{"batchcomplete":"","continue":{"lecontinue":"20260404144555|857","continue":"-||"},"query":{"logevents":[{"logid":867,"ns":6,"title":"File:A New Dusk-02 The Art of It.mp3","pageid":610,"logpage":610,"revid":5734,"params":{},"type":"create","action":"create","user":"Inthar","timestamp":"2026-04-05T07:25:09Z","comment":"A composition by groundfault corporation (in [[31edo]]). See [[A New Dusk]]."},{"logid":866,"ns":6,"title":"File:A New Dusk-02 The Art of It.mp3","pageid":610,"logpage":610,"revid":5734,"params":{"img_sha1":"m8t3ov6w6xm1dc0061ww3ip61bir95l","img_timestamp":"2026-04-05T07:25:09Z"},"type":"upload","action":"upload","user":"Inthar","timestamp":"2026-04-05T07:25:09Z","comment":"A composition by groundfault corporation (in [[31edo]]). See [[A New Dusk]]."},{"logid":865,"ns":0,"title":"Marvel","pageid":609,"logpage":609,"revid":5691,"params":{},"type":"create","action":"create","user":"Inthar","timestamp":"2026-04-05T02:10:55Z","comment":"Created page with \"'''Marvel''', [[19edo|19]] & [[22edo|22]] & [[31edo|31]], is a 7-limit rank-3 temperament tempering out 225/224, thereby equating 16/15 with 15/14 and equating 25/16 (= 5/4 * 5/4) with 14/9. On account of enlarging 16/15, Marvel favors somewhat flat tunings for 3 and 5. == Intervals ==  == Supporting temperaments == Many rank-2 temperaments in classical RTT support Marvel: * 19 & 31, Septimal [[Meantone]] * 19 & 22, [[Magic]] * 22 & 31, [[Orwell]] * 31 & 41, [[Miracle]]...\""},{"logid":864,"ns":0,"title":"Injera","pageid":608,"logpage":608,"revid":5686,"params":{},"type":"create","action":"create","user":"Inthar","timestamp":"2026-04-05T01:39:30Z","comment":"Created page with \"'''Injera''', [[26edo|26]] & [[38edo|38]], is a 7-limit [[weak extension]] of 5-limit [[Meantone]] that splits the octave into two tritones each representing 7/5~10/7.  {{Navbox regtemp}} {{Cat|temperaments}}\""},{"logid":863,"ns":0,"title":"Parapythic","pageid":607,"logpage":607,"revid":5674,"params":{},"type":"create","action":"create","user":"Inthar","timestamp":"2026-04-05T00:58:19Z","comment":"Redirected page to [[Parapyth]]"},{"logid":862,"ns":0,"title":"Skidoo","pageid":606,"logpage":606,"revid":5671,"params":{},"type":"create","action":"create","user":"Inthar","timestamp":"2026-04-05T00:48:11Z","comment":"Redirected page to [[Parapyth]]"},{"logid":861,"ns":0,"title":"Parapyth","pageid":605,"logpage":605,"revid":5663,"params":{},"type":"create","action":"create","user":"Inthar","timestamp":"2026-04-04T23:58:00Z","comment":"Created page with \"'''Parapyth''', 17 & 41 & 46, is generally viewed as a no-5 2.3.7.11.13 rank-3 regular temperament, sometimes called '''Parapythic'''. (In the strict sense, parapyth is Margo Schulter's rank-3 tuning construct inspired by medieval European and Middle Eastern music theory, where Schulter imposes commas that are to be ''observed'' as well as commas that are to be tempered out.{{citation needed}})  == Theory == The regular temperament Parapyth has two non-octave generators:...\""},{"logid":860,"ns":0,"title":"Gentle region","pageid":604,"logpage":604,"revid":5658,"params":{},"type":"create","action":"create","user":"Inthar","timestamp":"2026-04-04T23:42:17Z","comment":"Redirected page to [[Gentle tuning]]"},{"logid":859,"ns":0,"title":"Blackwood","pageid":603,"logpage":603,"revid":5644,"params":{},"type":"create","action":"create","user":"Vector","timestamp":"2026-04-04T14:49:21Z","comment":"Created page with \"[[File:Vector Blackwood.mp3|thumb|An example of Blackwood temperament in a song by Vector]] '''Blackwood''' is a regular temperament primarily supported by 15edo but in technicality by any EDO with 5edo's fifth (such as 25edo or 10edo) which takes 5edo as its 2.3.7, and treats 5 as an independent generator. Its 10-note scale (LsLsLsLsLs, '''pentawood''') is unique among scales of its complexity for making a perfect fifth available on every note of the scale, at the cost...\""},{"logid":858,"ns":6,"title":"File:Vector Blackwood.mp3","pageid":602,"logpage":602,"revid":5643,"params":{},"type":"create","action":"create","user":"Vector","timestamp":"2026-04-04T14:45:55Z","comment":""}]}}