4L 5s (3/1-equivalent)

↖ 3L 4s⟨3/1⟩	↑ 4L 4s⟨3/1⟩	5L 4s⟨3/1⟩ ↗
← 3L 5s⟨3/1⟩	4L 5s (3/1-equivalent)	5L 5s⟨3/1⟩ →
↙ 3L 6s⟨3/1⟩	↓ 4L 6s⟨3/1⟩	5L 6s⟨3/1⟩ ↘

┌╥┬╥┬╥┬╥┬┬┐
│║│║│║│║│││
│││││││││││
└┴┴┴┴┴┴┴┴┴┘

Scale structure

Step pattern

LsLsLsLss
ssLsLsLsL

Equave

3/1 (1902.0 ¢)

Period

3/1 (1902.0 ¢)

Generator size^(edt)

Bright

2\9 to 1\4 (422.7 ¢ to 475.5 ¢)

Dark

3\4 to 7\9 (1426.5 ¢ to 1479.3 ¢)

Related MOS scales

9L 4s⟨3/1⟩, 4L 9s⟨3/1⟩

Neutralized

8L 1s⟨3/1⟩

2-Flought

13L 5s⟨3/1⟩, 4L 14s⟨3/1⟩

Equal tunings^(edt)

Equalized (L:s = 1:1)

2\9 (422.7 ¢)

Supersoft (L:s = 4:3)

7\31 (429.5 ¢)

5\22 (432.3 ¢)

8\35 (434.7 ¢)

3\13 (438.9 ¢)

7\30 (443.8 ¢)

4\17 (447.5 ¢)

Superhard (L:s = 4:1)

5\21 (452.8 ¢)

Collapsed (L:s = 1:0)

1\4 (475.5 ¢)

Suggested for use as a "diatonic scale" when playing Bohlen-Pierce is the 9-note Lambda scale, which is the 4L5s MOS. This can be thought of as an MOS generated by a 3.5.7 rank-2 temperament called BPS (Bohlen-Pierce-Stearns) that eliminates only the comma 245/243, so that 9/7 * 9/7 = 5/3.

This is a very good temperament on the 3.5.7 subgroup, and additionally is supported by many EDT's (and even EDOs!) besides 13-EDT.

Some low-numbered EDOs that support Lambda are 19, 22, 27, 41, and 46, all of which make it possible to play BP music to some reasonable extent. These EDOs contain not only the Lambda BP diatonic scale, but also the 13-note "Lambda chromatic" MOS scale, or Lambda[13], which can be thought of as a "detempered" version of the 13-EDT Bohlen Pierce scale. This scale may be a suitable melodic substitute for the BP chromatic scale, and is basically the same as how 19-EDO and 31-EDO do not contain 12-EDO as a subset, but they do contain the meantone[12] chromatic scale.

When playing this temperament in some EDO, it may be desired to stretch/compress the tuning so that the tritave is pure, rather than the octave being pure - or in general, to minimize the error on the 3.5.7 subgroup while ignoring the error on 2/1.

One can "add" the octave to Lambda temperament by simply creating a new mapping for 2/1. A simple way to do so is to map the 2/1 to +7 of the ~9/7 generators, minus a single tritave. This is Sensi temperament, in essence treating it as a "3.5.7.2 extension" of the original 3.5.7 Lambda temperament.

List of EDT's supporting Lambda Temperament

Below is a list of the equal-temperaments which contain a 4L+5s scale using generators between 422.7 cents and 475.5 cents.

L=1 s=0 4 edt

L=1 s=1 9 edt (5flat40 7sharp18)

L=2 s=1 13 (5flat7 7flat3)

L=3 s=1 17 (5sharp10 7flat12)

L=3 s=2 22 (~14edo)

L=4 s=1 21

L=4 s=3 31

L=5 s=1 25

L=5 s=2 30 (~19edo) (5sharp3 7flat8)

L=5 s=3 35 (~22edo) (5flat14 7sharp0)

L=5 s=4 40

L=6 s=1 29

L=6 s=5 49 (~31EDO) (5sharp8 7sharp8) (Schism*)

L=7 s=1 33

L=7 s=2 38 (~24edo)

L=7 s=3 43 (~27edo) (5sharp0 7flat6)

L=7 s=4 48 (5flat13 7flat0)

L=7 s=5 53

L=7 s=6 58 5sharp1 7sharp10 (Schism*)

Schism, by which I mean, the most accurate value for 5/3 and-or 7/3 is found outside the 4L+5s MOS.

[Also, the way I see it, as 4edt and 9edt are comparable to 5edo and 7edo, then the "counterparts" of Blackwood and Whitewood would be found in multiples therein and would be octatonic and octadecatonic, e.g. 12edt and 27edt.]

Generator							cents hekts	L	s	notes
1/4							475.488… 325		0
						8/33	461.080… 315.15	403.445… 275.75	57.635… 39.39
					7/29		459.092… 313.793…	393.507… 268.965…	65.584… 44.827…
						13/54	457.878… 312.962	387.435… 264.814	70.442… 48.148
				6/25			456.469… 312	380.391… 260	76.078… 52
						17/71	455.397… 311.267…	375.033… 256.338…	80.364… 54.929…
					11/46		454.815… 310.869…	372.121… 254.347…	82.693… 56.521…
						16/67	454.198… 310.447…	369.036… 252.238…	85.162… 58.208…
			5/21				452.846… 309.523…	362.277… 247.619…	90.569… 61.904…
						19/80	451.714… 308.75	356.616… 243.75	95.097… 65
					14/59		451.311… 308.474…	354.601… 242.372…	96.709… 66.101…
						23/97	450.979… 308.247…	352.940… 241.234…	98.038… 67.010…
				9/38			450.463… 307.894…	350.360… 239.473…	100.102… 68.421…
						22/93	449.924… 307.526…	347.669… 237.634…	102.255… 69.892…
					13/55		449.553… 307.27	345.810… 236.36	103.743… 70.90
						17/72	449.072… 306.94	343.408… 234.72	105.664… 72.2
							448.420… 306.498…	340.148… 232.493…	108.272… 74.005…
		4/17					447.518… 305.882…	335.639… 229.411…	111.879… 76.470…	Canonical BP scales are between here...
						19/81	446.137… 304.938…	328.733… 224.691…	117.404… 80.246…
					15/64		445.770… [[1]]	326.898… [[2]]	118.872… 81.25
							445.533… 304.525…	325.710… 222.625…	119.822… 81.899…
						26/111	445.502… 304.504	325.559… 222.522	119.943… 81.981
				11/47			445.138… 304.255…	323.737… 221.276…	121.401… 82.978…
						29/124	444.812… 304.032…	322.105… 220.161…	122.706… 83.870…	Golden BP is near here
					18/77		444.612… 303.896…	321.109… 219.480…	123.503… 84.415…
						25/107	444.382… 303.738…	319.955… 218.691…	120.426… 85.046…
			7/30				443.789… 303.3	316.992… 216.6	126.797… 86.6
						24/103	443.173… 302.912…	313.914… 214.563…	129.259… 88.349…
					17/73		442.921… 302.739…	312.650… 213.698…	130.270… 89.041…
						27/116	442.696… 302.586…	311.527… 212.931…	131.169… 89.655…
				10/43			442.315… 302.325…	309.620… 211.627…	132.694… 90.697…
						23/99	441.868… 302.02	307.386… 210.10	134.481… 91.91
					13/56		441.525… 301.785…	305.671… 208.928…	135.853… 92.857…
						16/69	441.033… 301.449…	303.210… 207.246…	137.822… 94.202…
	3/13						438.912… 300	292.608… 200	146.304… 100	...and here Boundary of propriety for Lambda scale
						17/74	436.935… 298.648	282.723… 193.243	154.212… 105.405
					14/61		436.514… 298.360…	280.616… 191.803…	155.897… 106.557…
						25/109	436.228… 298.165…	279.186… 190.825…	157.042… 207.339…
				11/48			435.865 297.916	277.368… 189.583	158.496… 108.3
						30/131	435.562… 297.709…	275.856… 188.549…	159.706… 109.160…
					19/83		435.387… 297.590…	274.981… 187.951…	160.405… 109.638…
						27/118	435.193… 297.457…	274.010… 187.288…	161.182… 110.169…
			8/35				434.732… 297.142…	271.707… 185.714…	163.024… 111.428…
						29/127	434.304… 296.850…	269.568… 184.251…	164.736… 112.598…
					21/92		434.141… 596.739…	268.754… 183.695…	165.387… 113.043…
						34/149	434.003… 296.644…	268.060… 183.221…	165.942… 113.422…	Golden Lambda scale is near here 18\7*30\11=7
				13/57			433.779… 296.491…	266.941… 182.456…	166.838… 114.035…	18\7*30\11=7
						31/136	433.533… 296.323…	265.714… 181.617…	167.819… 114.705…
					18/79		433.356… 296.202…	264.829… 181.012…	168.527… 115.189…
						23/101	433.118… 296.039…	263.637… 180.198…	169.481… 115.841…
		5/22					432.262… 295.45	259.357… 177.27	172.905… 118.18
						22/97	431.371… 294.845…	254.901… 174.226…	176.470… 120.618…
					17/75		431.109… 294.6	253.594… 173.3	177.515… 121.3
						29/128	430.911… 294.531…	252.603… 172.656…	178.308… 121.875
				12/53			430.631… 294.339…	251.201… 171.698…	179.429… 122.641…
						31/137	430.369… 294.160…	249.891… 170.802…	180.477… 123.357…
					19/84		430.204… 294.047…	249.065… 170.238…	181.138… 123.809…
						26/115	430.007… 293.913…	248.081… 169.565…	181.926… 124.347…
			7/31				429.473… 293.548…	245.413… 167.741…	184.060… 125.806…
						23/102	428.872… 293.137…	242.406… 165.686…	186.466… 127.450…
					16/71		428.609… 292.957…	241.092… 164.788…	187.516… 128.169…
						25/111	428.368… 292.792	239.886… 163.963	188.482… 128.828
				9/40			427.939… 292.5	237.744… 162.5	190.195… 130
						20/89	427.405… 292.134…	235.073… 160.674…	192.332… 131.460…
					11/49		426.969… 291.836…	232.892… 159.183…	194.077… 132.653…
						13/58	426.300… 291.379…	229.546… 156.896…	196.753… 134.482…
2/9							422.656… 288.8	211.328… 144.4		Separatrix of Lambda and Anti-Lambda scales
						13/59	419.074… 286.440…	225.655… 154.237…	193.419… 132.203…
					11/50		418.430… 286	228.234… 156	190.195… 130
						20/91	418.012… 285.714…	229.906… 157.142…	188.105… 128.571…
				9/41			417.502… 285.365…	231.945… 158.536…	185.556… 126.829…
						25/114	417.095… 285.087…	233.573… 159.649…	183.521… 125.438…
					16/73		416.866… 284.931…	234.487… 160.273…	182.379… 124.657…
						23/105	416.618… 284.761…	235.480… 160.952…	181.138… 123.809…
			7/32				416.052… 284.375	237.744… 162.5	178.308… 121.875
						26/119	415.553… 284.033…	239.742… 163.865…	175.810… 120.168…
					19/87		415.369… 283.908…	240.477… 164.367…	174.892… 119.540…
						31/142	415.215… 283.802…	241.092… 164.788…	174.122… 119.014…
				12/55			414.972… 283.63	242.067… 165.45	172.905… 118.18
						29/133	414.711… 283.458…	243.107… 166.165…	171.604… 117.293…
					17/78		414.528… 283.3	243.840… 166.6	170.688… 116.6
						22/101	414.287… 283.168…	244.806… 167.326…	169.481… 115.841…
		5/23					413.468… 282.608…	248.081… 169.565…	165.387… 113.043…
						23/106	412.688… 282.075…	251.201… 171.698…	161.486… 110.377…
					18/83		412.472… 281.927…	252.066… 172.289…	160.405… 109.638…
						31/143	412.311… 281.81	252.707… 172.72	159.604… 109.09
				13/60			412.090… 281.6	253.594… 173.3	158.496… 108.3
						34/157	411.888… 281.528…	254.401… 173.885…	157.486… 107.643…	Golden Anti-Lambda scale is near here
					21/97		411.763… 281.443…	254.901… 174.226…	156.862… 107.216…
						29/134	411.617… 281.343…	255.486… 174.626…	156.130… 103.716…
			8/37				411.233… 281.081.	257.020… 175.675	154.212… 105.405
						27/125	410.822… 280.8	258.665… 176.8	152.156… 104
					19/88		410.649… 280.681…	259.357… 177.27	151.291… 103.409…
						30/139	410.494… 280.575…	259.979… 177.697…	150.514… 102.877…
				11/51			410.225… 280.392…	261.052… 178.431…	149.173… 101.960…
						25/116	409.904… 280.172…	262.338… 179.310…	147.565… 100.862……
					14/65		409.651… 280	263.347… 180	146.304… 100
						17/79	409.281… 279.746…	264.819… 181.012…	144.452… 98.734…
	3/14						407.561… 278.571…	271.707… 185.714…	135.853… 92.857…	Boundary of propriety for Anti-Lambda scale
						16/75	405.750… 277.3	278.953… 190.6	126.797… 86.6
					13/61		405.334… 277.049…	280.616… 191.803…	124.718… 85.245…
						23/108	405.045… 276.851	281.771… 192.592	123.274… 84.259
				10/47			404.671… 276.595…	283.269… 193.617…	121.401… 82.978…
						27/127	404.352… 276.377…	284.544… 194.488…	119.808… 81.889…
					17/80		404.165… 276.25	285.293… 195	118.872… 81.25
						24/113	403.955… 276.106…	286.134… 195.575…	117.820… 80.530…
			7/33				403.445… 275.75	288.175… 196.97	115.270… 78.78
						25/118	402.956… 275.423…	290.128… 198.305…	112.827… 77.118…
					18/85		402.766… 275.294…	290.887… 198.823…	111.879… 76.470…
						29/137	402.603… 275.182…	291.540… 199.270…	111.063… 75.912…
				11/52			402.336… 275	292.608… 200	109.728… 75
						26/123	402.039… 274.796…	293.797… 200.813…	108.241… 73.983…
							402.014… 274.779…	293.896… 200.880…	108.118… 73.899…
					15/71		401.821… 274.647…	294.669… 201.408…	107.152… 73.239…
						19/90	401.523… 274.4	295.859… 202.2	105.664… 72.2
		4\19					400.411… 273.684…	300.308… 205.263…	100.103… 68.421…
							399.692… 273.192…	303.185… 207.229…	96.506… 65.963…
						17/81	399.175… 272.839…	305.252… 208.641…	93.923… 64.197…
					13/62		398.797… 272.580…	306.766… 209.677…	92.030… 62.903…
						22/105	398.505… 272.380…	307.935… 210.476…	90.569… 61.904…
				9/43			398.083… 272.093…	309.620… 211.627…	88.463… 60.465…
						23/110	397.681… 271.81	311.229… 212.72	86.452… 59.09
					14/67		397.423… 271.641…	312.261… 213.432…	85.162… 58.208…
						19/91	397.111… 271.428…	313.509… 214.285…	83.602… 57.143…
			5/24				396.240… 270.83	316.992… 216.6	79.248 54.16
						16/77	395.211… 270.129…	321.109… 219.480…	74.102… 50.649…
					11/53		394.745… 269.811…	322.973… 220.754…	71.771… 49.056…
						17/82	394.307… 269.512…	324.724… 221.951…	69.583… 47.560…
				6/29			393.507… 268.965…	327.923… 224.137…	65.584… 44.827…
						13/63	392.467 265.254	332.087 226.984	60.3795 41.27
					7/34		391.578… 267.647…	335.639… 229.411…	55.939… 38.235…
						8/39	390.144… 266.6	341.376… 233.3	48.768 33.3
1/5							380.391… 260		0

4L 5s (3/1-equivalent)

List of EDT's supporting Lambda Temperament

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