35edo
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35-tET or 35-[[xenharmonic/edo|EDO]] refers to a tuning system which divides the octave into 35 steps of approximately [[xenharmonic/cent|34.29¢]] each. As 35 is 5 times 7, 35edo allows for mixing the two smallest xenharmonic [[xenharmonic/macrotonal edos|macrotonal edos]]: [[xenharmonic/5edo|5edo]] and [[xenharmonic/7edo|7edo]]. A single degree of 35edo represents the difference between 7edo's narrow fifth of 685.71¢ and 5edo's wide fifth of 720¢. 35edo can also represent the 2.3.5.7.11.17 [[xenharmonic/Just intonation subgroups|subgroup]] and 2.9.5.7.11.17 subgroup, because of the accuracy of 9 and the flatness of all other subgroup generators. Therefore among whitewood tunings it is very versatile, you can switch between these different subgroups if you don't mind having to use two different 3/2s to reach the inconsistent 9, and if you ignore [[xenharmonic/22edo|22edo]]'s consistent representation of both subgroups. 35edo is the optimal patent val for [[xenharmonic/Greenwoodmic temperaments|greenwood]] and [[Greenwoodmic temperaments#Secund|secund]] temperaments. A good beggining for start to play 35-EDO is with the Sub-diatonic scale, that is a [[xenharmonic/MOS|MOS]] of 3L2s: 9 4 9 9 4. =Intervals= || Degrees of 35-EDO || Cents value || Ratios in 2.5.7.11.17 subgroup || Ratios with 3 || Ratios with 9 || || 0 || 0 || 1/1 || || || || 1 || 34.29 || || || || || 2 || 68.57 || || || || || 3 || 102.86 || 17/16 || || 18/17 || || 4 || 137.14 || || 12/11 || || || 5 || 171.43 || 11/10 || || 10/9 || || 6 || 205.71 || || || 9/8 || || 7 || 240 || 8/7 || || || || 8 || 274.29 || 20/17 || 7/6 || || || 9 || 308.57 || || 6/5 || || || 10 || 342.86 || 17/14 || || 11/9 || || 11 || 377.14 || 5/4 || || || || 12 || 411.43 || 14/11 || || 14/11 || || 13 || 445.71 || 22/17 || || 9/7 || || 14 || 480 || || || || || 15 || 514.29 || || 4/3 || || || 16 || 548.57 || 11/8 || || || || 17 || 582.86 || 7/5 || 24/17 || || || 18 || 617.14 || 10/7 || 17/12 || || || 19 || 651.43 || 16/11 || || || || 20 || 685.71 || || 3/2 || || || 21 || 720 || || || || || 22 || 754.29 || 17/11 || || 14/9 || || 23 || 788.57 || 11/7 || || || || 24 || 822.86 || 8/5 || || || || 25 || 857.15 || || || 18/11 || || 26 || 891.43 || || 5/3 || || || 27 || 925.71 || 17/10 || 12/7 || || || 28 || 960 || 7/4 || || || || 29 || 994.29 || || || 16/9 || || 30 || 1028.57 || 20/11 || || 9/5 || || 31 || 1062.86 || || 11/6 || || || 32 || 1097.14 || 32/17 || || 17/9 || || 33 || 1131.43 || || || || || 34 || 1165.71 || || || || =Rank two temperaments= ||~ Periods per octave ||~ Generator ||~ Temperaments || || 1 || 3\35 || Ripple || || || 4\35 || [[Greenwoodmic temperaments#Secund|Secund]] || || 1 || 6\35 || || || 1 || 8\35 || || || 1 || 9\35 || [[xenharmonic/Myna|Myna]] || || 1 || 11\35 || [[xenharmonic/Magic|Magic]] || || 1 || 12\35 || || || 1 || 13\35 || [[xenharmonic/Sensi|Sensi]] || || 1 || 16\35 || || || 1 || 17\35 || || || || || || || 5 || 2\35 || [[xenharmonic/Blackwood|Blackwood]] || || || || || || 7 || 1\35 || [[xenharmonic/Apotome family|Whitewood]]/[[xenharmonic/Apotome family#Redwood|Redwood]]/[[xenharmonic/Greenwoodmic temperaments|Greenwood]] ||
Original HTML content:
<html><head><title>35edo</title></head><body>35-tET or 35-<a class="wiki_link" href="http://xenharmonic.wikispaces.com/edo">EDO</a> refers to a tuning system which divides the octave into 35 steps of approximately <a class="wiki_link" href="http://xenharmonic.wikispaces.com/cent">34.29¢</a> each.<br />
<br />
As 35 is 5 times 7, 35edo allows for mixing the two smallest xenharmonic <a class="wiki_link" href="http://xenharmonic.wikispaces.com/macrotonal%20edos">macrotonal edos</a>: <a class="wiki_link" href="http://xenharmonic.wikispaces.com/5edo">5edo</a> and <a class="wiki_link" href="http://xenharmonic.wikispaces.com/7edo">7edo</a>. A single degree of 35edo represents the difference between 7edo's narrow fifth of 685.71¢ and 5edo's wide fifth of 720¢. 35edo can also represent the 2.3.5.7.11.17 <a class="wiki_link" href="http://xenharmonic.wikispaces.com/Just%20intonation%20subgroups">subgroup</a> and 2.9.5.7.11.17 subgroup, because of the accuracy of 9 and the flatness of all other subgroup generators. Therefore among whitewood tunings it is very versatile, you can switch between these different subgroups if you don't mind having to use two different 3/2s to reach the inconsistent 9, and if you ignore <a class="wiki_link" href="http://xenharmonic.wikispaces.com/22edo">22edo</a>'s consistent representation of both subgroups. 35edo is the optimal patent val for <a class="wiki_link" href="http://xenharmonic.wikispaces.com/Greenwoodmic%20temperaments">greenwood</a> and <a class="wiki_link" href="/Greenwoodmic%20temperaments#Secund">secund</a> temperaments.<br />
<br />
A good beggining for start to play 35-EDO is with the Sub-diatonic scale, that is a <a class="wiki_link" href="http://xenharmonic.wikispaces.com/MOS">MOS</a> of 3L2s: 9 4 9 9 4.<br />
<br />
<!-- ws:start:WikiTextHeadingRule:0:<h1> --><h1 id="toc0"><a name="Intervals"></a><!-- ws:end:WikiTextHeadingRule:0 -->Intervals</h1>
<br />
<br />
<table class="wiki_table">
<tr>
<td>Degrees of 35-EDO<br />
</td>
<td>Cents value<br />
</td>
<td>Ratios in 2.5.7.11.17 subgroup<br />
</td>
<td>Ratios with 3<br />
</td>
<td>Ratios with 9<br />
</td>
</tr>
<tr>
<td>0<br />
</td>
<td>0<br />
</td>
<td>1/1<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>34.29<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>2<br />
</td>
<td>68.57<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>3<br />
</td>
<td>102.86<br />
</td>
<td>17/16<br />
</td>
<td><br />
</td>
<td>18/17<br />
</td>
</tr>
<tr>
<td>4<br />
</td>
<td>137.14<br />
</td>
<td><br />
</td>
<td>12/11<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>5<br />
</td>
<td>171.43<br />
</td>
<td>11/10<br />
</td>
<td><br />
</td>
<td>10/9<br />
</td>
</tr>
<tr>
<td>6<br />
</td>
<td>205.71<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td>9/8<br />
</td>
</tr>
<tr>
<td>7<br />
</td>
<td>240<br />
</td>
<td>8/7<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>8<br />
</td>
<td>274.29<br />
</td>
<td>20/17<br />
</td>
<td>7/6<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>9<br />
</td>
<td>308.57<br />
</td>
<td><br />
</td>
<td>6/5<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>10<br />
</td>
<td>342.86<br />
</td>
<td>17/14<br />
</td>
<td><br />
</td>
<td>11/9<br />
</td>
</tr>
<tr>
<td>11<br />
</td>
<td>377.14<br />
</td>
<td>5/4<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>12<br />
</td>
<td>411.43<br />
</td>
<td>14/11<br />
</td>
<td><br />
</td>
<td>14/11<br />
</td>
</tr>
<tr>
<td>13<br />
</td>
<td>445.71<br />
</td>
<td>22/17<br />
</td>
<td><br />
</td>
<td>9/7<br />
</td>
</tr>
<tr>
<td>14<br />
</td>
<td>480<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>15<br />
</td>
<td>514.29<br />
</td>
<td><br />
</td>
<td>4/3<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>16<br />
</td>
<td>548.57<br />
</td>
<td>11/8<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>17<br />
</td>
<td>582.86<br />
</td>
<td>7/5<br />
</td>
<td>24/17<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>18<br />
</td>
<td>617.14<br />
</td>
<td>10/7<br />
</td>
<td>17/12<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>19<br />
</td>
<td>651.43<br />
</td>
<td>16/11<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>20<br />
</td>
<td>685.71<br />
</td>
<td><br />
</td>
<td>3/2<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>21<br />
</td>
<td>720<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>22<br />
</td>
<td>754.29<br />
</td>
<td>17/11<br />
</td>
<td><br />
</td>
<td>14/9<br />
</td>
</tr>
<tr>
<td>23<br />
</td>
<td>788.57<br />
</td>
<td>11/7<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>24<br />
</td>
<td>822.86<br />
</td>
<td>8/5<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>25<br />
</td>
<td>857.15<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td>18/11<br />
</td>
</tr>
<tr>
<td>26<br />
</td>
<td>891.43<br />
</td>
<td><br />
</td>
<td>5/3<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>27<br />
</td>
<td>925.71<br />
</td>
<td>17/10<br />
</td>
<td>12/7<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>28<br />
</td>
<td>960<br />
</td>
<td>7/4<br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>29<br />
</td>
<td>994.29<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td>16/9<br />
</td>
</tr>
<tr>
<td>30<br />
</td>
<td>1028.57<br />
</td>
<td>20/11<br />
</td>
<td><br />
</td>
<td>9/5<br />
</td>
</tr>
<tr>
<td>31<br />
</td>
<td>1062.86<br />
</td>
<td><br />
</td>
<td>11/6<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>32<br />
</td>
<td>1097.14<br />
</td>
<td>32/17<br />
</td>
<td><br />
</td>
<td>17/9<br />
</td>
</tr>
<tr>
<td>33<br />
</td>
<td>1131.43<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>34<br />
</td>
<td>1165.71<br />
</td>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
</table>
<!-- ws:start:WikiTextHeadingRule:2:<h1> --><h1 id="toc1"><a name="Rank two temperaments"></a><!-- ws:end:WikiTextHeadingRule:2 -->Rank two temperaments</h1>
<br />
<br />
<table class="wiki_table">
<tr>
<th>Periods<br />
per octave<br />
</th>
<th>Generator<br />
</th>
<th>Temperaments<br />
</th>
</tr>
<tr>
<td>1<br />
</td>
<td>3\35<br />
</td>
<td>Ripple<br />
</td>
</tr>
<tr>
<td><br />
</td>
<td>4\35<br />
</td>
<td><a class="wiki_link" href="/Greenwoodmic%20temperaments#Secund">Secund</a><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>6\35<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>8\35<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>9\35<br />
</td>
<td><a class="wiki_link" href="http://xenharmonic.wikispaces.com/Myna">Myna</a><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>11\35<br />
</td>
<td><a class="wiki_link" href="http://xenharmonic.wikispaces.com/Magic">Magic</a><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>12\35<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>13\35<br />
</td>
<td><a class="wiki_link" href="http://xenharmonic.wikispaces.com/Sensi">Sensi</a><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>16\35<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>1<br />
</td>
<td>17\35<br />
</td>
<td><br />
</td>
</tr>
<tr>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>5<br />
</td>
<td>2\35<br />
</td>
<td><a class="wiki_link" href="http://xenharmonic.wikispaces.com/Blackwood">Blackwood</a><br />
</td>
</tr>
<tr>
<td><br />
</td>
<td><br />
</td>
<td><br />
</td>
</tr>
<tr>
<td>7<br />
</td>
<td>1\35<br />
</td>
<td><a class="wiki_link" href="http://xenharmonic.wikispaces.com/Apotome%20family">Whitewood</a>/<a class="wiki_link" href="http://xenharmonic.wikispaces.com/Apotome%20family#Redwood">Redwood</a>/<a class="wiki_link" href="http://xenharmonic.wikispaces.com/Greenwoodmic%20temperaments">Greenwood</a><br />
</td>
</tr>
</table>
</body></html>