User:Lériendil/ET harmonic testing page: Difference between revisions

Revision as of 23:27, 12 March 2026

Approximation of prime harmonics in 46ed5/3
Harmonic		2	3	5	7	11	13	17	19	23	29	31	37	41	43	47
Error	Absolute (¢)	-8.04	+1.34	+1.34	-4.42	+1.32	+0.49	-2.53	-2.84	-6.77	-4.34	-4.45	-3.16	-7.85	+5.82	+5.63
Error	Relative (%)	-41.8	+7.0	+7.0	-23.0	+6.9	+2.6	-13.2	-14.8	-35.2	-22.6	-23.2	-16.4	-40.8	+30.3	+29.3
Steps (reduced)		62 (16)	99 (7)	145 (7)	175 (37)	216 (32)	231 (1)	255 (25)	265 (35)	282 (6)	303 (27)	309 (33)	325 (3)	334 (12)	339 (17)	347 (25)

Approximation of prime harmonics in 127ed6
Harmonic		2	3	5	7	11	13	17	19	23	29	31	37	41	43	47
Error	Absolute (¢)	-3.18	+3.18	-1.88	+1.80	+0.91	+4.79	+4.44	+7.28	-5.96	+7.96	-9.80	+1.42	-5.33	+9.92	+2.48
Error	Relative (%)	-13.0	+13.0	-7.7	+7.4	+3.7	+19.6	+18.2	+29.8	-24.4	+32.6	-40.1	+5.8	-21.8	+40.6	+10.1
Steps (reduced)		49 (49)	78 (78)	114 (114)	138 (11)	170 (43)	182 (55)	201 (74)	209 (82)	222 (95)	239 (112)	243 (116)	256 (2)	263 (9)	267 (13)	273 (19)

Approximation of odd harmonics in 152ed7/3
Harmonic		3	5	7	9	11	13	15	17	19	21	23	25	27	29	31
Error	Absolute (¢)	-0.81	+2.67	-0.81	-1.63	-1.62	-1.31	+1.86	-2.52	-2.07	-1.63	-4.71	-4.31	-2.44	-0.70	-0.35
Error	Relative (%)	-8.4	+27.7	-8.4	-16.9	-16.8	-13.6	+19.3	-26.1	-21.4	-16.9	-48.8	-44.6	-25.3	-7.2	-3.6
Steps (reduced)		197 (45)	289 (137)	349 (45)	394 (90)	430 (126)	460 (4)	486 (30)	508 (52)	528 (72)	546 (90)	562 (106)	577 (121)	591 (135)	604 (148)	616 (8)

Approximation of prime harmonics in 6181edt
Harmonic		2	3	5	7	11	13	17	19	23	29	31	37	41	43	47
Error	Absolute (¢)	+0.0687	+0.0000	-0.0004	-0.0177	-0.0034	+0.0342	-0.0593	+0.0095	+0.0363	-0.0128	-0.0800	+0.0906	-0.0791	-0.0681	+0.1056
Error	Relative (%)	+22.3	+0.0	-0.1	-5.8	-1.1	+11.1	-19.3	+3.1	+11.8	-4.2	-26.0	+29.5	-25.7	-22.1	+34.3
Steps (reduced)		3900 (3900)	6181 (0)	9055 (2874)	10948 (4767)	13491 (1129)	14431 (2069)	15940 (3578)	16566 (4204)	17641 (5279)	18945 (402)	19320 (777)	20316 (1773)	20893 (2350)	21161 (2618)	21662 (3119)

Approximation of prime harmonics in 14036269511edo
Harmonic		2	3	5	7	11	13	17	19	23	29	31
Error	Absolute (¢)	+0.0000	+0.0000	-0.0000	-0.0000	-0.0000	-0.0000	+0.0000	+0.0000	+0.0000	+0.0000	+0.0000
Error	Relative (%)	+0.0	+4.9	-0.2	-3.3	-6.8	-3.7	+1.2	+11.4	+7.7	+7.3	+0.8
Steps (reduced)		14036269511 (0)	22246960825 (8210691314)	32591208525 (4518669503)	39404790299 (11332251277)	48557514554 (6448706021)	51940369193 (9831560660)	57372730056 (1227652012)	59625055442 (3479977398)	63493934765 (7348856721)	68187930527 (12042852483)	69538434623 (13393356579)

Approximation of prime harmonics in 14036269511edo
Harmonic		37	41	43	47	53	59	61	67	71	73	79
Error	Absolute (¢)	+0.0000	-0.0000	-0.0000	+0.0000	+0.0000	+0.0000	+0.0000	-0.0000	+0.0000	-0.0000	+0.0000
Error	Relative (%)	+4.6	-1.8	-3.9	+5.7	+18.1	+14.6	+1.7	-2.9	+13.6	-24.7	+33.3
Steps (reduced)		73121291445 (2939943890)	75200043856 (5018696301)	76164514535 (5983166980)	77965706145 (7784358590)	80398635238 (10217287683)	82570363278 (12389015723)	83245427669 (13064080114)	85145262755 (927645689)	86319507994 (2101890928)	86882045734 (2664428668)	88481565520 (4263948454)

@@ Line 9: / Line 9: @@
 {{Harmonics in equal|152|7|3|prec=2|columns=15|intervals=odd}}
 {{Harmonics in equal|6181|3|1|prec=4|columns=15|intervals=prime}}
-{{Harmonics in equal|851|2|1|prec=4|columns=15|intervals=prime}}
+{{Harmonics in equal|14036269511|2|1|prec=4|columns=11|intervals=prime}}
+{{Harmonics in equal|14036269511|2|1|prec=4|columns=11|start=12|intervals=prime}}