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Chords of orwell: Difference between revisions

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<h2>IMPORTED REVISION FROM WIKISPACES</h2>
{{Breadcrumb|Orwell}}
This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br>
Below is a complete list of all [[11-odd-limit]] [[dyadic chord]]s of [[11-limit]] [[orwell|orwell temperament]]. Note that there are many common chords, for example [[8:10:12:15]], which are not listed; in this case due to [[15/8]] not being in the 11-odd-limit. Every chord listed has multiple [[chord #Inversion|inversions]]; only one is listed, that being the inversion where all notes are a nonnegative number of subminor third [[generator]]s above the root.
: This revision was by author [[User:hstraub|hstraub]] and made on <tt>2015-03-15 07:53:05 UTC</tt>.<br>
: The original revision id was <tt>544127134</tt>.<br>
: The revision comment was: <tt></tt><br>
The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br>
<h4>Original Wikitext content:</h4>
<div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;white-space: pre-wrap ! important" class="old-revision-html">Below are listed the [[Dyadic chord|dyadic chords]] of 11-limit [[Orwell|orwell temperament]]. Typing the chords requires consideration of the fact that orwell equates certain 11 odd limit consonances--it conflates 14/11 and 9/7, 11/7 and 14/9, 12/11 and 11/10, and 11/6 and 20/11. If a transversal can be found which shows the chord to be essentially just, that transversal is listed along with a typing as otonal, utonal, or ambitonal. If the chord is essentially tempered, it is analyzed in terms of the transversal which employs 9/7 and 11/10 and their inversions. Those requiring tempering only by 225/224 are labeled marvel, by 99/98 mothwellsmic, by 121/120 biyatismic, by 176/175 valinorsmic, by 385/384 keenanismic, and by 540/539 swetismic. If it requires any two of 99/98, 176/175 and 225/224, it is labeled minerva, any two of 99/98, 121/120 or 540/539, big brother, any two of 121/120, 176/175 or 385/384, zeus, any two of 225/224, 385/384 or 540/539, unimarvel. If it requires both 99/98 and 385/384 it is labeled orwellian, and if it requires three independent commas among those discussed above, it is labeled orwell. Orwell has MOS of size 5, 9, 13, 22 and 31. The complaint is often made that orwell is lacking in low-complexity harmonies; however, even the orwell pentatonic has three triads and a tetrad, the nine note MOS is of course much better supplied and with thirteen notes we are rolling in chords and tossing them in the air, finding plenty of chords including even the inexorable major triad.


For diagrams showing how some of these chords might map to a [[Microtonal Keyboards|keyboard]] such as the Axis-49, see [[Orwell on an Isomorphic Keyboard]].
Typing the chords requires consideration of the fact that orwell equates certain [[11-odd-limit]] consonances – it conflates [[14/11]] with [[9/7]], [[11/7]] with [[14/9]], [[12/11]] with [[11/10]], and [[11/6]] with [[20/11]]. If a [[transversal]] can be found which shows the chord to be [[dyadic chord #Essentially tempered dyadic chord|essentially just]], that transversal is listed along with a typing as [[otonal]], [[utonal]], or [[ambitonal]]. Sometimes multiple such transversals exist, in which case the chord is a [[plurichord]], and the type is given for all possible interpretations. If the chord is [[dyadic chord #Essentially tempered dyadic chord|essentially tempered]], it is analyzed in terms of the transversal that requires the minimum amount of commas to be tempered out; if there is a tie between multiple transversals, it is analyzed in terms of the transversal which employs 9/7 and 11/10 over the root.  


=Triads=
Those requiring tempering only by [[225/224]] are labeled [[marvel chords|marvel]], by [[99/98]] [[mothwellsmic chords|mothwellsmic]], by [[121/120]] [[biyatismic chords|biyatismic]], by [[176/175]] [[valinorsmic chords|valinorsmic]], by [[385/384]] [[keenanismic chords|keenanismic]], and by [[540/539]] [[swetismic chords|swetismic]]. If it requires any two of 99/98, 176/175 and 225/224, it is labeled [[minerva chords|minerva]], any two of 99/98, 121/120 or 540/539, [[big brother chords|big brother]], any two of 121/120, 176/175 or 385/384, [[zeus chords|zeus]], any two of 225/224, 385/384 or 540/539, [[undecimal marvel chords|marvel11]]. If it requires both 99/98 and 385/384 it is labeled [[orwellian chords|orwellian]], and if it requires three independent commas among those discussed above, it is labeled [[orwell chords|orwell]].
|| Number || Chord || Transversal || Type ||
|| 1 || 0-1-2 || 1-7/6-11/8 || mothwellsmic ||
|| 2 || 0-1-3 || 1-7/6-8/5 || keenanismic ||
|| 3 || 0-2-3 || 1-11/8-8/5 || keenanismic ||
|| 4 || 0-2-5 || 1-11/8-11/10 || utonal ||
|| 5 || 0-3-5 || 1-8/5-11/10 || otonal ||
|| 6 || 0-1-6 || 1-7/6-14/11 || utonal ||
|| 7 || 0-3-6 || 1-8/5-9/7 || marvel ||
|| 8 || 0-5-6 || 1-12/11-14/11 || otonal ||
|| 9 || 0-1-7 || 1-7/6-3/2 || otonal ||
|| 10 || 0-2-7 || 1-11/8-3/2 || otonal ||
|| 11 || 0-5-7 || 1-12/11-3/2 || utonal ||
|| 12 || 0-6-7 || 1-9/7-3/2 || utonal ||
|| 13 || 0-1-8 || 1-7/6-7/4 || utonal ||
|| 14 || 0-2-8 || 1-11/8-7/4 || otonal ||
|| 15 || 0-3-8 || 1-8/5-7/4 || valinorsmic ||
|| 16 || 0-5-8 || 1-11/10-7/4 || valinorsmic ||
|| 17 || 0-6-8 || 1-14/11-7/4 || utonal ||
|| 18 || 0-7-8 || 1-3/2-7/4 || otonal ||
|| 19 || 0-2-10 || 1-11/8-6/5 || keenanismic ||
|| 20 || 0-3-10 || 1-8/5-6/5 || otonal ||
|| 21 || 0-5-10 || 1-11/10-6/5 || otonal ||
|| 22 || 0-7-10 || 1-3/2-6/5 || utonal ||
|| 23 || 0-8-10 || 1-7/4-6/5 || keenanismic ||
|| 24 || 0-1-11 || 1-7/6-7/5 || utonal ||
|| 25 || 0-3-11 || 1-8/5-7/5 || otonal ||
|| 26 || 0-5-11 || 1-11/10-7/5 || otonal ||
|| 27 || 0-6-11 || 1-14/11-7/5 || utonal ||
|| 28 || 0-8-11 || 1-7/4-7/5 || utonal ||
|| 29 || 0-10-11 || 1-6/5-7/5 || otonal ||
|| 30 || 0-1-12 || 1-7/6-18/11 || swetismic ||
|| 31 || 0-2-12 || 1-11/8-18/11 || biyatismic ||
|| 32 || 0-5-12 || 1-12/11-18/11 || otonal ||
|| 33 || 0-6-12 || 1-9/7-18/11 || utonal ||
|| 34 || 0-7-12 || 1-3/2-18/11 || utonal ||
|| 35 || 0-10-12 || 1-6/5-18/11 || biyatismic ||
|| 36 || 0-11-12 || 1-7/5-18/11 || swetismic ||
|| 37 || 0-2-14 || 1-11/8-9/8 || otonal ||
|| 38 || 0-3-14 || 1-8/5-9/8 || marvel ||
|| 39 || 0-6-14 || 1-9/7-9/8 || utonal ||
|| 40 || 0-7-14 || 1-3/2-9/8 || ambitonal ||
|| 41 || 0-8-14 || 1-7/4-9/8 || otonal ||
|| 42 || 0-11-14 || 1-7/5-9/8 || marvel ||
|| 43 || 0-12-14 || 1-18/11-9/8 || utonal ||
|| 44 || 0-3-17 || 1-8/5-9/5 || otonal ||
|| 45 || 0-5-17 || 1-11/10-9/5 || otonal ||
|| 46 || 0-6-17 || 1-9/7-9/5 || utonal ||
|| 47 || 0-7-17 || 1-3/2-9/5 || utonal ||
|| 48 || 0-10-17 || 1-6/5-9/5 || otonal ||
|| 49 || 0-11-17 || 1-7/5-9/5 || otonal ||
|| 50 || 0-12-17 || 1-18/11-9/5 || utonal ||
|| 51 || 0-14-17 || 1-9/8-9/5 || utonal ||


=Tetrads=
Orwell has [[mos]] of size 5, 9, 13, 22 and 31. The complaint is often made that orwell is lacking in low-complexity harmonies; however, even the orwell pentatonic scale has three triads and a tetrad. The 9-note mos is of course much better supplied, and with 13 notes we are rolling in chords and tossing them in the air, finding plenty of chords including even the inexorable [[4:5:6|major triad]].
|| Number || Chord || Transversal || Type ||  ||
|| 1 || 0-1-2-3 || 1-7/6-11/8-8/5 || orwellian || [[media type="file" key="OrwellTetrad22edo.mp3" width="240" height="20"]] ||
|| 2 || 0-2-3-5 || 1-11/8-8/5-11/10 || keenanismic || [[media type="file" key="Orwell_0_2_3_5_22edo.mp3" width="240" height="20"]] ||
|| 3 || 0-1-3-6 || 1-7/6-8/5-9/7 || unimarvel || [[media type="file" key="Orwell_0_1_3_6_22edo.mp3" width="240" height="20"]] ||
|| 4 || 0-3-5-6 || 1-8/5-11/10-9/7 || unimarvel || [[media type="file" key="Orwell_0_3_5_6_22edo.mp3" width="240" height="20"]] ||
|| 5 || 0-1-2-7 || 1-7/6-11/8-3/2 || big brother || [[media type="file" key="Orwell_0_1_2_7_22edo.mp3" width="240" height="20"]] ||
|| 6 || 0-2-5-7 || 1-11/8-11/10-3/2 || biyatismic || [[media type="file" key="Orwell_0_2_5_7_22edo.mp3" width="240" height="20"]] ||
|| 7 || 0-1-6-7 || 1-7/6-9/7-3/2 || swetismic || [[media type="file" key="Orwell_0_1_6_7_22edo.mp3" width="240" height="20"]] ||
|| 8 || 0-5-6-7 || 1-11/10-9/7-3/2 || big brother || [[media type="file" key="Orwell_0_5_6_7_22edo.mp3" width="240" height="20"]] ||
|| 9 || 0-1-2-8 || 1-7/6-11/8-7/4 || mothwellsmic || [[media type="file" key="Orwell_0_1_2_8_22edo.mp3"]] ||
|| 10 || 0-1-3-8 || 1-7/6-8/5-7/4 || zeus || [[media type="file" key="Orwell_0_1_3_8_22edo.mp3"]] ||
|| 11 || 0-2-3-8 || 1-11/8-8/5-7/4 || orwell ||  ||
|| 12 || 0-2-5-8 || 1-11/8-11/10-7/4 || minerva ||  ||
|| 13 || 0-3-5-8 || 1-8/5-11/10-7/4 || valinorsmic ||  ||
|| 14 || 0-1-6-8 || 1-7/6-14/11-7/4 || utonal ||  ||
|| 15 || 0-3-6-8 || 1-8/5-9/7-7/4 || minerva ||  ||
|| 16 || 0-5-6-8 || 1-11/10-9/7-7/4 || orwell ||  ||
|| 17 || 0-1-7-8 || 1-7/6-3/2-7/4 || ambitonal ||  ||
|| 18 || 0-2-7-8 || 1-11/8-3/2-7/4 || otonal ||  ||
|| 19 || 0-5-7-8 || 1-11/10-3/2-7/4 || zeus ||  ||
|| 20 || 0-6-7-8 || 1-9/7-3/2-7/4 || mothwellsmic ||  ||
|| 21 || 0-2-3-10 || 1-11/8-8/5-6/5 || keenanismic ||  ||
|| 22 || 0-2-5-10 || 1-11/8-11/10-6/5 || zeus ||  ||
|| 23 || 0-3-5-10 || 1-8/5-11/10-6/5 || otonal ||  ||
|| 24 || 0-2-7-10 || 1-11/8-3/2-6/5 || zeus ||  ||
|| 25 || 0-5-7-10 || 1-12/11-3/2-6/5 || utonal ||  ||
|| 26 || 0-2-8-10 || 1-11/8-7/4-6/5 || orwellian ||  ||
|| 27 || 0-3-8-10 || 1-8/5-7/4-6/5 || zeus ||  ||
|| 28 || 0-5-8-10 || 1-11/10-7/4-6/5 || zeus ||  ||
|| 29 || 0-7-8-10 || 1-3/2-7/4-6/5 || keenanismic ||  ||
|| 30 || 0-1-3-11 || 1-7/6-8/5-7/5 || keenanismic ||  ||
|| 31 || 0-3-5-11 || 1-8/5-11/10-7/5 || otonal ||  ||
|| 32 || 0-1-6-11 || 1-7/6-14/11-7/5 || utonal ||  ||
|| 33 || 0-3-6-11 || 1-8/5-9/7-7/5 || minerva ||  ||
|| 34 || 0-5-6-11 || 1-11/10-9/7-7/5 || big brother ||  ||
|| 35 || 0-1-8-11 || 1-7/6-7/4-7/5 || utonal ||  ||
|| 36 || 0-3-8-11 || 1-8/5-7/4-7/5 || valinorsmic ||  ||
|| 37 || 0-5-8-11 || 1-11/10-7/4-7/5 || minerva ||  ||
|| 38 || 0-6-8-11 || 1-14/11-7/4-7/5 || utonal ||  ||
|| 39 || 0-3-10-11 || 1-8/5-6/5-7/5 || otonal ||  ||
|| 40 || 0-5-10-11 || 1-11/10-6/5-7/5 || otonal ||  ||
|| 41 || 0-8-10-11 || 1-7/4-6/5-7/5 || keenanismic ||  ||
|| 42 || 0-1-2-12 || 1-7/6-11/8-18/11 || big brother ||  ||
|| 43 || 0-2-5-12 || 1-11/8-11/10-18/11 || biyatismic ||  ||
|| 44 || 0-1-6-12 || 1-7/6-9/7-18/11 || big brother ||  ||
|| 45 || 0-5-6-12 || 1-12/11-14/11-18/11 || otonal ||  ||
|| 46 || 0-1-7-12 || 1-7/6-3/2-18/11 || big brother ||  ||
|| 47 || 0-2-7-12 || 1-11/8-3/2-18/11 || biyatismic ||  ||
|| 48 || 0-5-7-12 || 1-12/11-3/2-18/11 || ambitonal ||  ||
|| 49 || 0-6-7-12 || 1-9/7-3/2-18/11 || utonal ||  ||
|| 50 || 0-2-10-12 || 1-11/8-6/5-18/11 || zeus ||  ||
|| 51 || 0-5-10-12 || 1-11/10-6/5-18/11 || biyatismic ||  ||
|| 52 || 0-7-10-12 || 1-3/2-6/5-18/11 || biyatismic ||  ||
|| 53 || 0-1-11-12 || 1-7/6-7/5-18/11 || swetismic ||  ||
|| 54 || 0-5-11-12 || 1-11/10-7/5-18/11 || big brother ||  ||
|| 55 || 0-6-11-12 || 1-9/7-7/5-18/11 || big brother ||  ||
|| 56 || 0-10-11-12 || 1-6/5-7/5-18/11 || big brother ||  ||
|| 57 || 0-2-3-14 || 1-11/8-8/5-9/8 || unimarvel ||  ||
|| 58 || 0-3-6-14 || 1-8/5-9/7-9/8 || marvel ||  ||
|| 59 || 0-2-7-14 || 1-11/8-3/2-9/8 || otonal ||  ||
|| 60 || 0-6-7-14 || 1-9/7-3/2-9/8 || utonal ||  ||
|| 61 || 0-2-8-14 || 1-11/8-7/4-9/8 || otonal ||  ||
|| 62 || 0-3-8-14 || 1-8/5-7/4-9/8 || minerva ||  ||
|| 63 || 0-6-8-14 || 1-9/7-7/4-9/8 || mothwellsmic ||  ||
|| 64 || 0-7-8-14 || 1-3/2-7/4-9/8 || otonal ||  ||
|| 65 || 0-3-11-14 || 1-8/5-7/5-9/8 || marvel ||  ||
|| 66 || 0-6-11-14 || 1-9/7-7/5-9/8 || minerva ||  ||
|| 67 || 0-8-11-14 || 1-7/4-7/5-9/8 || marvel ||  ||
|| 68 || 0-2-12-14 || 1-11/8-18/11-9/8 || biyatismic ||  ||
|| 69 || 0-6-12-14 || 1-9/7-18/11-9/8 || utonal ||  ||
|| 70 || 0-7-12-14 || 1-3/2-18/11-9/8 || utonal ||  ||
|| 71 || 0-11-12-14 || 1-7/5-18/11-9/8 || unimarvel ||  ||
|| 72 || 0-3-5-17 || 1-8/5-11/10-9/5 || otonal ||  ||
|| 73 || 0-3-6-17 || 1-8/5-9/7-9/5 || marvel ||  ||
|| 74 || 0-5-6-17 || 1-11/10-9/7-9/5 || swetismic ||  ||
|| 75 || 0-5-7-17 || 1-11/10-3/2-9/5 || biyatismic ||  ||
|| 76 || 0-6-7-17 || 1-9/7-3/2-9/5 || utonal ||  ||
|| 77 || 0-3-10-17 || 1-8/5-6/5-9/5 || otonal ||  ||
|| 78 || 0-5-10-17 || 1-11/10-6/5-9/5 || otonal ||  ||
|| 79 || 0-7-10-17 || 1-3/2-6/5-9/5 || ambitonal ||  ||
|| 80 || 0-3-11-17 || 1-8/5-7/5-9/5 || otonal ||  ||
|| 81 || 0-5-11-17 || 1-11/10-7/5-9/5 || otonal ||  ||
|| 82 || 0-6-11-17 || 1-9/7-7/5-9/5 || mothwellsmic ||  ||
|| 83 || 0-10-11-17 || 1-6/5-7/5-9/5 || otonal ||  ||
|| 84 || 0-5-12-17 || 1-11/10-18/11-9/5 || biyatismic ||  ||
|| 85 || 0-6-12-17 || 1-9/7-18/11-9/5 || utonal ||  ||
|| 86 || 0-7-12-17 || 1-3/2-18/11-9/5 || utonal ||  ||
|| 87 || 0-10-12-17 || 1-6/5-18/11-9/5 || biyatismic ||  ||
|| 88 || 0-11-12-17 || 1-7/5-18/11-9/5 || swetismic ||  ||
|| 89 || 0-3-14-17 || 1-8/5-9/8-9/5 || marvel ||  ||
|| 90 || 0-6-14-17 || 1-9/7-9/8-9/5 || utonal ||  ||
|| 91 || 0-7-14-17 || 1-3/2-9/8-9/5 || utonal ||  ||
|| 92 || 0-11-14-17 || 1-7/5-9/8-9/5 || marvel ||  ||
|| 93 || 0-12-14-17 || 1-18/11-9/8-9/5 || utonal ||  ||


=Pentads=
For diagrams showing how some of these chords might map to a [[keyboard]] such as the Axis-49, see [[Orwell on an isomorphic keyboard]].
|| Number || Chord || Transversal || Type ||
|| 1 || 0-1-2-3-8 || 1-7/6-11/8-8/5-7/4 || orwell ||
|| 2 || 0-2-3-5-8 || 1-11/8-8/5-11/10-7/4 || orwell ||
|| 3 || 0-1-3-6-8 || 1-7/6-8/5-9/7-7/4 || orwell ||
|| 4 || 0-3-5-6-8 || 1-8/5-11/10-9/7-7/4 || orwell ||
|| 5 || 0-1-2-7-8 || 1-7/6-11/8-3/2-7/4 || big brother ||
|| 6 || 0-2-5-7-8 || 1-11/8-11/10-3/2-7/4 || orwell ||
|| 7 || 0-1-6-7-8 || 1-7/6-9/7-3/2-7/4 || big brother ||
|| 8 || 0-5-6-7-8 || 1-11/10-9/7-3/2-7/4 || orwell ||
|| 9 || 0-2-3-5-10 || 1-11/8-8/5-11/10-6/5 || zeus ||
|| 10 || 0-2-5-7-10 || 1-11/8-11/10-3/2-6/5 || zeus ||
|| 11 || 0-2-3-8-10 || 1-11/8-8/5-7/4-6/5 || orwell ||
|| 12 || 0-2-5-8-10 || 1-11/8-11/10-7/4-6/5 || orwell ||
|| 13 || 0-3-5-8-10 || 1-8/5-11/10-7/4-6/5 || zeus ||
|| 14 || 0-2-7-8-10 || 1-11/8-3/2-7/4-6/5 || orwell ||
|| 15 || 0-5-7-8-10 || 1-11/10-3/2-7/4-6/5 || zeus ||
|| 16 || 0-1-3-6-11 || 1-7/6-8/5-9/7-7/5 || orwell ||
|| 17 || 0-3-5-6-11 || 1-8/5-11/10-9/7-7/5 || orwell ||
|| 18 || 0-1-3-8-11 || 1-7/6-8/5-7/4-7/5 || zeus ||
|| 19 || 0-3-5-8-11 || 1-8/5-11/10-7/4-7/5 || minerva ||
|| 20 || 0-1-6-8-11 || 1-7/6-14/11-7/4-7/5 || utonal ||
|| 21 || 0-3-6-8-11 || 1-8/5-9/7-7/4-7/5 || minerva ||
|| 22 || 0-5-6-8-11 || 1-11/10-9/7-7/4-7/5 || orwell ||
|| 23 || 0-3-5-10-11 || 1-8/5-11/10-6/5-7/5 || otonal ||
|| 24 || 0-3-8-10-11 || 1-8/5-7/4-6/5-7/5 || zeus ||
|| 25 || 0-5-8-10-11 || 1-11/10-7/4-6/5-7/5 || orwell ||
|| 26 || 0-1-2-7-12 || 1-7/6-11/8-3/2-18/11 || big brother ||
|| 27 || 0-2-5-7-12 || 1-11/8-11/10-3/2-18/11 || biyatismic ||
|| 28 || 0-1-6-7-12 || 1-7/6-9/7-3/2-18/11 || big brother ||
|| 29 || 0-5-6-7-12 || 1-11/10-9/7-3/2-18/11 || big brother ||
|| 30 || 0-2-5-10-12 || 1-11/8-11/10-6/5-18/11 || zeus ||
|| 31 || 0-2-7-10-12 || 1-11/8-3/2-6/5-18/11 || zeus ||
|| 32 || 0-5-7-10-12 || 1-11/10-3/2-6/5-18/11 || biyatismic ||
|| 33 || 0-1-6-11-12 || 1-7/6-9/7-7/5-18/11 || big brother ||
|| 34 || 0-5-6-11-12 || 1-11/10-9/7-7/5-18/11 || big brother ||
|| 35 || 0-5-10-11-12 || 1-11/10-6/5-7/5-18/11 || big brother ||
|| 36 || 0-2-3-8-14 || 1-11/8-8/5-7/4-9/8 || orwell ||
|| 37 || 0-3-6-8-14 || 1-8/5-9/7-7/4-9/8 || minerva ||
|| 38 || 0-2-7-8-14 || 1-11/8-3/2-7/4-9/8 || otonal ||
|| 39 || 0-6-7-8-14 || 1-9/7-3/2-7/4-9/8 || mothwellsmic ||
|| 40 || 0-3-6-11-14 || 1-8/5-9/7-7/5-9/8 || minerva ||
|| 41 || 0-3-8-11-14 || 1-8/5-7/4-7/5-9/8 || minerva ||
|| 42 || 0-6-8-11-14 || 1-9/7-7/4-7/5-9/8 || minerva ||
|| 43 || 0-2-7-12-14 || 1-11/8-3/2-18/11-9/8 || biyatismic ||
|| 44 || 0-6-7-12-14 || 1-9/7-3/2-18/11-9/8 || utonal ||
|| 45 || 0-6-11-12-14 || 1-9/7-7/5-18/11-9/8 || orwell ||
|| 46 || 0-3-5-6-17 || 1-8/5-11/10-9/7-9/5 || unimarvel ||
|| 47 || 0-5-6-7-17 || 1-11/10-9/7-3/2-9/5 || big brother ||
|| 48 || 0-3-5-10-17 || 1-8/5-11/10-6/5-9/5 || otonal ||
|| 49 || 0-5-7-10-17 || 1-11/10-3/2-6/5-9/5 || biyatismic ||
|| 50 || 0-3-5-11-17 || 1-8/5-11/10-7/5-9/5 || otonal ||
|| 51 || 0-3-6-11-17 || 1-8/5-9/7-7/5-9/5 || minerva ||
|| 52 || 0-5-6-11-17 || 1-11/10-9/7-7/5-9/5 || big brother ||
|| 53 || 0-3-10-11-17 || 1-8/5-6/5-7/5-9/5 || otonal ||
|| 54 || 0-5-10-11-17 || 1-11/10-6/5-7/5-9/5 || otonal ||
|| 55 || 0-5-6-12-17 || 1-11/10-9/7-18/11-9/5 || big brother ||
|| 56 || 0-5-7-12-17 || 1-11/10-3/2-18/11-9/5 || biyatismic ||
|| 57 || 0-6-7-12-17 || 1-9/7-3/2-18/11-9/5 || utonal ||
|| 58 || 0-5-10-12-17 || 1-11/10-6/5-18/11-9/5 || biyatismic ||
|| 59 || 0-7-10-12-17 || 1-3/2-6/5-18/11-9/5 || biyatismic ||
|| 60 || 0-5-11-12-17 || 1-11/10-7/5-18/11-9/5 || big brother ||
|| 61 || 0-6-11-12-17 || 1-9/7-7/5-18/11-9/5 || big brother ||
|| 62 || 0-10-11-12-17 || 1-6/5-7/5-18/11-9/5 || big brother ||
|| 63 || 0-3-6-14-17 || 1-8/5-9/7-9/8-9/5 || marvel ||
|| 64 || 0-6-7-14-17 || 1-9/7-3/2-9/8-9/5 || utonal ||
|| 65 || 0-3-11-14-17 || 1-8/5-7/5-9/8-9/5 || marvel ||
|| 66 || 0-6-11-14-17 || 1-9/7-7/5-9/8-9/5 || minerva ||
|| 67 || 0-6-12-14-17 || 1-9/7-18/11-9/8-9/5 || utonal ||
|| 68 || 0-7-12-14-17 || 1-3/2-18/11-9/8-9/5 || utonal ||
|| 69 || 0-11-12-14-17 || 1-7/5-18/11-9/8-9/5 || unimarvel ||


=Hexads=  
== Triads ==
|| Number || Chord || Transversal || Type ||
{| class="wikitable center-1"
|| 1 || 0-2-3-5-8-10 || 1-11/8-8/5-11/10-7/4-6/5 || orwell ||
|-
|| 2 || 0-2-5-7-8-10 || 1-11/8-11/10-3/2-7/4-6/5 || orwell ||
! #
|| 3 || 0-1-3-6-8-11 || 1-7/6-8/5-9/7-7/4-7/5 || orwell ||
! Generators
|| 4 || 0-3-5-6-8-11 || 1-8/5-11/10-9/7-7/4-7/5 || orwell ||
! Transversal
|| 5 || 0-3-5-8-10-11 || 1-8/5-11/10-7/4-6/5-7/5 || orwell ||
! Type
|| 6 || 0-2-5-7-10-12 || 1-11/8-11/10-3/2-6/5-18/11 || zeus ||
! Comment
|| 7 || 0-3-6-8-11-14 || 1-8/5-9/7-7/4-7/5-9/8 || minerva ||
|-
|| 8 || 0-3-5-6-11-17 || 1-8/5-11/10-9/7-7/5-9/5 || orwell ||
| 1
|| 9 || 0-3-5-10-11-17 || 1-8/5-11/10-6/5-7/5-9/5 || otonal ||
| 0–1–2
|| 10 || 0-5-6-7-12-17 || 1-11/10-9/7-3/2-18/11-9/5 || big brother ||
| 1–7/6–11/8
|| 11 || 0-5-7-10-12-17 || 1-11/10-3/2-6/5-18/11-9/5 || biyatismic ||
| Mothwellsmic
|| 12 || 0-5-6-11-12-17 || 1-11/10-9/7-7/5-18/11-9/5 || big brother ||
|  
|| 13 || 0-5-10-11-12-17 || 1-11/10-6/5-7/5-18/11-9/5 || big brother ||
|-
|| 14 || 0-3-6-11-14-17 || 1-8/5-9/7-7/5-9/8-9/5 || minerva ||
| 2
|| 15 || 0-6-7-12-14-17 || 1-9/7-3/2-18/11-9/8-9/5 || utonal ||
| 0–1–3
|| 16 || 0-6-11-12-14-17 || 1-9/7-7/5-18/11-9/8-9/5 || orwell ||</pre></div>
| 1–7/6–8/5
<h4>Original HTML content:</h4>
| Keenanismic
<div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;width:200%;white-space: pre-wrap ! important" class="old-revision-html">&lt;html&gt;&lt;head&gt;&lt;title&gt;Chords of orwell&lt;/title&gt;&lt;/head&gt;&lt;body&gt;Below are listed the &lt;a class="wiki_link" href="/Dyadic%20chord"&gt;dyadic chords&lt;/a&gt; of 11-limit &lt;a class="wiki_link" href="/Orwell"&gt;orwell temperament&lt;/a&gt;. Typing the chords requires consideration of the fact that orwell equates certain 11 odd limit consonances--it conflates 14/11 and 9/7, 11/7 and 14/9, 12/11 and 11/10, and 11/6 and 20/11. If a transversal can be found which shows the chord to be essentially just, that transversal is listed along with a typing as otonal, utonal, or ambitonal. If the chord is essentially tempered, it is analyzed in terms of the transversal which employs 9/7 and 11/10 and their inversions. Those requiring tempering only by 225/224 are labeled marvel, by 99/98 mothwellsmic, by 121/120 biyatismic, by 176/175 valinorsmic, by 385/384 keenanismic, and by 540/539 swetismic. If it requires any two of 99/98, 176/175 and 225/224, it is labeled minerva, any two of 99/98, 121/120 or 540/539, big brother, any two of 121/120, 176/175 or 385/384, zeus, any two of 225/224, 385/384 or 540/539, unimarvel. If it requires both 99/98 and 385/384 it is labeled orwellian, and if it requires three independent commas among those discussed above, it is labeled orwell. Orwell has MOS of size 5, 9, 13, 22 and 31. The complaint is often made that orwell is lacking in low-complexity harmonies; however, even the orwell pentatonic has three triads and a tetrad, the nine note MOS is of course much better supplied and with thirteen notes we are rolling in chords and tossing them in the air, finding plenty of chords including even the inexorable major triad.&lt;br /&gt;
|  
&lt;br /&gt;
|-
For diagrams showing how some of these chords might map to a &lt;a class="wiki_link" href="/Microtonal%20Keyboards"&gt;keyboard&lt;/a&gt; such as the Axis-49, see &lt;a class="wiki_link" href="/Orwell%20on%20an%20Isomorphic%20Keyboard"&gt;Orwell on an Isomorphic Keyboard&lt;/a&gt;.&lt;br /&gt;
| 3
&lt;br /&gt;
| 0–2–3
&lt;!-- ws:start:WikiTextHeadingRule:10:&amp;lt;h1&amp;gt; --&gt;&lt;h1 id="toc0"&gt;&lt;a name="Triads"&gt;&lt;/a&gt;&lt;!-- ws:end:WikiTextHeadingRule:10 --&gt;Triads&lt;/h1&gt;
| 1–11/8–8/5
| Keenanismic
|
|-
| 4
| 0–2–5
| 1–11/10–11/8
| Utonal
|
|-
| 5
| 0–3–5
| 1–11/10–8/5
| Otonal
|
|-
| 6
| 0–1–6
| 1–7/6–14/11
| Utonal
|
|-
| 7
| 0–3–6
| 1–9/7–8/5
| Marvel
|  
|-
| 8
| 0–5–6
| 1–12/11–14/11
| Otonal
|  
|-
| 9
| 0–1–7
| 1–7/6–3/2
| Otonal
| [[6:7:9]]
|-
| 10
| 0–2–7
| 1–11/8–3/2
| Otonal
|
|-
| 11
| 0–5–7
| 1–12/11–3/2
| Utonal
|
|-
| 12
| 0–6–7
| 1–9/7–3/2
| Utonal
| [[14:18:21|1/(9:7:6)]]
|-
| 13
| 0–1–8
| 1–7/6–7/4
| Utonal
| [[14:21:24|1/(12:8:7)]]
|-
| 14
| 0–2–8
| 1–11/8–7/4
| Otonal
|
|-
| 15
| 0–3–8
| 1–8/5–7/4
| Valinorsmic
|
|-
| 16
| 0–5–8
| 1–11/10–7/4
| Valinorsmic
|  
|-
| 17
| 0–6–8
| 1–14/11–7/4
| Utonal
|  
|-
| 18
| 0–7–8
| 1–3/2–7/4
| Otonal
| [[4:6:7]]
|-
| 19
| 0–2–10
| 1–6/5–11/8
| Keenanismic
|  
|-
| 20
| 0–3–10
| 1–6/5–8/5
| Otonal
| [[4:5:6]]
|-
| 21
| 0–5–10
| 1–11/10–6/5
| Otonal
|  
|-
| 22
| 0–7–10
| 1–6/5–3/2
| Utonal
| [[10:12:15|1/(6:5:4)]]
|-
| 23
| 0–8–10
| 1–6/5–7/4
| Keenanismic
|  
|-
| 24
| 0–1–11
| 1–7/6–7/5
| Utonal
| [[30:35:42|1/(7:6:5)]]
|-
| 25
| 0–3–11
| 1–7/5–8/5
| Otonal
| [[4:5:7]]
|-
| 26
| 0–5–11
| 1–11/10–7/5
| Otonal
|  
|-
| 27
| 0–6–11
| 1–14/11–7/5
| Utonal
|  
|-
| 28
| 0–8–11
| 1–7/5–7/4
| Utonal
| [[28:35:40|1/(10:8:7)]]
|-
| 29
| 0–10–11
| 1–6/5–7/5
| Otonal
| [[5:6:7]]
|-
| 30
| 0–1–12
| 1–7/6–18/11
| Swetismic
|  
|-
| 31
| 0–2–12
| 1–11/8–18/11
| Biyatismic
|
|-
| 32
| 0–5–12
| 1–12/11–18/11
| Otonal
|  
|-
| 33
| 0–6–12
| 1–9/7–18/11
| Utonal
|  
|-
| 34
| 0–7–12
| 1–3/2–18/11
| Utonal
|  
|-
| 35
| 0–10–12
| 1–6/5–18/11
| Biyatismic
|  
|-
| 36
| 0–11–12
| 1–7/5–18/11
| Swetismic
|  
|-
| 37
| 0–2–14
| 1–9/8–11/8
| Otonal
|  
|-
| 38
| 0–3–14
| 1–9/8–8/5
| Marvel
|
|-
| 39
| 0–6–14
| 1–9/8–9/7
| Utonal
|  
|-
| 40
| 0–7–14
| 1–9/8–3/2
| Ambitonal
| [[6:8:9]], [[8:9:12]]
|-
| 41
| 0–8–14
| 1–9/8–7/4
| Otonal
|
|-
| 42
| 0–11–14
| 1–9/8–7/5
| Marvel
|  
|-
| 43
| 0–12–14
| 1–9/8–18/11
| Utonal
|
|-
| 44
| 0–3–17
| 1–8/5–9/5
| Otonal
|
|-
| 45
| 0–5–17
| 1–11/10–9/5
| Otonal
|
|-
| 46
| 0–6–17
| 1–9/7–9/5
| Utonal
|  
|-
| 47
| 0–7–17
| 1–3/2–9/5
| Utonal
| [[10:15:18|1/(9:6:5)]]
|-
| 48
| 0–10–17
| 1–6/5–9/5
| Otonal
| [[6:9:10]]
|-
| 49
| 0–11–17
| 1–7/5–9/5
| Otonal
|
|-
| 50
| 0–12–17
| 1–18/11–9/5
| Utonal
|
|-
| 51
| 0–14–17
| 1–9/8–9/5
| Utonal
|
|}


&lt;table class="wiki_table"&gt;
== Tetrads ==
    &lt;tr&gt;
{| class="wikitable center-1"
        &lt;td&gt;Number&lt;br /&gt;
|-
&lt;/td&gt;
! #
        &lt;td&gt;Chord&lt;br /&gt;
! Generators
&lt;/td&gt;
! Transversal
        &lt;td&gt;Transversal&lt;br /&gt;
! Type
&lt;/td&gt;
! Comment
        &lt;td&gt;Type&lt;br /&gt;
! Example in 22edo
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 1
    &lt;tr&gt;
| 0–1–2–3
        &lt;td&gt;1&lt;br /&gt;
| 1–7/6–11/8–8/5
&lt;/td&gt;
| Orwellian
        &lt;td&gt;0-1-2&lt;br /&gt;
|
&lt;/td&gt;
| [[File:OrwellTetrad22edo.mp3]]
        &lt;td&gt;1-7/6-11/8&lt;br /&gt;
|-
&lt;/td&gt;
| 2
        &lt;td&gt;mothwellsmic&lt;br /&gt;
| 0–2–3–5
&lt;/td&gt;
| 1–11/10–11/8–8/5
    &lt;/tr&gt;
| Keenanismic
    &lt;tr&gt;
|
        &lt;td&gt;2&lt;br /&gt;
| [[File:Orwell_0_2_3_5_22edo.mp3]]
&lt;/td&gt;
|-
        &lt;td&gt;0-1-3&lt;br /&gt;
| 3
&lt;/td&gt;
| 0–1–3–6
        &lt;td&gt;1-7/6-8/5&lt;br /&gt;
| 1–7/6–9/7–8/5
&lt;/td&gt;
| Marvel11
        &lt;td&gt;keenanismic&lt;br /&gt;
|
&lt;/td&gt;
| [[File:Orwell_0_1_3_6_22edo.mp3]]
    &lt;/tr&gt;
|-
    &lt;tr&gt;
| 4
        &lt;td&gt;3&lt;br /&gt;
| 0–3–5–6
&lt;/td&gt;
| 1–11/10–9/7–8/5
        &lt;td&gt;0-2-3&lt;br /&gt;
| Marvel11
&lt;/td&gt;
|
        &lt;td&gt;1-11/8-8/5&lt;br /&gt;
| [[File:Orwell_0_3_5_6_22edo.mp3]]
&lt;/td&gt;
|-
        &lt;td&gt;keenanismic&lt;br /&gt;
| 5
&lt;/td&gt;
| 0–1–2–7
    &lt;/tr&gt;
| 1–7/6–11/8–3/2
    &lt;tr&gt;
| Big brother
        &lt;td&gt;4&lt;br /&gt;
|
&lt;/td&gt;
| [[File:Orwell_0_1_2_7_22edo.mp3]]
        &lt;td&gt;0-2-5&lt;br /&gt;
|-
&lt;/td&gt;
| 6
        &lt;td&gt;1-11/8-11/10&lt;br /&gt;
| 0–2–5–7
&lt;/td&gt;
| 1–11/10–11/8–3/2
        &lt;td&gt;utonal&lt;br /&gt;
| Biyatismic
&lt;/td&gt;
|
    &lt;/tr&gt;
| [[File:Orwell_0_2_5_7_22edo.mp3]]
    &lt;tr&gt;
|-
        &lt;td&gt;5&lt;br /&gt;
| 7
&lt;/td&gt;
| 0–1–6–7
        &lt;td&gt;0-3-5&lt;br /&gt;
| 1–7/6–9/7–3/2
&lt;/td&gt;
| Swetismic
        &lt;td&gt;1-8/5-11/10&lt;br /&gt;
|
&lt;/td&gt;
| [[File:Orwell_0_1_6_7_22edo.mp3]]
        &lt;td&gt;otonal&lt;br /&gt;
|-
&lt;/td&gt;
| 8
    &lt;/tr&gt;
| 0–5–6–7
    &lt;tr&gt;
| 1–11/10–9/7–3/2
        &lt;td&gt;6&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
        &lt;td&gt;0-1-6&lt;br /&gt;
| [[File:Orwell_0_5_6_7_22edo.mp3]]
&lt;/td&gt;
|-
        &lt;td&gt;1-7/6-14/11&lt;br /&gt;
| 9
&lt;/td&gt;
| 0–1–2–8
        &lt;td&gt;utonal&lt;br /&gt;
| 1–7/6–11/8–7/4
&lt;/td&gt;
| Mothwellsmic
    &lt;/tr&gt;
|
    &lt;tr&gt;
| [[File:Orwell_0_1_2_8_22edo.mp3]]
        &lt;td&gt;7&lt;br /&gt;
|-
&lt;/td&gt;
| 10
        &lt;td&gt;0-3-6&lt;br /&gt;
| 0–1–3–8
&lt;/td&gt;
| 1–7/6–8/5–7/4
        &lt;td&gt;1-8/5-9/7&lt;br /&gt;
| Zeus
&lt;/td&gt;
|
        &lt;td&gt;marvel&lt;br /&gt;
| [[File:Orwell_0_1_3_8_22edo.mp3]]
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 11
    &lt;tr&gt;
| 0–2–3–8
        &lt;td&gt;8&lt;br /&gt;
| 1–11/8–8/5–7/4
&lt;/td&gt;
| Orwell
        &lt;td&gt;0-5-6&lt;br /&gt;
|
&lt;/td&gt;
| [[File:Orwell_0_2_3_8_22edo.mp3]]
        &lt;td&gt;1-12/11-14/11&lt;br /&gt;
|-
&lt;/td&gt;
| 12
        &lt;td&gt;otonal&lt;br /&gt;
| 0–2–5–8
&lt;/td&gt;
| 1–11/10–11/8–7/4
    &lt;/tr&gt;
| Minerva
    &lt;tr&gt;
|
        &lt;td&gt;9&lt;br /&gt;
| [[File:Orwell_0_2_5_8_22edo.mp3]]
&lt;/td&gt;
|-
        &lt;td&gt;0-1-7&lt;br /&gt;
| 13
&lt;/td&gt;
| 0–3–5–8
        &lt;td&gt;1-7/6-3/2&lt;br /&gt;
| 1–11/10–8/5–7/4
&lt;/td&gt;
| Valinorsmic
        &lt;td&gt;otonal&lt;br /&gt;
|
&lt;/td&gt;
| [[File:Orwell_0_3_5_8_22edo.mp3]]
    &lt;/tr&gt;
|-
    &lt;tr&gt;
| 14
        &lt;td&gt;10&lt;br /&gt;
| 0–1–6–8
&lt;/td&gt;
| 1–7/6–14/11–7/4
        &lt;td&gt;0-2-7&lt;br /&gt;
| Utonal
&lt;/td&gt;
|
        &lt;td&gt;1-11/8-3/2&lt;br /&gt;
| [[File:Orwell_0_1_6_8_22edo.mp3]]
&lt;/td&gt;
|-
        &lt;td&gt;otonal&lt;br /&gt;
| 15
&lt;/td&gt;
| 0–3–6–8
    &lt;/tr&gt;
| 1–9/7–8/5–7/4
    &lt;tr&gt;
| Minerva
        &lt;td&gt;11&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;0-5-7&lt;br /&gt;
|-
&lt;/td&gt;
| 16
        &lt;td&gt;1-12/11-3/2&lt;br /&gt;
| 0–5–6–8
&lt;/td&gt;
| 1–11/10–9/7–7/4
        &lt;td&gt;utonal&lt;br /&gt;
| Orwell
&lt;/td&gt;
|
    &lt;/tr&gt;
|
    &lt;tr&gt;
|-
        &lt;td&gt;12&lt;br /&gt;
| 17
&lt;/td&gt;
| 0–1–7–8
        &lt;td&gt;0-6-7&lt;br /&gt;
| 1–7/6–3/2–7/4
&lt;/td&gt;
| Ambitonal
        &lt;td&gt;1-9/7-3/2&lt;br /&gt;
| [[12:14:18:21]], [[14:18:21:24]]<br>[[9-odd-limit]] [[ASS]]
&lt;/td&gt;
|
        &lt;td&gt;utonal&lt;br /&gt;
|-
&lt;/td&gt;
| 18
    &lt;/tr&gt;
| 0–2–7–8
    &lt;tr&gt;
| 1–11/8–3/2–7/4
        &lt;td&gt;13&lt;br /&gt;
| Otonal
&lt;/td&gt;
|
        &lt;td&gt;0-1-8&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;1-7/6-7/4&lt;br /&gt;
| 19
&lt;/td&gt;
| 0–5–7–8
        &lt;td&gt;utonal&lt;br /&gt;
| 1–11/10–3/2–7/4
&lt;/td&gt;
| Zeus
    &lt;/tr&gt;
|
    &lt;tr&gt;
|
        &lt;td&gt;14&lt;br /&gt;
|-
&lt;/td&gt;
| 20
        &lt;td&gt;0-2-8&lt;br /&gt;
| 0–6–7–8
&lt;/td&gt;
| 1–9/7–3/2–7/4
        &lt;td&gt;1-11/8-7/4&lt;br /&gt;
| Mothwellsmic
&lt;/td&gt;
|
        &lt;td&gt;otonal&lt;br /&gt;
|
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 21
    &lt;tr&gt;
| 0–2–3–10
        &lt;td&gt;15&lt;br /&gt;
| 1–6/5–11/8–8/5
&lt;/td&gt;
| Keenanismic
        &lt;td&gt;0-3-8&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;1-8/5-7/4&lt;br /&gt;
|-
&lt;/td&gt;
| 22
        &lt;td&gt;valinorsmic&lt;br /&gt;
| 0–2–5–10
&lt;/td&gt;
| 1–11/10–6/5–11/8
    &lt;/tr&gt;
| Zeus
    &lt;tr&gt;
|
        &lt;td&gt;16&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;0-5-8&lt;br /&gt;
| 23
&lt;/td&gt;
| 0–3–5–10
        &lt;td&gt;1-11/10-7/4&lt;br /&gt;
| 1–11/10–6/5–8/5
&lt;/td&gt;
| Otonal
        &lt;td&gt;valinorsmic&lt;br /&gt;
|
&lt;/td&gt;
|
    &lt;/tr&gt;
|-
    &lt;tr&gt;
| 24
        &lt;td&gt;17&lt;br /&gt;
| 0–2–7–10
&lt;/td&gt;
| 1–6/5–11/8–3/2
        &lt;td&gt;0-6-8&lt;br /&gt;
| Zeus
&lt;/td&gt;
|
        &lt;td&gt;1-14/11-7/4&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;utonal&lt;br /&gt;
| 25
&lt;/td&gt;
| 0–5–7–10
    &lt;/tr&gt;
| 1–12/11–6/5–3/2
    &lt;tr&gt;
| Utonal
        &lt;td&gt;18&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;0-7-8&lt;br /&gt;
|-
&lt;/td&gt;
| 26
        &lt;td&gt;1-3/2-7/4&lt;br /&gt;
| 0–2–8–10
&lt;/td&gt;
| 1–6/5–11/8–7/4
        &lt;td&gt;otonal&lt;br /&gt;
| Orwellian
&lt;/td&gt;
|
    &lt;/tr&gt;
|
    &lt;tr&gt;
|-
        &lt;td&gt;19&lt;br /&gt;
| 27
&lt;/td&gt;
| 0–3–8–10
        &lt;td&gt;0-2-10&lt;br /&gt;
| 1–6/5–8/5–7/4
&lt;/td&gt;
| Zeus
        &lt;td&gt;1-11/8-6/5&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;keenanismic&lt;br /&gt;
|-
&lt;/td&gt;
| 28
    &lt;/tr&gt;
| 0–5–8–10
    &lt;tr&gt;
| 1–11/10–6/5–7/4
        &lt;td&gt;20&lt;br /&gt;
| Zeus
&lt;/td&gt;
|
        &lt;td&gt;0-3-10&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;1-8/5-6/5&lt;br /&gt;
| 29
&lt;/td&gt;
| 0–7–8–10
        &lt;td&gt;otonal&lt;br /&gt;
| 1–6/5–3/2–7/4
&lt;/td&gt;
| Keenanismic
    &lt;/tr&gt;
|
    &lt;tr&gt;
|
        &lt;td&gt;21&lt;br /&gt;
|-
&lt;/td&gt;
| 30
        &lt;td&gt;0-5-10&lt;br /&gt;
| 0–1–3–11
&lt;/td&gt;
| 1–7/6–7/5–8/5
        &lt;td&gt;1-11/10-6/5&lt;br /&gt;
| Keenanismic
&lt;/td&gt;
|
        &lt;td&gt;otonal&lt;br /&gt;
|
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 31
    &lt;tr&gt;
| 0–3–5–11
        &lt;td&gt;22&lt;br /&gt;
| 1–11/10–7/5–8/5
&lt;/td&gt;
| Otonal
        &lt;td&gt;0-7-10&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;1-3/2-6/5&lt;br /&gt;
|-
&lt;/td&gt;
| 32
        &lt;td&gt;utonal&lt;br /&gt;
| 0–1–6–11
&lt;/td&gt;
| 1–7/6–14/11–7/5
    &lt;/tr&gt;
| Utonal
    &lt;tr&gt;
|
        &lt;td&gt;23&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;0-8-10&lt;br /&gt;
| 33
&lt;/td&gt;
| 0–3–6–11
        &lt;td&gt;1-7/4-6/5&lt;br /&gt;
| 1–9/7–7/5–8/5
&lt;/td&gt;
| Minerva
        &lt;td&gt;keenanismic&lt;br /&gt;
|
&lt;/td&gt;
|
    &lt;/tr&gt;
|-
    &lt;tr&gt;
| 34
        &lt;td&gt;24&lt;br /&gt;
| 0–5–6–11
&lt;/td&gt;
| 1–11/10–9/7–7/5
        &lt;td&gt;0-1-11&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
        &lt;td&gt;1-7/6-7/5&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;utonal&lt;br /&gt;
| 35
&lt;/td&gt;
| 0–1–8–11
    &lt;/tr&gt;
| 1–7/6–7/5–7/4
    &lt;tr&gt;
| Utonal
        &lt;td&gt;25&lt;br /&gt;
| [[70:84:105:120|1/(12:10:8:7)]]
&lt;/td&gt;
|
        &lt;td&gt;0-3-11&lt;br /&gt;
|-
&lt;/td&gt;
| 36
        &lt;td&gt;1-8/5-7/5&lt;br /&gt;
| 0–3–8–11
&lt;/td&gt;
| 1–7/5–8/5–7/4
        &lt;td&gt;otonal&lt;br /&gt;
| Valinorsmic
&lt;/td&gt;
|
    &lt;/tr&gt;
|
    &lt;tr&gt;
|-
        &lt;td&gt;26&lt;br /&gt;
| 37
&lt;/td&gt;
| 0–5–8–11
        &lt;td&gt;0-5-11&lt;br /&gt;
| 1–11/10–7/5–7/4
&lt;/td&gt;
| Minerva
        &lt;td&gt;1-11/10-7/5&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;otonal&lt;br /&gt;
|-
&lt;/td&gt;
| 38
    &lt;/tr&gt;
| 0–6–8–11
    &lt;tr&gt;
| 1–14/11–7/5–7/4
        &lt;td&gt;27&lt;br /&gt;
| Utonal
&lt;/td&gt;
|
        &lt;td&gt;0-6-11&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;1-14/11-7/5&lt;br /&gt;
| 39
&lt;/td&gt;
| 0–3–10–11
        &lt;td&gt;utonal&lt;br /&gt;
| 1–6/5–7/5–8/5
&lt;/td&gt;
| Otonal
    &lt;/tr&gt;
| [[4:5:6:7]]
    &lt;tr&gt;
|
        &lt;td&gt;28&lt;br /&gt;
|-
&lt;/td&gt;
| 40
        &lt;td&gt;0-8-11&lt;br /&gt;
| 0–5–10–11
&lt;/td&gt;
| 1–11/10–6/5–7/5
        &lt;td&gt;1-7/4-7/5&lt;br /&gt;
| Otonal
&lt;/td&gt;
|
        &lt;td&gt;utonal&lt;br /&gt;
|
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 41
    &lt;tr&gt;
| 0–8–10–11
        &lt;td&gt;29&lt;br /&gt;
| 1–6/5–7/5–7/4
&lt;/td&gt;
| Keenanismic
        &lt;td&gt;0-10-11&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;1-6/5-7/5&lt;br /&gt;
|-
&lt;/td&gt;
| 42
        &lt;td&gt;otonal&lt;br /&gt;
| 0–1–2–12
&lt;/td&gt;
| 1–7/6–11/8–18/11
    &lt;/tr&gt;
| Big brother
    &lt;tr&gt;
|
        &lt;td&gt;30&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;0-1-12&lt;br /&gt;
| 43
&lt;/td&gt;
| 0–2–5–12
        &lt;td&gt;1-7/6-18/11&lt;br /&gt;
| 1–11/10–11/8–18/11
&lt;/td&gt;
| Biyatismic
        &lt;td&gt;swetismic&lt;br /&gt;
|
&lt;/td&gt;
|
    &lt;/tr&gt;
|-
    &lt;tr&gt;
| 44
        &lt;td&gt;31&lt;br /&gt;
| 0–1–6–12
&lt;/td&gt;
| 1–7/6–9/7–18/11
        &lt;td&gt;0-2-12&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
        &lt;td&gt;1-11/8-18/11&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;biyatismic&lt;br /&gt;
| 45
&lt;/td&gt;
| 0–5–6–12
    &lt;/tr&gt;
| 1–12/11–14/11–18/11
    &lt;tr&gt;
| Otonal
        &lt;td&gt;32&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;0-5-12&lt;br /&gt;
|-
&lt;/td&gt;
| 46
        &lt;td&gt;1-12/11-18/11&lt;br /&gt;
| 0–1–7–12
&lt;/td&gt;
| 1–7/6–3/2–18/11
        &lt;td&gt;otonal&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
    &lt;/tr&gt;
|
    &lt;tr&gt;
|-
        &lt;td&gt;33&lt;br /&gt;
| 47
&lt;/td&gt;
| 0–2–7–12
        &lt;td&gt;0-6-12&lt;br /&gt;
| 1–11/8–3/2–18/11
&lt;/td&gt;
| Biyatismic
        &lt;td&gt;1-9/7-18/11&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;utonal&lt;br /&gt;
|-
&lt;/td&gt;
| 48
    &lt;/tr&gt;
| 0–5–7–12
    &lt;tr&gt;
| 1–12/11–3/2–18/11
        &lt;td&gt;34&lt;br /&gt;
| Ambitonal
&lt;/td&gt;
| 11-odd-limit ASS
        &lt;td&gt;0-7-12&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;1-3/2-18/11&lt;br /&gt;
| 49
&lt;/td&gt;
| 0–6–7–12
        &lt;td&gt;utonal&lt;br /&gt;
| 1–9/7–3/2–18/11
&lt;/td&gt;
| Utonal
    &lt;/tr&gt;
|
    &lt;tr&gt;
|
        &lt;td&gt;35&lt;br /&gt;
|-
&lt;/td&gt;
| 50
        &lt;td&gt;0-10-12&lt;br /&gt;
| 0–2–10–12
&lt;/td&gt;
| 1–6/5–11/8–18/11
        &lt;td&gt;1-6/5-18/11&lt;br /&gt;
| Zeus
&lt;/td&gt;
|
        &lt;td&gt;biyatismic&lt;br /&gt;
|
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 51
    &lt;tr&gt;
| 0–5–10–12
        &lt;td&gt;36&lt;br /&gt;
| 1–11/10–6/5–18/11
&lt;/td&gt;
| Biyatismic
        &lt;td&gt;0-11-12&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;1-7/5-18/11&lt;br /&gt;
|-
&lt;/td&gt;
| 52
        &lt;td&gt;swetismic&lt;br /&gt;
| 0–7–10–12
&lt;/td&gt;
| 1–6/5–3/2–18/11
    &lt;/tr&gt;
| Biyatismic
    &lt;tr&gt;
|
        &lt;td&gt;37&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;0-2-14&lt;br /&gt;
| 53
&lt;/td&gt;
| 0–1–11–12
        &lt;td&gt;1-11/8-9/8&lt;br /&gt;
| 1–7/6–7/5–18/11
&lt;/td&gt;
| Swetismic
        &lt;td&gt;otonal&lt;br /&gt;
|
&lt;/td&gt;
|
    &lt;/tr&gt;
|-
    &lt;tr&gt;
| 54
        &lt;td&gt;38&lt;br /&gt;
| 0–5–11–12
&lt;/td&gt;
| 1–11/10–7/5–18/11
        &lt;td&gt;0-3-14&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
        &lt;td&gt;1-8/5-9/8&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;marvel&lt;br /&gt;
| 55
&lt;/td&gt;
| 0–6–11–12
    &lt;/tr&gt;
| 1–9/7–7/5–18/11
    &lt;tr&gt;
| Big brother
        &lt;td&gt;39&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;0-6-14&lt;br /&gt;
|-
&lt;/td&gt;
| 56
        &lt;td&gt;1-9/7-9/8&lt;br /&gt;
| 0–10–11–12
&lt;/td&gt;
| 1–6/5–7/5–18/11
        &lt;td&gt;utonal&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
    &lt;/tr&gt;
|
    &lt;tr&gt;
|-
        &lt;td&gt;40&lt;br /&gt;
| 57
&lt;/td&gt;
| 0–2–3–14
        &lt;td&gt;0-7-14&lt;br /&gt;
| 1–9/8–11/8–8/5
&lt;/td&gt;
| Marvel11
        &lt;td&gt;1-3/2-9/8&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;ambitonal&lt;br /&gt;
|-
&lt;/td&gt;
| 58
    &lt;/tr&gt;
| 0–3–6–14
    &lt;tr&gt;
| 1–9/8–9/7–8/5
        &lt;td&gt;41&lt;br /&gt;
| Marvel
&lt;/td&gt;
|
        &lt;td&gt;0-8-14&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;1-7/4-9/8&lt;br /&gt;
| 59
&lt;/td&gt;
| 0–2–7–14
        &lt;td&gt;otonal&lt;br /&gt;
| 1–9/8–11/8–3/2
&lt;/td&gt;
| Otonal
    &lt;/tr&gt;
|
    &lt;tr&gt;
|
        &lt;td&gt;42&lt;br /&gt;
|-
&lt;/td&gt;
| 60
        &lt;td&gt;0-11-14&lt;br /&gt;
| 0–6–7–14
&lt;/td&gt;
| 1–9/8–9/7–3/2
        &lt;td&gt;1-7/5-9/8&lt;br /&gt;
| Utonal
&lt;/td&gt;
| [[28:36:42:63|1/(9:7:6:4)]]
        &lt;td&gt;marvel&lt;br /&gt;
|
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 61
    &lt;tr&gt;
| 0–2–8–14
        &lt;td&gt;43&lt;br /&gt;
| 1–9/8–11/8–7/4
&lt;/td&gt;
| Otonal
        &lt;td&gt;0-12-14&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;1-18/11-9/8&lt;br /&gt;
|-
&lt;/td&gt;
| 62
        &lt;td&gt;utonal&lt;br /&gt;
| 0–3–8–14
&lt;/td&gt;
| 1–9/8–8/5–7/4
    &lt;/tr&gt;
| Minerva
    &lt;tr&gt;
|
        &lt;td&gt;44&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;0-3-17&lt;br /&gt;
| 63
&lt;/td&gt;
| 0–6–8–14
        &lt;td&gt;1-8/5-9/5&lt;br /&gt;
| 1–9/8–9/7–7/4
&lt;/td&gt;
| Mothwellsmic
        &lt;td&gt;otonal&lt;br /&gt;
|
&lt;/td&gt;
|
    &lt;/tr&gt;
|-
    &lt;tr&gt;
| 64
        &lt;td&gt;45&lt;br /&gt;
| 0–7–8–14
&lt;/td&gt;
| 1–9/8–3/2–7/4
        &lt;td&gt;0-5-17&lt;br /&gt;
| Otonal
&lt;/td&gt;
| [[4:6:7:9]]
        &lt;td&gt;1-11/10-9/5&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;otonal&lt;br /&gt;
| 65
&lt;/td&gt;
| 0–3–11–14
    &lt;/tr&gt;
| 1–9/8–7/5–8/5
    &lt;tr&gt;
| Marvel
        &lt;td&gt;46&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;0-6-17&lt;br /&gt;
|-
&lt;/td&gt;
| 66
        &lt;td&gt;1-9/7-9/5&lt;br /&gt;
| 0–6–11–14
&lt;/td&gt;
| 1–9/8–9/7–7/5
        &lt;td&gt;utonal&lt;br /&gt;
| Minerva
&lt;/td&gt;
|
    &lt;/tr&gt;
|
    &lt;tr&gt;
|-
        &lt;td&gt;47&lt;br /&gt;
| 67
&lt;/td&gt;
| 0–8–11–14
        &lt;td&gt;0-7-17&lt;br /&gt;
| 1–9/8–7/5–7/4
&lt;/td&gt;
| Marvel
        &lt;td&gt;1-3/2-9/5&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;utonal&lt;br /&gt;
|-
&lt;/td&gt;
| 68
    &lt;/tr&gt;
| 0–2–12–14
    &lt;tr&gt;
| 1–9/8–11/8–18/11
        &lt;td&gt;48&lt;br /&gt;
| Biyatismic
&lt;/td&gt;
|
        &lt;td&gt;0-10-17&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;1-6/5-9/5&lt;br /&gt;
| 69
&lt;/td&gt;
| 0–6–12–14
        &lt;td&gt;otonal&lt;br /&gt;
| 1–9/8–9/7–18/11
&lt;/td&gt;
| Utonal
    &lt;/tr&gt;
|
    &lt;tr&gt;
|
        &lt;td&gt;49&lt;br /&gt;
|-
&lt;/td&gt;
| 70
        &lt;td&gt;0-11-17&lt;br /&gt;
| 0–7–12–14
&lt;/td&gt;
| 1–9/8–3/2–18/11
        &lt;td&gt;1-7/5-9/5&lt;br /&gt;
| Utonal
&lt;/td&gt;
|
        &lt;td&gt;otonal&lt;br /&gt;
|
&lt;/td&gt;
|-
    &lt;/tr&gt;
| 71
    &lt;tr&gt;
| 0–11–12–14
        &lt;td&gt;50&lt;br /&gt;
| 1–9/8–7/5–18/11
&lt;/td&gt;
| Marvel11
        &lt;td&gt;0-12-17&lt;br /&gt;
|
&lt;/td&gt;
|
        &lt;td&gt;1-18/11-9/5&lt;br /&gt;
|-
&lt;/td&gt;
| 72
        &lt;td&gt;utonal&lt;br /&gt;
| 0–3–5–17
&lt;/td&gt;
| 1–11/10–8/5–9/5
    &lt;/tr&gt;
| Otonal
    &lt;tr&gt;
|
        &lt;td&gt;51&lt;br /&gt;
|
&lt;/td&gt;
|-
        &lt;td&gt;0-14-17&lt;br /&gt;
| 73
&lt;/td&gt;
| 0–3–6–17
        &lt;td&gt;1-9/8-9/5&lt;br /&gt;
| 1–9/7–8/5–9/5
&lt;/td&gt;
| Marvel
        &lt;td&gt;utonal&lt;br /&gt;
|
&lt;/td&gt;
|
    &lt;/tr&gt;
|-
&lt;/table&gt;
| 74
| 0–5–6–17
| 1–11/10–9/7–9/5
| Swetismic
|
|
|-
| 75
| 0–5–7–17
| 1–11/10–3/2–9/5
| Biyatismic
|
|
|-
| 76
| 0–6–7–17
| 1–9/7–3/2–9/5
| Utonal
| [[70:90:105:126|1/(9:7:6:5)]]
|
|-
| 77
| 0–3–10–17
| 1–6/5–8/5–9/5
| Otonal
| [[4:5:6:9]]
|
|-
| 78
| 0–5–10–17
| 1–11/10–6/5–9/5
| Otonal
|
|
|-
| 79
| 0–7–10–17
| 1–6/5–3/2–9/5
| Ambitonal
| [[10:12:15:18]], [[12:15:18:20]]<br>9-odd-limit ASS
|
|-
| 80
| 0–3–11–17
| 1–7/5–8/5–9/5
| Otonal
| [[4:5:7:9]]
|
|-
| 81
| 0–5–11–17
| 1–11/10–7/5–9/5
| Otonal
|
|
|-
| 82
| 0–6–11–17
| 1–9/7–7/5–9/5
| Mothwellsmic
|
|
|-
| 83
| 0–10–11–17
| 1–6/5–7/5–9/5
| Otonal
| [[5:6:7:9]]
|
|-
| 84
| 0–5–12–17
| 1–11/10–18/11–9/5
| Biyatismic
|
|
|-
| 85
| 0–6–12–17
| 1–9/7–18/11–9/5
| Utonal
|
|
|-
| 86
| 0–7–12–17
| 1–3/2–18/11–9/5
| Utonal
|
|
|-
| 87
| 0–10–12–17
| 1–6/5–18/11–9/5
| Biyatismic
|
|
|-
| 88
| 0–11–12–17
| 1–7/5–18/11–9/5
| Swetismic
|
|
|-
| 89
| 0–3–14–17
| 1–9/8–8/5–9/5
| Marvel
|
|
|-
| 90
| 0–6–14–17
| 1–9/8–9/7–9/5
| Utonal
| [[140:180:252:315|1/(9:7:5:4)]]
|
|-
| 91
| 0–7–14–17
| 1–9/8–3/2–9/5
| Utonal
| [[20:30:36:45|1/(9:6:5:4)]]
|
|-
| 92
| 0–11–14–17
| 1–9/8–7/5–9/5
| Marvel
|
|
|-
| 93
| 0–12–14–17
| 1–9/8–18/11–9/5
| Utonal
|
|
|}


&lt;br /&gt;
== Pentads ==
&lt;!-- ws:start:WikiTextHeadingRule:12:&amp;lt;h1&amp;gt; --&gt;&lt;h1 id="toc1"&gt;&lt;a name="Tetrads"&gt;&lt;/a&gt;&lt;!-- ws:end:WikiTextHeadingRule:12 --&gt;Tetrads&lt;/h1&gt;
{| class="wikitable center-1"
|-
! #
! Generators
! Transversal
! Type
! Comment
|-
| 1
| 0–1–2–3–8
| 1–7/6–11/8–8/5–7/4
| Orwell
|
|-
| 2
| 0–2–3–5–8
| 1–11/10–11/8–8/5–7/4
| Orwell
|
|-
| 3
| 0–1–3–6–8
| 1–7/6–9/7–8/5–7/4
| Orwell
|
|-
| 4
| 0–3–5–6–8
| 1–11/10–9/7–8/5–7/4
| Orwell
|
|-
| 5
| 0–1–2–7–8
| 1–7/6–11/8–3/2–7/4
| Big brother
|
|-
| 6
| 0–2–5–7–8
| 1–11/10–11/8–3/2–7/4
| Orwell
|
|-
| 7
| 0–1–6–7–8
| 1–7/6–9/7–3/2–7/4
| Big brother
|
|-
| 8
| 0–5–6–7–8
| 1–11/10–9/7–3/2–7/4
| Orwell
|
|-
| 9
| 0–2–3–5–10
| 1–11/10–6/5–11/8–8/5
| Zeus
|
|-
| 10
| 0–2–5–7–10
| 1–11/10–6/5–11/8–3/2
| Zeus
|
|-
| 11
| 0–2–3–8–10
| 1–6/5–11/8–8/5–7/4
| Orwell
|
|-
| 12
| 0–2–5–8–10
| 1–11/10–6/5–11/8–7/4
| Orwell
|
|-
| 13
| 0–3–5–8–10
| 1–6/5–11/10–8/5–7/4
| Zeus
|
|-
| 14
| 0–2–7–8–10
| 1–6/5–11/8–3/2–7/4
| Orwell
|
|-
| 15
| 0–5–7–8–10
| 1–11/10–6/5–3/2–7/4
| Zeus
|
|-
| 16
| 0–1–3–6–11
| 1–7/6–9/7–7/5–8/5
| Orwell
|
|-
| 17
| 0–3–5–6–11
| 1–11/10–9/7–7/5
| Orwell
|
|-
| 18
| 0–1–3–8–11
| 1–7/6–7/5–8/5–7/4
| Zeus
|
|-
| 19
| 0–3–5–8–11
| 1–11/10–8/5–7/5–7/4
| Minerva
|
|-
| 20
| 0–1–6–8–11
| 1–7/6–14/11–7/5–7/4
| Utonal
| [[770:924:1155:1320:1680|1/(24:20:16:14:11)]]
|-
| 21
| 0–3–6–8–11
| 1–9/7–7/5–8/5–7/4
| Minerva
|
|-
| 22
| 0–5–6–8–11
| 1–11/10–9/7–7/5–7/4
| Orwell
|
|-
| 23
| 0–3–5–10–11
| 1–11/10–6/5–7/5–8/5
| Otonal
| [[4:5:6:7:11]]
|-
| 24
| 0–3–8–10–11
| 1–6/5–7/5–8/5–7/4
| Zeus
|
|-
| 25
| 0–5–8–10–11
| 1–11/10–6/5–7/5–7/4
| Orwell
|
|-
| 26
| 0–1–2–7–12
| 1–7/6–11/8–3/2–18/11
| Big brother
|
|-
| 27
| 0–2–5–7–12
| 1–11/10–11/8–3/2–18/11
| Biyatismic
|
|-
| 28
| 0–1–6–7–12
| 1–7/6–9/7–3/2–18/11
| Big brother
|
|-
| 29
| 0–5–6–7–12
| 1–11/10–9/7–3/2–18/11
| Big brother
|
|-
| 30
| 0–2–5–10–12
| 1–11/10–6/5–11/8–18/11
| Zeus
|
|-
| 31
| 0–2–7–10–12
| 1–6/5–11/8–3/2–18/11
| Zeus
|
|-
| 32
| 0–5–7–10–12
| 1–11/10–6/5–3/2–18/11
| Biyatismic
|
|-
| 33
| 0–1–6–11–12
| 1–7/6–9/7–7/5–18/11
| Big brother
|
|-
| 34
| 0–5–6–11–12
| 1–11/10–9/7–7/5–18/11
| Big brother
|
|-
| 35
| 0–5–10–11–12
| 1–11/10–6/5–7/5–18/11
| Big brother
|
|-
| 36
| 0–2–3–8–14
| 1–9/8–11/8–8/5–7/4
| Orwell
|
|-
| 37
| 0–3–6–8–14
| 1–9/8–9/7–8/5–7/4
| Minerva
|
|-
| 38
| 0–2–7–8–14
| 1–11/8–3/2–7/4–9/8
| Otonal
| [[4:6:7:9:11]]
|-
| 39
| 0–6–7–8–14
| 1–9/8–9/7–3/2–7/4
| Mothwellsmic
|
|-
| 40
| 0–3–6–11–14
| 1–9/8–9/7–7/5–8/5
| Minerva
|
|-
| 41
| 0–3–8–11–14
| 1–9/8–7/5–8/5–7/4
| Minerva
|
|-
| 42
| 0–6–8–11–14
| 1–9/8–9/7–7/5–7/4
| Minerva
|
|-
| 43
| 0–2–7–12–14
| 1–9/8–11/8–3/2–18/11
| Biyatismic
|
|-
| 44
| 0–6–7–12–14
| 1–9/8–9/7–3/2–18/11
| Utonal
| [[462:693:792:1008:1232|1/(24:16:14:11:9)]]
|-
| 45
| 0–6–11–12–14
| 1–9/8–9/7–7/5–18/11
| Orwell
|
|-
| 46
| 0–3–5–6–17
| 1–11/10–9/7–8/5–9/5
| Marvel11
|
|-
| 47
| 0–5–6–7–17
| 1–11/10–9/7–3/2–9/5
| Big brother
|
|-
| 48
| 0–3–5–10–17
| 1–11/10–6/5–8/5–9/5
| Otonal
| [[4:5:6:9:11]]
|-
| 49
| 0–5–7–10–17
| 1–11/10–6/5–3/2–9/5
| Biyatismic
|
|-
| 50
| 0–3–5–11–17
| 1–11/10–7/5–8/5–9/5
| Otonal
| [[4:5:7:9:11]]
|-
| 51
| 0–3–6–11–17
| 1–9/7–7/5–8/5–9/5
| Minerva
|
|-
| 52
| 0–5–6–11–17
| 1–11/10–9/7–7/5–9/5
| Big brother
|
|-
| 53
| 0–3–10–11–17
| 1–6/5–7/5–8/5–9/5
| Otonal
| [[4:5:6:7:9]]
|-
| 54
| 0–5–10–11–17
| 1–11/10–6/5–7/5–9/5
| Otonal
| [[5:6:7:9:11]]
|-
| 55
| 0–5–6–12–17
| 1–11/10–9/7–18/11–9/5
| Big brother
|
|-
| 56
| 0–5–7–12–17
| 1–11/10–3/2–18/11–9/5
| Biyatismic
|
|-
| 57
| 0–6–7–12–17
| 1–9/7–3/2–18/11–9/5
| Utonal
| [[1155:1386:1980:2520:3080|1/(24:20:14:11:9)]]
|-
| 58
| 0–5–10–12–17
| 1–11/10–6/5–18/11–9/5
| Biyatismic
|
|-
| 59
| 0–7–10–12–17
| 1–6/5–3/2–18/11–9/5
| Biyatismic
|
|-
| 60
| 0–5–11–12–17
| 1–11/10–7/5–18/11–9/5
| Big brother
|
|-
| 61
| 0–6–11–12–17
| 1–9/7–7/5–18/11–9/5
| Big brother
|
|-
| 62
| 0–10–11–12–17
| 1–6/5–7/5–18/11–9/5
| Big brother
|
|-
| 63
| 0–3–6–14–17
| 1–9/8–9/7–8/5–9/5
| Marvel
|
|-
| 64
| 0–6–7–14–17
| 1–9/8–9/7–3/2–9/5
| Utonal
| [[210:252:315:360:560|1/(24:20:16:14:9)]]
|-
| 65
| 0–3–11–14–17
| 1–9/8–7/5–8/5–9/5
| Marvel
|
|-
| 66
| 0–6–11–14–17
| 1–9/8–9/7–7/5–9/5
| Minerva
|
|-
| 67
| 0–6–12–14–17
| 1–9/8–9/7–18/11–9/5
| Utonal
| [[924:1155:1320:2016:2464|1/(20:16:14:11:9)]]
|-
| 68
| 0–7–12–14–17
| 1–9/8–3/2–18/11–9/5
| Utonal
| [[330:396:495:720:880|1/(24:20:16:11:9)]]
|-
| 69
| 0–11–12–14–17
| 1–9/8–7/5–18/11–9/5
| Marvel11
|
|}


&lt;table class="wiki_table"&gt;
== Hexads ==
    &lt;tr&gt;
{| class="wikitable center-1"
        &lt;td&gt;Number&lt;br /&gt;
|-
&lt;/td&gt;
! #
        &lt;td&gt;Chord&lt;br /&gt;
! Generators
&lt;/td&gt;
! Transversal
        &lt;td&gt;Transversal&lt;br /&gt;
! Type
&lt;/td&gt;
! Comment
        &lt;td&gt;Type&lt;br /&gt;
|-
&lt;/td&gt;
| 1
        &lt;td&gt;&lt;br /&gt;
| 0–2–3–5–8–10
&lt;/td&gt;
| 1–11/10–6/5–11/8–8/5–7/4
    &lt;/tr&gt;
| Orwell
    &lt;tr&gt;
|
        &lt;td&gt;1&lt;br /&gt;
|-
&lt;/td&gt;
| 2
        &lt;td&gt;0-1-2-3&lt;br /&gt;
| 0–2–5–7–8–10
&lt;/td&gt;
| 1–11/10–6/5–11/8–3/2–7/4
        &lt;td&gt;1-7/6-11/8-8/5&lt;br /&gt;
| Orwell
&lt;/td&gt;
|
        &lt;td&gt;orwellian&lt;br /&gt;
|-
&lt;/td&gt;
| 3
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:0:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/OrwellTetrad22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;OrwellTetrad22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwellTetrad22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:0 --&gt;&lt;br /&gt;
| 0–1–3–6–8–11
&lt;/td&gt;
| 1–7/6–9/7–7/5–8/5–7/4
    &lt;/tr&gt;
| Orwell
    &lt;tr&gt;
|
        &lt;td&gt;2&lt;br /&gt;
|-
&lt;/td&gt;
| 4
        &lt;td&gt;0-2-3-5&lt;br /&gt;
| 0–3–5–6–8–11
&lt;/td&gt;
| 1–11/10–9/7–7/5–8/5–7/4
        &lt;td&gt;1-11/8-8/5-11/10&lt;br /&gt;
| Orwell
&lt;/td&gt;
|
        &lt;td&gt;keenanismic&lt;br /&gt;
|-
&lt;/td&gt;
| 5
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:1:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_2_3_5_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_2_3_5_22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_2_3_5_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:1 --&gt;&lt;br /&gt;
| 0–3–5–8–10–11
&lt;/td&gt;
| 1–11/10–6/5–7/5–8/5–7/4
    &lt;/tr&gt;
| Orwell
    &lt;tr&gt;
|
        &lt;td&gt;3&lt;br /&gt;
|-
&lt;/td&gt;
| 6
        &lt;td&gt;0-1-3-6&lt;br /&gt;
| 0–2–5–7–10–12
&lt;/td&gt;
| 1–11/10–6/5–11/8–3/2–18/11
        &lt;td&gt;1-7/6-8/5-9/7&lt;br /&gt;
| Zeus
&lt;/td&gt;
|
        &lt;td&gt;unimarvel&lt;br /&gt;
|-
&lt;/td&gt;
| 7
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:2:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_1_3_6_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_1_3_6_22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_1_3_6_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:2 --&gt;&lt;br /&gt;
| 0–3–6–8–11–14
&lt;/td&gt;
| 1–9/8–9/7–7/5–8/5–7/4
    &lt;/tr&gt;
| Minerva
    &lt;tr&gt;
|
        &lt;td&gt;4&lt;br /&gt;
|-
&lt;/td&gt;
| 8
        &lt;td&gt;0-3-5-6&lt;br /&gt;
| 0–3–5–6–11–17
&lt;/td&gt;
| 1–11/10–9/7–7/5–8/5–9/5
        &lt;td&gt;1-8/5-11/10-9/7&lt;br /&gt;
| Orwell
&lt;/td&gt;
|
        &lt;td&gt;unimarvel&lt;br /&gt;
|-
&lt;/td&gt;
| 9
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:3:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_3_5_6_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_3_5_6_22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_3_5_6_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:3 --&gt;&lt;br /&gt;
| 0–3–5–10–11–17
&lt;/td&gt;
| 1–11/10–6/5–7/5–8/5–9/5
    &lt;/tr&gt;
| Otonal
    &lt;tr&gt;
| [[4:5:6:7:9:11]]
        &lt;td&gt;5&lt;br /&gt;
|-
&lt;/td&gt;
| 10
        &lt;td&gt;0-1-2-7&lt;br /&gt;
| 0–5–6–7–12–17
&lt;/td&gt;
| 1–11/10–9/7–3/2–18/11–9/5
        &lt;td&gt;1-7/6-11/8-3/2&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
        &lt;td&gt;big brother&lt;br /&gt;
|-
&lt;/td&gt;
| 11
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:4:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_1_2_7_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_1_2_7_22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_1_2_7_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:4 --&gt;&lt;br /&gt;
| 0–5–7–10–12–17
&lt;/td&gt;
| 1–11/10–6/5–3/2–18/11–9/5
    &lt;/tr&gt;
| Biyatismic
    &lt;tr&gt;
|
        &lt;td&gt;6&lt;br /&gt;
|-
&lt;/td&gt;
| 12
        &lt;td&gt;0-2-5-7&lt;br /&gt;
| 0–5–6–11–12–17
&lt;/td&gt;
| 1–11/10–9/7–7/5–18/11–9/5
        &lt;td&gt;1-11/8-11/10-3/2&lt;br /&gt;
| Big brother
&lt;/td&gt;
|
        &lt;td&gt;biyatismic&lt;br /&gt;
|-
&lt;/td&gt;
| 13
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:5:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_2_5_7_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_2_5_7_22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_2_5_7_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:5 --&gt;&lt;br /&gt;
| 0–5–10–11–12–17
&lt;/td&gt;
| 1–11/10–6/5–7/5–18/11–9/5
    &lt;/tr&gt;
| Big brother
    &lt;tr&gt;
|
        &lt;td&gt;7&lt;br /&gt;
|-
&lt;/td&gt;
| 14
        &lt;td&gt;0-1-6-7&lt;br /&gt;
| 0–3–6–11–14–17
&lt;/td&gt;
| 1–9/8–9/7–7/5–8/5–9/5
        &lt;td&gt;1-7/6-9/7-3/2&lt;br /&gt;
| Minerva
&lt;/td&gt;
|
        &lt;td&gt;swetismic&lt;br /&gt;
|-
&lt;/td&gt;
| 15
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:6:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_1_6_7_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_1_6_7_22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_1_6_7_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:6 --&gt;&lt;br /&gt;
| 0–6–7–12–14–17
&lt;/td&gt;
| 1–9/8–9/7–3/2–18/11–9/5
    &lt;/tr&gt;
| Utonal
    &lt;tr&gt;
| [[2310:2772:3465:3960:5040:6160|1/(24:20:16:14:11:9)]]
        &lt;td&gt;8&lt;br /&gt;
|-
&lt;/td&gt;
| 16
        &lt;td&gt;0-5-6-7&lt;br /&gt;
| 0–6–11–12–14–17
&lt;/td&gt;
| 1–9/8–9/7–7/5–18/11–9/5
        &lt;td&gt;1-11/10-9/7-3/2&lt;br /&gt;
| Orwell
&lt;/td&gt;
|
        &lt;td&gt;big brother&lt;br /&gt;
|}
&lt;/td&gt;
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:7:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_5_6_7_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_5_6_7_22edo.mp3&amp;amp;quot; width=&amp;amp;quot;240&amp;amp;quot; height=&amp;amp;quot;20&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_5_6_7_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:7 --&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;9&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-2-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-11/8-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;mothwellsmic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:8:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_1_2_8_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_1_2_8_22edo.mp3&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_1_2_8_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:8 --&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-3-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-8/5-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;!-- ws:start:WikiTextMediaRule:9:&amp;lt;img src=&amp;quot;http://www.wikispaces.com/site/embedthumbnail/file-audio/Orwell_0_1_3_8_22edo.mp3?h=20&amp;amp;w=240&amp;quot; class=&amp;quot;WikiMedia WikiMediaFile&amp;quot; id=&amp;quot;wikitext@@media@@type=&amp;amp;quot;file&amp;amp;quot; key=&amp;amp;quot;Orwell_0_1_3_8_22edo.mp3&amp;amp;quot;&amp;quot; title=&amp;quot;Local Media File&amp;quot;height=&amp;quot;20&amp;quot; width=&amp;quot;240&amp;quot;/&amp;gt; --&gt;&lt;embed src="/s/mediaplayer.swf" pluginspage="http://www.macromedia.com/go/getflashplayer" type="application/x-shockwave-flash" quality="high" width="240" height="20" wmode="transparent" flashvars="file=http%253A%252F%252Fxenharmonic.wikispaces.com%252Ffile%252Fview%252FOrwell_0_1_3_8_22edo.mp3?file_extension=mp3&amp;autostart=false&amp;repeat=false&amp;showdigits=true&amp;showfsbutton=false&amp;width=240&amp;height=20"&gt;&lt;/embed&gt;&lt;!-- ws:end:WikiTextMediaRule:9 --&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;13&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;valinorsmic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-6-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-14/11-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;15&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;16&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;ambitonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;18&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;19&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;20&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;mothwellsmic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;21&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;keenanismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;22&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;23&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;24&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;25&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-12/11-3/2-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;26&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwellian&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;27&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;28&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;29&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;keenanismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;30&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-3-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-8/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;keenanismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;31&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;32&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-6-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-14/11-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;33&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;34&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;35&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;36&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;valinorsmic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;37&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;38&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-14/11-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;39&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-10-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-6/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;40&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-10-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-6/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;41&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-8-10-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/4-6/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;keenanismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;42&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-2-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-11/8-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;43&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;44&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-6-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-9/7-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;45&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-12/11-14/11-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;46&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;47&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;48&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-12/11-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;ambitonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;49&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;50&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-10-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-6/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;51&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-10-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-6/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;52&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-10-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-6/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;53&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-11-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-7/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;swetismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;54&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-11-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-7/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;55&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-11-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;56&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-10-11-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-6/5-7/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;57&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;unimarvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;58&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;59&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;60&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;61&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;62&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;63&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;mothwellsmic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;64&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;65&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-11-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;66&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-11-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;67&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-8-11-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/4-7/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;68&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-12-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-18/11-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;69&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-12-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-18/11-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;70&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-12-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-18/11-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;71&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-11-12-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/5-18/11-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;unimarvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;72&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;73&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;74&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;swetismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;75&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-3/2-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;76&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;77&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-10-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-6/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;78&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-10-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-6/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;79&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-10-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-6/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;ambitonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;80&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;81&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;82&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;mothwellsmic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;83&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-10-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-6/5-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;84&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;85&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;86&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;87&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-10-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-6/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;88&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-11-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;swetismic&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;89&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;90&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;91&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;92&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-11-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/5-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;93&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-12-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-18/11-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
&lt;/table&gt;


&lt;br /&gt;
[[Category:Lists of chords]]
&lt;!-- ws:start:WikiTextHeadingRule:14:&amp;lt;h1&amp;gt; --&gt;&lt;h1 id="toc2"&gt;&lt;a name="Pentads"&gt;&lt;/a&gt;&lt;!-- ws:end:WikiTextHeadingRule:14 --&gt;Pentads&lt;/h1&gt;
[[Category:Dyadic chords]]
[[Category:11-limit]]
 
[[Category:Orwell]]
&lt;table class="wiki_table"&gt;
[[Category:Triads]]
    &lt;tr&gt;
[[Category:Tetrads]]
        &lt;td&gt;Number&lt;br /&gt;
[[Category:Pentads]]
&lt;/td&gt;
[[Category:Hexads]]
        &lt;td&gt;Chord&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;Transversal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;Type&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;1&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-2-3-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-11/8-8/5-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;2&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-5-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-11/10-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;3&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-3-6-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-8/5-9/7-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-6-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-9/7-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-2-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-11/8-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;6&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;7&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-6-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-9/7-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-7-8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-3/2-7/4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;9&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-5-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-11/10-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-7-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-3/2-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;13&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;15&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-3/2-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;16&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-3-6-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-8/5-9/7-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-6-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-9/7-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;18&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-3-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-8/5-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;19&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;20&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-6-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-14/11-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;21&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;22&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;23&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-10-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-6/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;24&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-8-10-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/4-6/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;25&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-8-10-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-7/4-6/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;26&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-2-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-11/8-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;27&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;28&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-6-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-9/7-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;29&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-7-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-3/2-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;30&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-10-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-6/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;31&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-10-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-6/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;32&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-10-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-3/2-6/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;33&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-6-11-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-9/7-7/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;34&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-11-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-7/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;35&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-10-11-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-6/5-7/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;36&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;37&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;38&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;39&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-8-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-7/4-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;mothwellsmic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;40&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-11-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;41&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-8-11-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/4-7/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;42&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-8-11-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/4-7/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;43&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-7-12-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-3/2-18/11-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;44&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-12-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-18/11-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;45&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-11-12-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/5-18/11-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;46&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-6-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-9/7-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;unimarvel&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;47&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-7-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-3/2-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;48&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-10-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-6/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;49&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-10-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-3/2-6/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;50&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;51&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;52&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;53&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-10-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-6/5-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;54&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-10-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-6/5-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;55&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;56&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-3/2-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;57&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;58&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-10-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-6/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;59&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-10-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-6/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;60&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-11-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-7/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;61&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-11-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;62&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-10-11-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-6/5-7/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;63&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;64&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;65&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-11-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-7/5-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;marvel&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;66&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-11-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/5-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;67&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-12-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-18/11-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;68&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-7-12-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-3/2-18/11-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;69&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-11-12-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/5-18/11-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;unimarvel&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
&lt;/table&gt;
 
&lt;br /&gt;
&lt;!-- ws:start:WikiTextHeadingRule:16:&amp;lt;h1&amp;gt; --&gt;&lt;h1 id="toc3"&gt;&lt;a name="Hexads"&gt;&lt;/a&gt;&lt;!-- ws:end:WikiTextHeadingRule:16 --&gt;Hexads&lt;/h1&gt;
 
&lt;table class="wiki_table"&gt;
    &lt;tr&gt;
        &lt;td&gt;Number&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;Chord&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;Transversal&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;Type&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;1&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-3-5-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-8/5-11/10-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;2&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-7-8-10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-3/2-7/4-6/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;3&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-1-3-6-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-7/6-8/5-9/7-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;4&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-6-8-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-9/7-7/4-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-8-10-11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-7/4-6/5-7/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;6&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-2-5-7-10-12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/8-11/10-3/2-6/5-18/11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;zeus&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;7&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-8-11-14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/4-7/5-9/8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;8&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-6-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-9/7-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;9&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-5-10-11-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-11/10-6/5-7/5-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;otonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;10&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-7-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-3/2-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;11&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-7-10-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-3/2-6/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;biyatismic&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;12&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-6-11-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-9/7-7/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;13&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-5-10-11-12-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-11/10-6/5-7/5-18/11-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;big brother&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;14&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-3-6-11-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-8/5-9/7-7/5-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;minerva&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;15&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-7-12-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-3/2-18/11-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;utonal&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
    &lt;tr&gt;
        &lt;td&gt;16&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;0-6-11-12-14-17&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;1-9/7-7/5-18/11-9/8-9/5&lt;br /&gt;
&lt;/td&gt;
        &lt;td&gt;orwell&lt;br /&gt;
&lt;/td&gt;
    &lt;/tr&gt;
&lt;/table&gt;
 
&lt;/body&gt;&lt;/html&gt;</pre></div>
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