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Tuning Theory 3: Moment of Symmetry ("Microtonal" Theory)

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    in addition to providing us with an
    efficient system for approximating JI
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    two-dimensional regular
    temperaments also generate scales with
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    very specific and useful melodic properties
    these scales are called
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    "moment of symmetry scales"
    a moment of symmetry scale or MoS for short
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    is defined by having exactly two different
    intervals that span one step in the scale
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    one large, one small and by being
    derivative of a continuous chain of generators
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    that is the same way the
    diatonic scale contains only a major and
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    minor second and can be derived from
    seven continuous fifths repeated within
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    the octave, all MoS scales must have only
    two types of second and they must be
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    derivative of a continuous chain of some
    generator repeated within some .
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    since it has those defining properties
    the diatonic scale is an MoS. as it turns
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    out our other standard Western scales
    are also moment of symmetry scales
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    including the pentatonic scale whose two
    step sizes are the major second in the
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    minor 3rd and the chromatic scale whose
    to step sizes are the minor second and
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    the Augmented unison. both derived from a
    continuous chains of fifths from the
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    circle of fifths. so we don't know for
    sure why historically we arrived so
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    naturally at MoS scales we can use that
    fact to theorize that other scales that
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    share similar properties would be
    similarly fruitful. MoS scales are
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    categorized by their number of large and
    small seconds. for example the diatonic scale
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    scale would be prefer to as the 5
    large and 2 small MoS, because it has five
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    major seconds and two minor seconds
    each MoS has what is referred to as a valid
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    tuning range. the range of generator
    sizes over which that MoS is generated
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    as you vary the size of the generator
    across that range the large and small
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    steps vary in size compared to each other
    at one extreme a small steps
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    shrink towards being non-existent, while
    the large steps take over the whole
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    scale at which point you reach an equal
    temperament equal to the number of large steps
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    at the other extreme the small steps
    get larger and a large steps
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    shrink until both are the same size at
    which point you reach an equal
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    temperament equal to the number of total
    steps in the scale
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    outside of those parameters the scales
    generated with no longer be of the same
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    MoS structure. for example the diatonic
    scale a.k.a. the 5 large 2 small MoS is
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    valid with the generator ranging from
    approximately 685 cents
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    to 720 cents. in the middle of
    these two around 700 cents you arrive at
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    scales or the scale structure is
    obviously LLsLLLs
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    as you approach 720 cents
    however the small steps shrink towards
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    nothing until the minor second
    disappears completely and you get 5-tet
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    here is what that progression in generator size
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    sounds like
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    conversely if your generator approaches
    685 cents your major and minor seconds
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    approach each other in size until
    they're equal at which point you have 7-tet
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    here's what that progression in generator size
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    sounds like
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    the sizes and structures of the
    different MoS scales you reach given a
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    period and a generator combination are
    determined by the ratio in size between
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    those two intervals. though the
    intricacies of that relationship are
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    beyond the scope of this video. to put it
    as simply as possible the number of
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    notes in each successive MoS scale a.k.a.
    their cardinalities follow a Fibonacci
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    ESCA pattern or each new scales
    cardinality is an addition of two
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    previous cardinalities. also the number
    of large and small steps in your new
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    scale will match those two previous
    cardinalities. for example when using a
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    pure 3/2 and a pure 2/1
    approximation 702 cents and 1200 cents
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    as our generator and period we have MoS
    scales after one note, which in this case
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    is just octaves, then at two notes a
    scale of one large one small
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    a perfect fifth and a perfect fourth
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    our next MoS has reached at three
    notes a.k.a. 2+1 giving us
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    2L1s MoS scale including two
    perfect fourth and a major second
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    after that we had an MoS of five notes a.k.a.
    2+3 giving us a 2L3s MoS scale
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    which is our pentatonic scale
    the next MoS is reached seven notes just
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    5+2 giving us a 5L 2s MoS scale
    which is our diatonic scale
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    and then 12 notes - 7+5 giving us a 5L 7s MoS scale
    and uneven
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    chromatic scale. after that the bag
    pattern continues onto 17 notes,
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    29 notes etc. if you generate with the
    pure 6/5 and a 2/1 however you
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    arrive at a different combination of MoS
    scales that they follow a similar
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    pattern. they would occur at one note,
    two notes, three notes (just 2+1), 4 notes
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    (3+1), 7 notes (3+4), 11 notes (7+4)
    15 notes (11+4) and so on
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    the closer to generators are in size the
    more scale structures they'll have in
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    common before they diverge. for example
    when generating scales using a flatted 3/2
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    or 696 cents, as often happens in
    mintone temperament, we arrived at the
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    same MoS scales as when generating with
    the pure 3/2 until we get to the 12
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    notes scale which will instead have
    seven large steps and five small steps
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    making it an uneven chromatic scale with
    a reverse structure
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    that scale is followed by MoS scales of
    19 notes (a.k.a. 12+7), 26 notes (19+7)
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    and then the pattern diverges from then on
    here is what several alternative MoS
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    scale structure sound like
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    those are just several examples among an
    infinite number of MoS scales which are
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    theoretically ripe for exploration.
    but how on earth should one go about playing
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    these new musical structures if they can
    differ on such a basic level from our
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    familiar scales? certainly many of them
    would not be playable on traditional
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    musical instruments. next video I'll be
    covering the most ergonomic way to
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    represent these musical structures
    physically for musical performance
Title:
Tuning Theory 3: Moment of Symmetry ("Microtonal" Theory)
Description:

Up until now we've talked about tuning intervals so that they approximate Just Intonation to some degree. But as I hope this video will show, a scale's melodic resources are AT LEAST as important as its harmonic resources.

Here are the previous videos in this series:

Tuning Theory 0: A Primer
https://www.youtube.com/watch?v=DB2aHGW45fY

Tuning Theory 1: Just Intonation
https://www.youtube.com/watch?v=S7YRYm-trAs

Tuning Theory 2: Temperament
https://www.youtube.com/watch?v=ZoAuVgndmbU

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Video Language:
English
Duration:
08:54

English subtitles

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