User:Ganaram inukshuk/Tables: Difference between revisions
Reorganized the page to state that the tables use 19edo as sample data. Testing out tables that include both temperament info and temperament-agnostic info. |
m →Temperament-Agnostic and Temperament Information: Had to remove a few scale codes because I only wanted them to be for steps whose size is a single-digit number. |
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I've had the idea of using a [[User:Ganaram inukshuk/Diagrams#MOS Diagrams for a Specific EDO|rectangular horogram]] to represent how mosses of a specific generator pair are related to one another, only to learn that I can copy-paste the entire tables from Excel into the wiki editor. I doubt I'd be the first person to do this, but this would be a nice way to list the mosses of an edo. The idea to include scale and step ratio information occurred mid-editing. Here's a few examples. | I've had the idea of using a [[User:Ganaram inukshuk/Diagrams#MOS Diagrams for a Specific EDO|rectangular horogram]] to represent how mosses of a specific generator pair are related to one another, only to learn that I can copy-paste the entire tables from Excel into the wiki editor. I doubt I'd be the first person to do this, but this would be a nice way to list the mosses of an edo. The idea to include scale and step ratio information occurred mid-editing. Here's a few examples. | ||
=== Temperament Agnostic Information Only === | |||
Notes: | Notes: | ||
* The generator pairs are ordered starting from ceil(n/2)\n and floor(n/2)\n and ending at (n-2)\n and 2\n. Including every possible pair from 1\n to (n-1)\n to (n-1)\n to 1\n would be redundant since the pair k\n and (n-k)\n would produce a table that's identical to (n-k)\n and k\n but reversed. | * The generator pairs are ordered starting from ceil(n/2)\n and floor(n/2)\n and ending at (n-2)\n and 2\n. Including every possible pair from 1\n to (n-1)\n to (n-1)\n to 1\n would be redundant since the pair k\n and (n-k)\n would produce a table that's identical to (n-k)\n and k\n but reversed. | ||
* (n-1)\n and 1\n is not included since it produces a sequence of "monolarge" scales where every scale in the table has the same size of small step. | * (n-1)\n and 1\n is not included since it produces a sequence of "monolarge" scales where every scale in the table has the same size of small step. | ||
* Information from the page for [[19edo]] and its subpages (as of time of writing) is used as sample data. | * Information from the page for [[19edo]] and its subpages (as of time of writing) is used as sample data. | ||
* A few unnamed mosses are given tentative names based on names from their respective pages (EG, klesitonic) or based on existing names (EG, tetric). | |||
{| class="wikitable" | {| class="wikitable" | ||
! colspan="19" |'''Step Pattern (19edo)''' | ! colspan="19" |'''Step Pattern (19edo)''' | ||
| Line 812: | Line 812: | ||
=== Temperament-Agnostic and Temperament Information === | === Temperament-Agnostic and Temperament Information === | ||
Notes: | |||
* The generator pairs are ordered starting from ceil(n/2)\n and floor(n/2)\n and ending at (n-2)\n and 2\n. Including every possible pair from 1\n to (n-1)\n to (n-1)\n to 1\n would be redundant since the pair k\n and (n-k)\n would produce a table that's identical to (n-k)\n and k\n but reversed. | |||
* (n-1)\n and 1\n is not included since it produces a sequence of "monolarge" scales where every scale in the table has the same size of small step. | |||
* Information from the page for [[19edo]] and its subpages (as of time of writing) is used as sample data. | |||
* A few unnamed mosses are given tentative names based on names from their respective pages (EG, klesitonic) or based on existing names (EG, tetric). | |||
* Scale codes are given for scales whose step sizes are single-digit numbers. | |||
{| class="wikitable" | {| class="wikitable" | ||
! colspan="19" rowspan="2" |Step Pattern | ! colspan="19" rowspan="2" |Step Pattern | ||
| Line 1,072: | Line 1,078: | ||
|1 | |1 | ||
| | | | ||
| | | | ||
| | | | ||
| | | | ||
| Line 1,437: | Line 1,443: | ||
| colspan="4" |4 | | colspan="4" |4 | ||
| colspan="4" |4 | | colspan="4" |4 | ||
| | | | ||
|1L 2s | |1L 2s | ||
|11:4 | |11:4 | ||
| Line 1,545: | Line 1,551: | ||
| colspan="3" |3 | | colspan="3" |3 | ||
| colspan="3" |3 | | colspan="3" |3 | ||
| | | | ||
|1L 2s | |1L 2s | ||
|13:3 | |13:3 | ||
| Line 1,555: | Line 1,561: | ||
| colspan="3" |3 | | colspan="3" |3 | ||
| colspan="3" |3 | | colspan="3" |3 | ||
| | | | ||
|1L 3s | |1L 3s | ||
|10:3 | |10:3 | ||
| Line 1,662: | Line 1,668: | ||
| colspan="2" |2 | | colspan="2" |2 | ||
| colspan="2" |2 | | colspan="2" |2 | ||
| | | | ||
|1L 2s | |1L 2s | ||
|15:2 | |15:2 | ||
| Line 1,672: | Line 1,678: | ||
| colspan="2" |2 | | colspan="2" |2 | ||
| colspan="2" |2 | | colspan="2" |2 | ||
| | | | ||
|1L 3s | |1L 3s | ||
|13:2 | |13:2 | ||
| Line 1,683: | Line 1,689: | ||
| colspan="2" |2 | | colspan="2" |2 | ||
| colspan="2" |2 | | colspan="2" |2 | ||
| | | | ||
|1L 4s | |1L 4s | ||
|11:2 | |11:2 | ||