Title1

Approximation of harmonics in ZPINAME
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	-4.1	-8.5	-8.2	+4.1	-12.6	+19.5	-12.3	-16.9	+0.0	+34.3	-16.7
Error	Relative (%)	-4.1	-8.5	-8.2	+4.1	-12.6	+19.6	-12.4	-17.0	+0.0	+34.4	-16.7
Steps (reduced)		12 (12)	19 (19)	24 (24)	28 (28)	31 (31)	34 (34)	36 (36)	38 (38)	40 (0)	42 (2)	43 (3)

Approximation of harmonics in ZPINAME
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+3.4	+3.4	+6.7	+21.5	+6.7	+40.7	+10.1	+6.7	+24.9	-39.9	+10.1
Error	Relative (%)	+3.3	+3.3	+6.7	+21.4	+6.7	+40.6	+10.0	+6.7	+24.8	-39.8	+10.0
Steps (reduced)		12 (5)	19 (5)	24 (3)	28 (0)	31 (3)	34 (6)	36 (1)	38 (3)	40 (5)	41 (6)	43 (1)

Approximation of harmonics in ZPINAME
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+1.2	+0.0	+2.5	+16.6	+1.2	+34.7	+3.7	+0.0	+17.8	-47.1	+2.5
Error	Relative (%)	+1.2	+0.0	+2.5	+16.6	+1.2	+34.6	+3.7	+0.0	+17.8	-47.1	+2.5
Steps (reduced)		12 (12)	19 (0)	24 (5)	28 (9)	31 (12)	34 (15)	36 (17)	38 (0)	40 (2)	41 (3)	43 (5)

Approximation of harmonics in ZPINAME
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.8	-0.8	+1.5	+15.5	+0.0	+33.3	+2.3	-1.5	+16.2	-48.7	+0.8
Error	Relative (%)	+0.8	-0.8	+1.5	+15.4	+0.0	+33.3	+2.3	-1.5	+16.2	-48.7	+0.8
Steps (reduced)		12 (12)	19 (19)	24 (24)	28 (28)	31 (0)	34 (3)	36 (5)	38 (7)	40 (9)	41 (10)	43 (12)

Title2

Octave stretch or compression

What follows is a comparison of stretched- and compressed-octave EDONAME tunings.

ZPINAME

Step size: NNN ¢, octave size: NNN ¢

_ing the octave of EDONAME by around NNN ¢ results in improved primes NNN, but worse primes NNN. This approximates all harmonics up to 16 within NNN ¢. The tuning ZPINAME does this.

Approximation of harmonics in ZPINAME
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Error	Relative (%)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Step		12	19	24	28	31	34	36	38	40	42	43

Approximation of harmonics in ZPINAME (continued)
Harmonic		13	14	15	16	17	18	19	20	21	22	23	24
Error	Absolute (¢)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Error	Relative (%)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Step		44	46	47	48	49	50	51	52	53	54	54	55

EDONOI

Step size: NNN ¢, octave size: NNN ¢

_ing the octave of EDONAME by around NNN ¢ results in improved primes NNN, but worse primes NNN. This approximates all harmonics up to 16 within NNN ¢. The tuning EDONOI does this.

Approximation of harmonics in EDONOI
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Error	Relative (%)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Steps (reduced)		12 (0)	19 (7)	24 (0)	28 (4)	31 (7)	34 (10)	36 (0)	38 (2)	40 (4)	42 (6)	43 (7)

Approximation of harmonics in EDONOI (continued)
Harmonic		13	14	15	16	17	18	19	20	21	22	23	24
Error	Absolute (¢)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Error	Relative (%)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Steps (reduced)		44 (8)	46 (10)	47 (11)	48 (0)	49 (1)	50 (2)	51 (3)	52 (4)	53 (5)	54 (6)	54 (6)	55 (7)

ETNAME, SUBGROUP WE tuning

Step size: NNN ¢, octave size: NNN ¢

_ing the octave of EDONAME by around NNN ¢ results in improved primes NNN, but worse primes NNN. This approximates all harmonics up to 16 within NNN ¢. Its SUBGROUP WE tuning and SUBGROUP TE tuning both do this.

Approximation of harmonics in ETNAME, SUBGROUP WE tuning
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Error	Relative (%)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Step		12	19	24	28	31	34	36	38	40	42	43

Approximation of harmonics in ETNAME, SUBGROUP WE tuning (continued)
Harmonic		13	14	15	16	17	18	19	20	21	22	23	24
Error	Absolute (¢)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Error	Relative (%)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Step		44	46	47	48	49	50	51	52	53	54	54	55

EDONAME

Step size: NNN ¢, octave size: NNN ¢

Pure-octaves EDONAME approximates all harmonics up to 16 within NNN ¢.

Approximation of harmonics in EDONAME
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Error	Relative (%)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Steps (reduced)		12 (0)	19 (7)	24 (0)	28 (4)	31 (7)	34 (10)	36 (0)	38 (2)	40 (4)	42 (6)	43 (7)

Approximation of harmonics in EDONAME (continued)
Harmonic		13	14	15	16	17	18	19	20	21	22	23	24
Error	Absolute (¢)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Error	Relative (%)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Steps (reduced)		44 (8)	46 (10)	47 (11)	48 (0)	49 (1)	50 (2)	51 (3)	52 (4)	53 (5)	54 (6)	54 (6)	55 (7)

ETNAME, SUBGROUP WE tuning

Step size: NNN ¢, octave size: NNN ¢

_ing the octave of EDONAME by around NNN ¢ results in improved primes NNN, but worse primes NNN. This approximates all harmonics up to 16 within NNN ¢. Its SUBGROUP WE tuning and SUBGROUP TE tuning both do this.

Approximation of harmonics in ETNAME, SUBGROUP WE tuning
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Error	Relative (%)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Step		12	19	24	28	31	34	36	38	40	42	43

Approximation of harmonics in ETNAME, SUBGROUP WE tuning (continued)
Harmonic		13	14	15	16	17	18	19	20	21	22	23	24
Error	Absolute (¢)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Error	Relative (%)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Step		44	46	47	48	49	50	51	52	53	54	54	55

EDONOI

Step size: NNN ¢, octave size: NNN ¢

_ing the octave of EDONAME by around NNN ¢ results in improved primes NNN, but worse primes NNN. This approximates all harmonics up to 16 within NNN ¢. The tuning EDONOI does this.

Approximation of harmonics in EDONOI
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Error	Relative (%)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Steps (reduced)		12 (0)	19 (7)	24 (0)	28 (4)	31 (7)	34 (10)	36 (0)	38 (2)	40 (4)	42 (6)	43 (7)

Approximation of harmonics in EDONOI (continued)
Harmonic		13	14	15	16	17	18	19	20	21	22	23	24
Error	Absolute (¢)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Error	Relative (%)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Steps (reduced)		44 (8)	46 (10)	47 (11)	48 (0)	49 (1)	50 (2)	51 (3)	52 (4)	53 (5)	54 (6)	54 (6)	55 (7)

ZPINAME

Step size: NNN ¢, octave size: NNN ¢

_ing the octave of EDONAME by around NNN ¢ results in improved primes NNN, but worse primes NNN. This approximates all harmonics up to 16 within NNN ¢. The tuning ZPINAME does this.

Approximation of harmonics in ZPINAME
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Error	Relative (%)	+0.0	-2.0	+0.0	+13.7	-2.0	+31.2	+0.0	-3.9	+13.7	+48.7	-2.0
Step		12	19	24	28	31	34	36	38	40	42	43

Approximation of harmonics in ZPINAME (continued)
Harmonic		13	14	15	16	17	18	19	20	21	22	23	24
Error	Absolute (¢)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Error	Relative (%)	-40.5	+31.2	+11.7	+0.0	-5.0	-3.9	+2.5	+13.7	+29.2	+48.7	-28.3	-2.0
Step		44	46	47	48	49	50	51	52	53	54	54	55

User:BudjarnLambeth/Sandbox2

Title1

Title2

Octave stretch or compression

Navigation menu

User:BudjarnLambeth/Sandbox2

Title1

Title2

Octave stretch or compression

Navigation menu

Search