 94, 103, 111, 121, 140, 183, 224 and 270}}.
+For tetrads, there are 38 pairs of chords in inverse relationship:
-[[Category:17-odd-limit]]
+{| class="wikitable center-all"
+|-
+! colspan="2" | Inversely related pairs of tetrads
+|-
+| 1 – 13/12 – 7/5 – 3/2 <br>(steps 13/12, 22/17, 15/14, 4/3) || 1 – 15/14 – 18/13 – 3/2 <br>(steps 15/14, 22/17, 13/12, 4/3)
+|-
+| 1 – 7/5 – 3/2 – 11/6 <br>(steps 7/5, 15/14, 11/9, 12/11) || 1 – 15/14 – 3/2 – 18/11 <br>(steps 15/14, 7/5, 12/11, 11/9)
+|-
+| 1 – 18/13 – 3/2 – 30/17 <br>(steps 18/13, 13/12, 20/17, 17/15) || 1 – 13/12 – 3/2 – 17/10 <br>(steps 13/12, 18/13, 17/15, 20/17)
+|-
+| 1 – 17/15 – 11/9 – 4/3 <br>(steps 17/15, 14/13, 12/11, 3/2) || 1 – 12/11 – 20/17 – 4/3 <br>(steps 12/11, 14/13, 17/15, 3/2)
+|-
+| 1 – 14/11 – 14/9 – 5/3 <br>(steps 14/11, 11/9, 15/14, 6/5) || 1 – 6/5 – 9/7 – 11/7 <br>(steps 6/5, 15/14, 11/9, 14/11)
+|-
+| 1 – 14/11 – 17/11 – 5/3 <br>(steps 14/11, 17/14, 14/13, 6/5) || 1 – 6/5 – 22/17 – 11/7 <br>(steps 6/5, 14/13, 17/14, 14/11)
+|-
+| 1 – 14/11 – 13/9 – 5/3 <br>(steps 14/11, 17/15, 15/13, 6/5) || 1 – 6/5 – 18/13 – 11/7 <br>(steps 6/5, 15/13, 17/15, 14/11)
+|-
+| 1 – 14/11 – 15/11 – 5/3 <br>(steps 14/11, 15/14, 11/9, 6/5) || 1 – 6/5 – 22/15 – 11/7 <br>(steps 6/5, 11/9, 15/14, 14/11)
+|-
+| 1 – 9/7 – 18/13 – 11/7 <br>(steps 9/7, 14/13, 17/15, 14/11) || 1 – 14/11 – 13/9 – 14/9 <br>(steps 14/11, 17/15, 14/13, 9/7)
+|-
+| 1 – 14/11 – 13/9 – 17/11 <br>(steps 14/11, 17/15, 15/14, 22/17) || 1 – 22/17 – 18/13 – 11/7 <br>(steps 22/17, 15/14, 17/15, 14/11)
+|-
+| 1 – 17/14 – 10/7 – 17/11 <br>(steps 17/14, 20/17, 13/12, 22/17) || 1 – 17/14 – 11/7 – 17/10 <br>(steps 17/14, 22/17, 13/12, 20/17)
+|-
+| 1 – 13/11 – 13/9 – 17/11 <br>(steps 13/11, 11/9, 15/14, 22/17) || 1 – 15/14 – 17/13 – 17/11 <br>(steps 15/14, 11/9, 13/11, 22/17)
+|-
+| 1 – 17/15 – 13/9 – 17/11 <br>(steps 17/15, 14/11, 15/14, 22/17) || 1 – 17/15 – 22/15 – 11/7 <br>(steps 17/15, 22/17, 15/14, 14/11)
+|-
+| 1 – 17/13 – 17/12 – 11/6 <br>(steps 17/13, 13/12, 22/17, 12/11) || 1 – 13/12 – 17/12 – 17/11 <br>(steps 13/12, 17/13, 12/11, 22/17)
+|-
+| 1 – 17/13 – 17/11 – 5/3 <br>(steps 17/13, 13/11, 14/13, 6/5) || 1 – 6/5 – 22/17 – 26/17 <br>(steps 6/5, 14/13, 13/11, 17/13)
+|-
+| 1 – 17/13 – 20/13 – 5/3 <br>(steps 17/13, 20/17, 13/12, 6/5) || 1 – 6/5 – 13/10 – 26/17 <br>(steps 6/5, 13/12, 20/17, 17/13)
+|-
+| 1 – 17/13 – 10/7 – 5/3 <br>(steps 17/13, 12/11, 7/6, 6/5) || 1 – 6/5 – 7/5 – 26/17 <br>(steps 6/5, 7/6, 12/11, 17/13)
+|-
+| 1 – 17/13 – 17/12 – 5/3 <br>(steps 17/13, 13/12, 20/17, 6/5) || 1 – 6/5 – 24/17 – 26/17 <br>(steps 6/5, 20/17, 13/12, 17/13)
+|-
+| 1 – 17/13 – 5/3 – 17/9 <br>(steps 17/13, 14/11, 17/15, 18/17) || 1 – 17/13 – 18/13 – 11/7 <br>(steps 17/13, 18/17, 17/15, 14/11)
+|-
+| 1 – 17/13 – 5/3 – 11/6 <br>(steps 17/13, 14/11, 11/10, 12/11) || 1 – 17/13 – 10/7 – 11/7 <br>(steps 17/13, 12/11, 11/10, 14/11)
+|-
+| 1 – 17/13 – 17/10 – 11/6 <br>(steps 17/13, 13/10, 14/13, 12/11) || 1 – 14/13 – 7/5 – 11/6 <br>(steps 14/13, 13/10, 17/13, 12/11)
+|-
+| 1 – 17/13 – 22/13 – 11/6 <br>(steps 17/13, 22/17, 13/12, 12/11) || 1 – 13/12 – 7/5 – 11/6 <br>(steps 13/12, 22/17, 17/13, 12/11)
+|-
+| 1 – 15/11 – 17/11 – 5/3 <br>(steps 15/11, 17/15, 14/13, 6/5) || 1 – 6/5 – 22/17 – 22/15 <br>(steps 6/5, 14/13, 17/15, 15/11)
+|-
+| 1 – 13/11 – 14/11 – 13/9 <br>(steps 13/11, 14/13, 17/15, 18/13) || 1 – 17/15 – 11/9 – 13/9 <br>(steps 17/15, 14/13, 13/11, 18/13)
+|-
+| 1 – 7/5 – 17/10 – 11/6 <br>(steps 7/5, 17/14, 14/13, 12/11) || 1 – 17/14 – 17/10 – 13/7 <br>(steps 17/14, 7/5, 12/11, 14/13)
+|-
+| 1 – 17/12 – 17/10 – 11/6 <br>(steps 17/12, 6/5, 14/13, 12/11) || 1 – 6/5 – 17/10 – 13/7 <br>(steps 6/5, 17/12, 12/11, 14/13)
+|-
+| 1 – 6/5 – 22/17 – 7/5 <br>(steps 6/5, 14/13, 13/12, 10/7) || 1 – 13/12 – 7/6 – 7/5 <br>(steps 13/12, 14/13, 6/5, 10/7)
+|-
+| 1 – 11/10 – 22/17 – 7/5 <br>(steps 11/10, 20/17, 13/12, 10/7) || 1 – 13/12 – 14/11 – 7/5 <br>(steps 13/12, 20/17, 11/10, 10/7)
+|-
+| 1 – 13/12 – 13/10 – 7/5 <br>(steps 13/12, 6/5, 14/13, 10/7) || 1 – 14/13 – 22/17 – 7/5 <br>(steps 14/13, 6/5, 13/12, 10/7)
+|-
+| 1 – 13/9 – 17/11 – 17/9 <br>(steps 13/9, 15/14, 11/9, 18/17) || 1 – 11/9 – 17/13 – 17/9 <br>(steps 11/9, 15/14, 13/9, 18/17)
+|-
+| 1 – 13/9 – 17/11 – 13/7 <br>(steps 13/9, 15/14, 6/5, 14/13) || 1 – 15/14 – 17/11 – 5/3 <br>(steps 15/14, 13/9, 14/13, 6/5)
+|-
+| 1 – 13/9 – 17/11 – 5/3 <br>(steps 13/9, 15/14, 14/13, 6/5) || 1 – 14/13 – 15/13 – 5/3 <br>(steps 14/13, 15/14, 13/9, 6/5)
+|-
+| 1 – 17/15 – 11/9 – 17/13 <br>(steps 17/15, 14/13, 15/14, 26/17) || 1 – 15/14 – 15/13 – 17/13 <br>(steps 15/14, 14/13, 17/15, 26/17)
+|-
+| 1 – 14/13 – 11/9 – 17/13 <br>(steps 14/13, 17/15, 15/,14 26/17) || 1 – 15/14 – 17/14 – 17/13 <br>(steps 15/14, 17/15, 14/13, 26/17)
+|-
+| 1 – 17/11 – 5/3 – 17/9 <br>(steps 17/11, 14/13, 17/15, 18/17) || 1 – 17/15 – 11/9 – 17/9 <br>(steps 17/15, 14/13, 17/11, 18/17)
+|-
+| 1 – 17/11 – 17/10 – 13/7 <br>(steps 17/11, 11/10, 12/11, 14/13) || 1 – 12/11 – 6/5 – 13/7 <br>(steps 12/11, 11/10, 17/11, 14/13)
+|-
+| 1 – 11/7 – 17/10 – 13/7 <br>(steps 11/7, 13/12, 12/11, 14/13) || 1 – 13/12 – 17/10 – 11/6 <br>(steps 13/12, 11/7, 14/13, 12/11)
+|-
+| 1 – 11/7 – 17/10 – 11/6 <br>(steps 11/7, 13/12, 14/13, 12/11) || 1 – 13/12 – 17/10 – 13/7 <br>(steps 13/12, 11/7, 12/11, 14/13)
+|}
+For pentads, there are 30 pairs of chords in inverse relationship:
+{| class="wikitable center-all"
+|-
+! colspan="2" | Inversely related pairs of pentads
+|-
+| 1 – 13/12 – 13/10 – 7/5 – 3/2 <br>(steps 13/12, 6/5, 14/13, 15/14, 4/3) || 1 – 15/14 – 15/13 – 18/13 – 3/2 <br>(steps 15/14, 14/13, 6/5, 13/12, 4/3)
+|-
+| 1 – 13/12 – 7/6 – 7/5 – 3/2 <br>(steps 13/12, 14/13, 6/5, 15/14, 4/3) || 1 – 15/14 – 9/7 – 18/13 – 3/2 <br>(steps 15/14, 6/5, 14/13, 13/12, 4/3)
+|-
+| 1 – 7/6 – 7/5 – 3/2 – 11/6 <br>(steps 7/6, 6/5, 15/14, 11/9, 12/11) || 1 – 15/14 – 9/7 – 3/2 – 18/11 <br>(steps 15/14, 6/5, 7/6, 12/11, 11/9)
+|-
+| 1 – 15/13 – 18/13 – 3/2 – 30/17 <br>(steps 15/13, 6/5, 13/12, 20/17, 17/15) || 1 – 13/12 – 13/10 – 3/2 – 17/10 <br>(steps 13/12, 6/5, 15/13, 17/15, 20/17)
+|-
+| 1 – 11/10 – 7/5 – 3/2 – 11/6 <br>(steps 11/10, 14/11, 15/14, 11/9, 12/11) || 1 – 15/14 – 15/11 – 3/2 – 18/11 <br>(steps 15/14, 14/11, 11/10, 12/11, 11/9)
+|-
+| 1 – 13/12 – 17/12 – 3/2 – 17/10 <br>(steps 13/12, 17/13, 18/17, 17/15, 20/17) || 1 – 18/17 – 18/13 – 3/2 – 30/17 <br>(steps 18/17, 17/13, 13/12, 20/17, 17/15)
+|-
+| 1 – 13/12 – 7/5 – 3/2 – 11/6 <br>(steps 13/12, 22/17, 15/14, 11/9, 12/11) || 1 – 15/14 – 18/13 – 3/2 – 18/11 <br>(steps 15/14, 22/17, 13/12, 12/11, 11/9)
+|-
+| 1 – 13/12 – 7/5 – 3/2 – 17/10 <br>(steps 13/12, 22/17, 15/14, 17/15, 20/17) || 1 – 15/14 – 18/13 – 3/2 – 30/17 <br>(steps 15/14, 22/17, 13/12, 20/17, 17/15)
+|-
+| 1 – 17/12 – 3/2 – 17/10 – 11/6 <br>(steps 17/12, 18/17, 17/15, 14/13, 12/11) || 1 – 18/17 – 3/2 – 18/11 – 30/17 <br>(steps 18/17, 17/12, 12/11, 14/13, 17/15)
+|-
+| 1 – 7/5 – 3/2 – 17/10 – 11/6 <br>(steps 7/5, 15/14, 17/15, 14/13, 12/11) || 1 – 15/14 – 3/2 – 18/11 – 30/17 <br>(steps 15/14, 7/5, 12/11, 14/13, 17/15)
+|-
+| 1 – 18/13 – 3/2 – 18/11 – 30/17 <br>(steps 18/13, 13/12, 12/11, 14/13, 17/15) || 1 – 13/12 – 3/2 – 17/10 – 11/6 <br>(steps 13/12, 18/13, 17/15, 14/13, 12/11)
+|-
+| 1 – 15/11 – 3/2 – 18/11 – 30/17 <br>(steps 15/11, 11/10, 12/11, 14/13, 17/15) || 1 – 11/10 – 3/2 – 17/10 – 11/6 <br>(steps 11/10, 15/11, 17/15, 14/13, 12/11)
+|-
+| 1 – 13/12 – 14/11 – 17/11 – 5/3 <br>(steps 13/12, 20/17, 17/14, 14/13, 6/5) || 1 – 14/13 – 17/13 – 20/13 – 5/3 <br>(steps 14/13, 17/14, 20/17, 13/12, 6/5)
+|-
+| 1 – 14/13 – 14/11 – 14/9 – 5/3 <br>(steps 14/13, 13/11, 11/9, 15/14, 6/5) || 1 – 15/14 – 17/13 – 17/11 – 5/3 <br>(steps 15/14, 11/9, 13/11, 14/13, 6/5)
+|-
+| 1 – 17/14 – 17/13 – 10/7 – 11/7 <br>(steps 17/14, 14/13, 12/11, 11/10, 14/11) || 1 – 11/10 – 6/5 – 22/17 – 11/7 <br>(steps 11/10, 12/11, 14/13, 17/14, 14/11)
+|-
+| 1 – 6/5 – 22/17 – 22/15 – 11/7 <br>(steps 6/5, 14/13, 17/15, 15/14, 14/11) || 1 – 15/14 – 17/14 – 17/13 – 11/7 <br>(steps 15/14, 17/15, 14/13, 6/5, 14/11)
+|-
+| 1 – 6/5 – 22/17 – 18/13 – 11/7 <br>(steps 6/5, 14/13, 15/14, 17/15, 14/11) || 1 – 17/15 – 17/14 – 17/13 – 11/7 <br>(steps 17/15, 15/14, 14/13, 6/5, 14/11)
+|-
+| 1 – 6/5 – 9/7 – 18/13 – 11/7 <br>(steps 6/5, 15/14, 14/13, 17/15, 14/11) || 1 – 17/15 – 11/9 – 17/13 – 11/7 <br>(steps 17/15, 14/13, 15/14, 6/5, 14/11)
+|-
+| 1 – 17/15 – 11/9 – 22/15 – 11/7 <br>(steps 17/15, 14/13, 6/5, 15/14, 14/11) || 1 – 15/14 – 9/7 – 18/13 – 11/7 <br>(steps 15/14, 6/5, 14/13, 17/15, 14/11)
+|-
+| 1 – 17/15 – 6/5 – 22/15 – 11/7 <br>(steps 17/15, 18/17, 11/9, 15/14, 14/11) || 1 – 15/14 – 17/13 – 18/13 – 11/7 <br>(steps 15/14, 11/9, 18/17, 17/15, 14/11)
+|-
+| 1 – 17/14 – 17/13 – 10/7 – 17/11 <br>(steps 17/14, 14/13, 12/11, 13/12, 22/17) || 1 – 13/12 – 13/11 – 14/11 – 17/11 <br>(steps 13/12, 12/11, 14/13, 17/14, 22/17)
+|-
+| 1 – 13/11 – 14/11 – 13/9 – 17/11 <br>(steps 13/11, 14/13, 17/15, 15/14, 22/17) || 1 – 15/14 – 17/14 – 17/13 – 17/11 <br>(steps 15/14, 17/15, 14/13, 13/11, 22/17)
+|-
+| 1 – 17/13 – 17/11 – 5/3 – 17/9 <br>(steps 17/13, 13/11, 14/13, 17/15, 18/17) || 1 – 13/11 – 17/11 – 18/11 – 13/7 <br>(steps 13/11, 17/13, 18/17, 17/15, 14/13)
+|-
+| 1 – 17/13 – 17/12 – 5/3 – 11/6 <br>(steps 17/13, 13/12, 20/17, 11/10, 12/11) || 1 – 13/12 – 17/12 – 17/11 – 17/10 <br>(steps 13/12, 17/13, 12/11, 11/10, 20/17)
+|-
+| 1 – 17/13 – 10/7 – 17/11 – 5/3 <br>(steps 17/13, 12/11, 13/12, 14/13, 6/5) || 1 – 14/13 – 7/6 – 14/11 – 5/3 <br>(steps 14/13, 13/12, 12/11, 17/13, 6/5)
+|-
+| 1 – 17/13 – 10/7 – 20/13 – 5/3 <br>(steps 17/13, 12/11, 14/13, 13/12, 6/5) || 1 – 13/12 – 7/6 – 14/11 – 5/3 <br>(steps 13/12, 14/13, 12/11, 17/13, 6/5)
+|-
+| 1 – 17/13 – 17/12 – 17/11 – 5/3 <br>(steps 17/13, 13/12, 12/11, 14/13, 6/5) || 1 – 14/13 – 20/17 – 14/11 – 5/3 <br>(steps 14/13, 12/11, 13/12, 17/13, 6/5)
+|-
+| 1 – 13/12 – 17/12 – 17/11 – 5/3 <br>(steps 13/12, 17/13, 12/11, 14/13, 6/5) || 1 – 14/13 – 20/17 – 20/13 – 5/3 <br>(steps 14/13, 12/11, 17/13, 13/12, 6/5)
+|-
+| 1 – 13/9 – 17/11 – 5/3 – 17/9 <br>(steps 13/9, 15/14, 14/13, 17/15, 18/17) || 1 – 17/15 – 11/9 – 17/13 – 17/9 <br>(steps 17/15, 14/13, 15/14, 13/9, 18/17)
+|-
+| 1 – 11/10 – 6/5 – 22/17 – 7/5 <br>(steps 11/10, 12/11, 14/13, 13/12, 10/7) || 1 – 13/12 – 7/6 – 14/11 – 7/5 <br>(steps 13/12, 14/13, 12/11, 11/10, 10/7)
+|}
+For hexads, there are 5 pairs of chords in inverse relationship:
+{| class="wikitable center-all"
+|-
+! colspan="2" | Inversely related pairs of hexads
+|-
+| 1 – 13/12 – 13/10 – 7/5 – 3/2 – 17/10 <br>(steps 13/12, 6/5, 14/13, 15/14, 17/15, 20/17) || 1 – 15/14 – 15/13 – 18/13 – 3/2 – 30/17 <br>(steps 15/14, 14/13, 6/5, 13/12, 20/17, 17/15)
+|-
+| 1 – 13/12 – 7/6 – 7/5 – 3/2 – 11/6 <br>(steps 13/12, 14/13, 6/5, 15/14, 11/9, 12/11) || 1 – 15/14 – 9/7 – 18/13 – 3/2 – 18/11 <br>(steps 15/14, 6/5, 14/13, 13/12, 12/11, 11/9)
+|-
+| 1 – 11/10 – 7/5 – 3/2 – 17/10 – 11/6 <br>(steps 11/10, 14/11, 15/14, 17/15, 14/13, 12/11) || 1 – 15/14 – 15/11 – 3/2 – 18/11 – 30/17 <br>(steps 15/14, 14/11, 11/10, 12/11, 14/13, 17/15)
+|-
+| 1 – 13/12 – 17/12 – 3/2 – 17/10 – 11/6 <br>(steps 13/12, 17/13, 18/17, 17/15, 14/13, 12/11) || 1 – 18/17 – 18/13 – 3/2 – 18/11 – 30/17 <br>(steps 18/17, 17/13, 13/12, 12/11, 14/13, 17/15)
+|-
+| 1 – 13/12 – 7/5 – 3/2 – 17/10 – 11/6 <br>(steps 13/12, 22/17, 15/14, 17/15, 14/13, 12/11) || 1 – 15/14 – 18/13 – 3/2 – 18/11 – 30/17 <br>(steps 15/14, 22/17, 13/12, 12/11, 14/13, 17/15)
+|}
+Equal temperaments with september chords include {{EDOs| 31, 41, 46, 72, 87, 94, 103, 111, 121, 140, 183, 224 and 270 }}.
+[[Category:17-odd-limit chords]]
 [[Category:Essentially tempered chords]]
 [[Category:Triads]]
+[[Category:Tetrads]]
+[[Category:Pentads]]
+[[Category:Hexads]]
 [[Category:September]]