The Modes in “Circle of Fifths” Order
I mostly won’t be analyzing the modes in their traditional order, since I’m analyzing how lowering a regular pattern of notes by a half-step each walks us through every mode on every key. A few notes (pun intended):
- Most of this analysis focuses on twelve-tone equal temperament (12-TET for short), the tuning system the vast majority of Western music has used for hundreds of years. Where exceptions to what I write exist in other temperaments, I will attempt to note them, but I can’t promise to have thought of them all, especially because my understanding of other tuning systems is spotty at best.
- For the most part, I will attempt to avoid bogging this analysis down in heavy mathematics, but I must begin this analysis by noting that in 12-TET, every note on the chromatic scale vibrates at exactly 2¹⁄₁₂ its immediate neighbor’s frequency – that is, the notes are spaced exactly evenly. This is an important precondition for the analysis I’ve conducted here: much of it wouldn’t apply otherwise.
- In 12-TET, A♯ and B♭ represent the same pitch. Likewise B and C♭, C♯ and D♭, and so on. However, in terms of music theory, A♯ and B♭ can be semantically quite different in some contexts – be careful.
- Key signatures with seven sharps or seven flats exist, but I’ve mostly omitted them from my analysis of Ionian’s modes. (There are even monstrosities with double-sharps [𝄪] and double-flats [𝄫] … which I mostly ignore. I can at least tolerate the double-flat symbol, but the double-sharp is a monstrosity that doesn’t resemble even slightly the thing it’s supposed to double.) I feel it was extravagant enough just to include both six-flat and six-sharp key signatures.
- If we start from Lydian mode, lowering the correct pitches one at a time by a half-step each gives us the next mode in the cycle. I’ll use C Lydian as an example to demonstrate the principle:
Modes Descending from Lydian | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
# | Root & mode | Pitch lowered | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 | |
4 | C | – | C | D | E | F♯ | G | A | B | C | |
1 | C | 4 | C | D | E | F | G | A | B | C | |
5 | C | 7 | C | D | E | F | G | A | B♭ | C | |
2 | C | 3 | C | D | E♭ | F | G | A | B♭ | C | |
6 | C | 6 | C | D | E♭ | F | G | A♭ | B♭ | C | |
3 | C | 2 | C | D♭ | E♭ | F | G | A♭ | B♭ | C | |
7 | C | 5 | C | D♭ | E♭ | F | G♭ | A♭ | B♭ | C | |
4 | C♭ | 1 | C♭ | D♭ | E♭ | F | G♭ | A♭ | B♭ | C♭ |
- In other words:
- Lowering C Lydian’s F♯ to F gives us C Ionian (i.e., C major).
- Lowering C Ionian’s B to B♭ gives us C Mixolydian.
- And so on, until we reach C Locrian – whence the pattern repeats for C♭/B, the key below C on the chromatic scale.
- Lowering Locrian’s root gives us Lydian mode in the key below it on the chromatic scale.
- In other words, lowering C Locrian’s C to C♭/B gives us C♭/B Lydian.
- The sequence repeats from there:
- Lowering B Lydian’s E♯ gives us B Ionian.
- Lowering B Ionian’s A♯ gives us B Mixolydian.
- This sequence will repeat for every note on the chromatic scale: C, C♭/B, B♭/A♯, A, A♭/G♯, G, G♭/F♯, F, F♭/E, E♭/D♯, D, D♭/C♯, and back to C.
The Principles of Inverse Operations
- Now, note that we’ve effectively been subtracting 1 from a regular pattern of values in a sequence:
- 4, 7, 3, 6, 2, 5, 1, 4, 7, 3, 6, 2, 5, 1…
- As a result, if we consult the mathematical properties of inverse operations, we can infer that converse of everything we’ve just done will apply if we add 1 to the same notes in the reverse order:
- 1, 5, 2, 6, 3, 7, 4, 1, 5, 2, 6, 3, 7, 4…
- In other words:
- Raising C♭ Lydian’s C♭ gives us C Locrian.
- Raising C Locrian’s G♭ gives us C Phrygian.
- Raising C Phrygian’s D♭ gives us C Aeolian.
- And so on.
An Audio Demonstration
- None of this will mean much to readers in isolation, so I put together a ⟨aaronfreed
.github .io /c_ lydian_ to_ b_ lydian .flac⟩ in Logic Pro. For the following modes, in order: - C Lydian
- C Ionian
- C Mixolydian
- C Dorian
- C Aeolian
- C Phrygian
- C Locrian
- C♭/B Lydian
- the scale in ascending order
- arpeggiated and block versions of:
- the root (I) chord
- the subdominant (IV) chord
- the dominant (V) chord
- the root (I) chord
Further Notes
- It might help solidify your conception of this principle to understand that while we’re lowering (or raising) a pitch on our scale, we’re also, in a sense, jumping down (or up) a fifth. F Lydian is in the same key signature as C Ionian, not F Ionian. This is why so many of these patterns mirror the circle of fifths.
- In “Modes Descending from Lydian” above, the mode number and the pitch we lower to get it are exact mirrors of each other. This is not coincidental – it’s the direct result of a mathematical pattern.
- The modes are also always either three steps on the scale below their predecessors (usually, but not always, a perfect fourth), or four steps above (usually, but not always, a perfect fifth). In this context, they’re equivalent, since the scale repeats every octave.
- Although this is only somewhat relevant here, one pair of intervals always constitutes an exception to the “perfect fourths” and “perfect fifths” rules: one fourth is always augmented, and one fifth is always diminished. These are actually the same interval, a tritone. The following steps on each scale are tritones in either direction:
Diabolus in mūsicā # Mode Tritone 4 4 1 1 7 4 5 3 7 2 6 3 6 2 6 3 5 2 7 1 5
- Although this is only somewhat relevant here, one pair of intervals always constitutes an exception to the “perfect fourths” and “perfect fifths” rules: one fourth is always augmented, and one fifth is always diminished. These are actually the same interval, a tritone. The following steps on each scale are tritones in either direction:
The Major Scale’s Modes & the Circle of Fifths
12 Major Scales × 7 Modes = 84 Combinations
- I’ve printed the C major scale’s modes in bold, blue type to make them stand out. These are the only scales played using only the white keys of the piano (this is also why music notation can express these specific keys without accidentals, either in the key signature or after it). The differences between their numbers are always multiples of twelve; this is also not a coincidence.
- Halfway between C major’s modes, I always print a mode twice, in orange, with its key signature first using six flats (G♭ major), then six sharps (F♯ major). I don’t really like either option (E♯ is F♮! C♭ is B♮!), but both avoid a repeated letter in a scale, and thus a rash of accidentals in the notation of any piece that uses them. G♭/F♯ major’s modes are also always separated by multiples of twelve, for the same reason: this progression separates all seven modes of each scale from each other by multiples of twelve.
- I’ve listed these descending by pitch so higher pitches will be, well, higher, which may confuse some people since we read from top to bottom and are used to thinking of harmony in ascending order. Someday, I plan to write a JavaScript add-on to give readers an option to reverse the order – and eventually, to give them then option to create similar tables for different scales (at the bare minimum, melodic minor, harmonic minor, and chromatic Hypolydian; possibly others as well).
- “RM” is an initialism for “Relative Major”, and “KS” is for “Key Signature”. A cheat sheet for what modes use what key signatures can be found in the section immediately following this one.
- I’ve used zero-based indexing for these tables, so they’re indexed from zero to eighty-three. This is partly because I prefer zero-based indexing, but to be honest, it was mostly to give C Ionian an index of one.
C (B♯) | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
0 | C♮ | G | 1♯ | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | C♮ | |
1 | C♮ | C | ♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | |
2 | C♮ | F | 1♭ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | C♮ | |
3 | C♮ | B♭ | 2♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | |
4 | C♮ | E♭ | 3♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | |
5 | C♮ | A♭ | 4♭ | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | |
6 | C♮ | D♭ | 5♭ | C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♮ |
B (C♭) | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
7 | C♭ | G♭ | 6♭ | C♭ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♭ | |
7 | B♮ | F♯ | 6♯ | B♮ | C♯ | D♯ | E♯ | F♯ | G♯ | A♯ | B♮ | |
8 | B♮ | B | 5♯ | B♮ | C♯ | D♯ | E♮ | F♯ | G♯ | A♯ | B♮ | |
9 | B♮ | E | 4♯ | B♮ | C♯ | D♯ | E♮ | F♯ | G♯ | A♮ | B♮ | |
10 | B♮ | A | 3♯ | B♮ | C♯ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | |
11 | B♮ | D | 2♯ | B♮ | C♯ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | |
12 | B♮ | G | 1♯ | B♮ | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | |
13 | B♮ | C | ♮ | B♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ |
A♯ / B♭ | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
14 | B♭ | F | 1♭ | B♭ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | |
15 | B♭ | B♭ | 2♭ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | |
16 | B♭ | E♭ | 3♭ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | |
17 | B♭ | A♭ | 4♭ | B♭ | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | |
18 | B♭ | E♭ | 5♭ | B♭ | C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | |
19 | B♭ | G♭ | 6♭ | B♭ | C♭ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | |
19 | A♯ | F♯ | 6♯ | A♯ | B♮ | C♯ | D♯ | E♯ | F♯ | G♯ | A♯ | |
20 | A♯ | B | 5♯ | A♯ | B♮ | C♯ | D♯ | E♮ | F♯ | G♯ | A♯ |
A | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
21 | A♮ | E | 4♯ | A♮ | B♮ | C♯ | D♯ | E♮ | F♯ | G♯ | A♮ | |
22 | A♮ | A | 3♯ | A♮ | B♮ | C♯ | D♮ | E♮ | F♯ | G♯ | A♮ | |
23 | A♮ | D | 2♯ | A♮ | B♮ | C♯ | D♮ | E♮ | F♯ | G♮ | A♮ | |
24 | A♮ | G | 1♯ | A♮ | B♮ | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | |
25 | A♮ | C | ♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | |
26 | A♮ | F | 1♭ | A♮ | B♭ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | |
27 | A♮ | B♭ | 2♭ | A♮ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ |
G♯ / A♭ | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
28 | A♭ | E♭ | 3♭ | A♭ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | |
29 | A♭ | A♭ | 4♭ | A♭ | B♭ | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | |
30 | A♭ | D♭ | 5♭ | A♭ | B♭ | C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | |
31 | A♭ | G♭ | 6♭ | A♭ | B♭ | C♭ | D♭ | E♭ | F♮ | G♭ | A♭ | |
31 | G♯ | F♯ | 6♯ | G♯ | A♯ | B♮ | C♯ | D♯ | E♯ | F♯ | G♯ | |
32 | G♯ | B | 5♯ | G♯ | A♯ | B♮ | C♯ | D♯ | E♮ | F♯ | G♯ | |
33 | G♯ | E | 4♯ | G♯ | A♮ | B♮ | C♯ | D♯ | E♮ | F♯ | G♯ | |
34 | G♯ | A | 3♯ | G♯ | A♮ | B♮ | C♯ | D♮ | E♮ | F♯ | G♯ |
G | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
35 | G♮ | D | 2♯ | G♮ | A♮ | B♮ | C♯ | D♮ | E♮ | F♯ | G♮ | |
36 | G♮ | G | 1♯ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♯ | G♮ | |
37 | G♮ | C | ♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♮ | G♮ | |
38 | G♮ | F | 1♭ | G♮ | A♮ | B♭ | C♮ | D♮ | E♮ | F♮ | G♮ | |
39 | G♮ | B♭ | 2♭ | G♮ | A♮ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | |
40 | G♮ | E♭ | 3♭ | G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | |
41 | G♮ | A♭ | 4♭ | G♮ | A♭ | B♭ | C♮ | D♭ | E♭ | F♮ | G♮ |
F♯ / G♭ | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
42 | G♭ | D♭ | 5♭ | G♭ | A♭ | B♭ | C♮ | D♭ | E♭ | F♮ | G♭ | |
43 | G♭ | G♭ | 6♭ | G♭ | A♭ | B♭ | C♭ | D♭ | E♭ | F♮ | G♭ | |
43 | F♯ | F♯ | 6♯ | F♯ | G♯ | A♯ | B♮ | C♯ | D♯ | E♯ | F♯ | |
44 | F♯ | B | 5♯ | F♯ | G♯ | A♯ | B♮ | C♯ | D♯ | E♮ | F♯ | |
45 | F♯ | E | 4♯ | F♯ | G♯ | A♮ | B♮ | C♯ | D♯ | E♮ | F♯ | |
46 | F♯ | A | 3♯ | F♯ | G♯ | A♮ | B♮ | C♯ | D♮ | E♮ | F♯ | |
47 | F♯ | D | 2♯ | F♯ | G♮ | A♮ | B♮ | C♯ | D♮ | E♮ | F♯ | |
48 | F♯ | G | 1♯ | F♯ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♯ |
F (E♯) | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
49 | F♮ | C | ♮ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♮ | |
50 | F♮ | F | 1♭ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | E♮ | F♮ | |
51 | F♮ | B♭ | 2♭ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | E♭ | F♮ | |
52 | F♮ | E♭ | 3♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | F♮ | |
53 | F♮ | A♭ | 4♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♭ | E♭ | F♮ | |
54 | F♮ | D♭ | 5♭ | F♮ | G♭ | A♭ | B♭ | C♮ | D♭ | E♭ | F♮ | |
55 | F♮ | G♭ | 6♭ | F♮ | G♭ | A♭ | B♭ | C♭ | D♭ | E♭ | F♮ | |
55 | E♯ | F♯ | 6♯ | E♯ | F♯ | G♯ | A♯ | B♮ | C♯ | D♯ | E♯ |
E (F♭) | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
56 | E♮ | B | 5♯ | E♮ | F♯ | G♯ | A♯ | B♮ | C♯ | D♯ | E♮ | |
57 | E♮ | E | 4♯ | E♮ | F♯ | G♯ | A♮ | B♮ | C♯ | D♯ | E♮ | |
58 | E♮ | A | 3♯ | E♮ | F♯ | G♯ | A♮ | B♮ | C♯ | D♮ | E♮ | |
59 | E♮ | D | 2♯ | E♮ | F♯ | G♮ | A♮ | B♮ | C♯ | D♮ | E♮ | |
60 | E♮ | G | 1♯ | E♮ | F♯ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | |
61 | E♮ | C | ♮ | E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | |
62 | E♮ | F | 1♭ | E♮ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | E♮ |
D♯ / E♭ | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
63 | E♭ | B♭ | 2♭ | E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | E♭ | |
64 | E♭ | E♭ | 3♭ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | |
65 | E♭ | A♭ | 4♭ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♭ | E♭ | |
66 | E♭ | D♭ | 5♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♮ | D♭ | E♭ | |
67 | E♭ | G♭ | 6♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♭ | D♭ | E♭ | |
67 | D♯ | F♯ | 6♯ | D♯ | E♯ | F♯ | G♯ | A♯ | B♮ | C♯ | D♯ | |
68 | D♯ | B | 5♯ | D♯ | E♮ | F♯ | G♯ | A♯ | B♮ | C♯ | D♯ | |
69 | D♯ | E | 4♯ | D♯ | E♮ | F♯ | G♯ | A♮ | B♮ | C♯ | D♯ |
D | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
70 | D♮ | A | 3♯ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | C♯ | D♮ | |
71 | D♮ | D | 2♯ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | C♯ | D♮ | |
72 | D♮ | G | 1♯ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | C♮ | D♮ | |
73 | D♮ | C | ♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | |
74 | D♮ | F | 1♭ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | |
75 | D♮ | B♭ | 2♭ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | |
76 | D♮ | E♭ | 3♭ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♮ |
C♯ / D♭ | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
77 | D♭ | A♭ | 4♭ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♭ | |
78 | D♭ | D♭ | 5♭ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♮ | D♭ | |
79 | D♭ | G♭ | 6♭ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♭ | D♭ | |
79 | C♯ | F♯ | 6♯ | C♯ | D♯ | E♯ | F♯ | G♯ | A♯ | B♮ | C♯ | |
80 | C♯ | B | 5♯ | C♯ | D♯ | E♮ | F♯ | G♯ | A♯ | B♮ | C♯ | |
81 | C♯ | E | 4♯ | C♯ | D♯ | E♮ | F♯ | G♯ | A♮ | B♮ | C♯ | |
82 | C♯ | A | 3♯ | C♯ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | C♯ | |
83 | C♯ | D | 2♯ | C♯ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | C♯ |
Key Signature Cheat Sheet
- Twelve-tone equal temperament has fifteen key signatures, 𝄪/𝄫 atrocities notwithstanding:
Key Signatures of the Seven Modes for the Twelve-Note Chromatic Scale | ||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Lyd | Maj | Mix | Dor | Min | Phr | Loc | KS | A | B | C | D | E | F | G |
F♯ | C♯ | G♯ | D♯ | A♯ | E♯ | B♯ | 7♯ | ♯ | ♯ | ♯ | ♯ | ♯ | ♯ | ♯ |
B | F♯ | C♯ | G♯ | D♯ | A♯ | E♯ | 6♯ | ♯ | ♯ | ♯ | ♯ | ♯ | ♯ | |
E | B | F♯ | C♯ | G♯ | D♯ | A♯ | 5♯ | ♯ | ♯ | ♯ | ♯ | ♯ | ||
A | E | B | F♯ | C♯ | G♯ | D♯ | 4♯ | ♯ | ♯ | ♯ | ♯ | |||
D | A | E | B | F♯ | C♯ | G♯ | 3♯ | ♯ | ♯ | ♯ | ||||
G | D | A | E | B | F♯ | C♯ | 2♯ | ♯ | ♯ | |||||
C | G | D | A | E | B | F♯ | 1♯ | ♯ | ||||||
F | C | G | D | A | E | B | ♮ | |||||||
B♭ | F | C | G | D | A | E | 1♭ | ♭ | ||||||
E♭ | B♭ | F | C | G | D | A | 2♭ | ♭ | ♭ | |||||
A♭ | E♭ | B♭ | F | C | G | D | 3♭ | ♭ | ♭ | ♭ | ||||
D♭ | A♭ | E♭ | B♭ | F | C | G | 4♭ | ♭ | ♭ | ♭ | ♭ | |||
G♭ | D♭ | A♭ | E♭ | B♭ | F | C | 5♭ | ♭ | ♭ | ♭ | ♭ | ♭ | ||
C♭ | G♭ | D♭ | A♭ | E♭ | B♭ | F | 6♭ | ♭ | ♭ | ♭ | ♭ | ♭ | ♭ | |
F♭ | C♭ | G♭ | D♭ | A♭ | E♭ | B♭ | 7♭ | ♭ | ♭ | ♭ | ♭ | ♭ | ♭ | ♭ |
- Legend for the above:
- Lyd = Lydian
- Maj = major (Ionian)
- Mix = Mixolydian
- Dor = Dorian (if you’re not sure why it’s grey, ask your English teacher about the picture)
- Min = natural minor (Aeolian)
- Phr = Phrygian
- Loc = Locrian
- KS = key signature (highlighted because it’s the key to the table – pun coincidental, though I definitely didn’t even try to avoid it)
- Additional notes:
- 5♯ and 7♭ express the same pitches.
- 6♯ and 6♭ express the same pitches.
- 7♯ and 5♭ express the same pitches.
- I’ve again printed C major’s modes in blue and F♯/G♭ major’s modes in orange.
- Accidentals also fall onto the circle of fifths (e.g., B♭ to E♭ and E♭ to A♭ are both perfect fifths).
Why is this happening?
The simple answer: whether we realized it or not, we’ve been traversing the circle of fifths this entire time. My introduction notes that traveling from C Lydian to C Ionian is, in a sense, traveling from G major to C major. Here’s the C table again. Note Relative Major’s traversal down the circle of fifths:
C++ | ||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Root | Mode | RM | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
0 | C♮ | G | 1♯ | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | C♮ | |
1 | C♮ | C | ♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | |
2 | C♮ | F | 1♭ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | C♮ | |
3 | C♮ | B♭ | 2♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | |
4 | C♮ | E♭ | 3♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | |
5 | C♮ | A♭ | 4♭ | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | |
6 | C♮ | D♭ | 5♭ | C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♮ |
The explanation is that each of these modes, apart from C Ionian, has been rearranging a different major scale. Reshuffling each mode back into its Ionian form may explain the cause:
You were expecting modes, but it was me, | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|
# | Original Mode | Root | KS | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 1 |
0 | G | 1♯ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♯ | G♮ | |
1 | C | ♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | |
2 | F | 1♭ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | E♮ | F♮ | |
3 | B♭ | 2♭ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | |
4 | E♭ | 3♭ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | |
5 | A♭ | 4♭ | A♭ | B♭ | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | |
6 | D♭ | 5♭ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | C♮ | D♭ |
Every note of every scale in this table is, in fact, a perfect fifth below its counterpart in its predecessor. That’s the first part of the explanation. The second part has to do with interval distributions:
Ionian interval spacing | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Mode | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | ||||||
4 | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | |
1 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | |
5 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | |
2 | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | |
6 | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | |
3 | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | |
7 | C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
The Ionian scale is virtually unique among seven-note scales in 12-TET in that it is possible to swap two intervals and produce a different mode of the same scale, and the one other scale that displays this trait is actually its polar opposite in virtually every important way. In the section below on the pentatonic scale, I will go over more about why, precisely, this is. For now, the important point is that each step down the circle of fifths order changes the position of only one interval. If more intervals changed, the pattern would break.
Chord Analysis by Mode
Chord Tonalities by Scale Position & Mode | ||||||||
---|---|---|---|---|---|---|---|---|
Mode | I | II | III | IV | V | VI | VII | |
1 | Maj | min | min | Maj | Maj | min | dim | |
2 | min | min | Maj | Maj | min | dim | Maj | |
3 | min | Maj | Maj | min | dim | Maj | min | |
4 | Maj | Maj | min | dim | Maj | min | min | |
5 | Maj | min | dim | Maj | min | min | Maj | |
6 | min | dim | Maj | min | min | Maj | Maj | |
7 | dim | Maj | min | min | Maj | Maj | min |
- I’ve printed each mode’s root (I) subdominant (IV), and dominant (V) chords in bold – they’re especially important to establishing its tonality.
- I’ve printed the seventh chord in fainter text because it’s diminished in the major scale.
- Minor chords are blue; diminished chords are orange.
- This analysis clarifies why Ionian became the standard major scale and Aeolian became the natural minor scale: Ionian’s root, subdominant, and dominant are all major; Aeolian’s are all minor. This makes them feel, respectively, especially major and especially minor.
- Since their root chords are major, Lydian and Mixolydian still sound more “major” than the other modes (except Ionian), and Dorian and Phrygian still sound more “minor” than the others (except Aeolian). Locrian, as mentioned, is the oddball because it’s the only mode of the scale whose root chord is diminished.
Beyond the Major Scale
Other Heptatonic Scales & Tonalities
While the above analysis focuses exclusively on the Ionian scale’s modes, numerous possible scales (and modes thereof) don’t fit its pattern, many of which I’ll now analyze. Some examples:
- Numerous heptatonic (seven-note) scales that aren’t modes of the major scale. I’ve rooted the following examples (many of which are common in jazz) in C to make it clear how they change the Ionian scale:
Other Heptatonic Scales Scale 1 2 3 4 5 6 7 Intervals C♮ D♭ E𝄫 F♮ G♮ A♭ B𝄫 ½ ½ 1½ 1 ½ ½ 1½ C♮ D♭ E♭ F♭ G♭ A♭ B𝄫 ½ 1 ½ 1 1 ½ 1½ C♮ D♭ E♭ F♭ G♭ A♭ B♭ ½ 1 ½ 1 1 1 1 C♮ D♭ E♭ F♮ G♭ A♮ B♭ ½ 1 1 ½ 1½ ½ 1 C♮ D♭ E♭ F♮ G♮ A♮ B♭ ½ 1 1 1 1 ½ 1 C♮ D♭ E♮ F♮ G♮ A♭ B♭ ½ 1½ ½ 1 ½ 1 1 C♮ D♭ E♮ F♮ G♮ A♭ B♮ ½ 1½ ½ 1 ½ 1½ ½ C♮ D♮ E♭ F♮ G♭ A♭ B♭ 1 ½ 1 ½ 1 1 1 C♮ D♮ E♭ F♮ G♭ A♭ B♮ 1 ½ 1 ½ 1 1½ ½ C♮ D♮ E♭ F♮ G♮ A♭ B♮ 1 ½ 1 1 ½ 1½ ½ C♮ D♮ E♭ F♮ G♮ A♮ B♮ 1 ½ 1 1 1 1 ½ C♮ D♮ E♭ F♯ G♮ A♭ B♮ 1 ½ 1½ ½ ½ 1½ ½ C♮ D♮ E♭ F♯ G♮ A♮ B♭ 1 ½ 1½ ½ 1 ½ 1 C♮ D♮ E♮ F♮ G♮ A♭ B♭ 1 1 ½ 1 ½ 1 1 C♮ D♮ E♮ F♮ G♯ A♮ B♮ 1 1 ½ 1½ ½ 1 ½ C♮ D♮ E♮ F♯ G♮ A♮ B♭ 1 1 1 ½ 1 ½ 1 C♮ D♮ E♮ F♯ G♯ A♮ B♮ 1 1 1 1 ½ 1 ½ C♮ D♯ E♮ F♮ G♮ A♯ B♮ 1½ ½ ½ 1 1½ ½ ½ C♮ D♯ E♮ F♯ G♮ A♮ B♮ 1½ ½ 1 ½ 1 1 ½ C♮ D♯ E♯ F♯ G♮ A♯ B♮ 1½ 1 ½ ½ 1½ ½ ½ C♮ D♯ E♯ F♯ G♯ A♯ B♮ 1½ 1 ½ 1 1 ½ ½ Since many scales have up to dozens of names (if you’re on a computer, hover over dotted scale names for more information), I’ve instead used the sorting methods of Southern India’s Bold, orange text denotes raised notes and minor thirds; thin, blue text denotes lowered notes and minor seconds (doubly lowered notes are also fainter).
, which effectively alphabetize the scales themselves: sort intervals in ascending order, with the lowest intervals counting as most significant. (§9 lists the mēḷakartā in full; note that they categorically exclude scales with sharp thirds or fifths, or flat fourths or fifths.)This list is far from exhaustive. Note that none of these scales use B♯ because, while it’s semantically different from C, the two notes represent the same pitch in twelve-tone equal temperament. Likewise, none of these scales use D𝄫 because it’s the same pitch as C.
In any case, one thing distinguishes these scales from the Ionian scale’s modes: we can print the latter with no accidentals outside the key signature, but every single scale in the above table requires accidentals for at least some notes. Key signatures are strictly based on the Ionian scale and the circle of fifths; using three flats that weren’t B♭, E♭, and A♭ in a key signature would just confuse readers.
The names “Chromatic Dorian” and “Chromatic Hypophrygian” will reappear below in the section on ancient Greek harmony below. (Don’t waste time trying to discern their connections to the similarly named diatonic modes: Chromatic Dorian actually relates to Phrygian, and Chromatic Hypophrygian to Mixolydian. The section on Greek harmony explains the relationships, and why they aren’t the ones their names suggest.)
-
Note that several sets of the above scales are modes of each other. In particular:
Harmonic Minor & Melodic Minor’s Modes at a Glance Scale 1 2 3 4 5 6 7 Intervals C♮ D♮ E♭ F♮ G♮ A♭ B♮ 1 ½ 1 1 ½ 1½ ½ C♮ D♭ E♭ F♮ G♭ A♮ B♭ ½ 1 1 ½ 1½ ½ 1 C♮ D♮ E♮ F♮ G♯ A♮ B♮ 1 1 ½ 1½ ½ 1 ½ C♮ D♮ E♭ F♯ G♮ A♮ B♭ 1 ½ 1½ ½ 1 ½ 1 C♮ D♭ E♮ F♮ G♮ A♭ B♭ ½ 1½ ½ 1 ½ 1 1 C♮ D♯ E♮ F♯ G♮ A♮ B♮ 1½ ½ 1 ½ 1 1 ½ C♮ D♭ E♭ F♭ G♭ A♭ B𝄫 ½ 1 ½ 1 1 ½ 1½ C♮ D♮ E♭ F♮ G♮ A♮ B♮ 1 ½ 1 1 1 1 ½ C♮ D♭ E♭ F♮ G♮ A♮ B♭ ½ 1 1 1 1 ½ 1 C♮ D♮ E♮ F♯ G♯ A♮ B♮ 1 1 1 1 ½ 1 ½ C♮ D♮ E♮ F♯ G♮ A♮ B♭ 1 1 1 ½ 1 ½ 1 C♮ D♮ E♮ F♮ G♮ A♭ B♭ 1 1 ½ 1 ½ 1 1 C♮ D♮ E♭ F♮ G♭ A♭ B♭ 1 ½ 1 ½ 1 1 1 C♮ D♭ E♭ F♭ G♭ A♭ B♭ ½ 1 ½ 1 1 1 1 We can apply similar principles to them as we applied to the Ionian scale’s modes, though certain things may not line up as neatly with some of the scales. I leave ascertaining which other sets of scales are modes of each other as an exercise for the reader. (I didn’t list every mode of most other sets of scales.) The next two sections analyze these modes in much greater depth.
Note that two competing shorthands exist for transformations like “Aeolian ♯7”, relative to either:
- The current note: “♯7” always means “raise the base scale’s seventh note half a step”. If it’s currently A♭, make it A♮. If it’s currently A, make it A♯. If it’s currently C♯, make it (ugh) C𝄪 (and Jesus wept, for there were no more worlds to conquer… wait, that’s not how it goes).
- The C scale’s accidental: C Aeolian 7 is B♭, so ‘Aeolian ♮7’ = ‘raise Aeolian’s seventh note half a step’.
Not gonna front: I despise the latter with the burning passion of a thousand suns. “♯7” applies independently of the root, while in any key except C, “♮7” requires asking “wait, what accidental is on C Aeolian 7?” C♯ Aeolian 7 is already B♮, so what does “C♯ Aeolian ♮7” even tell us? F♯ Aeolian 7 is C♯, so if we read “F♯ Aeolian ♮7” literally, we’d lower the seventh note by a half-step – exactly the opposite of what it intends!
Then again, “Lydian ♮4” (“lower Lydian’s fourth note a half-step”) and “Mixolydian ♮7” (“raise Mixolydian’s seventh note a half-step”) make for the most pretentious possible ways to say “major” this side of «διατονικός Λῡ́δῐος τόνος» (“diatonic Lydian tonos”; see the section on Ancient Greek harmony below), so I guess there is one actual upside to the C-based convention.
Beyond Pentatonic and Heptatonic Scales
Of course, scales are hardly required to contain seven notes. Due largely to twelve being divisible by neither five nor seven, pentatonic (five-note) scales provide so much to unpack that I’m giving them their own section. Let’s start with a brief overview of other scale sizes. In order of scale size:
- Hexatonic (six-note) scales are fairly common. The whole-tone scale is likely the most familiar example.
- Scales also aren’t limited to seven notes; blues and jazz often use octatonic (eight-note) and enneatonic (nine-note) scales. Decatonic (ten-note) scales are slightly less common, but still occur.
- The ⟨en
.wikipedia .org /wiki /12_ equal_ temperament⟩ used in the vast majority of Western music for centuries only allows for one possible hendecatonic (eleven-note) scale, though it does have eleven separate modes. Do you understand why? (Hint: There’s only a single dodecatonic scale in 12-TET for exactly the same reason.) - The dodecatonic (twelve-note) chromatic scale (though works that use the entire twelve-note scale for non-colorative purposes are quite rare and are mostly considered avant-garde).
The above, of course, is all based on 12-TET. Plenty of other tunings have been and still are used, though; there’s nothing even restricting the number of notes per octave to twelve. For instance:
- A ⟨en
.wikipedia .org /wiki /Quarter_ tone⟩ is common in Arabic and Turkic music. - Indian ⟨en
.wikipedia .org /wiki /Raga⟩ (similar to scales) typically use four to seven svaras (similar to scale tones) of the ⟨en .wikipedia .org /wiki /Shruti_ (music)⟩ (which collectively aren’t exactly 22-TET, but not entirely unlike it). - Experimental Western musicians also occasionally use alternate temperaments. Here are a few recent rock and metal examples, in increasing order of heaviness:
- ⟨kinggizzard
.bandcamp .com /album /flying-microtonal-banana⟩ by King Gizzard & the Lizard Wizard (24-TET) - ⟨votsband
.bandcamp .com /album /nowherer⟩ by Victory over the Sun (17-TET) - any metal album by ⟨jutegyte
.bandcamp .com /music⟩ since Discontinuities (24-TET)
- ⟨kinggizzard
- As we’ll see when we discuss Ancient Greece, their enharmonic genus also used microtonality. (Note: enharmonic varies wildly in meaning based on context. In 12-TET, two enharmonic notes have the same pitch. In microtonal tunings, they’re about as dissonant as you can get.)
For the record:
Ἐπίθετᾰ πρός ᾰ̓ρῐθμούς τόνων Epíthetă prós ărĭthmoús tónōn Adjectives for Numbers of Notes |
|||||
---|---|---|---|---|---|
# | Ἐπίθετον Epítheton Adjective | Ἑλληνική «–τονος» Hellēnĭke «–tonos» Greek “–toned” | Ῥωμαῐσμένη Rhṓmēĭsméni Romanized | Ἑλληνική «–τονικός» Hellēnĭke «–tonikós» Greek “–tonic” | Ῥωμαῐσμένη Rhṓmēĭsméni Romanized |
1 | monotonic | μονότονος | monótonos | μονότονικός | monótonikós |
2 | διατονος | diatonos | διατονικός | diatonikós | |
3 | τρίτονος | trítonos | τρίτονικός | trítonikos | |
4 | tetratonic | τετράτονος | tetrátonos | τετράτονικός | tetrátonikós |
5 | pentatonic | πέντατονος | péntatonos | πέντατονικός | péntatonikós |
6 | hexatonic | ἑξατονος | hexatonos | ἑξατονικός | hexatonikós |
7 | heptatonic | ἑπτάτονος | heptátonos | ἑπτάτονικός | heptátonikós |
8 | octatonic | ὀκτάτονος | oktátonos | ὀκτάτονικός | oktátonikós |
9 | enneatonic | ἐννεάτονος | enneátonos | ἐννεάτονικός | enneátonikós |
10 | decatonic | δέκατονος | dékatonos | δέκατονικός | dékatonikós |
11 | hendecatonic | ἕνδεκάτονος | hendekátonos | ἕνδεκάτονικός | hendekátonikós |
12 | dodecatonic | δωδεκάτονος | dōdekátonos | δωδεκάτονικός | dōdekátonikós |
The suffix -tonic is Greek. Friends don’t let friends mix Latin prefixes and Greek suffixes. (Latin did borrow τόνος as tonus, but only as a noun, never an adjective; it did not borrow τονικός.)
I only managed to find attestations of some of the Greek forms in this list, but it seems likely they all must have existed at some time. The ones I found are in bold; the ones I was unable to find are in fainter text.
Bolded English words, meanwhile, have attested usages for scale size in music theory contexts. Monotonic, diatonic, and tritonic are printed more faintly because they have completely different meanings that have nothing to do with the number of pitches in a scale, so using them to mean that will likely just confuse readers. The latter two are also struck through because their alternate meanings are ubiquitous in music theory contexts. You might be technically correct to use them to refer to scale size, but is that really the hill you want to die on?
- Monotonic mostly refers to the modern Greek accent system, in contrast with the old polytonic accent system that conveyed breathing and word pitch. It does not have a widely established meaning in music theory contexts, so this is a less clear-cut case than the others.
- Diatonic means having two interval sizes, mostly referring to what became our Ionian scale.
- Tritonic means spanning an interval of three whole tones, i.e., a tritone.
The Pentatonic Scale
As complement of Ionian
Pentatonic (five-note, “5t” for short) scales are ubiquitous in rock, blues, and jazz, though they’re much older than that and exist in many cultures. The most common pentatonic scale is literally Ionian’s scale complement.
What exactly is a scale complement? It’s the equivalent of a binary XOR. Say we represent a scale as a set of twelve 1s (“this tone is part of the scale”) or 0s (“this tone is not part of the scale”). Now, flip all the bits. Tones that had notes are no longer part of the scale; tones that didn’t now are. That’s the complement.
This means we can play the pentatonic scale using all the piano keys we didn’t use to play Ionian. Whenever I write “the pentatonic scale”, preceded by the definite article, I mean this pentatonic scale. To wit:
- C Ionian only uses the white keys on the piano: C, D, E, F, G, A, B, C.
- F♯ pentatonic major only uses the black keys: F♯, G♯, A♯, C♯, D♯ (or G♭, A♭, B♭, D♭, E♭, if you
’re nastyprefer flats).
To a huge extent, the pentatonic and Ionian scales’ relationship even extends to their modes. For instance:
- Starting C Ionian three semitones early creates its relative minor, A Aeolian.
- Starting F♯ pentatonic major three semitones early creates its relative minor, D♯/E♭ pentatonic minor.
As truncation of Ionian
Conveniently, though, it’s not just a complement, though: it’s also a truncation. We can get the pentatonic scale simply by deleting two notes of Ionian. As a result, the two scales’ modes correspond in countless ways.
Since the pentatonic scale has two fewer notes than Ionian, our analysis must delete two modes. But which two? We can derive the pentatonic scale from Ionian using at least three different methods.
A quick warning before we proceed further: we’re about to take a quick detour into “right for the wrong reasons” land. After the third table, I’ll explain how, why, and where the first two tables go wrong.
Let’s try disregarding Phrygian and Locrian, the lowest modes in the circle of fifths progression. In this analysis:
- F♯ G♯ A♯ C♯ D♯ (1, 1, 1½, 1, 1½). deletes ’s fourth and seventh notes:
- C♯ D♯ F♯ G♯ A♯ (1, 1½, 1, 1, 1½). deletes ’s third and seventh notes:
- G♯ A♯ C♯ D♯ F♯ (1, 1½, 1, 1½, 1). Neutral pentatonic is comparable to Dorian mode in two ways: it is a symmetrical scale, and it’s the midpoint of the pentatonic circle of fifths order (which is complex enough to merit its own section below). deletes ’s third and sixth notes:
- D♯ F♯ G♯ A♯ C♯ (1½, 1, 1, 1½, 1). deletes ’s second and sixth notes:
- A♯ C♯ D♯ F♯ G♯ (1½, 1, 1½, 1, 1). deletes ’s second and fifth notes:
Got all that? Let’s recap. (Note: “H” = half-tone, ”W” = whole tone, “M” = minor third)
The incorrect “upshift” hypothesis | ||||||
---|---|---|---|---|---|---|
[7t] Mode [5t] | [7t] Piano keys [5t] | [7t] Intervals [5t] | Del | |||
F♮G♮A♮B♮C♮D♮E | F♯ G♯ A♯ C♯ D♯ | W W W H W W H | W W M W M | 4 7 | ||
C♮D♮E♮F♮G♮A♮B | C♯ D♯ F♯ G♯ A♯ | W W H W W W H | W M W W M | 3 7 | ||
G♮A♮B♮C♮D♮E♮F | G♯ A♯ C♯ D♯ F♯ | W W H W W H W | W M W M W | 3 6 | ||
D♮E♮F♮G♮A♮B♮C | D♯ F♯ G♯ A♯ C♯ | W H W W W H W | M W W M W | 2 6 | ||
A♮B♮C♮D♮E♮F♮G | A♯ C♯ D♯ F♯ G♯ | W H W W H W W | M W M W W | 2 5 |
I probably don’t even need to point out how many patterns recur in both scales.
We just analyzed the pentatonic modes based on notes a half-step above them, but we could just as easily have used the notes a half-step above. This means instead disregarding Lydian and Ionian. Oddly enough, we delete the same scale degrees either way:
The incorrect “downshift” hypothesis | ||||||
---|---|---|---|---|---|---|
[7t] Mode [5t] | [7t] Piano keys [5t] | [7t] Intervals [5t] | Del | |||
G♮A♮B♮C♮D♮E♮F | G♭ A♭ B♭ D♭ E♭ | W W H W W H W | W W M W M | 4 7 | ||
D♮E♮F♮G♮A♮B♮C | D♭ E♭ G♭ A♭ B♭ | W H W W W H W | W M W W M | 3 7 | ||
A♮B♮C♮D♮E♮F♮G | A♭ B♭ D♭ E♭ G♭ | W H W W H W W | W M W M W | 3 6 | ||
E♮F♮G♮A♮B♮C♮D | E♭ G♭ A♭ B♭ D♭ | H W W W H W W | M W W M W | 2 6 | ||
B♮C♮D♮E♮F♮G♮A | B♭ D♭ E♭ G♭ A♭ | H W W H W W W | M W M W W | 2 5 |
(End warning.)
We have to go deeper (Scaleception)
But wait, there’s more! Consulting the heptatonic circle of fifths progression enables us to “average” the above two tables. Eerily, averaging them doesn’t invalidate their results in any way except a trivial one: this is the first analysis that’s actually correct. But, as the famed philosopher Nigel Tufnel put it, that’s nitpicking, innit?
How pentatonic transforms Ionian: The correct “tritone deletion” explanation | ||||||
---|---|---|---|---|---|---|
[7t] Mode [5t] | [7t] Piano keys [5t] | [7t] Intervals [5t] | Del | |||
C♮D♮E♮F♮G♮A♮B | C♮D♮E♮G♮A | W W H W W W H | W W M W M | 4 7 | ||
G♮A♮B♮C♮D♮E♮F | G♮A♮C♮D♮E | W W H W W H W | W M W W M | 3 7 | ||
D♮E♮F♮G♮A♮B♮C | D♮E♮G♮A♮C | W H W W W H W | W M W M W | 3 6 | ||
A♮B♮C♮D♮E♮F♮G | A♮C♮D♮E♮G | W H W W H W W | M W W M W | 2 6 | ||
E♮F♮G♮A♮B♮C♮D | E♮G♮A♮C♮D | H W W W H W W | M W M W W | 2 5 |
So, to reiterate: The first two tables I presented are filthy half-truths: their explanations only fit due to mathematical patterns they don’t account for. Only the third is fully correct. Can you figure out why?
- If both scales have symmetrical modes (Dorian and neutral pentatonic), then:
- We should compare the symmetrical modes to each other.
- Symmetrical modes should be their circle-of-fifths-order comparisons’ center data rows.
- Rows whose intervals are mirrors in the base should remain mirrors in the transformation.
- Both circle-of-fifths-order interval comparisons should possess 180° rotational symmetry.
- Since we didn’t delete the root, our analysis must compare the base scales. Only table three does so. Not comparing the base scales is a surefire recipe for confusion.
- Deleting the base scale’s fourth and seventh notes also deletes its fourth and seventh modes. The first table keeps Lydian. The second keeps Locrian. The third deletes both.
- Our analysis must compare the same notes within each scale. We didn’t move notes, only remove them, so our analysis can’t either. A closer look at the “downshift” table reveals the problem here: Mixolydian’s fourth degree, Dorian’s seventh, Aeolian’s third, Phrygian’s sixth, and Locrian’s second are Ionian’s root!
The problem isn’t as obvious in the “upshift” table, but it tells us to remove Ionian’s third degree. Major pentatonic still opens with two whole steps, just like Ionian, so we haven’t removed Ionian’s third degree! This is why our analysis should only shift notes if we delete the root. (And if you do, good luck – you’ll need it.)
I struggled with whether to call the last table “Tritone Deletion”, “Tritone Substitution”, or “Tritone Shift”; all three are correct. The notes the last table removes correspond exactly to the Ionian scale’s sole tritone; the pentatonic scales are also exactly a tritone from where its two predecessors listed them. I ultimately went with “Tritone Deletion”, though, because all the properties above are direct consequences of removing the tritone.
Things like this are one reason I self-identify as agnostic rather than atheist: part of my brain refuses to accept that these could be coincidences. (The other part of my brain replies that this is all mathematically inevitable, and I simply haven’t yet grokked all the implications of deleting Ionian’s fourth and seventh notes.)
Since pentatonic’s mode nomenclature isn’t as well established as Ionian’s, my brain’s cutesy part wants to rename them Nianoi, Niadyloxim, Niarod, Nialoea, and Niagyrhp. I’m afraid that even after the above explanation, that might confuse people, but that won’t stop me from using them as alternate names.
Analysis of modes in scale order
The modes’ scale ordering may help further clarify why the upshift and downshift tables are wrong:
How pentatonic transforms Ionian: The correct “root note” explanation | ||||||
---|---|---|---|---|---|---|
[7t] Mode [5t] | [7t] Piano keys [5t] | [7t] Intervals [5t] | Del | |||
C♮D♮E♮F♮G♮A♮B | C♮D♮E♮G♮A | W W H W W W H | W W M W M | 4 7 | ||
D♮E♮F♮G♮A♮B♮C | D♮E♮G♮A♮C | W H W W W H W | W M W M W | 3 6 | ||
E♮F♮G♮A♮B♮C♮D | E♮G♮A♮C♮D | H W W W H W W | M W M W W | 2 5 | ||
G♮A♮B♮C♮D♮E♮F | G♮A♮C♮D♮E | W W H W W H W | W M W W M | 3 7 | ||
A♮B♮C♮D♮E♮F♮G | A♮C♮D♮E♮G | W H W W H W W | M W W M W | 2 6 |
Modes are inextricably linked to their roots. We must compare the same notes in each scale:
- We didn’t delete this note, so its mode, , becomes .
- We didn’t delete this note, so its mode, , becomes .
- We didn’t delete this note, so its mode, , becomes .
- Deleting this note deletes its mode. has no pentatonic equivalent.
- We didn’t delete this note, so its mode, , becomes .
- We didn’t delete this note, so its mode, , becomes .
- Deleting this note deletes its mode. has no pentatonic equivalent.
Put another way, recall how Ionian’s modes got their numbering:
- starts on its first note.
- starts on its second note.
- starts on its third note.
- starts on its fourth note.
- starts on its fifth note.
- starts on its sixth note.
- starts on its seventh note.
So, applying the same principle to the pentatonic scale:
- starts on its first note.
- starts on its second note.
- starts on its third note.
- starts on its fourth note.
- starts on its fifth note.
Comparison of interval spacing
Why pentatonic and Ionian’s intervals are out of sync may not be obvious. Let’s revisit the above table, this time with deleted tones in red and combined intervals in purple:
How pentatonic transforms Ionian: Interval analysis (circle order) | ||||||
---|---|---|---|---|---|---|
[7t] Mode [5t] | [7t] Piano keys [5t] | [7t] Intervals [5t] | Del | |||
C♮D♮E♮F♮G♮A♮B | C♮D♮E♮G♮A | W W H W W W H | W W M W M | 4 7 | ||
G♮A♮B♮C♮D♮E♮F | G♮A♮C♮D♮E | W W H W W H W | W M W W M | 3 7 | ||
D♮E♮F♮G♮A♮B♮C | D♮E♮G♮A♮C | W H W W W H W | W M W M W | 3 6 | ||
A♮B♮C♮D♮E♮F♮G | A♮C♮D♮E♮G | W H W W H W W | M W W M W | 2 6 | ||
E♮F♮G♮A♮B♮C♮D | E♮G♮A♮C♮D | H W W W H W W | M W M W W | 2 5 |
It may help to emphasize that we aren’t deleting intervals; we’re deleting notes and combining intervals. For instance, deleting a scale’s second note combines its first two intervals. Also, bear in mind that:
- Ionian has only semitones and whole tones
- We only delete notes that:
- follow semitones and precede whole tones
- follow whole tones and precede semitones
Thus, the two intervals around every deleted note turn become a single minor third aligning exactly to the pattern of deletions. Since this pattern is out of phase with the original one, it changes, but if the deleted notes were surrounded by different intervals, the new interval pattern wouldn’t map so precisely to the deletions.
Interestingly, that relationship is vastly less obvious in scale order, even with the above highlighting:
How pentatonic transforms Ionian: Interval analysis (scale order) | ||||||
---|---|---|---|---|---|---|
[7t] Mode [5t] | [7t] Piano keys [5t] | [7t] Intervals [5t] | Del | |||
C♮D♮E♮F♮G♮A♮B | C♮D♮E♮G♮A | W W H W W W H | W W M W M | 4 7 | ||
D♮E♮F♮G♮A♮B♮C | D♮E♮G♮A♮C | W H W W W H W | W M W M W | 3 6 | ||
E♮F♮G♮A♮B♮C♮D | E♮G♮A♮C♮D | H W W W H W W | M W M W W | 2 5 | ||
G♮A♮B♮C♮D♮E♮F | G♮A♮C♮D♮E | W W H W W H W | W M W W M | 3 7 | ||
A♮B♮C♮D♮E♮F♮G | A♮C♮D♮E♮G | W H W W H W W | M W W M W | 2 6 |
So, let’s correct our original analysis, shall we?
- C D E G A (1, 1, 1½, 1, 1½). It is the root form of the scale, and it is the pentatonic circle of fourths’ lowest mode. deletes ’s fourth and seventh notes:
- G A C D E (1, 1½, 1, 1, 1½). It is the pentatonic circle of fourths’ second-lowest mode. deletes ’s third and seventh notes:
- D E G A C (1, 1½, 1, 1½, 1). Like Dorian, it’s symmetrical; it’s also the pentatonic circle of fourths’ midpoint. deletes ’s third and sixth notes:
- A C D E G (1½, 1, 1, 1½, 1). It is the pentatonic circle of fourths’ second-highest mode. deletes ’s second and sixth notes:
- E G A C D (1½, 1, 1½, 1, 1). It is the pentatonic circle of fourths’ highest mode. deletes ’s second and fifth notes:
Oh, right. Time to explain “circle of fourths”. Though I should probably explain scale rotation even before that.
A Brief Explanation of Scale Rotation
Scale rotation is the practice of forming a different mode by moving some of a scale’s intervals either from its start to its end or from its end to its start. When I refer to moving a scale’s intervals “left”, I’m referring both to the piano keyboard and to the scale interval tables I keep using. Rotating a scale left means moving most of its intervals to a lower point in the scale. Since a scale repeats every octave, the rest move to the top.
“It might not always be ‘most’,” I hear you object. Well, true, you could rotate a seven-note scale six degrees to the right, but why would you, when that’s the same as rotating it one degree to the left?
…Oh, right. I need to explain rotation by degrees, too. No, we’re not talking angles here. Rotating a scale by a specific number of degrees moves that many intervals from the start of the scale to the end (or vice versa). Rotating Ionian one degree left gives you Dorian. Rotating Ionian three degrees left gives you Lydian. And so on.
I’ll also sometimes refer to rotation by semitones. If I rotate a scale by five semitones, that means the intervals moved from the start to the end (or from the end to the start) sum up to five semitones. Thus, rotating Ionian five semitones to the left also takes you to Lydian.
The size of a scale rotation, either in interval size or in degrees, has nothing to do with how far the notes within the scale move. Lydian may be a five-semitone leftward rotation from Ionian, but it only moves one note (the fourth degree of the scale), and that note only moves by a semitone (F to F♯).
I may also refer to scale rotations by the number of notes they move. A single-note rotation only changes the position of one note. This does not signify anything about the number of intervals moved to the front or the end of the scale, the size of those intervals, or even about the interval by which the note is moved.
So, to summarize: Ionian to Lydian is a single-note rotation; it moves the note by one semitone, but it rotates the scale by five semitones (and three degrees).
I’ll try to keep this terminology from being ambiguous, but words are an imperfect medium for discussing music at the best of times, and when we throw mathematics, geometry, and set theory into the mix, forget it. If anything feels confusingly worded, please let me know, and I’ll try to clarify.
The Pentatonic Circle of Fourths, or, Contrary Motion Explained
The pentatonic and Ionian circle of fifths orders move their parent scales in exact opposite directions. In fact, to emphasize this, I’m not even gonna call it the pentatonic circle of fifths anymore. I’ma call it monkeydude Josh the pentatonic circle of fourths. I find this fitting for at least two reasons:
- Scale analysis disregards octaves in such a way that moving up a perfect fifth equates to moving down a perfect fourth. The different nomenclature helps call attention to their contrary directions.
- Since the perfect fifth (seven semitones) has been the focus of my analysis of seven-note scales, the perfect fourth (five semitones) feels like the perfect focus for analysis of five-note scales.
But why do they move in opposite directions? It’s probably easiest to analyze in terms of interval spacing.
Pentatonic changes two of Ionian’s interval pairs from “tone, semitone” to “minor third”. It so happens that one of Ionian’s two semitones closes out the scale. Thus, compare what happens when we shift pentatonic major’s intervals to the left to what happens when we shift Ionian’s.
Pentatonic interval spacing (root order) | ||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Mode | 1 | 2 | 3 | 4 | 5 | Intervals | |||||||
1 | C♮ | D♮ | E♮ | G♮ | A♮ | 1 | 1 | 1½ | 1 | 1½ | ||||
2 | C♮ | D♮ | F♮ | G♮ | A♯ | 1 | 1½ | 1 | 1½ | 1 | ||||
3 | C♮ | D♯ | F♮ | G♯ | A♯ | 1½ | 1 | 1½ | 1 | 1 | ||||
4 | C♮ | D♮ | F♮ | G♮ | A♮ | 1 | 1½ | 1 | 1 | 1½ | ||||
5 | C♮ | D♯ | F♮ | G♮ | A♯ | 1½ | 1 | 1 | 1½ | 1 |
Ionian interval spacing (root order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Mode | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | ||||||
1 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | |
2 | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | |
3 | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | |
4 | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | |
5 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | |
6 | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | |
7 | C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
There’s a lot to unpack there. Some analysis:
Both scales contain a repeated interval set (called a tetrachord in Ionian and a trichord in pentatonic) and a spare whole step, or synaphe. I’ve marked one possible reading within the interval list. (Two such readings exist of pentatonic, and three of Ionian; in this example, I avoided splitting tetrachords or trichords in the base scale.)
Synaphe (plural synaphai or synaphes) comes from the Attic Greek σῠνᾰφή (sŭnăphḗ, literally connection, union, junction; point or line of junction; conjunction of two tetrachords). Its Attic pronunciation is roughly suh-nuh-FAY (so, basically how a drunk person would say Santa Fe), but I think English speakers, mistakenly assuming it to be French, might say sy-NAFF. (Pro tip: If a word contains ph and doesn’t split it across two syllables, you can almost wager money that it came from Greek. Also, pronouncing a foreign word using the wrong language’s orthography is a great way to make a linguistics nerd’s blood boil. And just to prove that I’m a linguistics nerd, orthography is derived from ορθο- (ortho-, correct) and -γραφίᾱ (-graphíā, writing).)
Ionian and pentatonic have similar structures and share five notes… but for the purposes of this analysis, that’s almost where their similarities stop.
Ionian interval spacing (circle of fifths order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Mode | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | ||||||
4 | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | |
1 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | |
5 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | |
2 | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | |
6 | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | |
3 | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | |
7 | C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
I’ve analyzed Ionian’s tetrachord as whole tone, whole tone, semitone, placing the synaphe mid-scale. Swapping the synaphe with the tetrachord above it shifts the scale down, note by note. (Remember, a scale is a repeating note pattern, so in Mixolydian, “the tetrachord above it” is intervals 1-3, and it’s split across the start and end of the scale in Aeolian and Locrian.) Only Lydian’s interval list is more front-loaded than Ionian’s – it swaps Ionian’s first semitone with the following whole tone, with the following results:
- Lydian’s fourth note is the only sharp in the entire table.
- Each mode after Ionian adds flats to its notes, one by one.
- Locrian’s first and fourth notes are the only ones that aren’t lowered from their positions in Ionian.
Note also the following patterns within each mode:
- The note it lowers is either five semitones above or seven below the one its predecessor lowered.
- Its sole tritone consists of the note it lowers and the note its successor lowers.
Pentatonic interval spacing (circle of fourths order) | ||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Mode | 1 | 2 | 3 | 4 | 5 | Intervals | |||||||
3 | C♮ | D♯ | F♮ | G♯ | A♯ | 1½ | 1 | 1½ | 1 | 1 | ||||
5 | C♮ | D♯ | F♮ | G♮ | A♯ | 1½ | 1 | 1 | 1½ | 1 | ||||
2 | C♮ | D♮ | F♮ | G♮ | A♯ | 1 | 1½ | 1 | 1½ | 1 | ||||
4 | C♮ | D♮ | F♮ | G♮ | A♮ | 1 | 1½ | 1 | 1 | 1½ | ||||
1 | C♮ | D♮ | E♮ | G♮ | A♮ | 1 | 1 | 1½ | 1 | 1½ |
I’ve analyzed pentatonic’s trichord as whole tone, minor third, placing the synaphe at the start of the scale. As it happens, pentatonic major’s intervals are as back-loaded as possible: that is, every other C-rooted mode of the pentatonic scale moves at least one note up a semitone. If we want to lower any notes besides the root, we have to lower the root before them.
Thus, while Ionian is second in its circle of fifths order, major pentatonic closes out its own circle of fourths. The next transposition in this sequence will yield C♭ blues minor (or B blues minor, whichever you prefer).
A few additional observations regarding both tables:
- Note the notes in common to multiple modes of each scale:
Land of Confusion Pentatonic mode Notes Ionian modes Notes C♮ D♯ F♮ G♯ A♯ C♮ E♭ F♮ A♭ B♭ C♮ D♯ F♮ G♮ A♯ C♮ E♭ F♮ G♮ B♭ C♮ D♮ F♮ G♮ A♯ C♮ D♮ F♮ G♮ B♭ C♮ D♮ F♮ G♮ A♮ C♮ D♮ F♮ G♮ A♮ C♮ D♮ E♮ G♮ A♮ C♮ D♮ E♮ G♮ A♮ - Ionian’s final semitone is why C Locrian and C Phrygian use D♭. That semitone doesn’t exist in pentatonic.
- Shifting major pentatonic’s intervals one space to the right instead changes D to D♯, E to F, and A to A♯.
- As a result, the scales have effectively opposite directions of motion.
One final note: I highlighted the extra whole step, but its different position in each scale isn’t, in and of itself, why they move in different directions. In fact, since both scales are mostly made of whole steps, multiple intervals could be considered their synaphai; the choice depends entirely on the arbitrary choice of trichord or tetrachord pattern. Two such patterns can fit for the pentatonic scale and three for Ionian; each result in different synaphai and n-chord divisions. I used my divisions because the others split one of the base scale’s n-chords. (I’ve highlighted my approaches below.)
Ionian tetrachords & pentatonic trichords & synaphai, oh my | |||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | Pattern | n-chord 1 | n-chord 2 | Synaphe | |||||||||
Major 5t | 1 | 1½ | 2 | 3 | 4 | 5 | 1 | ||||||
Major 5t | 1½ | 1 | 3 | 4 | 5 | 1 | 2 | ||||||
Ionian | 1 | 1 | ½ | 5 | 6 | 7 | 1 | 2 | 3 | 4 | |||
Ionian | 1 | ½ | 1 | 6 | 7 | 1 | 2 | 3 | 4 | 5 | |||
Ionian | ½ | 1 | 1 | 7 | 1 | 2 | 3 | 4 | 5 | 6 |
Note that the Ancient Greeks used the final analysis for their diatonic genus, which was nearly identical to our Ionian scale in all but name. When in Greece, I shall do as the Greeks did, but in this section, I figured it was better to defer the added complexity until this part of my explanation.
In short, the extra whole step’s position per se doesn’t affect the scale’s direction; they move in different directions mostly because Ionian’s last interval is a semitone and major pentatonic’s is a minor third. However, as we’re about to see, the circle orders wouldn’t exist even without the pentatonic and Ionian scales’ atypically regular note spacing. Transforming one mode of most other scales into another requires far more work.
An Analysis of Five-Semitone Scale Rotation
Ultimately, the pentatonic and Ionian scales are, respectively, the only pentatonic and heptatonic scales in 12-TET for which moving a single note by a semitone amounts to a scale rotation. There’s a relatively simple mathematical explanation for why, too:
- Both scales are primarily composed of two identical interval collections, summing to five semitones each.
Ionian & Pentatonic Building Blocks Scale n-chord Notes Intervals Outlier Ionian Tetrachord 4 3 Semitone Pentatonic Trichord 3 2 Minor third - A synaphe (additional whole tone) separates the two n-chords.
- All but one of the n-chord’s intervals are whole tones. The outlier differs in size by a semitone.
- Rotating the scale by n degrees swaps the n-chord and the synaphe.
- This has a single effect on the interval composition: a whole tone swaps positions with an outlier.
- Since the outlier differs by merely a semitone, the sole result on the scale’s harmonic composition is to move a single note by a semitone:
Outcome of swapping n-chord with synaphe Outlier Outlier moves Note moves Minor third Down Up Semitone Down Down Minor third Up Down Semitone Up Up - This is why the pattern depends on the notes being almost, but not quite, completely evenly distributed: rotating a less even distribution moves more notes; rotating a completely even distribution moves none.
- It’s also why the pattern is so closely linked to the circles of fourths and fifths: swapping the synaphe with the n-chord requires rotating the scale by either five or seven semitones.
- Five and seven are the magic numbers because 12 modulo 7 = 5. In other words, after a note has moved seven semitones, five semitones of the octave remain.
- For a concrete examination, let’s look again at Ionian (1, 1, ½, 1, 1, 1, ½) and Mixolydian (1, 1, ½, 1, 1, ½, 1).
- Changing Ionian to Mixolydian causes a single change: intervals 6 and 7 swap places.
- Ionian’s first three intervals are identical to its last three.
- Mixolydian’s first three intervals are identical to its fourth through sixth.
- Ionian’s first three intervals are identical to Mixolydian’s.
- Ionian’s fifth through seventh intervals are identical to Mixolydian’s fourth through sixth.
- Ionian’s fourth and fifth intervals are also identical to Mixolydian’s fourth and fifth.
- Ionian’s fourth interval is identical to Mixolydian’s seventh.
- Ionian’s sixth interval is a semitone larger than Mixolydian’s.
- Mixolydian’s seventh interval is a semitone larger than Ionian’s.
- Rotating a scale with less uniform interval spacing changes its interval composition substantially more.
- Rotating a scale with completely uniform intervals does not change its interval composition at all – thus, a completely uniform scale has only a single mode.
In summary, for moving a single note of any five- or seven-note scale in 12-TET by a semitone to rotate the scale, its intervals must be almost completely uniform, with only two identical outliers that:
- Differ in size from the remainder by only a semitone
- Are separated by five semitones
One final question may remain for readers: why is the number of outliers so important? Actually, it isn’t; it’s just important that the outliers be identical. If a seven-note scale could be completely uniform apart from one outlier, moving that interval would also rotate the scale. And, as it turns out, it can, but not, ironically, by making its note distribution more uniform.
- Take the temperament modulo the scale size to get the number of extra semitones to distribute: 12 modulo 7 is 5. We have five extra semitones to distribute.
- Take the note count modulo the extra semitones to figure out the most uniform note distribution possible: 7 modulo 5 is 2.
In short, two intervals must be outliers in the most uniform heptatonic note distribution possible. The way to get a single outlier, therefore, is to go in the exact opposite direction and make the outlier as big as possible. Which brings us to our next point of analysis.
Other Single-Note Scale Rotations
I’ve focused most of my analysis so far on pentatonic and heptatonic scales, but now that I better understand the mathematical principles explaining why this happens, I’ve expanded my scope somewhat to see if I can uncover other examples of similar patterns with scale rotations of various interval sizes. I’ve uncovered a few, which I’ll explain in a moment.
Other equal temperaments certainly have similar examples (for instance, in 24-TET, rotation by 11 or 13 quarter-tones should produce similar results for similar 11- and 13-note scales), but I haven’t finished developing tools for scale analysis outside 12-TET, so they will have to wait.
Do other scales exist in 12-TET that don’t contain the above composition for which moving a single note by a semitone will qualify as a scale rotation? As it happens, yes: I can say with complete confidence, without even having to think about it, that the hendecatonic scale must demonstrate the same principle. And I say the hendecatonic scale for a simple reason: 12-TET contains only a single hendecatonic scale. The reason may be self-explanatory, but if it isn’t, I’ll give you a hint: It’s also why it contains only a single dodecatonic scale.
In 12-TET, hendecatonic scales must contain all but one note of the chromatic scale. Thus, it must contain ten semitones and one whole tone, and swapping its whole tone with any of its semitones qualifies as a scale rotation by default. There are only eleven ways to remove notes that aren’t the root; thus, a single scale with eleven modes, and it displays similar patterns not just for the circle of fifths but for every possible interval in 12-TET.
Of course, the very fact that only one hendecatonic scale exists in 12-TET somehow makes this feel vastly less impressive, even though it has exactly the same cause as Ionian’s circle of fifths pattern. Funny how that works.
Applying this same principle, we can determine that one other heptatonic scale exists in 12-TET for which moving a series of single notes by a constant interval size will rotate the scale. However, you don’t move its notes by a semitone; you move them by a perfect fourth. And, ironically, this doesn’t rotate it by five semitones; it rotates it by one. And its root won’t progress through the chromatic scale by semitones: it’ll progress through it by perfect fourths. (This will still take it all the way around the chromatic scale, just in a different order.) It’s the
, which has the following interval spacing:½ ½ ½ ½ ½ ½ 3
Which is to say:
semitone, semitone, semitone, semitone, semitone, semitone, tritone
The notation for this is absolutely cursed, so I won’t bother displaying charts for its modes. But by following the above explanation, you may be able to understand the inevitable mathematical result of this scale composition.
Similar corollaries apply to some other scale sizes: moving successive notes of the ½ ½ ½ ½ 4, or semitone, semitone, semitone, semitone, minor sixth) by seven semitones will inevitably take the scale through all its modes, moving the scale root up by a perfect fifth each time.
(However, this only applies to a few scale sizes. Why? To rotate the ½ ½ ½ ½ 3½, or semitone, semitone, semitone, perfect fifth), we must move notes by a tritone each. So when we move the root up, we move it a tritone. Two tritones amount to an octave, so we skip five-sixths of the chromatic scale.
(The only non-semitone interval of any such truncation of the chromatic scale is (13 - n) semitones, where n is the scale’s note count. Thus, scale rotation moves notes by (12 - n) semitones. For rotation of such a scale to take us through all of its modes across the entire chromatic scale, this interval cannot be a factor of 12. In fact, in any n-TET, for scale rotations that move single notes by more than a chromatic step to cover the entire chromatic scale, n modulo the interval size (in units of 1/n octave) must not be 0. Thus, in 12-TET:
- Moving notes a semitone runs through the entire chromatic scale in linear order.
- Moving notes two semitones (major second) skips half of the scale.
- Moving notes three semitones (minor third) skips two-thirds of the scale.
- Moving notes four semitones (major third) skips three-quarters of the scale.
- Moving notes five semitones (perfect fourth) runs through all notes in circle of fourths order.
- Moving notes six semitones (tritone) skip five-sixths of the scale.
Anything beyond a tritone can be evaluated using the first six parameters: moving a note up by seven semitones equates to moving it down by five. Thus, in 12-TET, the only truncations of the chromatic scale for which this method of scale rotation will work contain 1, 5, 7, and 11 notes, and their rotations will respectively move single notes by a semitone, a perfect fourth, a perfect fourths, and a semitone.
Thus, the Ionian and heptatonic chromatic scales are the only heptatonic scales in 12-TET where single-note rotations will take us through the entire chromatic scale. As far as I can ascertain, only two other heptatonic scales exist in 12-TET that have single-note rotations. They respectively have the following interval spacing:
Hungarian major: minor third, semitone, whole tone, semitone, whole tone, semitone, whole tone
Lydian ♯23: minor third, whole tone, semitone, whole tone, semitone, whole tone, semitone
In case it isn’t obvious why these won’t take us through the entire chromatic scale: in both cases, the single-note rotation moves a note by a minor third. Four minor thirds make up an octave. Thus, cannot cycle through the entire chromatic scale using these kinds of transformations.
Note that in both these scales, there are three pairs of whole tones and semitones, and one additional minor third. A whole tone and a semitone, of course, add up to a minor third. Thus, although this is in some ways the least regular interval distribution we’ve examined, the fact that it can be divided into four three-semitone regions necessitates a rotation that lines up exactly with the parent tonality.
Transformations of the Ionian Scale
Harmonic Minor
Since learning harmonic and melodic minor’s modes is absolutely essential for anyone who wants to play jazz, I’ve created several sets of tables to help people visualize them better.
Harmonic Minor vs. Modes from Aeolian (rooted on C, in ascending order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♮ | B♭ | ½ | 1 | 1 | ½ | 1½ | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♭ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♭ | E♭ | F♭ | G♭ | A♭ | B𝄫 | ½ | 1 | ½ | 1 | 1 | ½ | 1½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 |
Thus, as the first set of mode names suggests, harmonic minor’s modes respectively raise by a half-step:
- Aeolian’s seventh degree,
- Locrian’s sixth degree,
- Ionian’s fifth degree,
- Dorian’s fourth degree,
- Phrygian’s third degree,
- Lydian’s second degree,
- C-C-C-C-COMBO BREAKER!
Since we’re transposing every mode to C, we can’t raise Mixolydian’s first degree, because it’s the first degree! Instead, we must lower every other degree by a half-step. Say wha?
Somehow, it’s actually both even weirder than that, and not weird at all: what we do in the above table is the equivalent of raising the first degree. Since we’re constraing ourselves to a root of C, raising the first note of a scale by a half-step requires us to lower every note of that scale by a half-step. This results in the first note being the only scale degree we don’t lower: ½ − ½ = 0.
In practice, though, it’s usually already raised for us: it’s harmonic minor’s seventh degree! Let’s see what happens when we root these modes on the corresponding notes of their respective parent C minor scales:
Harmonic Minor vs. Modes from Aeolian (rooted on scale, in ascending order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | C♮ | ½ | 1 | 1 | ½ | 1½ | ½ | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
E♭ | F♮ | G♮ | A♭ | B♮ | C♮ | D♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
F♮ | G♮ | A♭ | B♮ | C♮ | D♮ | E♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | ||
F♮ | G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
G♮ | A♭ | B♮ | C♮ | D♮ | E♭ | F♮ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | ||
G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | F♮ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
A♭ | B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ | ||
A♭ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | ½ | 1 | ½ | 1 | 1 | ½ | 1½ | ||
B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 |
Thus, B♭ Mixolydian is to C Aeolian as B Mixolydian ♯1 is to C harmonic minor: each starts from its parent scale’s seventh note. There’s actually nothing odd going on here at all; it’s exactly how modes are supposed to behave. C Mixolydian ♯1 equates to lowering every note of C Mixolydian except C by a half-step – and to raising only the B in B Mixolydian by a half-step.
Observant readers may have noticed that the “rooted on C” table above actually appears to contain several shifts. The missing puzzle piece is that it lists the modes in ascending order rather than “circle of fifths” order, which I did to make the scales’ intervals easier to relate to each other. So let’s return to “circle of fiths” order.
Harmonic Minor vs. Modes from Aeolian (rooted on C, in “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♭ | E♭ | F♭ | G♭ | A♭ | B𝄫 | ½ | 1 | ½ | 1 | 1 | ½ | 1½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♭ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♮ | B♭ | ½ | 1 | 1 | ½ | 1½ | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
We now see that, broadly speaking, in all except one case, each scale has one fewer sharp or one more flat than its predecessor two entries above. The clear outlier is Mixolydian ♯1, and this table may further clarify why the mode corresponding to Mixolydian is the one thus affected. Mixolydian corresponds to Ionian’s fifth scale degree, Dorian’s fourth scale degree, Phrygian’s third scale degree… and that’s the degree that harmonic minor’s modes raise. For completeness, here are the modes in “circle of fifths” order, rooted to their respective notes within their parent C minor scales:
Harmonic Minor vs. Modes from Aeolian (rooted on scale, in “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
A♭ | B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ | ||
A♭ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
E♭ | F♮ | G♮ | A♭ | B♮ | C♮ | D♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | D♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | ½ | 1 | ½ | 1 | 1 | ½ | 1½ | ||
B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
F♮ | G♮ | A♭ | B♮ | C♮ | D♮ | E♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | ||
F♮ | G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
G♮ | A♭ | B♮ | C♮ | D♮ | E♭ | F♮ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | ||
G♮ | A♭ | B♭ | C♮ | D♮ | E♭ | F♮ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | C♮ | ½ | 1 | 1 | ½ | 1½ | ½ | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | C♮ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
Analysis of chord tonality by scale position:
Chord Tonalities by Scale Position & Mode (Harmonic Minor) | |||||||||
---|---|---|---|---|---|---|---|---|---|
Mode | I | II | III | IV | V | VI | VII | ||
1 | min | dim | AUG | min | Maj | Maj | dim | ||
2 | dim | AUG | min | Maj | Maj | dim | min | ||
3 | AUG | min | Maj | Maj | dim | min | dim | ||
4 | min | Maj | Maj | dim | min | dim | AUG | ||
5 | Maj | Maj | dim | min | dim | AUG | min | ||
6 | Maj | dim | min | dim | AUG | min | Maj | ||
7 | dim | min | dim | AUG | min | Maj | Maj |
Melodic Minor
Melodic minor is perhaps better related to the modes starting with Ionian. I haven’t drawn borders this time, because… well, it’s probably better to just show the table first.
Melodic Minor vs. Modes from Ionian (rooted on C, in ascending order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♭ | G♭ | A♭ | B♭ | ½ | 1 | ½ | 1 | 1 | 1 | 1 |
The dual mnemonics for each mode of melodic minor in this table effectively show how we can derive melodic minor and each of its modes in two different ways from two different modes of Ionian:
- Melodic minor is Ionian with a flat third or Dorian with a sharp seventh.
- Jazz minor inverse is Dorian with a flat second or Phrygian with a sharp sixth.
- Lydian augmented is Phrygian with a flat first* or Lydian with a sharp fifth.
- Lydian dominant is Lydian with a flat seventh or Mixolydian with a sharp fourth.
- Aeolian dominant is Mixolydian with a flat sixth or Aeolian with a sharp third.
- Half-diminished is Aeolian with a flat fifth or Locrian with a sharp second.
- Super-Locrian is Locrian with a flat fourth or Ionian with a sharp first*.
Asterisks are necessary for the first scale degree when transposing every scale degree to C. When improvising on an existing scale, the same principles apply as with harmonic minor’s Mixolydian ♯1 – the mode’s root will already be transposed within the scale you’re playing, so you just have to bear that in mind when thinking of what notes to play above it. This may be clearer in the following table, which shows how the above modes relate to C melodic minor and C Ionian:
Melodic Minor vs. Modes from Ionian (rooted on scale, in ascending order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♮ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
A♮ | B♮ | C♮ | D♮ | E♮ | F♮ | G♮ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
B♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 |
In short, E♭ Phrygian ♭1’s root note is already flat in its parent scale – you don’t have to flat it again!
“Circle of fifths” order makes it clear that the big note shift from Phrygian to Lydian augmented occurs in the “rooted on C” chart for the same reason the note shift between Mixolydian and Mixolydian ♯1 occurs with the harmonic minor scale: rooting everything to C means we can’t lower the first note and must instead raise the other notes by however much we’d have lowered the first note.
Melodic Minor vs. Modes from Ionian (rooted on C, in “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♭ | G♭ | A♭ | B♭ | ½ | 1 | ½ | 1 | 1 | 1 | 1 |
Phrygian mode corresponds to Ionian’s third degree; that’s the note melodic minor lowers from Ionian. Thus, Phrygian is the mode that undergoes the note shift in the above table. Moreover, C Lydian augmented raises every note of C Phrygian except its root because its parent scale lowers its corresponding note.
For completeness, here’s “circle of fifths” order without transposition.
Melodic Minor vs. Modes from Ionian (rooted on scale, in “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
G♮ | A♮ | B♮ | C♮ | D♮ | E♮ | F♮ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
A♮ | B♮ | C♮ | D♮ | E♮ | F♮ | G♮ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
E♮ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
B♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 |
Of course, as the orange names in the “rooted on C” table suggest, we can also get melodic minor by raising a different set of notes on a different series of modes. I’ve changed the first set of scale names accordingly, and since this interpretation of melodic minor raises pitches from its parent modes instead of lowering them, I’ve printed it first in this table. Note also the Ionian scale’s different base key here (B♭ major instead of C major).
Melodic Minor vs. Modes from Dorian (rooted on scale, in ascending order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | E♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
G♮ | A♮ | B♭ | C♮ | D♮ | E♭ | F♮ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
A♮ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ |
Here’s a comparison of these transformations in “circle of fifths” order, rooted to C:
Melodic Minor vs. Modes from Dorian (rooted on C, in “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♭ | E♭ | F♭ | G♭ | A♭ | B♭ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
And in “circle of fifths” order rooted on their parent scales:
Melodic Minor vs. Modes from Dorian (rooted on scale, in “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
F♮ | G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
F♮ | G♮ | A♮ | B♭ | C♮ | D♮ | E♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
G♮ | A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
G♮ | A♮ | B♭ | C♮ | D♮ | E♭ | F♮ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | C♮ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | C♮ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
A♮ | B♮ | C♮ | D♮ | E♭ | F♮ | G♮ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
A♮ | B♭ | C♮ | D♮ | E♭ | F♮ | G♮ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
Analysis of chord tonality by scale position:
Chord Tonalities by Scale Position & Mode (Melodic Minor) | |||||||||
---|---|---|---|---|---|---|---|---|---|
Mode | I | II | III | IV | V | VI | VII | ||
1 | min | min | AUG | Maj | Maj | dim | dim | ||
2 | min | AUG | Maj | Maj | dim | dim | min | ||
3 | AUG | Maj | Maj | dim | dim | min | min | ||
4 | Maj | Maj | dim | dim | min | min | AUG | ||
5 | Maj | dim | dim | min | dim | AUG | Maj | ||
6 | dim | dim | min | min | AUG | Maj | Maj | ||
7 | dim | min | min | AUG | Maj | Maj | min |
The Ionian Scale’s Stability
Let’s use a slightly more flexible root to compare melodic minor’s modes to Ionian’s in both directions – Ionian’s modes, melodic minor’s modes, and Dorian’s modes. Note especially how much stabler the Ionian scale’s root is.
Melodic Minor vs. Ionian & Dorian (roots of C±½, circle of fifths order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♯ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♯ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♭ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
C♭ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♭ | G♭ | A♭ | B♭ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
C♭ | D♭ | E♭ | F♭ | G♭ | A♭ | B♭ | 1 | 1 | ½ | 1 | 1 | 1 | ½ |
None of these representations are perfect, but together, they may help illuminate how these scales’ modes are related. As you can see, it’s quite messy – we have to move our root up or down a half-step at points to preserve relationships to the Ionian scale and the circle of fifths. Whether we read melodic minor as
or as , we must move its root three times in a row to keep the circle of fifths progression stable:- Half-diminished to Lydian augmented: lower it a half-step
- Lydian augmented to Super-Locrian: raise it a half-step
- Super-Locrian to Lydian dominant: lower it a half-step
If the above table continued, its next three modes would be B Lydian, B Lydian dominant, and B Mixolydian – and a case could be made for rewriting its last six rows as B♯ Phrygian, B Lydian augmented, B Lydian, B♯ Locrian, B♯ Super-Locrian, and B Ionian.
Harmonic minor’s modes must shift their root in similar ways to preserve the pattern, except they’re spaced more unpredictably (which feels inevitable, given that its intervals are also less evenly spaced):
- Ionian augmented (#2) to Super-Locrian ♭7 (#3)
- Super-Locrian ♭7 (#3) to Lydian diminished (#4)
- Maqam Tarznauyn (#7) to Aeolian harmonic (#1)
Harmonic minor’s modes revisited, or, please throw some snacks down this rabbit hole | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | ½ | 1 | 1 | ½ | 1½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♭ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♮ | B♭ | ½ | 1 | 1 | ½ | 1½ | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
The Ionian scale has a comparatively stable descent: its root only lowers once, in the transition from Locrian to Lydian. As far as I can ascertain, it is the only seven-note scale for which this is true. My hypothesis is that this occurs because it comes as close as any seven-note scale within twelve-tone equal temperament can come to having its notes evenly spaced, without being precisely even. Two whole tones, a semitone, three whole tones, and a semitone.
The Ionian scale’s descent through its modes’ circle of fifths order requires only a single note change. Other scales’ changes are far less straightforward. Both harmonic and melodic minor’s equivalent transformations require moving three notes:
Harmonic minor & melodic minor’s “circle of fifths” progressions | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Shift from Previous Note | |||||||
|
C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♮ | −½ | +½ | 0 | 0 | 0 | −½ | 0 | |
|
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♮ | 0 | −½ | 0 | −½ | +½ | 0 | 0 | |
|
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | +½ | 0 | 0 | 0 | −½ | 0 | −½ | |
|
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♭ | −½ | 0 | −½ | +½ | 0 | 0 | 0 | |
|
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 0 | 0 | 0 | −½ | 0 | −½ | +½ | |
|
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♭ | 0 | −½ | +½ | 0 | 0 | 0 | −½ | |
|
C♮ | D♭ | E♭ | F♮ | G♭ | A♮ | B♭ | 0 | 0 | −½ | 0 | −½ | +½ | 0 | |
|
C♭ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | −½ | +½ | 0 | 0 | 0 | −½ | 0 | |
|
C♭ | D♭ | E♭ | F♭ | G♮ | A♭ | B♭ | 0 | −½ | 0 | −½ | +½ | 0 | 0 | |
|
C♮ | D♭♮ | E♭♮ | F♭♮ | G♭♮ | A♭♮ | B𝄫 | +½ | 0 | 0 | 0 | −½ | 0 | −½ | |
♮ | C♮ | D♮ | E♮ | F♯ | G♯ | A♮ | B♮ | −½ | −½ | 0 | 0 | +½ | 0 | 0 | |
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | +½ | 0 | 0 | −½ | −½ | 0 | 0 | ||
♮ | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | −½ | 0 | 0 | +½ | 0 | 0 | −½ | |
♮ | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 0 | 0 | −½ | −½ | 0 | 0 | +½ | |
♮ | C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 0 | 0 | +½ | 0 | 0 | −½ | −½ | |
♮ | C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | 0 | −½ | −½ | 0 | 0 | +½ | 0 | |
♮ | C♮ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | 0 | +½ | 0 | 0 | −½ | −½ | 0 | |
C♭ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | −½ | −½ | 0 | 0 | +½ | 0 | 0 | ||
♮ | C♮ | D♭ | E♭ | F♭ | G♭ | A♭ | B♭ | +½ | 0 | 0 | −½ | −½ | 0 | 0 |
Note a few additional patterns here:
- Harmonic minor:
- The fourth scale degree changes three times over four consecutive transformations:
- C Ionian ♯5 shifts F♯ to F♮. (This is the normal circle of fifths transformation.)
- C Dorian ♯4 shifts F back to F♯.
- C Aeolian ♯7 changes F♯ once more back to F♮.
- The seventh scale degree also changes three times over four consecutive transformations:
- C♯ Mixolydian ♯1 shifts B to B♭. (This is the normal circle of fifths transformation.)
- C Dorian ♯4 shifts B♭ back to B♮.
- C Aeolian ♯7 changes B once more back to F♭.
- Tritonality:
- These notes are a tritone apart from each other in the base scale.
- The Ionian scale contains only one tritone: F and B.
- Harmonic minor contains two: D is also a tritone away from A♭.
- Transforming Ionian to harmonic minor thus requires adding a second tritone.
- The fourth scale degree changes three times over four consecutive transformations:
- Melodic minor:
- The fourth scale degree changes three times over three consecutive transformations:
- C♯ Ionian ♯1 (C♯ Locrian ♭4) shifts F♯ to F♮. (This is the normal circle of fifths transformation.)
- C Mixolydian ♯4 (C Lydian ♭7) shifts F back to F♯.
- C Dorian ♯7 (C Ionian ♭3) changes F♯ once more back to F♮.
- The seventh scale degree also changes three times over three consecutive transformations:
- C♯ Mixolydian ♯4 (C♯ Lydian ♭7) shifts B to B♭. (This is the normal circle of fifths transformation.)
- C Dorian ♯7 (C Ionian ♭3) shifts B♭ back to F♮.
- C Aeolian ♯3 (C Mixolydian ♭6) changes F♯ once more back to F♮.
- Tritonality:
- These notes are also a tritone apart from each other in the base scale.
- Like harmonic minor, melodic minor has two tritones: E♭ to A.
- Transforming Ionian to melodic minor thus requires adding a second tritone.
- The fourth scale degree changes three times over three consecutive transformations:
- Melodic minor’s second set of tritones is exactly a half-step removed from harmonic minor’s. This is a direct consequence of their mathematical relationships in twelve-tone equal temperament:
- C Aeolian is tonally identical to C Dorian ♭6 (conversely: C Dorian is tonally identical to C Aeolian ♯6).
- C melodic minor is tonally identical to C Dorian ♯7
- C harmonic minor is tonally identical to C Aeolian ♯7.
- Changing C Dorian (C Aeolian ♯6) to C Aeolian (C Dorian ♭6) requires only changing A to A♭.
- Changing C melodic minor to C harmonic minor requires only changing A to A♭.
- Changing C Dorian ♯7 to C Aeolian ♯7 requires only changing A to A♭.
- The Ionian scale is the only seven-note scale in which only a single note pair makes a tritone. It also has the most uniform note spacing possible for a seven-note scale in 12-TET, as I’ll prove mathematically below.
- As a mathematical consequence of the following premises:
- C Aeolian follows C Dorian in the Ionian scale’s circle of fifths order.
- C melodic minor is C Dorian ♯7.
- C harmonic minor is C Aeolian ♯7.
- Shifting harmonic minor’s transformed mode up a row (Aeolian to Dorian) gets us melodic minor.
- The mode from one row of harmonic minor’s transformations of Ionian’s modes
- The key and scale degree shift from the next
One weird trick to transform harmonic minor to melodic minor Harmonic minor − ½ Melodic minor Harmonic minor + ½ C Lydian ♯2 C Lydian ♯5 C Ionian ♯5 C Ionian ♯5 C♯ Ionian ♯1 C♯ Mixolydian ♯1 C♯ Mixolydian ♯1 C Mixolydian ♯4 C Dorian ♯4 C Dorian ♯4 C Dorian ♯7 C Aeolian ♯7 C Aeolian ♯7 C Aeolian ♯3 C Phrygian ♯3 C Phrygian ♯3 C Phrygian ♯6 C Locrian ♯6 C Locrian ♯6 C Locrian ♯2 C♭ Lydian ♯2 C♭ Lydian ♯2 C♭ Lydian ♯5 C♭ Ionian ♯5 - If you’re starting to suspect that absolutely none of this is coincidental, you’re right.
(At some point, I plan to make equivalents of §3’s charts for at least melodic minor and harmonic minor, and perhaps for some of the Greek scales I discuss below as well… but not until I’ve written programs to automate their generation, which could take anywhere from a few days to months.)
Mathematical proof of even spacing
It’s impossible to distribute a seven-note scale’s intervals more evenly in 12-TET than Ionian distributes them, and I’ll prove it.
- In n-tone equal temperament, for a scale with s notes, divide n by s to determine the mean interval size, expressed in units of 1/n octave (i.e., the smallest possible interval; in 12-TET, a semitone).
12/7 is 1.714285714….
- If there is a remainder, discard it to get the scale’s lower interval size, and add one to the result to get its larger interval size. If there is no remainder, skip the rest of this proof; you’re done (but, as Oliver Messiaen would’ve already told you, you won’t have any other modes).
That’s 1. So all intervals in the scale should be at least a semitone (and, in fact, must be).
- Take the modulus of the temperament size and the scale size to determine how many intervals will get an extra 1/n octave added to them.
12 modulo 7 is 5. Thus, we have five leftover half-steps to add to five of the intervals.
- Subtract the number of leftovers from the number of notes in the scale to determine how many intervals don’t get an extra 1/n octave.
7 - 5 is 2. Thus, five intervals have added semitones, two don’t. Five whole steps, two half steps.
- To determine the most even interval distribution, first divide the number of occurrences of the more frequent interval by the number of occurrences of the less frequent one.
- If the divisor is 0, you need to work on your reading comprehension: step 2 already told you to stop.
- If the less frequent interval occurs multiple times and the quotient is an integer, the scale will repeat the same pattern multiple times per octave and is therefore a mode of limited transposition.
- If the less frequent interval occurs nearly as often as the more frequent one, you may need to repeat some of these steps, replacing n with the count of the more frequent interval and s with the count of the less frequent one.
5 / 2 = 2.5. There should be a median of 2.5 occurrences of the more frequent interval in a row.
- The interval distribution should take roughly this form: small group of more frequent interval, less frequent interval, large group of more frequent interval, less frequent interval. If there are more than two groups of the less frequent interval, determining the optimal distribution may require repeating some of these steps, replacing with n the more frequent interval’s count and s with the less frequent one’s count.
Since we can’t have a whole step exactly 2.5 times in a row, we’ll have to have two in one group and three in another. That gives us two whole tones, a semitone, three whole tones, and a semitone. That’s Ionian. I literally just described the Ionian scale. Median number of whole tones in a row: 2.5. Therefore, its semitones are as evenly spread out as they possibly can be between its whole tones.
Surely that also applies to its complement, right? Let’s look at the pentatonic scale.
- In n-tone equal temperament, for a scale with s notes, divide n by s to determine the mean interval size, expressed in units of 1/n octave (i.e., the smallest possible interval; in 12-TET, a semitone).
12/5 is 2.4.
- If there is a remainder, discard it to get the scale’s lower interval size, and add one to the result to get its larger interval size. If there is no remainder, skip the rest of this proof; you’re done (but, as Oliver Messiaen would’ve already told you, you won’t have any other modes).
That’s 2. So all intervals in the scale should be at least a whole tone.
- Take the modulus of the temperament size and the scale size to determine how many intervals will get an extra 1/n octave added to them.
12 modulo 5 is 2. So we have two leftover half-steps to add to two of the intervals.
- Subtract the number of leftovers from the number of notes in the scale to determine how many intervals don’t get an extra 1/n octave.
5 - 2 is 3. Thus, two intervals have extra semitones, three won’t. Three whole steps, two minor thirds.
- To determine the most even interval distribution, first divide the number of occurrences of the more frequent interval by the number of occurrences of the less frequent one.
- If the divisor is 0, you need to work on your reading comprehension: step 2 already told you to stop.
- If the less frequent interval occurs multiple times and the quotient is an integer, the scale will repeat the same pattern multiple times per octave and is therefore a mode of limited transposition.
- If the less frequent interval occurs nearly as often as the more frequent one, you may need to repeat some of these steps, replacing n with the count of the more frequent interval and s with the count of the less frequent one.
3 / 2 = 1.5. There should be a median of 1.5 occurrences of the more frequent interval in a row.
- The interval distribution should take roughly this form: small group of more frequent interval, less frequent interval, large group of more frequent interval, less frequent interval. If there are more than two groups of the less frequent interval, determining the optimal distribution may require repeating some of these steps, replacing with n the more frequent interval’s count and s with the less frequent one’s count.
Since we can’t have exactly 1.5 whole steps in a row, we’ll have to have two in one group and one by itself. That gives us two whole tones, a minor third, a whole tone, and a minor third. Which, again, is the pentatonic scale.
Of course, we already knew this. If the Ionian scale has the most even interval distribution a heptatonic scale can have in 12-TET, its complement must also have the most even interval distribution a pentatonic scale can have in 12-TET, by definition. Nonetheless, it’s nice to prove it mathematically.
Other single-note transformations of Ionian
So far, we’ve almost exclusively explored single-note transformations of Ionian and its modes:
- Ionian ♭3 is melodic minor.
- Ionian ♯1 is Super-Locrian, melodic minor’s sixth mode (counting melodic minor itself as the first).
- Ionian ♯5 is Ionian augmented, harmonic minor’s fifth mode.
Do other single-note transformations exist? Yes, but fewer than you might expect:
- Two transformations create other modes of Ionian:
- Ionian ♯4 is Lydian.
- Ionian ♭7 is Mixolydian.
- Four transformations would create hexatonic scales due to note duplication:
- Ionian ♭1: C♭ is enharmonically equivalent to B.
- Ionian ♯3: E♯ is enharmonically equivalent to F.
- Ionian ♭4: F♭ is enharmonically equivalent to E.
- Ionian ♯7: B♯ is enharmonically equivalent to C.
Thus, eight single-note transformations create heptatonic scales that aren’t other modes of Ionian. (I’ve printed the five we haven’t yet explored in bold, orange text.)
Threshold of Transformation | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♮ | 1½ | ½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♮ | 1 | 1 | ½ | ½ | 1½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♮ | 1 | 1 | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♯ | B♮ | 1 | 1 | ½ | 1 | 1½ | ½ | ½ |
Expanding those gives us:
4. Expand, expand, expand. Clear forest, make land, fresh blood on hands | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1½ | ½ | 1 | 1 | 1 | ½ | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | 1 | 1 | 1 | ½ | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B𝄫 | ½ | 1 | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B♮ | 1 | 1 | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♭ | 1 | 1 | ½ | ½ | 1½ | ½ | 1 | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B♭ | 1 | ½ | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B♭ | ½ | ½ | 1½ | ½ | 1 | 1 | 1 | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♮ | 1½ | ½ | ½ | 1 | 1 | 1 | ½ | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | ½ | 1 | 1 | 1 | ½ | 1½ | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♮ | ½ | 1 | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♯ | B♮ | 1 | 1 | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♭ | 1 | 1 | ½ | 1½ | ½ | ½ | 1 | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♭ | 1 | ½ | 1½ | ½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♭ | ½ | 1½ | ½ | ½ | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♮ | 1 | 1 | ½ | ½ | 1½ | 1 | ½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♮ | B♭ | 1 | ½ | ½ | 1½ | 1 | ½ | 1 | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♮ | B♮ | ½ | 1½ | 1 | ½ | 1 | 1 | ½ | ||
C♭ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | 1 | ½ | 1 | 1 | ½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B𝄫 | 1 | ½ | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A𝄫 | B♭ | ½ | 1 | 1 | ½ | ½ | 1½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♯ | B♮ | 1 | 1 | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♯ | A♮ | B♭ | 1 | ½ | 1 | 1½ | ½ | ½ | 1 | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♭ | ½ | 1 | 1½ | ½ | ½ | 1 | 1 | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♮ | B♮ | 1 | 1½ | ½ | ½ | 1 | 1 | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | ½ | 1 | 1 | ½ | 1 | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1 | 1 | ½ | 1 | 1½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♮ | ½ | 1 | 1 | ½ | 1 | 1½ | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♮ | 1 | 1 | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♮ | B♭ | 1 | ½ | 1 | ½ | 1½ | ½ | 1 | ||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B♭ | ½ | 1 | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♮ | 1 | ½ | 1½ | ½ | 1 | 1 | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1½ | ½ | 1 | 1 | ½ | 1 | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1½ | ½ | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B𝄫 | ½ | 1 | 1 | ½ | 1 | ½ | 1½ |
Or, in circle of fifths order:
5. Why just shells? Why limit yourself? She sells seashells; sell oil as well | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B♮ | 1 | 1 | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♭ | 1 | 1 | ½ | ½ | 1½ | ½ | 1 | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | 1 | 1 | 1 | ½ | ½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B♭ | 1 | ½ | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B𝄫 | ½ | 1 | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B♭ | ½ | ½ | 1½ | ½ | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♯ | B♮ | 1 | 1 | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♮ | 1½ | ½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♭ | 1 | 1 | ½ | 1½ | ½ | ½ | 1 | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | ½ | 1 | 1 | 1 | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♭ | 1 | ½ | 1½ | ½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♮ | ½ | 1 | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♭ | ½ | 1½ | ½ | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♮ | B♮ | ½ | 1½ | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♮ | 1 | 1 | ½ | ½ | 1½ | 1 | ½ | ||
C♭ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | 1 | ½ | 1 | 1 | ½ | ½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♮ | B♭ | 1 | ½ | ½ | 1½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B𝄫 | 1 | ½ | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A𝄫 | B♭ | ½ | 1 | 1 | ½ | ½ | 1½ | 1 | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♮ | B♮ | 1 | 1½ | ½ | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♯ | B♮ | 1 | 1 | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♯ | A♮ | B♭ | 1 | ½ | 1 | 1½ | ½ | ½ | 1 | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1 | 1 | ½ | 1 | 1½ | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♭ | ½ | 1 | 1½ | ½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♮ | ½ | 1 | 1 | ½ | 1 | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♮ | 1 | ½ | 1½ | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♮ | 1 | 1 | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1½ | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♮ | B♭ | 1 | ½ | 1 | ½ | 1½ | ½ | 1 | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1½ | ½ | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B♭ | ½ | 1 | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B𝄫 | ½ | 1 | 1 | ½ | 1 | ½ | 1½ |
Note that Dorian ♭1 is the mathematical inverse of Dorian ♯1, as is Dorian ♯5 of Dorian ♭4. Dorian ♭5 is likewise the mathematical inverse of Dorian ♯4, harmonic minor’s fourth mode. To clarify:
6. Guns, sell stocks, sell diamonds, sell rocks, sell water to a fish, sell the time to a clock | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B♮ | 1 | 1 | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♭ | ½ | 1½ | ½ | ½ | 1 | 1 | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♮ | ½ | 1 | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♭ | 1 | 1 | ½ | ½ | 1½ | ½ | 1 | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♭ | 1 | ½ | 1½ | ½ | ½ | 1 | 1 | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | 1 | 1 | 1 | ½ | ½ | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | ½ | 1 | 1 | 1 | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B♭ | 1 | ½ | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♭ | 1 | 1 | ½ | 1½ | ½ | ½ | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B𝄫 | ½ | 1 | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♮ | 1½ | ½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B♭ | ½ | ½ | 1½ | ½ | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♯ | B♮ | 1 | 1 | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♮ | B♮ | ½ | 1½ | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♮ | ½ | 1 | 1 | ½ | 1 | 1½ | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♮ | 1 | 1 | ½ | ½ | 1½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♭ | ½ | 1 | 1½ | ½ | ½ | 1 | 1 | ||
C♭ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | 1 | ½ | 1 | 1 | ½ | ½ | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1 | 1 | ½ | 1 | 1½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♮ | B♭ | 1 | ½ | ½ | 1½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♯ | A♮ | B♭ | 1 | ½ | 1 | 1½ | ½ | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B𝄫 | 1 | ½ | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1½ | 1 | ½ | 1 | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♯ | B♮ | 1 | 1 | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A𝄫 | B♭ | ½ | 1 | 1 | ½ | ½ | 1½ | 1 | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♮ | B♮ | 1 | 1½ | ½ | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♮ | 1 | ½ | 1½ | ½ | 1 | 1 | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♮ | B♭ | ½ | 1 | 1 | ½ | 1½ | ½ | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♮ | 1 | 1 | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♭ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1½ | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♮ | B♭ | 1 | ½ | 1 | ½ | 1½ | ½ | 1 | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1½ | ½ | 1 | 1 | ½ | 1 | ½ | ||
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | ½ | 1 | 1 | ½ | 1½ | ||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B♭ | ½ | 1 | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B𝄫 | ½ | 1 | 1 | ½ | 1 | ½ | 1½ | ||
C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ |
Scale transformations and symmetry
The above data aren’t very easy to parse. Clearly, some of these transformations produce more symmetrical and (for lack of a better term) stabler scales than others. The question is, why? I’m still piecing together the answer, but a piece of the puzzle has to do with note distributions.
The Ionian scale is internally symmetrical: Dorian mode has the same interval order forwards and backwards. Ionian is tied among heptatonic scales in 12-TET for the smallest number of semitone intervals (only two), and it has fewer tritones than any other heptatonic scale in 12-TET. Also – and this is probably the most important fact here – Ionian has the most uniform note distribution among heptatonic scales in 12-TET, but – and this part is equally important – it isn’t completely uniform. As we’ll see later when we discuss modes of limited transposition, completely uniform scales don’t even have modes.
Transforming a single note can thus completely destroy the scale symmetry. As it happens, of all the single-note transformations that produce symmetrical scales, both sets produce versions of the melodic minor scale, which we’ve already examined. Not coincidentally, this also is the closest heptatonic scale within 12-TET to Ionian’s stability respective to the circle of fifths: while one must transform each note three times for its equivalent of Ionian’s descent through its modes, at least it’s the same note three times in a row.
Another important note is that each transformation of Ionian that raises a note has an equal and opposite transformation that lowers a note and produces the first transformation’s reflection. For twelve of the fourteen transformations that produce modes of melodic minor, that reflection is another mode of melodic minor; for the remaining two, that reflection is itself, but is applied to a different mode of Ionian:
- Aeolian ♯3 produces the same (symmetrical) result as Mixolydian ♭6.
- Aeolian ♭5 produces Locrian ♯2’s mirror image. (Or, Mixolydian ♯4 produces Lydian ♭7’s mirror image.)
While writing Ionian’s modes this way is pretentious, we can say the same of its own internal transformations:
- Mixolydian ♭3 produces the same (symmetrical) result as Aeolian ♯6, namely, Dorian mode.
- Aeolian ♭2 produces Mixolydian ♯7’s mirror image. (Or, Locrian ♯5 produces Lydian ♭4’s mirror image.)
All single-note transformations of the Ionian scale that don’t create hexatonic scales or modes of melodic minor or Ionian result in scales with enantiomorphs (Attic Greek: ἐναντίος, enantíos, opposite, + μορφή, morphḗ, form), which all appear in different sets of single-note transformations of the Ionian scale. Only scales without internal reflective symmetry have enantiomorphs. This means that:
- If any mode of a scale has palindromic intervals, that scale does not have enantiomorphs. Aeolian ♯3 has palindromic intervals and therefore no enantiomorph.
- If a scale’s mirror image is one of its own modes, it does not have an an enantiomorph. Ionian is the mirror image of Phrygian. Ionian has no enantiomorph.
In the following table, I’ve taken the liberty of rotating Lydian ♯5 to the end of the first set of scale comparisons, and Locrian ♭4 to the start of the second. I had several reasons for this:
- This places the symmetrical mode, Aeolian ♯3 / Mixolydian ♭6, in the center of the comparisons.
- The table’s other comparisons are between two discrete sets of scale transformations, but here, we compare a set of scale transformations to itself. This places our comparison in sync with itself.
- These are the table’s only comparisons of single-note transformations that can be derived from two discrete parent modes. Oddly, shifting the scales like this actually approximates our usual circle of fifths order:
- Both sets now open with Ionian ♯1 / Locrian ♭4, between which is Lydian.
- Both sets now close with Lydian ♯5 / Phrygian ♭1, between which is Locrian.
- Remember in the pentatonic scale analysis how I said symmetrical modes should be circle-order comparisons’ central rows? Now it is.
- This results in a few additional quirks:
- The 7×7 interval inset has 180° rotational symmetry.
- Both halves also have identical interval distributions, with a pattern that spans across them.
Other one-note transformations don’t produce symmetrical scales; therefore, they have reflections.
- Dorian ♯5 is the reflection of Dorian ♭4.
- Dorian ♯4 is the reflection of Dorian ♭5.
- Dorian ♯1 is the reflection of Dorian ♭1 (if we disregard transposition of the root).
I specifically used Dorian mode for these examples because it’s symmetrical in the base scale, but we can still make similar comparisons for the other six modes, since they each have reflections within the Ionian scale:
- Ionian’s reflection is Phrygian.
- Locrian’s reflection is Lydian.
- Aeolian’s reflection is Mixolydian.
Thus, the reflection of a transformation of a non-palindromic mode applies to the parent mode’s reflection:
- Aeolian ♭4 is the reflection of Mixolydian ♯5.
- Aeolian ♯4 is the reflection of Mixolydian ♭5.
- Ionian ♯5 is the reflection of Phrygian ♭4.
- Phrygian ♯4 is the reflection of Ionian ♭5.
- Ionian ♭3 is the reflection of Phrygian ♯6.
- Phrygian ♯3 is the reflection of Ionian ♭6.
We can observe all this in the table below.
7. Press on the gas, take your foot off the brakes; then run to be the president of the United States | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
C♭ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1 | ½ | 1 | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♭ | B♭ | 1 | ½ | 1 | ½ | 1 | 1 | 1 | ||
C♭ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♮ | B♮ | ½ | 1½ | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♮ | 1 | 1 | ½ | ½ | 1½ | 1 | ½ | ||
C♭ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | 1 | ½ | 1 | 1 | ½ | ½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♮ | B♭ | 1 | ½ | ½ | 1½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B𝄫 | 1 | ½ | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A𝄫 | B♭ | ½ | 1 | 1 | ½ | ½ | 1½ | 1 | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♮ | B♮ | 1 | 1½ | ½ | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♯ | B♮ | 1 | 1 | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♯ | A♮ | B♭ | 1 | ½ | 1 | 1½ | ½ | ½ | 1 | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1 | 1 | ½ | 1 | 1½ | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♭ | ½ | 1 | 1½ | ½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♮ | ½ | 1 | 1 | ½ | 1 | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♮ | 1 | ½ | 1½ | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♮ | 1 | 1 | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1½ | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♭ | A♮ | B♭ | 1 | ½ | 1 | ½ | 1½ | ½ | 1 | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1½ | ½ | 1 | 1 | ½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B♭ | ½ | 1 | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B𝄫 | ½ | 1 | 1 | ½ | 1 | ½ | 1½ | ||
C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♮ | 1 | 1 | ½ | 1½ | ½ | 1 | ½ | ||
C♯ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | ½ | 1 | 1 | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♭ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♮ | B♭ | ½ | 1 | 1 | ½ | 1½ | ½ | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B♮ | 1 | 1 | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♭ | A♮ | B♭ | 1 | 1 | ½ | ½ | 1½ | ½ | 1 | ||
C♭ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | 1 | 1 | 1 | ½ | ½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B♭ | 1 | ½ | ½ | 1½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B𝄫 | ½ | 1 | 1 | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B♭ | ½ | ½ | 1½ | ½ | 1 | 1 | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♯ | B♮ | 1 | 1 | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♮ | 1½ | ½ | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♯ | A♮ | B♭ | 1 | 1 | ½ | 1½ | ½ | ½ | 1 | ||
C♯ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | ½ | 1 | 1 | 1 | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♭ | 1 | ½ | 1½ | ½ | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♮ | ½ | 1 | 1 | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♭ | ½ | 1½ | ½ | ½ | 1 | 1 | 1 |
One obvious symmetrical scale isn’t possible to produce with a single note transformation from the Ionian scale (although it is possible to produce by swapping two intervals; it’s also equivalent to the whole-tone scale with a note added). Its interval distribution is quite far from uniform, and it’s also all but impossible to relate to any sort of circle of fifths order. (Also, “Neapolitan major” and “Lydian minor” are both misnomers. I didn’t invent them and disclaim all responsibility.)
8. Big smile, mate; big wave, that’s great; now the truth is overrated; tell lies out the gate | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♮ | E♮ | F♮ | G♭ | A♭ | B♭ | 1 | 1 | ½ | ½ | 1 | 1 | 1 | ||
C♮ | D♮ | E♭ | F♭ | G♭ | A♭ | B♭ | 1 | ½ | ½ | 1 | 1 | 1 | 1 | ||
C♮ | D♭ | E𝄫 | F♭ | G♭ | A♭ | B♭ | ½ | ½ | 1 | 1 | 1 | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♮ | ½ | 1 | 1 | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♯ | A♯ | B♮ | 1 | 1 | 1 | 1 | 1 | ½ | ½ | ||
C♮ | D♮ | E♮ | F♯ | G♯ | A♮ | B♭ | 1 | 1 | 1 | 1 | ½ | ½ | 1 | ||
C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B♭ | 1 | 1 | 1 | ½ | ½ | 1 | 1 |
I’m also bizarrely partial to the Major Phyrgian scale, which has its own fearful symmetry, to coin a phrase. It’s more closely related to the Ancient Greek chromatic genus, which I cover below in the section on Ancient Greek harmony, than it is to the Ionian scale. We’ll therefore revisit it later.
9. Polarise the people; controversy is the game; it don’t matter if they hate you if they all say your name | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♭ | ½ | 1½ | ½ | ½ | 1½ | ½ | 1 | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♮ | 1½ | ½ | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B𝄫 | ½ | ½ | 1½ | ½ | 1 | ½ | 1½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♮ | ½ | 1½ | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♯ | E♮ | F♯ | G♮ | A♯ | B♮ | 1½ | ½ | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B𝄫 | ½ | 1 | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♮ | 1 | ½ | 1½ | ½ | ½ | 1½ | ½ |
Modes of Limited Transposition
The scales we’ve examined in detail thus far have as many modes as they have notes. There are seven notes in the scales; multiply this by twelve notes in the chromatic scale and we wind up with a total of eighty-four possible permutations of modes and root notes. However, this is not true of every scale.
French composer Oliver Messiaen coined the term term “modes of limited transposition” for scales that have fewer modes than notes. Every such scale can be “simplified” into repetitions smaller than an octave.
- A scale with the same number of modes as notes is not a mode of limited transposition.
- A scale that can be transposed to a discrete set of notes for every note in the chromatic scale is not a mode of limited transposition.
Messiaen identified seven possible patterns (beyond the chromatic scale in its entirety); there are also numerous “truncations” that remove notes in ways that conform to the patterns.
Mode 1: The Whole-Tone Scale
Since the whole-tone scale repeats a single interval six times (W-W-W-W-W-W), it has only one mode (i.e., itself) that may only be made from two sets of notes:
Whole-tone note sets | ||||||
---|---|---|---|---|---|---|
# | 1 | 2 | 3 | 4 | 5 | 6 |
1 | C♮ | D♮ | E♮ | F♯ | G♯ | A♯ |
2 | C♯ | D♯ | F♮ | G♮ | A♮ | B♮ |
Multiplying one mode by six repetitions by two note sets gives us a total of twelve transpositions:
Transpositions of the whole-tone scale | ||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
T | P | 1 | 2 | 3 | 4 | 5 | 6 | P | 1 | 2 | 3 | 4 | 5 | 6 |
1 | 1 | C♮ | D♮ | E♮ | F♯ | G♯ | A♯ | 2 | C♯ | D♯ | F♮ | G♮ | A♮ | B♮ |
2 | 1 | D♮ | E♮ | F♯ | G♯ | A♯ | C♮ | 2 | D♯ | F♮ | G♮ | A♮ | B♮ | C♯ |
3 | 1 | E♮ | F♯ | G♯ | A♯ | C♮ | D♮ | 2 | F♮ | G♮ | A♮ | B♮ | C♯ | D♯ |
4 | 1 | F♯ | G♯ | A♯ | C♮ | D♮ | E♮ | 2 | G♮ | A♮ | B♮ | C♯ | D♯ | F♮ |
5 | 1 | G♯ | A♯ | C♮ | D♮ | E♮ | F♯ | 2 | A♮ | B♮ | C♯ | D♯ | F♮ | G♮ |
6 | 1 | A♯ | C♮ | D♮ | E♮ | F♯ | G♯ | 2 | B♮ | C♯ | D♯ | F♮ | G♮ | A♮ |
The whole-tone scale is the
, and the only one that has no other modes. (A few truncations of the modes of limited transposition also have no other modes, as we shall see below.)Mode 2: The Octatonic Scale
The octatonic scale (H-W-H-W-H-W-H-W), Messiaen’s
, repeats a two-note pattern every three half-steps. Since its pattern has only two notes, it has only two modes:The second mode’s modes | ||||||||
---|---|---|---|---|---|---|---|---|
# | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
1 | ½ | 1 | ½ | 1 | ½ | 1 | ½ | 1 |
2 | 1 | ½ | 1 | ½ | 1 | ½ | 1 | ½ |
And since its pattern spans three half-steps, there are only three possible note sets:
The second mode’s notes | ||||||||
---|---|---|---|---|---|---|---|---|
# | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
1 | C | C♯ | D♯ | E | F♯ | G | A | A♯ |
2 | C♯ | D | E | F | G | G♯ | A♯ | B |
3 | D | D♯ | F | F♯ | G♯ | A | B | C |
Does it make sense why we have to stop counting here? C octatonic’s third mode would start on D♯, but it would contain exactly the same notes as D♯ octatonic’s first mode, in exactly the same order! We can’t count them both, so the octatonic scale has six total permutations of modes and note sets.
But if we have to stop counting modes at the end of each cluster, how do we calculate the number of discrete transpositions of the scale and its modes? As far as I can work out, the calculation is quite simple:
- (
8 / 4 = 2
) - (
2 × 12 = 24
)
As we see below, the octatonic scale indeed has twenty-four total transpositions:
Transposing the second mode of limited transposition | |||||||||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
M | T | P | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | M | T | P | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
1 | 1 | C♮ | C♯ | D♯ | E♮ | F♯ | G♮ | A♮ | A♯ | 1 | 1 | C♯ | D♯ | E♮ | F♯ | G♮ | A♮ | A♯ | C♮ | ||
2 | C♯ | D♮ | E♮ | F♮ | G♮ | G♯ | A♯ | B♮ | 2 | D♮ | E♮ | F♮ | G♮ | G♯ | A♯ | B♮ | C♯ | ||||
3 | D♮ | D♯ | F♮ | F♯ | G♯ | A♮ | B♮ | C♮ | 3 | D♯ | F♮ | F♯ | G♯ | A♮ | B♮ | C♮ | D♮ | ||||
2 | 1 | D♯ | E♮ | F♯ | G♮ | A♮ | A♯ | C♮ | C♯ | 2 | 1 | E♮ | F♯ | G♮ | A♮ | A♯ | C♮ | C♯ | D♯ | ||
2 | E♮ | F♮ | G♮ | G♯ | A♯ | B♮ | C♯ | D♮ | 2 | F♮ | G♮ | G♯ | A♯ | B♮ | C♯ | D♮ | E♮ | ||||
3 | F♮ | F♯ | G♯ | A♮ | B♮ | C♮ | D♮ | D♯ | 3 | F♯ | G♯ | A♮ | B♮ | C♮ | D♮ | D♯ | F♮ | ||||
3 | 1 | F♯ | G♮ | A♮ | A♯ | C♮ | C♯ | D♯ | E♮ | 3 | 1 | G♮ | A♮ | A♯ | C♮ | C♯ | D♯ | E♮ | F♯ | ||
2 | G♮ | G♯ | A♯ | B♮ | C♯ | D♮ | E♮ | F♮ | 2 | G♯ | A♯ | B♮ | C♯ | D♮ | E♮ | F♮ | G♮ | ||||
3 | G♯ | A♮ | B♮ | C♮ | D♮ | D♯ | F♮ | F♯ | 3 | A♮ | B♮ | C♮ | D♮ | D♯ | F♮ | F♯ | G♯ | ||||
4 | 1 | A♮ | A♯ | C♮ | C♯ | D♯ | E♮ | F♯ | G♮ | 4 | 1 | A♯ | C♮ | C♯ | D♯ | E♮ | F♯ | G♮ | A♮ | ||
2 | A♯ | B♮ | C♯ | D♮ | E♮ | F♮ | G♮ | G♯ | 2 | B♮ | C♯ | D♮ | E♮ | F♮ | G♮ | G♯ | A♯ | ||||
3 | B♮ | C♮ | D♮ | D♯ | F♮ | F♯ | G♯ | A♮ | 3 | C♮ | D♮ | D♯ | F♮ | F♯ | G♯ | A♮ | B♮ |
Mode 3: Triple Chromatic
The
repeats a three-interval pattern across four half-steps; thus, it has three unique modes that may be constructed from four possible sets of notes, for a total of twelve permutations of notes per four-half-step cluster:The third mode of limited transposition | |||||||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
M | S | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | Intervals | ||||||||
1 | C♮ | D♮ | D♯ | E♮ | F♯ | G♮ | G♯ | A♯ | B♮ | 1 | ½ | ½ | 1 | ½ | ½ | 1 | ½ | ½ | |
2 | C♯ | D♯ | E♮ | F♮ | G♮ | G♯ | A♮ | B♮ | C♮ | ||||||||||
3 | D♮ | E♮ | F♮ | F♯ | G♯ | A♮ | A♯ | C♮ | C♯ | ||||||||||
4 | D♯ | F♮ | F♯ | G♮ | A♮ | A♯ | B♮ | C♯ | D♮ | ||||||||||
1 | D♮ | D♯ | E♮ | F♯ | G♮ | G♯ | A♯ | B♮ | C♮ | ½ | ½ | 1 | ½ | ½ | 1 | ½ | ½ | 1 | |
2 | D♯ | E♮ | F♮ | G♮ | G♯ | A♮ | B♮ | C♮ | C♯ | ||||||||||
3 | E♮ | F♮ | F♯ | G♯ | A♮ | A♯ | C♮ | C♯ | D♮ | ||||||||||
4 | F♮ | F♯ | G♮ | A♮ | A♯ | B♮ | C♯ | D♮ | D♯ | ||||||||||
1 | D♯ | E♮ | F♯ | G♮ | G♯ | A♯ | B♮ | C♮ | D♮ | ½ | 1 | ½ | ½ | 1 | ½ | ½ | 1 | ½ | |
2 | E♮ | F♮ | G♮ | G♯ | A♮ | B♮ | C♮ | C♯ | D♯ | ||||||||||
3 | F♮ | F♯ | G♯ | A♮ | A♯ | C♮ | C♯ | D♮ | E♮ | ||||||||||
4 | F♯ | G♮ | A♮ | A♯ | B♮ | C♯ | D♮ | D♯ | F♮ |
I leave filling in the rest of the table as an exercise for the reader. A quick hint: You should wind up with three sets of twelve scales that each walk up the chromatic scale by half-steps, for a total of thirty-six.
Mode 4: Double Chromatic III
Modes 4 through 7 all repeat patterns of various lengths twice an octave. Since the
has eight total notes, it has forty-eight possible transpositions.The fourth mode of limited transposition | |||||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
M | S | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | Intervals | |||||||
1 | C♮ | C♯ | D♮ | F♮ | F♯ | G♮ | G♯ | B♮ | ½ | ½ | 1½ | ½ | ½ | ½ | 1½ | ½ | |
2 | C♯ | D♮ | D♯ | F♯ | G♮ | G♯ | A♮ | C♮ | |||||||||
3 | D♮ | D♯ | E♮ | G♮ | G♯ | A♮ | A♯ | C♯ | |||||||||
4 | D♯ | E♮ | F♮ | G♯ | A♮ | A♯ | B♮ | D♮ | |||||||||
5 | E♮ | F♮ | F♯ | A♮ | A♯ | B♮ | C♮ | D♯ | |||||||||
6 | F♮ | F♯ | G♮ | A♯ | B♮ | C♮ | C♯ | E♮ | |||||||||
1 | C♮ | C♯ | E♮ | F♮ | F♯ | G♮ | A♯ | B♮ | ½ | 1½ | ½ | ½ | ½ | 1½ | ½ | ½ | |
2 | C♯ | D♮ | F♮ | F♯ | G♮ | G♯ | B♮ | C♮ | |||||||||
3 | D♮ | D♯ | F♯ | G♮ | G♯ | A♮ | C♮ | C♯ | |||||||||
4 | D♯ | E♮ | G♮ | G♯ | A♮ | A♯ | C♯ | D♮ | |||||||||
5 | E♮ | F♮ | G♯ | A♮ | A♯ | B♮ | D♮ | D♯ | |||||||||
6 | F♮ | F♯ | A♮ | A♯ | B♮ | C♮ | D♯ | E♮ | |||||||||
1 | C♮ | D♯ | E♮ | F♮ | F♯ | A♮ | A♯ | B♮ | 1½ | ½ | ½ | ½ | 1½ | ½ | ½ | ½ | |
2 | C♯ | E♮ | F♮ | F♯ | G♮ | A♯ | B♮ | C♮ | |||||||||
3 | D♮ | F♮ | F♯ | G♮ | G♯ | B♮ | C♮ | C♯ | |||||||||
4 | D♯ | F♯ | G♮ | G♯ | A♮ | C♮ | C♯ | D♮ | |||||||||
5 | E♮ | G♮ | G♯ | A♮ | A♯ | C♯ | D♮ | D♯ | |||||||||
6 | F♮ | G♯ | A♮ | A♯ | B♮ | D♮ | D♯ | E♮ | |||||||||
1 | C♮ | C♯ | D♮ | D♯ | F♯ | G♮ | G♯ | A♮ | ½ | ½ | ½ | 1½ | ½ | ½ | ½ | 1½ | |
2 | C♯ | D♮ | D♯ | E♮ | G♮ | G♯ | A♮ | A♯ | |||||||||
3 | D♮ | D♯ | E♮ | F♮ | G♯ | A♮ | A♯ | B♮ | |||||||||
4 | D♯ | E♮ | F♮ | F♯ | A♮ | A♯ | B♮ | C♮ | |||||||||
5 | E♮ | F♮ | F♯ | G♮ | A♯ | B♮ | C♮ | C♯ | |||||||||
6 | F♮ | F♯ | G♮ | G♯ | B♮ | C♮ | C♯ | D♮ |
Mode 5: Tritone Chromatic II
The
has six notes and repeats twice an octave; therefore, it has thirty-six possible transpositions.The fifth mode of limited transposition | |||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|
M | S | 1 | 2 | 3 | 4 | 5 | 6 | Intervals | |||||
1 | C♮ | C♯ | F♮ | F♯ | G♮ | B♮ | ½ | 2 | ½ | ½ | 2 | ½ | |
2 | C♯ | D♮ | F♯ | G♮ | G♯ | C♮ | |||||||
3 | D♮ | D♯ | G♮ | G♯ | A♮ | C♯ | |||||||
4 | D♯ | E♮ | G♯ | A♮ | A♯ | D♮ | |||||||
5 | E♮ | F♮ | A♮ | A♯ | B♮ | D♯ | |||||||
6 | F♮ | F♯ | A♯ | B♮ | C♮ | E♮ | |||||||
1 | C♮ | E♮ | F♮ | F♯ | A♯ | B♮ | 2 | ½ | ½ | 2 | ½ | ½ | |
2 | C♯ | F♮ | F♯ | G♮ | B♮ | C♮ | |||||||
3 | D♮ | F♯ | G♮ | G♯ | C♮ | C♯ | |||||||
4 | D♯ | G♮ | G♯ | A♮ | C♯ | D♮ | |||||||
5 | E♮ | G♯ | A♮ | A♯ | D♮ | D♯ | |||||||
6 | F♮ | A♮ | A♯ | B♮ | D♯ | E♮ | |||||||
1 | C♮ | C♯ | D♮ | F♯ | G♮ | G♯ | ½ | ½ | 2 | ½ | ½ | 2 | |
2 | C♯ | D♮ | D♯ | G♮ | G♯ | A♮ | |||||||
3 | D♮ | D♯ | E♮ | G♯ | A♮ | A♯ | |||||||
4 | D♯ | E♮ | F♮ | A♮ | A♯ | B♮ | |||||||
5 | E♮ | F♮ | F♯ | A♯ | B♮ | C♮ | |||||||
6 | F♮ | F♯ | G♮ | B♮ | C♮ | C♯ |
Mode 6: Whole-Tone Chromatic
Messiaen’s
repeats a four-note, six-half-step pattern. Four modes, six note combinations per mode, twenty-four note permutations per cluster, two clusters per octave, forty-eight permutations of roots and modes across the entire chromatic scale.The sixth mode of limited transposition | |||||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
M | S | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | Intervals | |||||||
1 | C♮ | D♮ | E♮ | F♮ | F♯ | G♯ | A♯ | B♮ | 1 | 1 | ½ | ½ | 1 | 1 | ½ | ½ | |
2 | C♯ | D♯ | F♮ | F♯ | G♮ | A♮ | B♮ | C♮ | |||||||||
3 | D♮ | E♮ | F♯ | G♮ | G♯ | A♯ | C♮ | C♯ | |||||||||
4 | D♯ | F♮ | G♮ | G♯ | A♮ | B♮ | C♯ | D♮ | |||||||||
5 | E♮ | F♯ | G♯ | A♮ | A♯ | C♮ | D♮ | D♯ | |||||||||
6 | F♮ | G♮ | A♮ | A♯ | B♮ | C♯ | D♯ | E♮ | |||||||||
1 | C♮ | D♮ | D♯ | E♮ | F♯ | G♯ | A♮ | A♯ | 1 | ½ | ½ | 1 | 1 | ½ | ½ | 1 | |
2 | C♯ | D♯ | E♮ | F♮ | G♮ | A♮ | A♯ | B♮ | |||||||||
3 | D♮ | E♮ | F♮ | F♯ | G♯ | A♯ | B♮ | C♮ | |||||||||
4 | D♯ | F♮ | F♯ | G♮ | A♮ | B♮ | C♮ | C♯ | |||||||||
5 | E♮ | F♯ | G♮ | G♯ | A♯ | C♮ | C♯ | D♮ | |||||||||
6 | F♮ | G♮ | G♯ | A♮ | B♮ | C♯ | D♮ | D♯ | |||||||||
1 | C♮ | C♯ | D♮ | E♮ | F♯ | G♮ | G♯ | A♯ | ½ | ½ | 1 | 1 | ½ | ½ | 1 | 1 | |
2 | C♯ | D♮ | D♯ | F♮ | G♮ | G♯ | A♮ | B♮ | |||||||||
3 | D♮ | D♯ | E♮ | F♯ | G♯ | A♮ | A♯ | C♮ | |||||||||
4 | D♯ | E♮ | F♮ | G♮ | A♮ | A♯ | B♮ | C♯ | |||||||||
5 | E♮ | F♮ | F♯ | G♯ | A♯ | B♮ | C♮ | D♮ | |||||||||
6 | F♮ | F♯ | G♮ | A♮ | B♮ | C♮ | C♯ | D♯ | |||||||||
1 | C♮ | C♯ | D♯ | F♮ | F♯ | G♮ | A♮ | B♮ | ½ | 1 | 1 | ½ | ½ | 1 | 1 | ½ | |
2 | C♯ | D♮ | E♮ | F♯ | G♮ | G♯ | A♯ | C♮ | |||||||||
3 | D♮ | D♯ | F♮ | G♮ | G♯ | A♮ | B♮ | C♯ | |||||||||
4 | D♯ | E♮ | F♯ | G♯ | A♮ | A♯ | C♮ | D♮ | |||||||||
5 | E♮ | F♮ | G♮ | A♮ | A♯ | B♮ | C♯ | D♯ | |||||||||
6 | F♮ | F♯ | G♯ | A♯ | B♮ | C♮ | D♮ | E♮ |
Mode 7: Duplex Genus Secundum Inverse
This
repeats the same pattern twice an octave; thus, it has sixty possible transpositions.The seventh mode of limited transposition | |||||||||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
M | S | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | Intervals | |||||||||
1 | C♮ | C♯ | D♮ | D♯ | F♮ | F♯ | G♮ | G♯ | A♮ | B♮ | ½ | ½ | ½ | 1 | ½ | ½ | ½ | ½ | 1 | ½ | |
2 | C♯ | D♮ | D♯ | E♮ | F♯ | G♮ | G♯ | A♮ | A♯ | C♮ | |||||||||||
3 | D♮ | D♯ | E♮ | F♮ | G♮ | G♯ | A♮ | A♯ | B♮ | C♯ | |||||||||||
4 | D♯ | E♮ | F♮ | F♯ | G♯ | A♮ | A♯ | B♮ | C♮ | D♮ | |||||||||||
5 | E♮ | F♮ | F♯ | G♮ | A♮ | A♯ | B♮ | C♮ | C♯ | D♯ | |||||||||||
6 | F♮ | F♯ | G♮ | G♯ | A♯ | B♮ | C♮ | C♯ | D♮ | E♮ | |||||||||||
1 | C♮ | C♯ | D♮ | E♮ | F♮ | F♯ | G♮ | G♯ | A♯ | B♮ | ½ | ½ | 1 | ½ | ½ | ½ | ½ | 1 | ½ | ½ | |
2 | C♯ | D♮ | D♯ | F♮ | F♯ | G♮ | G♯ | A♮ | B♮ | C♮ | |||||||||||
3 | D♮ | D♯ | E♮ | F♯ | G♮ | G♯ | A♮ | A♯ | C♮ | C♯ | |||||||||||
4 | D♯ | E♮ | F♮ | G♮ | G♯ | A♮ | A♯ | B♮ | C♯ | D♮ | |||||||||||
5 | E♮ | F♮ | F♯ | G♯ | A♮ | A♯ | B♮ | C♮ | D♮ | D♯ | |||||||||||
6 | F♮ | F♯ | G♮ | A♮ | A♯ | B♮ | C♮ | C♯ | D♯ | E♮ | |||||||||||
1 | C♮ | C♯ | D♯ | E♮ | F♮ | F♯ | G♮ | A♮ | A♯ | B♮ | ½ | 1 | ½ | ½ | ½ | ½ | 1 | ½ | ½ | ½ | |
2 | C♯ | D♮ | E♮ | F♮ | F♯ | G♮ | G♯ | A♯ | B♮ | C♮ | |||||||||||
3 | D♮ | D♯ | F♮ | F♯ | G♮ | G♯ | A♮ | B♮ | C♮ | C♯ | |||||||||||
4 | D♯ | E♮ | F♯ | G♮ | G♯ | A♮ | A♯ | C♮ | C♯ | D♮ | |||||||||||
5 | E♮ | F♮ | G♮ | G♯ | A♮ | A♯ | B♮ | C♯ | D♮ | D♯ | |||||||||||
6 | F♮ | F♯ | G♯ | A♮ | A♯ | B♮ | C♮ | D♮ | D♯ | E♮ | |||||||||||
1 | C♮ | D♮ | D♯ | E♮ | F♮ | F♯ | G♯ | A♮ | A♯ | B♮ | 1 | ½ | ½ | ½ | ½ | 1 | ½ | ½ | ½ | ½ | |
2 | C♯ | D♯ | E♮ | F♮ | F♯ | G♮ | A♮ | A♯ | B♮ | C♮ | |||||||||||
3 | D♮ | E♮ | F♮ | F♯ | G♮ | G♯ | A♯ | B♮ | C♮ | C♯ | |||||||||||
4 | D♯ | F♮ | F♯ | G♮ | G♯ | A♮ | B♮ | C♮ | C♯ | D♮ | |||||||||||
5 | E♮ | F♯ | G♮ | G♯ | A♮ | A♯ | C♮ | C♯ | D♮ | D♯ | |||||||||||
6 | F♮ | G♮ | G♯ | A♮ | A♯ | B♮ | C♯ | D♮ | D♯ | E♮ | |||||||||||
1 | C♮ | C♯ | D♮ | D♯ | E♮ | F♯ | G♮ | G♯ | A♮ | A♯ | ½ | ½ | ½ | ½ | 1 | ½ | ½ | ½ | ½ | 1 | |
2 | C♯ | D♮ | D♯ | E♮ | F♮ | G♮ | G♯ | A♮ | A♯ | B♮ | |||||||||||
3 | D♮ | D♯ | E♮ | F♮ | F♯ | G♯ | A♮ | A♯ | B♮ | C♮ | |||||||||||
4 | D♯ | E♮ | F♮ | F♯ | G♮ | A♮ | A♯ | B♮ | C♮ | C♯ | |||||||||||
5 | E♮ | F♮ | F♯ | G♮ | G♯ | A♯ | B♮ | C♮ | C♯ | D♮ | |||||||||||
6 | F♮ | F♯ | G♮ | G♯ | A♮ | B♮ | C♮ | C♯ | D♮ | D♯ |
Truncations & Implications
- Two examples of truncations of Messaien’s modes are the
Transposing the diminished seventh chord P/T 1 2 3 4 P/T 1 2 3 4 P/T 1 2 3 4 P/T 1 2 3 4 A/1 C♮ D♯ F♯ A♮ B/1 D♯ F♯ A♮ C♮ C/1 F♯ A♮ C♮ D♯ D/1 A♮ C♮ D♯ F♯ A/2 C♯ E♮ G♮ A♯ B/2 E♮ G♮ A♯ C♯ C/2 G♮ A♯ C♯ E♮ D/2 A♯ C♯ E♮ G♮ A/3 D♮ F♮ G♯ B♮ B/3 F♮ G♯ B♮ D♮ C/3 G♯ B♮ D♮ F♮ D/3 B♮ D♮ F♮ G♯ Transposing the augmented chord P/T 1 2 3 P/T 1 2 3 P/T 1 2 3 P/T 1 2 3 A/1 C♮ E♮ G♯ A/2 C♯ F♮ A♮ A/3 D♮ F♯ A♯ A/4 D♯ G♮ B♮ B/1 E♮ G♯ C♮ B/2 F♮ A♮ C♯ B/3 F♯ A♯ D♮ B/4 G♮ B♮ D♯ C/1 G♯ C♮ E♮ C/2 A♮ C♯ F♮ C/3 A♯ D♮ F♯ C/4 B♮ D♯ G♮ (Note: Each arrangement of the three diminished seventh chords appears on the same line as its rotations; by contrast, the augmented chord’s three-note sets are 3×3 squares. For each chord, A/2 precedes B/1.)
Since both chords truncate their parent modes in ways that maintain their symmetry, they both have only twelve transpositions. Put another way, each inversion of a diminished seventh chord or an augmented chord contains the same notes as its parent. We can contrast this with major and minor chords, which each have first and second inversions and therefore have thirty-six transpositions across the chromatic scale.
, which removes every other note from the octatonic scale (mode 2):
- Messaien omitted several scales on the grounds that they simply truncated scales he’d already listed, but he arguably applied this principle rather arbitrarily: every scale in his list is a truncation of either mode 7 or mode 3 (or, frequently, of both). Since modes 1 & 2 repeat more often, there’s arguably a stronger case for treating them differently; however, modes 4–6 don’t.
- The Ionian scale, W-W-H-W-W-W-H, forms a useful contrast with modes of limitated transposition: the extra W between the W-W-H patterns makes it impossible to simplify into a smaller pattern. It therefore has seven modes, which each have twelve variants, for a total of eighty-four permutations.
- An important consequence of modes of limited transposition in music theory: their tonalities are ambiguous, since multiple keys could be the root. In many cases, these notes are a tritone apart, which can provide interesting opportunities for tritone substitutions, but it also provides challenges that are absent when writing for less ambiguous tonalities such as the Ionian scale.
- Modes of limited transposition never have fewer than twelve permutations in twelve-tone equal temperament, since even scales with only one mode can still start on all twelve notes of the chromatic scale.
- This is a complete list of every set of notes in 12-TET temperament with only a single mode:
- The
- The
- The
- The
- The
- The
Mode 0: The Chromatic Scale
-
The chromatic scale itself merits further discussion. As it repeats one interval twelve times (H-H-H-H-H-H-H-H-H-H-H-H), it has only one mode which in turn may only be made from one permutation of notes. The chromatic scale can therefore be transposed in twelve different ways across the entire, um, chromatic scale:
Permuatations of the Chromatic Scale # 1 2 3 4 5 6 7 8 9 10 11 12 1 C♮ C♯ D♮ D♯ E♮ F♮ F♯ G♮ G♯ A♮ A♯ B♮ 2 C♯ D♮ D♯ E♮ F♮ F♯ G♮ G♯ A♮ A♯ B♮ C♮ 3 D♮ D♯ E♮ F♮ F♯ G♮ G♯ A♮ A♯ B♮ C♮ C♯ 4 D♯ E♮ F♮ F♯ G♮ G♯ A♮ A♯ B♮ C♮ C♯ D♮ 5 E♮ F♮ F♯ G♮ G♯ A♮ A♯ B♮ C♮ C♯ D♮ D♯ 6 F♮ F♯ G♮ G♯ A♮ A♯ B♮ C♮ C♯ D♮ D♯ E♮ 7 F♯ G♮ G♯ A♮ A♯ B♮ C♮ C♯ D♮ D♯ E♮ F♮ 8 G♮ G♯ A♮ A♯ B♮ C♮ C♯ D♮ D♯ E♮ F♮ F♯ 9 G♯ A♮ A♯ B♮ C♮ C♯ D♮ D♯ E♮ F♮ F♯ G♮ 10 A♮ A♯ B♮ C♮ C♯ D♮ D♯ E♮ F♮ F♯ G♮ G♯ 11 A♯ B♮ C♮ C♯ D♮ D♯ E♮ F♮ F♯ G♮ G♯ A♮ 12 B♮ C♮ C♯ D♮ D♯ E♮ F♮ F♯ G♮ G♯ A♮ A♯
Microtonal corollaries
- In any
t
-tone equal temperament witht > 12 and t modulo 12 = 0
, i.e.:t = 12 × n
- n is an integer
n > 1
t
possible permutations of modes and root notes. Thus, in 24-tone equal temperament, it has 24 possible permutations of modes and root notes; in 36-TET, it has 36; in 48-TET, it has 48; and so on. Four particular corollaries to modes of limited transposition within 12-TET itself apply:The 12-tone chromatic scale as a mode of limited microtonal transposition In x
-TET:the 12-TCS has x
/ 12 modes:the same number y
has in 12-TET:24 2 the whole-tone scale 36 3 the diminished seventh chord 48 4 the augmented chord 72 6 the tritone In other words, y consists of evenly spaced intervals whose ratio to 12 equals 12’s ratio to x.
- The 12-tone chromatic scale is also a mode of limited transposition in 60-TET, 84-TET, 96-TET, 108-TET, 120-TET, and so on; the analogy just doesn’t work in those tonalities because 12 doesn’t have an integer quotient with their ratios to 12 (i.e., 12 / (60 / 12) = 12² / 60 = 2.4, i.e., not an integer).
- Any scale’s number of repetitions per octave in any n-TET must be an integer factor of n. Thus:
- All scales in 12-TET must repeat exactly 12, 6, 4, 3, 2, or 1 times per octave.
- Prime equal temperaments (e.g., 13-TET, 17-TET, 19-TET) can’t have modes of limited transposition.
- Nonprime equal temperaments (e.g., 15-TET, 22-TET, 24-TET) must have them.
- Let t-TET exist, where t is composite.
- Let f be an integer factor of t.
- Therefore, t / f must yield an integer n.
- As a result, a scale must exist in t-TET with:
- intervals uniformly spaced n notes apart
- f repetitions per octave
- n discrete transpositions
A Crash Course in Ancient Greek Harmony
Etymology
The major scale’s modes are named for places in or near ancient Greece and/or ancient Greek tribes:
Αἱ ἐτῠμολογῐ́αι τῶν ἑπτᾰ́ τόνων (Hai etumologíai tô heptá tónōn) [The Seven Modes’ Etymologies] |
||||
---|---|---|---|---|
# | Mode | Greek | Romanized | Reference |
1 | Ἰωνία | Iōnía | region on the western coast of Anatolia (modern Turkey) | |
2 | Δωρῐεύς | Dōrieús | one of the four major Hellenic tribes | |
3 | Φρῠγῐ́ᾱ | Phrugíā | kingdom in west-central Anatolia | |
4 | Λῡδῐ́ᾱ | Lūdíā | Anatolian kingdom most famously ruled by Croesus | |
5 | μιξο-Λῡ́δῐος | mixo-Lū́dios | literally “mixed Lydian” | |
6 | Αἰολῐ́ᾱ | Aiolíā | region of northwestern Anatolia | |
7 | Λοκρῐ́ς | Lokrís | ⟨en |
However, they really don’t have anything to do with the regions or tribes they were named after, or even the ancient Greek tonoi (singular: tonos) that in many cases shared their names; it was more a case of “medieval Europeans thought it’d be cool to name their modes after aspects of Ancient Greece.”
(Tonos comes from the ancient Greek ὁ τόνος, ho tónos, meaning cord, chord, note, tone, or tension; its dual nominative form was τὼ τόνω, tṑ tónō, and its plural nominative form was οἱ τόνοι, hoi tónoi.)
As for the word diatonic, that comes from the Ancient Greek διατονικός (diatonikós), literally meaning two tones, in reference to the diatonic tetrachord, which… well, keep reading.
Ancient Greek Harmony: The Cliffs Notes
This is an oversimplification by necessity, as ancient Greek music theory wasn’t unified; (Φιλόλαος, Philólaos), (Ἀρχύτας), (Ἀριστόξενος ὁ Ταραντῖνος, Aristóxenos ho Tarantínos), (Πτολεμαῖος, Ptolemaios), and others had quite different conceptions of it. I will list modern sources in an acknowledgement section below.
I should first clarify that very little music of ancient Greece actually survives to this day; the earliest known piece that can reasonably be described as complete is ⟨en
I’ll be using numbers to represent the intervals of ancient Greek harmony within ⟨en
Interval Key | ||||||||
---|---|---|---|---|---|---|---|---|
# | Interval | Tone | Exact | Approximate | ||||
¼ | Infra second | Quarter-tone | ²⁴√2 | : | 1 | ≈ | 1.02930223664 | |
½ | Minor second | Semitone | ¹²√2 | : | 1 | ≈ | 1.05946309436 | |
1 | Major second | Whole tone | ⁶√2 | : | 1 | ≈ | 1.12246204831 | |
1½ | Minor third | Three semitones | ⁴√2 | : | 1 | ≈ | 1.18920711500 | |
2 | Major third | Two whole tones | ³√2 | : | 1 | ≈ | 1.25992104989 |
Note that in scales with only whole-steps and half-steps, I’ll use H (i.e., Half) interchangeably with ½, and W (i.e., Whole) interchangeably with 1. In all other scales, I’ll only use the numbers.
24-TET is by necessity an oversimplification as well, not least since different authors defined the same interval differently. For instance, here are how Philolaus, Archytas, and 24-TET would define the intervals within a diatonic tetrachord. (A tetrachord is a major element of Greek harmony consisting of four notes.)
Also, I’ve taken the liberty of reversing what they called the first and third intervals – ancient Greek harmony defined scales in what we would consider descending order. But then, the ancient Greek metaphor for time literally inverted the modern one: they saw the past as receding away in front of us, continually getting ever more distant, and the future as creeping up from behind us. I actually find their metaphor far more apt than ours: who can actually see the future? And our memories of the past get more distant every day.
I don’t know if this metaphor affected how they described changes over time. I may be overthinking this, but if they thought of the past as in front of them, they may not have perceived this as a descent. I don’t have enough information to know if concrete proof exists one way or the other. Certainly, where the ancient Greeks refer to time, translators must be aware of their metaphor, and anyone who reads translated Greek writing that concerns time should take the differences into account (and even ask if the translator knew of them).
Interval Ratios of a Diatonic Tetrachord | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Source | Low interval | Middle interval | High interval | ||||||||||||
Philolaus | 256 | : | 243 | ≈ | 1.05349794239 | 9 | : | 8 | = | 1.125 | 9 | : | 8 | = | 1.125 |
Archytas | 28 | : | 27 | = | 1.0370370370… | 8 | : | 7 | = | 1.142857142857… | 9 | : | 8 | = | 1.125 |
24-TET | ¹²√2 | : | 1 | ≈ | 1.05946309436 | ⁶√2 | : | 1 | ≈ | 1.12246204831 | ⁶√2 | : | 1 | ≈ | 1.12246204831 |
Thus, representing ancient Greek harmony using 24-TET is a substantial oversimplification, and in point of fact, we’d get closer to Archytas’ definitions in 24-TET by using a quarter tone for the low interval and 1¼-tone (that is, the interval between a major second and a minor third, known as an infra third or ultra second) for the middle interval. However, the intervals I’ve selected (a minor second and two major seconds) are closer to Philolaus’ definitions and, crucially, can be represented in modern Western music’s 12-TET.
As one further example, both Philolaus and Archytas define a diatonic tetrachord’s high and low notes as having 4:3 (1.33333…) ratios, which 24-TET would represent using a perfect fourth (≈1.33483985417). Most people’s ears are insufficiently trained to tell the difference – even trained singers with perfect pitch frequently wander off-key by larger differences than that (at least when they’re not subjected to pitch alteration).
The same ancient Greek tonos could actually use any of three genera (singular: genus). Each tonos contained two tetrachords, four-note sets spanning a 4:3 ratio, or perfect fourth. The note spacing varied between genera, but all three used one interval once per tetrachord and another interval twice, in the following order:
Interval Genera: A Feed from Cloud Mountain | |||
---|---|---|---|
Genus | Low interval | Middle interval | High interval |
Enharmonic | Infra second | Infra second | Major third |
Chromatic | Minor second | Minor second | Minor third |
Diatonic | Minor second | Major second | Major second |
The positions of the tetrachords and synaphai, meanwhile, varied between tonoi, with notable consequences:
- In most tonoi, the synaphe occurred between the tetrachords.
- In Hypodorian and Mixolydian, it occurred respectively before and after them.
- Additionally, Lydian, Phrygian, Hypolydian, and Hypophrygian split one tetrachord.
Since tetrachords spanned a 4:3 ratios, the synaphe was mathematically constrained to 9:8, or a major second:
- 4² × 9 = 144
- 3² × 8 = 72
- 144 ÷ 72 = 2
Note that enharmonic has a different meaning in twelve-tone equal temperament than it has in ancient Greek harmony (or any tuning system that uses microtonality). In 12-TET, enharmonic means that two tones have the same pitch. In ancient Greek harmony, it refers to an interval spacing smaller than a semitone and to the tuning system that used this interval. As stated, I’ll be approximating this interval in 24-TET with a quarter-tone.
Ancient Greek Tonoi & Modern Modes
A few notes:
- As stated above, ancient Greek harmony defined tonoi in descending order; I’ve listed them in our more familiar ascending order to keep them consistent with the other scales on this page.
- I’ve printed intervals rather than notes because the notation for microtones is extremely confusing if you’re not already familiar with it. Hopefully, the interval notation will be slightly easier to understand for the enharmonic tonoi. Below this table, I’ll present examples of the chromatic tonoi based on C.
- A thicker font denotes a larger interval size: 2, 1½, 1, ½, ¼.
- I’ve placed borders between tetrachords (again, four tonoi split one of their tetrachords) and around the extra whole step (whose background I’ve also highlighted).
- I’ve printed the modern modes with blue text and brighter borders, with a thicker border below since the next tonos will not be related.
- I’ve printed the tonoi in the order ancient Greek harmony assigned them: Mixolydian (modern Locrian’s equivalent) first, Hypodorian (modern Aeolian’s equivalent) last.
- Our Dorian, Phrygian, Lydian, and Mixolydian modes don’t match their eponymous diatonic tonoi. The apparent cause for this is medieval Europeans’ misconception that the ancient Greeks described tonoi in ascending order. (Swiss poet Heinrich Glarean appears to have popularized the error.) I’ll explain this further below.
Here are all three genera of all seven tonoi, followed by the diatonic genus’ modern equivalent:
Approximate Intervals of Ancient Greek Tonoi & Modern Diatonic Modes | |||||||||
---|---|---|---|---|---|---|---|---|---|
Tonos | Genus | 1–2 | 2–3 | 3–4 | 4–5 | 5–6 | 6–7 | 7–8 | |
Mixolydian | Enharmonic | ¼ | ¼ | 2 | ¼ | ¼ | 2 | 1 | |
Chromatic | ½ | ½ | 1½ | ½ | ½ | 1½ | 1 | ||
Diatonic | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
Modern | ½ | 1 | 1 | ½ | 1 | 1 | 1 | ||
Lydian | Enharmonic | ¼ | 2 | ¼ | ¼ | 2 | 1 | ¼ | |
Chromatic | ½ | 1½ | ½ | ½ | 1½ | 1 | ½ | ||
Diatonic | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
Modern | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
Phrygian | Enharmonic | 2 | ¼ | ¼ | 2 | 1 | ¼ | ¼ | |
Chromatic | 1½ | ½ | ½ | 1½ | 1 | ½ | ½ | ||
Diatonic | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
Modern | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
Dorian | Enharmonic | ¼ | ¼ | 2 | 1 | ¼ | ¼ | 2 | |
Chromatic | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | ||
Diatonic | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
Modern | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
Hypolydian | Enharmonic | ¼ | 2 | 1 | ¼ | ¼ | 2 | ¼ | |
Chromatic | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | ||
Diatonic | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
Modern | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
Hypophrygian | Enharmonic | 2 | 1 | ¼ | ¼ | 2 | ¼ | ¼ | |
Chromatic | 1½ | 1 | ½ | ½ | 1½ | ½ | ½ | ||
Diatonic | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
Modern | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
Hypodorian | Enharmonic | 1 | ¼ | ¼ | 2 | ¼ | ¼ | 2 | |
Chromatic | 1 | ½ | ½ | 1½ | ½ | ½ | 1½ | ||
Diatonic | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
Modern | 1 | ½ | 1 | 1 | ½ | 1 | 1 |
The above table is quite abstract, so to follow it up, here are the chromatic tonoi rooted in C and, for the sake of representing what medieval Europeans might have thought they were, their inversions. As in the previous table, I’ve separated the tetrachords in the interval listing to make it clear where they occur, and I’ve highlighted the extra whole-step (a bit more so, even, because it will become a bit less legible shortly).
Greek Chromatic Tonoi & Their Inversions (C roots, linear order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Chromatic Tonos | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B♭ | ½ | ½ | 1½ | ½ | ½ | 1½ | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | ½ | 1½ | ½ | ½ | 1½ | 1 | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♯ | B♮ | 1½ | ½ | ½ | 1½ | 1 | ½ | ½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B𝄫 | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♭ | B♮ | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♯ | E♯ | F♯ | G♮ | A♯ | B♮ | 1½ | 1 | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B𝄫 | 1 | ½ | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♯ | B♮ | 1 | 1½ | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♮ | ½ | 1 | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E𝄫 | F♭ | G♮ | A♭ | B𝄫 | ½ | ½ | 1 | 1½ | ½ | ½ | 1½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | 1½ | ½ | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♮ | ½ | 1½ | ½ | ½ | 1 | 1½ | ½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B𝄫 | ½ | ½ | 1½ | ½ | ½ | 1 | 1½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♭ | 1½ | ½ | ½ | 1½ | ½ | ½ | 1 |
Remember how I said above that Chromatic Dorian was directly relevant to this section? Well, there you go.
(I’ll represent the enharmonic tonoi with similar tables when I figure out how best to do so.)
Scale-based transposition now. My base scales are Chromatic Lydian and Chromatic Hypophrygian inverse; this is an admittedly arbitrary choice that I made purely because they use the fewest accidentals on C. This also creates a neat pattern in the table below:
Greek Chromatic Tonoi & Their Inversions (mode-based roots, linear order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Chromatic Tonos | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
B♮ | C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | ½ | ½ | 1½ | ½ | ½ | 1½ | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | ½ | 1½ | ½ | ½ | 1½ | 1 | ½ | ||
D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | C♮ | 1½ | ½ | ½ | 1½ | 1 | ½ | ½ | ||
E♮ | F♮ | G♭ | A♮ | B♮ | C♮ | D♭ | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | ||
F♮ | G♭ | A♮ | B♮ | C♮ | D♭ | E♮ | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | ||
G♭ | A♮ | B♮ | C♮ | D♭ | E♮ | F♮ | 1½ | 1 | ½ | ½ | 1½ | ½ | ½ | ||
A♮ | B♮ | C♮ | D♭ | E♮ | F♮ | G♭ | 1 | ½ | ½ | 1½ | ½ | ½ | 1½ | ||
F♮ | G♮ | A♯ | B♮ | C♮ | D♯ | E♮ | 1 | 1½ | ½ | ½ | 1½ | ½ | ½ | ||
E♮ | F♮ | G♮ | A♯ | B♮ | C♮ | D♯ | ½ | 1 | 1½ | ½ | ½ | 1½ | ½ | ||
D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | C♮ | ½ | ½ | 1 | 1½ | ½ | ½ | 1½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | 1½ | ½ | ½ | 1 | 1½ | ½ | ½ | ||
B♮ | C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | ½ | 1½ | ½ | ½ | 1 | 1½ | ½ | ||
A♯ | B♮ | C♮ | D♯ | E♮ | F♮ | G♮ | ½ | ½ | 1½ | ½ | ½ | 1 | 1½ | ||
G♮ | A♯ | B♮ | C♮ | D♯ | E♮ | F♮ | 1½ | ½ | ½ | 1½ | ½ | ½ | 1 |
The ancient Greek tonoi’s “circle of fifths” order is:
- Hypolydian
- Lydian
- Hypophrygian
- Phrygian
- Hypodorian
- Dorian
- Mixolydian
This may help explain how the Greeks got the names Hypolydian, Hypophrygian, and Hypodorian in the first place: ὑπό (hupó) is literally Ancient Greek for under, and remember, the ancient Greeks’ scales went in what we consider descending order.
I’m reversing the inverted scales’ order in the next table, since as its predecessor clearly demonstrates, they’re actually moving in the opposite direction from their namesakes. Also, I’m reintroducing Major Phrygian and its modes here, since they’re the midway point between the chromatic scales and their inversions.
Greek Chromatic Tonoi & Their Variants (mode-based roots, “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Chromatic Tonos | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
F♮ | G♭ | A♮ | B♮ | C♮ | D♭ | E♮ | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | ½ | 1½ | ½ | ½ | 1½ | 1 | ½ | ||
G♭ | A♮ | B♮ | C♮ | D♭ | E♮ | F♮ | 1½ | 1 | ½ | ½ | 1½ | ½ | ½ | ||
D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | C♮ | 1½ | ½ | ½ | 1½ | 1 | ½ | ½ | ||
A♮ | B♮ | C♮ | D♭ | E♮ | F♮ | G♭ | 1 | ½ | ½ | 1½ | ½ | ½ | 1½ | ||
E♮ | F♮ | G♭ | A♮ | B♮ | C♮ | D♭ | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | ||
B♮ | C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | ½ | ½ | 1½ | ½ | ½ | 1½ | 1 | ||
E♮ | F♮ | G♮ | A♭ | B♮ | C♮ | D♭ | ½ | 1 | ½ | 1½ | ½ | ½ | 1½ | ||
B♮ | C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | ½ | ½ | 1½ | ½ | 1 | ½ | 1½ | ||
F♮ | G♮ | A♭ | B♮ | C♮ | D♭ | E♮ | 1 | ½ | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♮ | ½ | 1½ | ½ | 1 | ½ | 1½ | ½ | ||
G♮ | A♭ | B♮ | C♮ | D♭ | E♮ | F♮ | ½ | 1½ | ½ | ½ | 1½ | ½ | 1 | ||
D♭ | E♮ | F♮ | G♮ | A♭ | B♮ | C♮ | 1½ | ½ | 1 | ½ | 1½ | ½ | ½ | ||
A♭ | B♮ | C♮ | D♭ | E♮ | F♮ | G♮ | 1½ | ½ | ½ | 1½ | ½ | 1 | ½ | ||
F♮ | G♮ | A♯ | B♮ | C♮ | D♯ | E♮ | 1 | 1½ | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | 1½ | ½ | ½ | 1 | 1½ | ½ | ½ | ||
G♮ | A♯ | B♮ | C♮ | D♯ | E♮ | F♮ | 1½ | ½ | ½ | 1½ | ½ | ½ | 1 | ||
D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | C♮ | ½ | ½ | 1 | 1½ | ½ | ½ | 1½ | ||
A♯ | B♮ | C♮ | D♯ | E♮ | F♮ | G♮ | ½ | ½ | 1½ | ½ | ½ | 1 | 1½ | ||
E♮ | F♮ | G♮ | A♯ | B♮ | C♮ | D♯ | ½ | 1 | 1½ | ½ | ½ | 1½ | ½ | ||
B♮ | C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | ½ | 1½ | ½ | ½ | 1 | 1½ | ½ |
So effectively, Lydian and Hypolydian keep one tetrachord in the same place; the other tetrachord just swaps places with the extra whole-step. This actually continues to be true throughout the rest of the chromatic scales. Effectively, the extra whole-step either moves three places forward or four places back. Dividing the Ionian scale in this way shows us the same thing occurring with it:
Greek Diatonic Tonoi (C roots, circle of fifths order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Modern | Ancient | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | ||||||
C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | ||
C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | ||
C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | ||
C♮ | D♭ | E♭ | F♮ | G♭ | A♭ | B♭ | ½ | 1 | 1 | ½ | 1 | 1 | 1 |
Every scale in this table lowers its predecessor’s extra whole-step to a half-step – and because the extra whole-step is always followed by a half-step, that half-step subsequently becomes a whole-step. This is, in fact, exactly the source of most of the patterns we’ve observed throughout our analysis of the Ionian scale. I don’t know how much the ancient Greeks mapped this out and how much of it simply stemmed from intuition, but if it was by design, the designer was a genius, and I’m sad that their name has been lost to history.
There’s no obvious equivalent of the circle of fifths progression for the chromatic genus, though; for reasons explained above, that’s a special property of the diatonic genus’ mathematical regularity. Rotating most scales requires making more changes to their intervals. Let’s see the scales on C again, this time with the tetrachord placement standardized around Major Phrygian’s layout (since it centers the synaphe within the middle row).
Greek Chromatic Tonoi & Their Variants (C roots, “circle of fifths” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Chromatic Tonos | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♯ | E♯ | F♯ | G♮ | A♯ | B♮ | 1½ | 1 | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♯ | B♮ | 1½ | ½ | ½ | 1½ | 1 | ½ | ½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B𝄫 | 1 | ½ | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B𝄫 | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B♭ | ½ | ½ | 1½ | ½ | ½ | 1½ | 1 | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♭ | B♮ | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | ½ | 1½ | ½ | ½ | 1½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B𝄫 | ½ | 1 | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B𝄫 | ½ | ½ | 1½ | ½ | 1 | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♮ | 1 | ½ | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♮ | ½ | 1½ | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♭ | ½ | 1½ | ½ | ½ | 1½ | ½ | 1 | ||
C♮ | D♯ | E♮ | F♯ | G♮ | A♯ | B♮ | 1½ | ½ | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♮ | 1½ | ½ | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♮ | ½ | 1 | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♮ | ½ | 1½ | ½ | ½ | 1 | 1½ | ½ | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♯ | B♮ | 1 | 1½ | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | 1½ | ½ | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♭ | 1½ | ½ | ½ | 1½ | ½ | ½ | 1 | ||
C♮ | D♭ | E𝄫 | F♭ | G♮ | A♭ | B𝄫 | ½ | ½ | 1 | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B𝄫 | ½ | ½ | 1½ | ½ | ½ | 1 | 1½ |
It fascinates me how these three sets of modes complement each other. Note the accidental distributions: the inversions have sharps bunched in the middle, the chromatic scales have flats bunched in the middle, and Major Phrygian has flats bunched above it and sharps below it. Of course, the interval distribution explains why that might have happened:
- The following scales open with minor thirds:
- The first two chromatic scales
- Major Phrygian’s two lowest modes
- The fourth and fifth inverted chromatic scales
- The following scales inevitably (we are discussing inversions and reflectively symmetrical scales) close with minor thirds:
- Major Phrygian’s two highest modes
- The last two chromatic inversions
- The third and fourth chromatic scales
In short, the accidental distribution is a direct consequence of the interval distribution. So let’s run an experiment. The following table doesn’t reposition any tetrachords; it just swaps them between scales:
Greek Chromatic Tonoi & Their Variants (C roots, “cyclical tetrachord swap” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Chromatic Tonos | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B𝄫 | ½ | 1 | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B𝄫 | ½ | ½ | 1½ | ½ | 1 | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B𝄫 | 1 | ½ | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B𝄫 | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B♭ | ½ | ½ | 1½ | ½ | ½ | 1½ | 1 | ||
C♮ | D♭ | E𝄫 | F♭ | G♮ | A♭ | B𝄫 | ½ | ½ | 1 | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B𝄫 | ½ | ½ | 1½ | ½ | ½ | 1 | 1½ | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♮ | ½ | 1 | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♮ | ½ | 1½ | ½ | ½ | 1 | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♮ | 1 | ½ | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♮ | ½ | 1½ | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♭ | ½ | 1½ | ½ | ½ | 1½ | ½ | 1 | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♭ | B♮ | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | ½ | 1½ | ½ | ½ | 1½ | 1 | ½ | ||
C♮ | D♯ | E♯ | F♯ | G♮ | A♯ | B♮ | 1½ | 1 | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♯ | B♮ | 1½ | ½ | ½ | 1½ | 1 | ½ | ½ | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♯ | B♮ | 1 | 1½ | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | 1½ | ½ | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♭ | 1½ | ½ | ½ | 1½ | ½ | ½ | 1 | ||
C♮ | D♯ | E♮ | F♯ | G♮ | A♯ | B♮ | 1½ | ½ | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♮ | 1½ | ½ | ½ | 1½ | ½ | 1 | ½ |
Neat. Now what if we put the scales back into something resembling linear order?
Greek Chromatic Tonoi & Their Variants (C roots, “linear tetrachord swap” order) | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Chromatic Tonos | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | |||||||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B♭ | ½ | ½ | 1½ | ½ | ½ | 1½ | 1 | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A𝄫 | B𝄫 | ½ | ½ | 1½ | ½ | ½ | 1 | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♭ | A♭ | B𝄫 | ½ | ½ | 1½ | ½ | 1 | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B𝄫 | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | ||
C♮ | D♭ | E𝄫 | F♭ | G♮ | A♭ | B𝄫 | ½ | ½ | 1 | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E♭ | F♭ | G♮ | A♭ | B𝄫 | ½ | 1 | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♮ | E♭ | F♭ | G♮ | A♭ | B𝄫 | 1 | ½ | ½ | 1½ | ½ | ½ | 1½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♭ | ½ | 1½ | ½ | ½ | 1½ | ½ | 1 | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♮ | B♮ | ½ | 1½ | ½ | ½ | 1½ | 1 | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♭ | A♭ | B♮ | ½ | 1½ | ½ | ½ | 1 | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♮ | ½ | 1½ | ½ | 1 | ½ | 1½ | ½ | ||
C♮ | D♭ | E♮ | F♯ | G♮ | A♭ | B♮ | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | ||
C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♮ | ½ | 1 | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♮ | 1 | ½ | 1½ | ½ | ½ | 1½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♭ | 1½ | ½ | ½ | 1½ | ½ | ½ | 1 | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♮ | B♮ | 1½ | ½ | ½ | 1½ | ½ | 1 | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♯ | A♯ | B♮ | 1½ | ½ | ½ | 1½ | 1 | ½ | ½ | ||
C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | 1½ | ½ | ½ | 1 | 1½ | ½ | ½ | ||
C♮ | D♯ | E♮ | F♯ | G♮ | A♯ | B♮ | 1½ | ½ | 1 | ½ | 1½ | ½ | ½ | ||
C♮ | D♯ | E♯ | F♯ | G♮ | A♯ | B♮ | 1½ | 1 | ½ | ½ | 1½ | ½ | ½ | ||
C♮ | D♮ | E♯ | F♯ | G♮ | A♯ | B♮ | 1 | 1½ | ½ | ½ | 1½ | ½ | ½ |
So, as we can see, each interval’s relative position has a massive impact on a scale’s accidental distribution. This makes intuitive sense, but it still might be hard to understand how much it underpins a scale’s entire composition without seeing it laid out like this.
Why Our Modes Have Historically Inaccurate Names
Our Ionian mode’s chromatic counterpart is actually Chromatic Hypolydian, and our Aeolian mode’s counterpart is Chromatic Hypodorian. Why is that? Well, as I remarked above, medieval Europeans were confused. Four of our modern modes also had multiple names, three of which they borrowed from the Ancient Greek tonoi: their Hypodorian was our Aeolian, their Hypophrygian was our Locrian, and their Hypolydian was our Ionian. So, if we plug in those names and recenter the order around our Aeolian mode:
A Great Mode Discombobulation | ||
---|---|---|
Ancient | Medieval | Modern |
Visualizing the mistake they made becomes easier. In short, their misconception that Greek harmony went in ascending order led them to reverse the mode order. Since Ionian has an odd number of notes, it also has an odd number of modes. Its inversion is also one of its own modes – which, to be clear, is not a given (for instance, it’s not true of the Greeks’ chromatic tonoi, which is why I listed their inversions separately above). For this to hold, one of the scale’s modes must be symmetrical – in this case, our Dorian mode:
Inverting the Ionian Scale | |||||
---|---|---|---|---|---|
Modern | Ancient | Mode | Modern | Ancient | Inversion |
W H W W H W W | W W H W W H W | ||||
H W W H W W W | W W W H W W H | ||||
W W H W W W H | H W W W H W W | ||||
W H W W W H W | W H W W W H W | ||||
H W W W H W W | W W H W W W H | ||||
W W W H W W H | H W W H W W W | ||||
W W H W W H W | W H W W H W W |
Thus, by necessity, they were still going to get one right; it just happened to be our Aeolian mode. Why wasn’t it our Dorian mode? Apparently, they made an off-by-one error in assuming the Greeks listed the tonoi themselves in ascending order as well. Let’s move the tonoi on the right down by one and plug in their medieval names:
A Medieval Off-by-One Error | |||||
---|---|---|---|---|---|
Medieval | Ancient | Mode | Medieval | Ancient | Inversion − 1 |
W H W W H W W | W H W W H W W | ||||
H W W H W W W | W W H W W H W | ||||
W W H W W W H | W W W H W W H | ||||
W H W W W H W | H W W W H W W | ||||
H W W W H W W | W H W W W H W | ||||
W W W H W W H | W W H W W W H | ||||
W W H W W H W | H W W H W W W |
Now the ancient names on the left line up with the medieval names on the right, and vice versa.
Remember, the ancient Greeks used the opposite metaphor for time from the modern one: they thought of the past as being in front and the future as being behind them. I don’t know if this was the source of medieval Europeans’ confusion, but it wouldn’t entirely surprise me if it was.
Applied Greek Harmony: Tetrachords in Modern Scales
We’ve already seen how the Ionian scale is a variant of a scale in which a tetrachord is repeated with a whole-tone separation (though in our Ionian mode, specifically, the second tetrachord is split midway through). To reiterate, let’s look at D Dorian, whose intervals are W-H-W-W-W-H-W:
- It opens with a W-H-W tetrachord (i.e., D, E, F, G).
- It features another whole step (i.e., G, A).
- It closes by repeating the W-H-W tetrachord (i.e., A, B, C, D).
And because the tetrachord itself is symmetrical, so is Dorian mode itself.
A few scales in Other Scales and Tonalities above are also built on two tetrachords separated by a whole step:
- Chromatic Dorian (½, ½, 1½, 1, ½, ½, 1½) and its modes literally are an ancient Greek genus.
- Chromatic Dorian inverse (1½, ½, ½, 1, 1½, ½, ½) and its modes also qualify.
- Major Phrygian (½, 1½, ½, 1, ½, 1½, ½) uses a ½–1½–½ tetrachord, a whole step, and another ½–1½–½ tetrachord. It also has the same reflective symmetry as our Dorian mode: since its repeated tetrachord is symmetrical and its extra whole-step occurs between them, it too is symmetrical.
Scales built on two tetrachords can be pleasing in their regularity, and they may be helpful starting places when you first write pieces that stray from the Ionian scale’s familiarity. Symmetrical scales built on two of the same tetrachord (e.g., double harmonic minor or modes thereof) may be especially ideal starting places. I’d suggest inventing your own, but there aren’t any others.
But you can be creative in varying how the ancient Greeks constructed their harmony. One possibility: a nine-note scale featuring two of the same pentachord (five-note sequence) separated by a whole-step. To fit these criteria, your pentachord must span a perfect fourth (2½ steps), which unfortunately prevents it from being rotationally symmetrical - your options are W-H-H-H, H-W-H-H, H-H-W-H, or H-H-H-W.
If you want rotational symmetry, though, you could invert the second pentachord:
- W-H-H-H-W-H-H-H-W ( )
- H-W-H-H-W-H-H-W-H ( )
- H-H-W-H-W-H-W-H-H ( )
- H-H-H-W-W-W-H-H-H ( ; this one seems especially daring)
The second option, H-W-H-H-W-H-H-W-H, can also be constructed by repeating the same trichord (three-note sequence), H-W, with a half-step separation each time, which is another interesting variation on the ancient Greek idea. Within it, each trichord spans a minor third; the added half-step above it means that the same interval pattern repeats every major third. Above its root key, it also includes a minor third, a major third, a perfect fourth, and a perfect fifth above its root key. These make it potentially a very versatile scale. (Since its dominant chord is diminished and it excludes the major second above its root, it also shares some harmonic characteristics with Phrygian mode and Phrygian dominant.) But these aren’t the only possible variants – be creative!
Then again, you may prefer harmonic minor or melodic minor, which respectively only lower one note of Aeolian mode and raise one note of Ionian mode; both are also so ubiquitous in Western music that they may be intuitive. Neither, however, possess the repeated tetrachord of the ancient Greek genera. (Melodic minor does possess a symmetrical mode, Aeolian dominant [W-W-H-W-H-W-W]; harmonic minor does not.)
Acknowledgements & Sources
I first wish to thank Marty O’Donnell (yes, that Marty O’Donnell) for pointing out that it wasn’t sufficiently clear what parts of this section I was oversimplifying; his feedback resulted in a much clearer explanation. However, the opinions presented in this section are entirely my own. In particular, Marty believes modern scholars have extrapolated more from ancient Greek texts than is merited by their contents – and in the interest of fairness, I must point out that he has a degree in music theory, and I don’t. However, I must also be fair to myself: Marty got his degree decades ago, and a lot of music scholarship has been done since then.
But even then, I’ll be the first person to admit that I’m by no means an infallible source, so here are some starting places for readers wishing to learn more about this subject. ⟨en
I consulted several other resources researching this section; many were too technical to be of interest to non-specialists, but those seeking more detailed technical analysis of ancient Greek tuning systems may be interested in Robert Erickson’s ⟨ex-tempore
But I think it’s most helpful to quote the ancient Greeks in their own words (or as close to their words as English speakers without educations in Attic Greek will understand), so, via Cris Forester’s ⟨chrysalis-foundation
The magnitude of harmonia is syllaba and di’oxeian. The di’oxeian is greater than the syllaba in epogdoic ratio. From hypate [E] to mese [A] is a syllaba, from mese [A] to neate [or nete, E¹] is a di’oxeian, from neate [E¹] to trite [later paramese, B] is a syllaba, and from trite [B] to hypate [E] is a di’oxeian. The interval between trite [B] and mese [A] is epogdoic [9:8], the syllaba is epitritic [4:3], the di’oxeian hemiolic [3:2], and the dia pason is duple [2:1]. Thus harmonia consists of five epogdoics and two dieses; di’oxeian is three epogdoics and a diesis, and syllaba is two epogdoics and a diesis.—Philolaus, translated by Andrew Barker, Greek Musical Writings, Vol. 2 (1989:
Cambridge University Press). [Text and ratios in brackets are Cris Forester’s.]
Difficult as this is to parse, a close reading reveals Philolaus to be describing the Ionian scale:
- 3:2 is 1.5; our perfect fifth rounds to 1.49830707688.
- 4:3 is 1.333…; our perfect fourth rounds to 1.33483985417.
- 9:8 is 1.125; our whole step rounds to 1.12246204831.
- Philolaus’ dieses are thus 256:243, or 1.05349794239; our half step rounds to 1.05946309436.
In other words:
- A dia pason (or harmonia) is exactly an octave.
- A di’oxean is almost exactly a perfect fifth.
- A syllaba is almost exactly a perfect fourth.
- An epogdoic is almost exactly a whole step.
- A diesis is almost exactly a half-step.
Plugging those in gives us:
The magnitude of an octave is a perfect fourth and a perfect fifth. The perfect fifth is greater than the perfect fourth in whole-step ratio. From hypate [E] to mese [A] is a perfect fourth, from mese [A] to neate [or nete, E¹] is a perfect fifth, from neate [E¹] to trite [later paramese, B] is a perfect fourth, and from trite [B] to hypate [E] is a perfect fifth. The interval between trite [B] and mese [A] is a whole step [9:8], the perfect fourth is epitritic [4:3], the perfect fifth hemiolic [3:2], and the octave is duple [2:1]. Thus an octave consists of five whole steps and two half-steps; a perfect fifth is three whole steps and a half-step, and a perfect fourth is two whole steps and a half-step.
Plus ça change, plus c’est la même chose.
Philolaus’ description is so exact that I believe we can conclude from it that the ancient Greeks routinely used something very similar to our Ionian scale. However, I must reiterate: “ancient Greek harmony” refers to over a millennium of musical practices that were by no means uniform; various authors described other tonoi and indeed entirely different tuning systems. I’ve focused on the tonoi described above for two reasons:
- They’re easy to equate to modern tuning systems.
- They clearly inspired (four of) our modern modes’ names.
I also wish to acknowledge a few resources for the Greek language itself. Wiktionary is low key one of the best online resources for learning languages; it contains a wealth of information on Greek declensions, conjugations, and vocabulary. Λογεῖον and the Liddell, Scott, Jones wiki capably filled gaps in Wiktionary’s coverage. I’m by no means fluent in Attic Greek, but I’ve managed to write lyrics in it that don’t completely embarrass me. (Here’s the song itself if you want to listen to it.) I’d never have managed that without such comprehensive lexicons.
(Keep an eye on this page – I still intend to add more information on the medieval church modes that served as the precursors to our modern modes.)
Appendix 1: Greek musical terminology
It might seem like overkill to include a table this repetitive, but Google Translate is not great at parsing Ancient Greek. My hope is that this will help.
This table focuses exclusively on musical meanings of terms; many have other meanings as well. For instance, the lyre’s three strings are named after the three Muses.
Λεξικογραφία Ἑλληνῐκῶν μουσῐκῶν ῐ̓́δῐογλῶσσῐῶν Lexikographía Hellēnĭkôn mousĭkôn ĭ́dĭóglôssĭôn A lexicography of Ancient Greek musical idioglossia |
||
---|---|---|
Ἀττικός Ἑλληνική Attĭkós Hellēnĭkḗ Attic Greek |
Ῥωμαῐσμένη Rhṓmēĭsméni Romanized |
Μετάφρασις Metáphrasis Translation |
ἐναρμόνιος μιξολῡ́δῐος τόνος | enarmónios mixolū́dĭos tónos | enharmonic Mixolydian tonos |
ἐναρμόνιος Λῡ́δῐος τόνος | enarmónios Lū́dĭos tónos | enharmonic Lydian tonos |
ἐναρμόνιος Φρύγιος τόνος | enarmónios Phrŭ́gios tónos | enharmonic Phrygian tonos |
ἐναρμόνιος Δώριος τόνος | enarmónios Dṓrios tónos | enharmonic Dorian tonos |
ἐναρμόνιος ὑπολύδῐος τόνος | enarmónios hŭpolū́dĭos tónos | enharmonic Hypolydian tonos |
ἐναρμόνιος ὑποφρύγιος τόνος | enarmónios hŭpophrŭ́gios tónos | enharmonic Hypophrygian tonos |
ἐναρμόνιος ὑποδώριος τόνος | enarmónios hŭpodṓrios tónos | enharmonic Hypodorian tonos |
χρωμᾰτῐκός μιξολῡ́δῐος τόνος | khrōmătĭkós mixolū́dĭos tónos | chromatic Mixolydian tonos |
χρωμᾰτῐκός Λῡ́δῐος τόνος | khrōmătĭkós Lū́dĭos tónos | chromatic Lydian tonos |
χρωμᾰτῐκός Φρύγιος τόνος | khrōmătĭkós Phrŭ́gios tónos | chromatic Phrygian tonos |
χρωμᾰτῐκός Δώριος τόνος | khrōmătĭkós Dṓrios tónos | chromatic Dorian tonos |
χρωμᾰτῐκός ὑπολύδῐος τόνος | khrōmătĭkós hŭpolū́dĭos tónos | chromatic Hypolydian tonos |
χρωμᾰτῐκός ὑποφρύγιος τόνος | khrōmătĭkós hŭpophrŭ́gios tónos | chromatic Hypophrygian tonos |
χρωμᾰτῐκός ὑποδώριος τόνος | khrōmătĭkós hŭpodṓrios tónos | chromatic Hypodorian tonos |
διατονικός μιξολῡ́δῐος τόνος | diatonikós mixolū́dĭos tónos | diatonic Mixolydian tonos |
διατονικός Λῡ́δῐος τόνος | diatonikós Lū́dĭos tónos | diatonic Lydian tonos |
διατονικός Φρύγιος τόνος | diatonikós Phrŭ́gios tónos | diatonic Phrygian tonos |
διατονικός Δώριος τόνος | diatonikós Dṓrios tónos | diatonic Dorian tonos |
διατονικός ὑπολύδῐος τόνος | diatonikós hŭpolū́dĭos tónos | diatonic Hypolydian tonos |
διατονικός ὑποφρύγιος τόνος | diatonikós hŭpophrŭ́gios tónos | diatonic Hypophrygian tonos |
διατονικός ὑποδώριος τόνος | diatonikós hŭpodṓrios tónos | diatonic Hypodorian tonos |
μουσικά | mousiká | music |
μουσικός | mousikós | musically skilled, musical |
ἁρμονίᾱ | harmoníā | harmony |
διαπασῶν | diapasôn | octave (lit. “through all”) |
διπλόος | diplóos | double, 2:1 ratio |
δῐοξειῶν | dĭoxeiôn | perfect fifth |
ἡμιόλιος | hēmiólios | 1½, 3:2 ratio |
σῠλλᾰβή | sŭllăbḗ | perfect fourth |
ἐπίτριτος | epítritos | 1⅓, 4:3 ratio |
τρῐ́τος, τρῐ́τη | trĭ́tos, trĭ́tē | third |
ἐπόγδοος | epógdoos | 1⅛, 9:8 ratio |
δίεσις | díesis | a scale’s smallest interval |
ὑπάτη | hupátē | lyre’s lowest-pitched string |
παραμέση | paramésē | second-lowest-pitched string |
μέση | mésē | lyre’s middle string |
νήτη, νεάτη | nḗtē, neátē | lyre’s highest-pitched string |
…OK, fine, I completely made up the declension of «ῐ̓́δῐογλῶσσῐῶν», but to be fair, it wouldn’t have sufficed at all to have used a modern declension when all the surrounding language is Attic.
(For the time being, a complete explanation of declensions is beyond my scope, but I may eventually find myself unable to resist writing one.)
Appendix 2: Interval Ratios of 12- and 24-Tone Equal Temperament
As an appendix to the section on tonoi, I’ve also created this table of every possible interval in 24-tone equal temperament. The column “LPT” means “Lowest Possible Temperament” – in other words, to contain an interval, a temperament must be a multiple of its LPT; e.g., if the LPT is 8, the interval will appear in 16-TET, 24-TET, 32-TET, and so on, but will not appear in 12-TET. The lower the LPT, the bolder the font used to print the interval. Intervals printed in blue also appear in 12-TET (our familiar 12-note chromatic scale).
24-Tone Equal Temperament’s Interval Ratios | |||||||
---|---|---|---|---|---|---|---|
# | Interval | Exact | Approximate | LPT | |||
1 | Quarter tone, infra second | 2¹⁄₂₄ | = | ²⁴√ | 2 | 1.02930223664 | 24 |
2 | Minor second | 2²⁄₂₄ | = | ¹²√ | 2 | 1.05946309436 | 12 |
3 | Neutral second | 2³⁄₂₄ | = | ⁸√ | 2 | 1.09050773267 | 8 |
4 | Major second | 2⁴⁄₂₄ | = | ⁶√ | 2 | 1.12246204831 | 6 |
5 | Ultra second, infra third | 2⁵⁄₂₄ | = | ²⁴√ | 32 | 1.15535269687 | 24 |
6 | Minor third | 2⁶⁄₂₄ | = | ⁴√ | 2 | 1.18920711500 | 4 |
7 | Neutral third | 2⁷⁄₂₄ | = | ²⁴√ | 128 | 1.22405354330 | 24 |
8 | Major third | 2⁸⁄₂₄ | = | ³√ | 2 | 1.25992104989 | 3 |
9 | Ultra third, narrow fourth | 2⁹⁄₂₄ | = | ⁸√ | 8 | 1.29683955465 | 8 |
10 | Perfect fourth | 2¹⁰⁄₂₄ | = | ¹²√ | 32 | 1.33483985417 | 12 |
11 | Wide fourth | 2¹¹⁄₂₄ | = | ²⁴√ | 2,048 | 1.37395364746 | 24 |
12 | Tritone | 2¹²⁄₂₄ | = | √ | 2 | 1.41421356237 | 2 |
13 | Narrow fifth | 2¹³⁄₂₄ | = | ²⁴√ | 8,192 | 1.45565318284 | 24 |
14 | Perfect fifth | 2¹⁴⁄₂₄ | = | ¹²√ | 128 | 1.49830707688 | 12 |
15 | Wide fifth, infra sixth | 2¹⁵⁄₂₄ | = | ⁸√ | 32 | 1.54221082541 | 8 |
16 | Minor sixth | 2¹⁶⁄₂₄ | = | ³√ | 4 | 1.58740105197 | 3 |
17 | Neutral sixth | 2¹⁷⁄₂₄ | = | ²⁴√ | 131,072 | 1.63391545324 | 24 |
18 | Major sixth | 2¹⁸⁄₂₄ | = | ⁴√ | 8 | 1.68179283051 | 4 |
19 | Ultra sixth, infra seventh | 2¹⁹⁄₂₄ | = | ²⁴√ | 524,288 | 1.73107312201 | 24 |
20 | Minor seventh | 2²⁰⁄₂₄ | = | ⁶√ | 32 | 1.78179743628 | 6 |
21 | Neutral seventh | 2²¹⁄₂₄ | = | ⁸√ | 128 | 1.83400808641 | 8 |
22 | Major seventh | 2²²⁄₂₄ | = | ¹²√ | 2,048 | 1.88774862536 | 12 |
23 | Ultra seventh, narrow octave | 2²³⁄₂₄ | = | ²⁴√ | 8,388,608 | 1.94306388231 | 24 |
24 | Octave | 2²⁴⁄₂₄ | = | 2 | 2 | 1 |
The Carnatic Numbered Mēḷakartā
A numbered set of fundamental rāgasa (musical scales) that originated in carnatic music (South Indian classical music). They must obey a few rules:
- They must be sampūrṇa, or complete: i.e., they must contain all seven svaras.
- The ascending and descending notes must be the same.
- They must end with the same note they start with. (I have omitted the upper C here for the sake of space.)
- The third and fifth scale degrees may not be sharp.
- The fourth and fifth scale degrees may not be flat.
Many of these correspond exactly to frequently used Western scales (e.g., #8 is Phrygian, #20 is Aeolian, #21 is harmonic minor, #22 is Dorian, #23 is melodic minor, #28 is Mixolydian, #29 is Ionian, #65 is Lydian); however, many others are virtually unique to Indian music, and some fundamental modes of Western music (e.g., Locrian mode) are absent here, as they break some of the fundamental rules of mēḷakartā.
Indian music uses multiple scales, and although there are commonly held to be 22 shruti per octave, this remains a matter of some debate, since in practice, pitch tends to vary somewhat. To avoid confusion, I’m therefore printing the swaras’ Western names.
The Carnatic Numbered Mēḷakartā | |||||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
# | Scale | 1 | 2 | 3 | 4 | 5 | 6 | 7 | Intervals | ||||||
1 | C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B𝄫 | ½ | ½ | 1½ | 1 | ½ | ½ | 1½ | |
2 | C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B♭ | ½ | ½ | 1½ | 1 | ½ | 1 | 1 | |
3 | C♮ | D♭ | E𝄫 | F♮ | G♮ | A♭ | B♮ | ½ | ½ | 1½ | 1 | ½ | 1½ | ½ | |
4 | C♮ | D♭ | E𝄫 | F♮ | G♮ | A♮ | B♭ | ½ | ½ | 1½ | 1 | 1 | ½ | 1 | |
5 | C♮ | D♭ | E𝄫 | F♮ | G♮ | A♮ | B♮ | ½ | ½ | 1½ | 1 | 1 | 1 | ½ | |
6 | C♮ | D♭ | E𝄫 | F♮ | G♮ | A♯ | B♮ | ½ | ½ | 1½ | 1 | 1½ | ½ | ½ | |
7 | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B𝄫 | ½ | 1 | 1 | 1 | ½ | ½ | 1½ | |
8 | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♭ | ½ | 1 | 1 | 1 | ½ | 1 | 1 | |
9 | C♮ | D♭ | E♭ | F♮ | G♮ | A♭ | B♮ | ½ | 1 | 1 | 1 | ½ | 1½ | ½ | |
10 | C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♭ | ½ | 1 | 1 | 1 | 1 | ½ | 1 | |
11 | C♮ | D♭ | E♭ | F♮ | G♮ | A♮ | B♮ | ½ | 1 | 1 | 1 | 1 | 1 | ½ | |
12 | C♮ | D♭ | E♭ | F♮ | G♮ | A♯ | B♮ | ½ | 1 | 1 | 1 | 1½ | ½ | ½ | |
13 | C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B𝄫 | ½ | 1½ | ½ | 1 | ½ | ½ | 1½ | |
14 | C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♭ | ½ | 1½ | ½ | 1 | ½ | 1 | 1 | |
15 | C♮ | D♭ | E♮ | F♮ | G♮ | A♭ | B♮ | ½ | 1½ | ½ | 1 | ½ | 1½ | ½ | |
16 | C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♭ | ½ | 1½ | ½ | 1 | 1 | ½ | 1 | |
17 | C♮ | D♭ | E♮ | F♮ | G♮ | A♮ | B♮ | ½ | 1½ | ½ | 1 | 1 | 1 | ½ | |
18 | C♮ | D♭ | E♮ | F♮ | G♮ | A♯ | B♮ | ½ | 1½ | ½ | 1 | 1½ | ½ | ½ | |
19 | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B𝄫 | 1 | ½ | 1 | 1 | ½ | ½ | 1½ | |
20 | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♭ | 1 | ½ | 1 | 1 | ½ | 1 | 1 | |
21 | C♮ | D♮ | E♭ | F♮ | G♮ | A♭ | B♮ | 1 | ½ | 1 | 1 | ½ | 1½ | ½ | |
22 | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♭ | 1 | ½ | 1 | 1 | 1 | ½ | 1 | |
23 | C♮ | D♮ | E♭ | F♮ | G♮ | A♮ | B♮ | 1 | ½ | 1 | 1 | 1 | 1 | ½ | |
24 | C♮ | D♮ | E♭ | F♮ | G♮ | A♯ | B♮ | 1 | ½ | 1 | 1 | 1½ | ½ | ½ | |
25 | C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B𝄫 | 1 | 1 | ½ | 1 | ½ | ½ | 1½ | |
26 | C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♭ | 1 | 1 | ½ | 1 | ½ | 1 | 1 | |
27 | C♮ | D♮ | E♮ | F♮ | G♮ | A♭ | B♮ | 1 | 1 | ½ | 1 | ½ | 1½ | ½ | |
28 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♭ | 1 | 1 | ½ | 1 | 1 | ½ | 1 | |
29 | C♮ | D♮ | E♮ | F♮ | G♮ | A♮ | B♮ | 1 | 1 | ½ | 1 | 1 | 1 | ½ | |
30 | C♮ | D♮ | E♮ | F♮ | G♮ | A♯ | B♮ | 1 | 1 | ½ | 1 | 1½ | ½ | ½ | |
31 | C♮ | D♯ | E♮ | F♮ | G♮ | A♭ | B𝄫 | 1½ | ½ | ½ | 1 | ½ | ½ | 1½ | |
32 | C♮ | D♯ | E♮ | F♮ | G♮ | A♭ | B♭ | 1½ | ½ | ½ | 1 | ½ | 1 | 1 | |
33 | C♮ | D♯ | E♮ | F♮ | G♮ | A♭ | B♮ | 1½ | ½ | ½ | 1 | ½ | 1½ | ½ | |
34 | C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♭ | 1½ | ½ | ½ | 1 | 1 | ½ | 1 | |
35 | C♮ | D♯ | E♮ | F♮ | G♮ | A♮ | B♮ | 1½ | ½ | ½ | 1 | 1 | 1 | ½ | |
36 | C♮ | D♯ | E♮ | F♮ | G♮ | A♯ | B♮ | 1½ | ½ | ½ | 1 | 1½ | ½ | ½ | |
37 | C♮ | D♭ | E𝄫 | F♯ | G♮ | A♭ | B𝄫 | ½ | ½ | 2 | ½ | ½ | ½ | 1½ | |
38 | C♮ | D♭ | E𝄫 | F♯ | G♮ | A♭ | B♭ | ½ | ½ | 2 | ½ | ½ | 1 | 1 | |
39 | C♮ | D♭ | E𝄫 | F♯ | G♮ | A♭ | B♮ | ½ | ½ | 2 | ½ | ½ | 1½ | ½ | |
40 | C♮ | D♭ | E𝄫 | F♯ | G♮ | A♮ | B♭ | ½ | ½ | 2 | ½ | 1 | ½ | 1 | |
41 | C♮ | D♭ | E𝄫 | F♯ | G♮ | A♮ | B♮ | ½ | ½ | 2 | ½ | 1 | 1 | ½ | |
42 | C♮ | D♭ | E𝄫 | F♯ | G♮ | A♯ | B♮ | ½ | ½ | 2 | ½ | 1½ | ½ | ½ | |
43 | C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B𝄫 | ½ | 1 | 1½ | ½ | ½ | ½ | 1½ | |
44 | C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♭ | ½ | 1 | 1½ | ½ | ½ | 1 | 1 | |
45 | C♮ | D♭ | E♭ | F♯ | G♮ | A♭ | B♮ | ½ | 1 | 1½ | ½ | ½ | 1½ | ½ | |
46 | C♮ | D♭ | E♭ | F♯ | G♮ | A♮ | B♭ | ½ | 1 | 1½ | ½ | 1 | ½ | 1 | |
47 | C♮ | D♭ | E♭ | F♯ | G♮ | A♮ | B♮ | ½ | 1 | 1½ | ½ | 1 | 1 | ½ | |
48 | C♮ | D♭ | E♭ | F♯ | G♮ | A♯ | B♮ | ½ | 1 | 1½ | ½ | 1½ | ½ | ½ | |
49 | C♮ | D♭ | E♮ | F♯ | G♮ | A♭ | B𝄫 | ½ | 1½ | 1 | ½ | ½ | ½ | 1½ | |
50 | C♮ | D♭ | E♮ | F♯ | G♮ | A♭ | B♭ | ½ | 1½ | 1 | ½ | ½ | 1 | 1 | |
51 | C♮ | D♭ | E♮ | F♯ | G♮ | A♭ | B♮ | ½ | 1½ | 1 | ½ | ½ | 1½ | ½ | |
52 | C♮ | D♭ | E♮ | F♯ | G♮ | A♮ | B♭ | ½ | 1½ | 1 | ½ | 1 | ½ | 1 | |
53 | C♮ | D♭ | E♮ | F♯ | G♮ | A♮ | B♮ | ½ | 1½ | 1 | ½ | 1 | 1 | ½ | |
54 | C♮ | D♭ | E♮ | F♯ | G♮ | A♯ | B♮ | ½ | 1½ | 1 | ½ | 1½ | ½ | ½ | |
55 | C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B𝄫 | 1 | ½ | 1½ | ½ | ½ | ½ | 1½ | |
56 | C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♭ | 1 | ½ | 1½ | ½ | ½ | 1 | 1 | |
57 | C♮ | D♮ | E♭ | F♯ | G♮ | A♭ | B♮ | 1 | ½ | 1½ | ½ | ½ | 1½ | ½ | |
58 | C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♭ | 1 | ½ | 1½ | ½ | 1 | ½ | 1 | |
59 | C♮ | D♮ | E♭ | F♯ | G♮ | A♮ | B♮ | 1 | ½ | 1½ | ½ | 1 | 1 | ½ | |
60 | C♮ | D♮ | E♭ | F♯ | G♮ | A♯ | B♮ | 1 | ½ | 1½ | ½ | 1½ | ½ | ½ | |
61 | C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B𝄫 | 1 | 1 | 1 | ½ | ½ | ½ | 1½ | |
62 | C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B♭ | 1 | 1 | 1 | ½ | ½ | 1 | 1 | |
63 | C♮ | D♮ | E♮ | F♯ | G♮ | A♭ | B♮ | 1 | 1 | 1 | ½ | ½ | 1½ | ½ | |
64 | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♭ | 1 | 1 | 1 | ½ | 1 | ½ | 1 | |
65 | C♮ | D♮ | E♮ | F♯ | G♮ | A♮ | B♮ | 1 | 1 | 1 | ½ | 1 | 1 | ½ | |
66 | C♮ | D♮ | E♮ | F♯ | G♮ | A♯ | B♮ | 1 | 1 | 1 | ½ | 1½ | ½ | ½ | |
67 | C♮ | D♯ | E♮ | F♯ | G♮ | A♭ | B𝄫 | 1½ | ½ | 1 | ½ | ½ | ½ | 1½ | |
68 | C♮ | D♯ | E♮ | F♯ | G♮ | A♭ | B♭ | 1½ | ½ | 1 | ½ | ½ | 1 | 1 | |
69 | C♮ | D♯ | E♮ | F♯ | G♮ | A♭ | B♮ | 1½ | ½ | 1 | ½ | ½ | 1½ | ½ | |
70 | C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♭ | 1½ | ½ | 1 | ½ | 1 | ½ | 1 | |
71 | C♮ | D♯ | E♮ | F♯ | G♮ | A♮ | B♮ | 1½ | ½ | 1 | ½ | 1 | 1 | ½ | |
72 | C♮ | D♯ | E♮ | F♯ | G♮ | A♯ | B♮ | 1½ | ½ | 1 | ½ | 1½ | ½ | ½ |
The numbering consistently obeys several patterns:
- Adding 36 to numbers below 36 changes F to F♯; subtracting 36 from numbers above 36 changes F♯ to F♮.
- The scale number modulo 6 determines the scale’s fifth, six, and seventh notes:
- G, A♭, B𝄫
- G, A♭, B♭
- G, A♭, B
- G, A, B♭
- G, A, B
- G, A♯, B
- The following ranges of numbers open with the following sets of notes:
Range 1 Range 2 Notes 1–6 37–42 C, D♭, E𝄫 7-12 43–48 C, D♭, E♭ 13-18 49–54 C, D♭, E 19-24 55–60 C, D, E♭ 25-30 61–66 C, D, E 31-36 67–72 C, D♯, E