5L 4s

The familiar harmonic entropy minimum with this MOS pattern is godzilla, in which a generator is 8/7 or 7/6 (tempered to be the same interval, or even 37/32 if you like) so two of them make a 4/3. However, in addition to godzilla (tempering out 81/80) and the 2.3.7 temperament semaphore, there is also a weird scale called "pseudo-semaphore", in which two different flavors of 3/2 exist in the same scale: an octave minus two generators makes a sharp 3/2, and two octaves minus seven generators makes a flat 3/2.

Generator											Cents	Comments
1\5											240
										12\59	244.068	Pseudo-semaphore is around here
									11\54		244.444
								10\49			244.898
							9\44				245.455
						8\39					246.154
					7\34						247.059
				6\29							248.276
					11\53						249.057	Semaphore is around here
			5\24								250	L/s = 4
					9\43						251.163
											252.178	L/s = pi
		4\19									252.632	Godzilla is around here L/s = 3
											253.643	L/s = e
				11\52							253.813
						29\137					254.015
								76\359			254.039
										199\940	254.043
									123\581		254.045
							47\222				254.054
					18\85						254.118
			7\33								254.5455
				10\47							255.319
					13\61						255.734
						16\75					256.000
	3\14										257.143	Boundary of propriety (generators larger than this are proper)
				11\51							258.8235
											258.957
			8\37								259.459
					21\97						259.794
							55\254				259.843
									144\665		259.850
										233\1076	259.851	Golden superpelog
								89\411			259.854
						34\157					259.873
				13\60							260
											260.246
		5\23									260.870	Optimum rank range (L/s=3/2) superpelog
			7\32								262.5
				9\41							263.415
					11\50						264
						13\59					264.407
							15\68				264.706
								17\77			264.935
									19\86		265.116
										21\95	265.263
2\9											266.667

5L 4s

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