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