tag:blogger.com,1999:blog-7091985729414288302024-02-20T01:26:40.133+01:00Casting I Ching HexagramsUnknownnoreply@blogger.comBlogger49125tag:blogger.com,1999:blog-709198572941428830.post-27535040526007038282022-10-01T22:01:00.003+02:002022-10-02T09:02:17.865+02:00Five I Ching Cards<img border="0" data-original-height="458" data-original-width="334" height="320" style="display:none;" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiOuj3LlVMAGYIikjyzfztpisAAVcKLRC2wIuVPFMu4FWZkC86Z1UfxjTMPBGjx-dQyI2fd2pQGgn7C1GyEAgLemXvU_jJS9OLiYRvY00cwGQQdKJ7l5MGsxBElm6dnOOX1QtxZcU4xhPVw3HOFsywR2UPo12V7bV5LtjJImvYphbfKaURmJjdDGNQ9FQ/s320/elements.jpg" width="233" />
This set of five Cards is inspired to the the traditional <a href="https://en.wikipedia.org/wiki/Wuxing_(Chinese_philosophy)" rel="nofollow" target="_blank">five elements (or five phases)</a> and the relations between them.<p></p>
<br />
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgv-z8u_aSGEhEC30tDpv_0NaS2W0t1vn2w5nZvLVWYNPBs4uDuWXiW84kOfR9szt_y4azN9xl_oN2o4CrqziANuigZRxPHP5L_DuBGkRgCtJX5yQKh1CS3FV-XvPEUrF6nLOwSI0uiRTIORp-S6ILto9Ni_4M3n_g5OKARXRfzdzib4bMcdTQWq5zXtA/s749/5cards-A.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="749" data-original-width="449" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgv-z8u_aSGEhEC30tDpv_0NaS2W0t1vn2w5nZvLVWYNPBs4uDuWXiW84kOfR9szt_y4azN9xl_oN2o4CrqziANuigZRxPHP5L_DuBGkRgCtJX5yQKh1CS3FV-XvPEUrF6nLOwSI0uiRTIORp-S6ILto9Ni_4M3n_g5OKARXRfzdzib4bMcdTQWq5zXtA/w120-h200/5cards-A.png" width="120" /></a>
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj_DAEbYbkzNZOK7CFU8od3epaN_GtIrY4919rKqbu7Hi8u2uSi0vXCGm2Hn-QqDKAatl_14aEVZo0EBGYKFf3gaV8NeZ_JU9OGx63TJwOIOZAFxkQ-BiZQw9xAo-kSThJhbOQTxhm29BatkZ6XYkdSbB9zuHSHxI8qT0CK0sSRZawTvroTiCqcDRtL0A/s749/5cards-B.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="749" data-original-width="449" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj_DAEbYbkzNZOK7CFU8od3epaN_GtIrY4919rKqbu7Hi8u2uSi0vXCGm2Hn-QqDKAatl_14aEVZo0EBGYKFf3gaV8NeZ_JU9OGx63TJwOIOZAFxkQ-BiZQw9xAo-kSThJhbOQTxhm29BatkZ6XYkdSbB9zuHSHxI8qT0CK0sSRZawTvroTiCqcDRtL0A/w120-h200/5cards-B.png" width="120" /></a>
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiSfrw_zErJRd3PddtjMpO9FZeU8HCm2wbBCCwg46zmav5pDKRGWP1Wtzq2NgFxIg9PYbpVVylE8Arl8oDWUa_rtNMLnY74JawDHx7Y1ZG0tE08GPHzIuC_3Yy3_l8-nA2c46cwVQS4v1N2724jiZcBNM4j2PnVPRtGhRRJ9Wh48j170DLb4e5UrIG10Q/s749/5cards-C.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="749" data-original-width="449" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiSfrw_zErJRd3PddtjMpO9FZeU8HCm2wbBCCwg46zmav5pDKRGWP1Wtzq2NgFxIg9PYbpVVylE8Arl8oDWUa_rtNMLnY74JawDHx7Y1ZG0tE08GPHzIuC_3Yy3_l8-nA2c46cwVQS4v1N2724jiZcBNM4j2PnVPRtGhRRJ9Wh48j170DLb4e5UrIG10Q/w120-h200/5cards-C.png" width="120" /></a>
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgBvdH7v3FnwM1Gqo_lefBNwM1lQOV5bfY9Qy1lcps6ynphVdL6IZd6_nnqtbKZv3C86ItygiHmgbIElnyaDI-WbuaCtLs3b99xNf1T9SSSB5om5POtb_MsqfP5B-Wuory1xRZvd1oUbnMcplnfxoU9e9YwVWqII9rq-tXkV58iRxYkHOOz-k5oAOjW7A/s749/5cards-D.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="749" data-original-width="449" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgBvdH7v3FnwM1Gqo_lefBNwM1lQOV5bfY9Qy1lcps6ynphVdL6IZd6_nnqtbKZv3C86ItygiHmgbIElnyaDI-WbuaCtLs3b99xNf1T9SSSB5om5POtb_MsqfP5B-Wuory1xRZvd1oUbnMcplnfxoU9e9YwVWqII9rq-tXkV58iRxYkHOOz-k5oAOjW7A/w120-h200/5cards-D.png" width="120" /></a>
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgPGIMg7mmudsffWiYs21792qy6U26PAL8loFmrRJCirz9G9VbbDldWLESzlh2GWtDKXQCjmjLnprG4ZpW2MLtfYmZc9guakzuoQ9a3uRqRAaKdS377ZcyZtJmpiNvc6SM3RrWx57Jmxz6yrPaDF98N74gXFYKtDid-oXo-5DSIgEXdWw7phs76t15fhQ/s749/5cards-E.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="749" data-original-width="449" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgPGIMg7mmudsffWiYs21792qy6U26PAL8loFmrRJCirz9G9VbbDldWLESzlh2GWtDKXQCjmjLnprG4ZpW2MLtfYmZc9guakzuoQ9a3uRqRAaKdS377ZcyZtJmpiNvc6SM3RrWx57Jmxz6yrPaDF98N74gXFYKtDid-oXo-5DSIgEXdWw7phs76t15fhQ/w120-h200/5cards-E.png" width="120" /></a>
<br /> <p>
To cast a line you shuffle the five cards and place three of them as shown in the two examples below:</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhHUofrn5p-M4xMejLHBEU56RhmtooOxWcWhxf-m6168Ga4fBDjiWcf7Dtz_vfDkRypEFI1QMwUZEmqUZaw2m3FWgg9oww2wrp9xDOpTknk8fZzVmVhdaQJaH68cNnmxXNej-eLmTpPe_7wB3YLNHwpehkXhAju7xw_cjWMioGP6hY5aF87ZJJO_cEV0g/s713/spread.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="404" data-original-width="713" height="227" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhHUofrn5p-M4xMejLHBEU56RhmtooOxWcWhxf-m6168Ga4fBDjiWcf7Dtz_vfDkRypEFI1QMwUZEmqUZaw2m3FWgg9oww2wrp9xDOpTknk8fZzVmVhdaQJaH68cNnmxXNej-eLmTpPe_7wB3YLNHwpehkXhAju7xw_cjWMioGP6hY5aF87ZJJO_cEV0g/w400-h227/spread.png" width="400" /></a></div><br /><p>Starting from the red symbol and following the connections between the
symbols on the other cards, you'll arrive at the line you got as an
outcome. Chaging lines are in red.</p><p>The two examples above show a non-changing yin line (8) on the left and a changing moving line (6) on the right</p><p>The probability is extremely close to the yarrow stalks one ( ± 0.42%).</p><p><br /></p><p> </p><p> <br /></p>Unknownnoreply@blogger.com0Rome, Metropolitan City of Rome, Italy41.9027835 12.496365513.592549663821153 -22.6598845 70.213017336178837 47.652615499999996tag:blogger.com,1999:blog-709198572941428830.post-5774382676151265182022-09-02T09:05:00.005+02:002022-09-02T12:35:53.410+02:00Ten I Ching cards<img border="0" data-original-height="500" data-original-width="500" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgo4_QF4uUUS6dwc0irmfE-Otj_RN5L9LxAGj2s_e4ZdDZrj78_K26x-GzQN8nzcOv6fp4RU3Pg56Fe070D0shrUDhS6dJalWjhlles16NzyMNfYv7CJJsaH6UPd7UvN5Z930rgC2VryuSrppZtIkceA3gHwgi_n7L1SzLmssYilEnoaJfhFeamDjZgDA/s320/MPC_thumb2.jpg" style="display: none;" width="320" />I've prepared a small deck with 10 cards for those who want to try using card for casting I ching hexagram.<p></p><p>The card images, (full size, ready to be print) are <a href="https://github.com/rdentato/castingiching/releases/download/v1.0.0/8.I.Ching.cards.Ukiyo-e.zip" rel="nofollow">available here</a>.</p><p>For those who do not want to set up their own project on a Print on Demand service, you can order the printed cards directly from <a href="https://www.makeplayingcards.com/sell/marketplace/i-ching-trigrams.html" rel="nofollow" target="_blank">MPC</a>. <br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgy8pLrhbSVskuPAMnd3WMySSgUXXUNrZ_yLntlyRyzCrsbLMeGjbuj9Lx4Dv1_Vqvn4TNyc-upv91jdBGI4UMn2O5mqvCfv01XvRyVLIFU_qDLxJ465_GvVrwTOH3dMBV9VogstJmQvPY44cCkuupUx0pFAl-IOdvtFiWNgmWZUVZE3MiRfWv1DY3nrA/s880/all.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="880" data-original-width="538" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgy8pLrhbSVskuPAMnd3WMySSgUXXUNrZ_yLntlyRyzCrsbLMeGjbuj9Lx4Dv1_Vqvn4TNyc-upv91jdBGI4UMn2O5mqvCfv01XvRyVLIFU_qDLxJ465_GvVrwTOH3dMBV9VogstJmQvPY44cCkuupUx0pFAl-IOdvtFiWNgmWZUVZE3MiRfWv1DY3nrA/s320/all.jpg" width="196" /></a></div><p><br />
You can cast a single line following this process:<br />
</p><ul><li data-xf-list-type="ul">shuffle the eight cards</li><li data-xf-list-type="ul">pick one of them (without turning it)</li><li data-xf-list-type="ul">rotate it at will (again, without looking at the card's face) so to lose track of its orientation</li><li data-xf-list-type="ul">turn the card and look at the top left corner</li><li data-xf-list-type="ul">add 5 to the number of red dots you see there. You'll get 6, 7, 8, or 9 with yarrow stalks probability.</li></ul><p></p><p>Actually, the main purpose of these cards is for meditation on the nature of the trigrams (if you feel inclined to do so) but they be well used for casting hexagrams as any other method.</p><p> The deck also contains two additional cards that can be used for casting lines:</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjLAyZwcTKRxIygqBZpH0483Fd2JFDJfvRqAZf-zSYchgpbRvJvPwGAoKfzf97FPPHFT0bnd8km0t_diSiPcG-mHS5gGHP76BFnNaaPc1pcjtr7Euz4oE_Af32fxPfUw4tnBmZ-8itv39r8Bbeu2YBf3tAsDpQ3qNH6LpyNskh1PcyIlSR7zjIXecZB9Q/s1357/2%20-%20instr.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="614" data-original-width="1357" height="181" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjLAyZwcTKRxIygqBZpH0483Fd2JFDJfvRqAZf-zSYchgpbRvJvPwGAoKfzf97FPPHFT0bnd8km0t_diSiPcG-mHS5gGHP76BFnNaaPc1pcjtr7Euz4oE_Af32fxPfUw4tnBmZ-8itv39r8Bbeu2YBf3tAsDpQ3qNH6LpyNskh1PcyIlSR7zjIXecZB9Q/w400-h181/2%20-%20instr.jpg" width="400" /> </a></div><div class="separator" style="clear: both; text-align: center;"> </div><br /><p><br /></p><p> </p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-42430489619750485782022-01-23T11:18:00.001+01:002022-01-23T11:18:25.147+01:00Two Coins<img border="0" data-original-height="215" data-original-width="342" height="126" style="display:none;" src="https://blogger.googleusercontent.com/img/a/AVvXsEgqhmuGBZxFEsvDlRuy7s6XzRmwxLsvRTVIBqheH1eHtr8W8ywbbn0oR53BhLNLM1O1M1PtMIWN1SdzrjDqapoomrB8mquj3g7TXRlZAN10QlWPcSxvmuhw9ajnoC5FfA2nUKORxsxUkQhUD-i3YuHTrlJM5_GtxsWUFgXKsO_3E_wflccaqhLzidciYw=w200-h126" width="200" />
Another method, with only two coins, I learned from <a href="https://www.onlineclarity.co.uk/learn/ways-to-consult-the-i-ching/2-coins/" target="_blank">Clarity</a>
</p>
<ol><li>Throw the two coins.<br /> If they both show <b>head</b> count 2 otherwise count 3<br /></li><li>Throw the two cons again<br /> Count 2 for each <b>head </b>and 3 for each <b>tail</b>.</li><li>Sum it all up and draw the resulting line according the following table:<br />
<table class="center" style="width: 340px;">
<tbody>
<tr><td align="center" style="font-size: large; font-weight: bold; text-align: center;" width="25%">6</td>
<td style="font-size: large; font-weight: bold; text-align: center;" width="25%">7</td>
<td style="font-size: large; font-weight: bold; text-align: center;" width="25%">8</td>
<td style="font-size: large; font-weight: bold; text-align: center;" width="25%">9</td></tr>
<tr>
<td style="text-align: center;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqKQHSL1r6lZ3O6gyIbk6N8Tscg2D7_OPrVC9N6WLSK3hwBNmECtBNgGUZyUCHOxoSDBL9L9l-2LE3CPc4t3bUwI4XTyWcb39nEWh2pKdPcqlmSZ582LOKgiWAc90GHn4QPNBgrxuJbZx7/s1600/6.jpg" /></td>
<td style="text-align: center;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" /></td>
<td style="text-align: center;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" /></td>
<td style="text-align: center;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUgfVENqLAqtmuWaV_cEhiwsommhs_GAmJ9xqhKYOBcTAuWsoV5eaxQEd5m5iJGXpA0-d23lioLszCNX1hN5EimVbyJzoZzRrx20ST1kWgBF5W5T67kfT3caJMIuP3CloVq0bF0p79jMfr/s1600/9.jpg" /></td>
</tr>
</tbody></table>
</li><li>Repeat steps 1 and 2 other five times drawing the resulting lines from the bottom to the top of the hexagram.
</li></ol>
<h4>
Probabilities</h4><p>This method generates lines with the same probabilities as the yarrow stalk method because the odds of getting 2 in the first throw are <sup>1</sup>/<sub>4</sub>. </p><p>For each of the possible eight outcomes, probabilities are:<br />
</p><table class="center" style="width: 340px;">
<tbody>
<tr>
<td width="90px">2+2+2 = 6</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqKQHSL1r6lZ3O6gyIbk6N8Tscg2D7_OPrVC9N6WLSK3hwBNmECtBNgGUZyUCHOxoSDBL9L9l-2LE3CPc4t3bUwI4XTyWcb39nEWh2pKdPcqlmSZ582LOKgiWAc90GHn4QPNBgrxuJbZx7/s1600/6.jpg" width="45" /></td><td> <sup>1</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>1</sup>/<sub>16</sub> </td></tr>
<tr>
<td>2+2+3 = 7</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="45" /></td><td> <sup>1</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>1</sup>/<sub>16</sub> </td></tr>
<tr>
<td>2+3+2 = 7</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="45" /></td><td> <sup>1</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>1</sup>/<sub>16</sub> </td></tr>
<tr>
<td>2+3+3 = 8</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="45" /></td><td> <sup>1</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>1</sup>/<sub>16</sub> </td></tr>
<tr>
<td>3+2+2 = 7</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="45" /></td><td> <sup>3</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>3</sup>/<sub>16</sub> </td></tr>
<tr>
<td>3+2+3 = 8</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="45" /></td><td> <sup>3</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>3</sup>/<sub>16</sub> </td></tr>
<tr>
<td>3+3+2 = 8</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="45" /></td><td> <sup>3</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>3</sup>/<sub>16</sub> </td></tr>
<tr>
<td>3+3+3 = 9</td><td><img border="0" height="20" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUgfVENqLAqtmuWaV_cEhiwsommhs_GAmJ9xqhKYOBcTAuWsoV5eaxQEd5m5iJGXpA0-d23lioLszCNX1hN5EimVbyJzoZzRrx20ST1kWgBF5W5T67kfT3caJMIuP3CloVq0bF0p79jMfr/s1600/9.jpg" width="45" /></td><td> <sup>3</sup>/<sub>4</sub> * <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>2</sub> = <sup>3</sup>/<sub>16</sub> </td>
</tr>
</tbody></table><p> </p><p> Meaning that:<br />
</p><div>
<span class="prob">Prob</span>(6) = <sup>1</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(8) = <sup>7</sup>/<sub>16</sub> = <sup>1</sup>/<sub>16</sub> + <sup>3</sup>/<sub>16</sub> + <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(7) = <sup>5</sup>/<sub>16</sub> = <sup>1</sup>/<sub>16</sub> + <sup>1</sup>/<sub>16</sub> + <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(9) = <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<br /><br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-62419044704208956772021-06-28T15:56:00.008+02:002021-07-01T13:03:03.553+02:00Seven Cards (reprise)<p><img border="0" data-original-height="267" data-original-width="300" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgZPEY98nbkU1H-rqwO4jik7WeegfWgDMqia1LdXTnGVxnG3-Dh6OHQgBe8s8Ha28Q9vR1xILrdsyu2fmjYIvpz8oMa770Ts1mrFq3_n84DFsfKw5uKHedK-L9MdeVmVGNXBWeDcQNyApQa/s0/Dragicon.png" style="display: none;" />
After some test with the <a href="https://www.castingiching.com/2021/05/one-card-or-two-or-seven.html">Seven Cards method</a> that I posted some time ago, I decided to design a variant with larger (tarot sized) cards. I don't believe I can get any simpler than this. </p><p>I also decided to take an extra step asking an artist to draw two original illustrations for the two sides of the card. I went with the traditional theme Dragon/Tiger.<br /></p><p>I'm extremely pleased of the work she did and I'm sure you'll like it too. You can find more of the artist's work on her <a href="https://www.instagram.com/nariel_enii/" rel="nofollow" target="_blank">Instagram account</a>,</p><p>Below, the two sides of each card:</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg2fsTGSlv0-pSRKgMoQkaqdnCiYkBbAVQbrBQFpd3ppheXcSiN1si_AEdolAABAfvFZfbTcBdrLE3PTTLOVWokw_rIzvUcFOA_fhuRlpLViNvXbLh4va347pM7HDT0t9hzcUW46_9GilZy/s668/Dragon_small.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="400" data-original-width="668" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg2fsTGSlv0-pSRKgMoQkaqdnCiYkBbAVQbrBQFpd3ppheXcSiN1si_AEdolAABAfvFZfbTcBdrLE3PTTLOVWokw_rIzvUcFOA_fhuRlpLViNvXbLh4va347pM7HDT0t9hzcUW46_9GilZy/s320/Dragon_small.png" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg4eAzhJ0jEHvo21kfZ3yzAs5UY6_s4_4rVFyw_yPTjlvd5sZncxIV_aR3xGy8sCpHjQWkNIKN3xFrelMiCzJh7NxrmIkreM_AWWvq1omRaeYnGQgi2E73I9Lg5dzXq-w8NnzGW82zhoVD3/s668/Tiger_small.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="400" data-original-width="668" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg4eAzhJ0jEHvo21kfZ3yzAs5UY6_s4_4rVFyw_yPTjlvd5sZncxIV_aR3xGy8sCpHjQWkNIKN3xFrelMiCzJh7NxrmIkreM_AWWvq1omRaeYnGQgi2E73I9Lg5dzXq-w8NnzGW82zhoVD3/s320/Tiger_small.png" width="320" /></a></div><br /><p>You'll use seven of such cards but their use is slightly different from the previous method; you place them as shown below:</p><p></p><p></p><p style="text-align: center;"><img alt="" src="data:image/png;base64,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" /></p><p style="text-align: left;">and the line in the low left corner is the line you recieved. If there are two identical ideograms (one red, the other black) at the bottom center, then it's a moving line.</p><p style="text-align: left;">You stack the cards one on top of the other to record the lines until you will receive the full hexagram (and the related one) as shown below:</p><p style="text-align: left;"></p><p style="text-align: left;"></p><p style="text-align: center;"><img alt="" src="data:image/png;base64,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" /></p><p style="text-align: left;">I'll probably print them trhough a print on demand service to get the feeling of using them for real.</p><p style="text-align: left;"><br /></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-85835828709168829322021-05-22T12:40:00.001+02:002021-06-29T09:40:33.108+02:00Two dice (2d12)<p><img border="0" data-original-height="1089" data-original-width="1137" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEilyLeePaxBgmPoCWLyHdWET0GikHQ-UPO4cmyYPpTWGRvEcQoW5Xf1V4tTOAnI6uC6blMjxovQdXTCE69FzR0CY5D1mct-2H5hXQHbB9UsfyZc3dqvb91W832cSy2HI4Hb1V7qPwksmC41/s320/D12_regular_dodecahedron.JPG" style="display: none;" width="320" />
You can mark two twelve sided dice to make them able to cast lines with the yarrow stalks probabilities.</p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjtJ9sR3Dz-Juz-_OJMDVJ40z3HQdaVD_nA0GHrDCANV1aMEp3AJnRKvWX2nmC3akTJZLcIACIFRhM0tLnqLeyXog48NmIi7ndmcMyz49YbiOQ9x9dfOEQOyEw1a9uszjRHfIiGIF69bR0r/s621/d12_dots.png" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" data-original-height="621" data-original-width="563" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjtJ9sR3Dz-Juz-_OJMDVJ40z3HQdaVD_nA0GHrDCANV1aMEp3AJnRKvWX2nmC3akTJZLcIACIFRhM0tLnqLeyXog48NmIi7ndmcMyz49YbiOQ9x9dfOEQOyEw1a9uszjRHfIiGIF69bR0r/w290-h320/d12_dots.png" width="290" /></a></div>One of the dice has:<p></p><ul style="text-align: left;"><li>Three faces with 3 dots</li><li>All the other faces with 4 dots.</li></ul><p>The other dice has:</p><ul style="text-align: left;"><li>Three faces with 3 dots</li><li>Three faces with 5 dots</li><li>All the other faces with 4 dots.</li></ul><p>To cast a line you just cast the two dice together and sum the dots.</p><p>You'll get 6,7,8 or 9 with yarrow stalks probabilites: <br /></p><h4>
Probabilities <br /></h4><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgULGkzAx3WkuczxHWvZIJYWbuWuRsgKyW-nIyEBnuS0CmKpM3PUeCo5PvdmMB5a4XTKIj2raGNi07OdCtrWGa0aFXoQvWGAkvz8yU3hsOZHtRcsYQYEMxtfNrAP22Ob36VQ_dgDE7EHcU4/s298/d12_tab.png" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" data-original-height="271" data-original-width="298" height="182" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgULGkzAx3WkuczxHWvZIJYWbuWuRsgKyW-nIyEBnuS0CmKpM3PUeCo5PvdmMB5a4XTKIj2raGNi07OdCtrWGa0aFXoQvWGAkvz8yU3hsOZHtRcsYQYEMxtfNrAP22Ob36VQ_dgDE7EHcU4/w200-h182/d12_tab.png" width="200" /></a></div>The table on the right shows all the possible combinations for the two dice. Counting the number of 6,7,8 and 9 it's easy to see that:<br /><br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <sup>9</sup>/<sub>144</sub> = <sup>1</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(8) = <sup>63</sup>/<sub>144</sub> = <sup>7</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(7) = <sup>45</sup>/<sub>144</sub> = <sup>5</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(9) = <sup>27</sup>/<sub>144</sub> = <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub></div>
<h4>
Variations</h4><p>To get lines with 3 coins probability, mark the first dice as follows:</p><ul style="text-align: left;"><li>Six faces with 3 dots</li><li>Six faces with 4 dots </li></ul><p> </p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-77465264999612256782021-05-17T14:37:00.006+02:002021-05-18T08:46:14.943+02:00Spinning dice <p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEguiuEPFoTqe-eRsyjiKAzkJ0DiaD_PZ3eENq98dw14P3f3Na-oCGsnG1ga6b3XlTxOJhrJUWGPppaoGJPQJaiu49bdDmbuL7p3uUxFkCSP721yRZErE4RQ-PbwjLt0IUI5l0w5VBm5TT5q/s896/spinningdice.png" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="584" data-original-width="896" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEguiuEPFoTqe-eRsyjiKAzkJ0DiaD_PZ3eENq98dw14P3f3Na-oCGsnG1ga6b3XlTxOJhrJUWGPppaoGJPQJaiu49bdDmbuL7p3uUxFkCSP721yRZErE4RQ-PbwjLt0IUI5l0w5VBm5TT5q/s320/spinningdice.png" width="320" /></a></div>The picture on the left is the 3D reconstruction of a simple device I made long time ago. Unfortunately I lost it and never made another one, so I created this 3D model to show how it worked.<p></p><p>To make one yourself, take two dice, drill a hole in both and make them turn freely around a stick (or a cord).</p><p>Mark the left die faces with 3,4,4,4 dots and the right die faces with 3,4,4,5 dots. <br /></p><p>To cast a line, spin the two dice in opposite directions for as long as you feel appropriate and when you stop them, add the dots. You'll get 6, 7, 8 or 9 with yarrow stalks probabilities.</p><p><br /></p>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-80036191715750049992021-05-11T22:59:00.009+02:002021-06-29T10:05:24.091+02:00Eight cards<p> Yes, I came up with another cards design!</p><p>This time it's for 8 proper cards. With <i>proper</i> I mean that the back has a geometric pattern while the front of each card has a different design:</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhjnwqugOKaNGjMg4rDkfo0JwMSxXteWSAtae0yEtjTzr1_t_AW_tBx2Oq0Zmo2KSF_itChnSo152odLSsEves01fGZo_S-RTCF-i2lnc-cu7_kXg3lmitH3Ad240oBXvXlTmol258RPDz5/s800/allcards.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="539" data-original-width="800" height="432" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhjnwqugOKaNGjMg4rDkfo0JwMSxXteWSAtae0yEtjTzr1_t_AW_tBx2Oq0Zmo2KSF_itChnSo152odLSsEves01fGZo_S-RTCF-i2lnc-cu7_kXg3lmitH3Ad240oBXvXlTmol258RPDz5/w640-h432/allcards.png" width="640" /></a></div><br /><p>and here is the cards back:</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi4EHvdZhpxhDMkc2DR3d3S0-unr4Oj_x8Zz_1gjh8V3_jSkIc7NCF1SJ6RjOx7Mw5Byh3OD9XmItLleTKoEQs9AxGxulmk9uOg3zImmcLieEfSmY53amZXmmUJCqbsrNR30Xs-3jx37pJa/s263/backsmall.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="263" data-original-width="193" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi4EHvdZhpxhDMkc2DR3d3S0-unr4Oj_x8Zz_1gjh8V3_jSkIc7NCF1SJ6RjOx7Mw5Byh3OD9XmItLleTKoEQs9AxGxulmk9uOg3zImmcLieEfSmY53amZXmmUJCqbsrNR30Xs-3jx37pJa/w147-h200/backsmall.png" width="147" /></a></div><p>Each card represents one of the eight trigram with, enclosed in the square, its name in red.</p><p style="text-align: center;"><img height="200" 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" width="145" /></p><p></p><p>At the corners you'll find, in black, a chinese numeral (6,7,8 or 9) and, in red, the associated image (heaven, fire, wind, ...).</p><p>Should you, like me, have troubles remembering traditional chinese numerals, below them there are some black dots. Just add six to the number of dots in the corner and you'll get the numeral value.<br /></p><p></p><p>Using these cards you can cast lines with yarrow stalks probabilites as follows:</p><ul style="text-align: left;"><li>Shuffle the eight cards, mix them and rotate at will.</li><li>Pick a card and rotate it again until you feel satisfied.</li><li>Flip the card and look at the upper left corner (do not change the orientation of the card, being upside down or not is part of the casting process). </li><li>Use the chinese numeral (or the number of dots) to determine the line according to the following table:<br /></li></ul><p style="text-align: center;"><img height="115" 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" width="200" /></p><br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-71919723077572120042021-05-09T21:56:00.285+02:002021-06-29T09:42:31.284+02:00Seven Cards<p><img border="0" data-original-height="308" data-original-width="406" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjBhu59dg8APnsXOEo1GH_OPBdZhACDM5cqvw7TPdObcqscxOzFpU9247agq3XNcHUyz-gx7YKNcyRfK20utTWpZT_UZKPOBhA62IvuhgWfxJYqhKOEQEyHzLNtrfyHHjTerBbBR0m9Udcv/s320/127_card_ico.png" style="display: none;" width="320" /> The post title is a little bit misleading as this is actually the design for a single card, but the best way to use them is to print and use seven of them togheter, hence the name.<br /></p><p>The "one card" I already <a href="https://www.castingiching.com/2016/06/i-ching-one-card.html" target="_blank">presented </a>is rather easy to use but I wanted something more.
I set for myself some requirement for a new card that:</p><ul style="text-align: left;"><li>could generate yarrow stalks probabilites (additional proces for other probabilities would be nice)<br /></li><li>could be usable on its own (one card)</li><li>could be combined with other <i>identical</i> cards to generate a line with a single operation</li><li>could be used with other <i>identical</i> cards to keep track of the lines generated (i.e. removing the need for drawing the hexagram with pen and paper).</li><li>has a table to determine the number of hexagram from the lines</li></ul><p> I tried many different design and, in the end, I decided to print some card using this one (front & back): <br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhi2ZOhj74Ae7DZmA5FQP7QFGmcvQwgPvpjqwZbdJcgQ3AIATOxVaKqSXosSSeyMzi_eEgbR50m1iugJwSyyfHrSh9xwHT2v1QJmW-NSrmUfmdQ5NWUrPSPSxtQPy6mHkWctDD4Xe9U97vK/s1026/127_card_both.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="756" data-original-width="1026" height="295" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhi2ZOhj74Ae7DZmA5FQP7QFGmcvQwgPvpjqwZbdJcgQ3AIATOxVaKqSXosSSeyMzi_eEgbR50m1iugJwSyyfHrSh9xwHT2v1QJmW-NSrmUfmdQ5NWUrPSPSxtQPy6mHkWctDD4Xe9U97vK/w400-h295/127_card_both.png" width="400" /></a></div><p> It's rather cramped but fulfills all my requirements.</p><p><b>Seven cards</b> </p><p>To make full use of this design, you need to print seven cards. Note that the dimensions are such that the design will fit in a standard business card. You can print them on regular paper and glue to an old business card; or you can print use some pre-cut specific paper. Or you can print them through a dedicated shop.</p><p>You use the cards as follows:</p><p></p><ul><li>Pick two cards, flip and turn them at will and pair them as shown in the picture below (forming a sort of "L").</li><li>The front card will tell you if it's a yin or yang line. (look at the top or bottom middle of the card).</li><li>If the two ideograms in the top left corners, one red and the other black, are the same it's a moving line.</li><li>Place the front card so that the line you received is at the bottom (moving lines are those with a red dot on the right).</li><li>Repeat the process other five times, each time laying one card over the other so
that the line at the bottom is visible. (see the right side of the
picture below)</li><li>Place the seventh card on top of the stack in the opposite direction.<br /></li><li>The stacked cards now show both the primary and secondary hexagrams.</li><li>Use the index on the seventh card (or any other method you like) to get the hexagrams number.</li></ul><p></p><p> <a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi9YYSXv3mU-It31fB8DwUj7nDeTyhDLzDIBgzTd4gnxwyiAxtT5_0bkt2bzL7Mub17knpqDnzIubW0F3jM-Q5oQw1ZOTu2ukigz9KePnGUGohTLTaEsVAYl5DLkqaswHgQqyCqgyccY7xd/s1014/exampleBC.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="541" data-original-width="1014" height="342" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi9YYSXv3mU-It31fB8DwUj7nDeTyhDLzDIBgzTd4gnxwyiAxtT5_0bkt2bzL7Mub17knpqDnzIubW0F3jM-Q5oQw1ZOTu2ukigz9KePnGUGohTLTaEsVAYl5DLkqaswHgQqyCqgyccY7xd/w640-h342/exampleBC.png" width="640" /></a></p><p>An example will, hopefully, clarify better. Let's go through the six steps needed to cast the hexagram line by line looking at the picture above and focusing on the two ideograms in the top left corners:<br /></p><ol><li>Same ideograms → Moving line (lay down the card as it is)</li><li>Different ideograms → Non moving line (lay down the card as it is)</li><li>Different ideograms → Non moving line (rotate the card before laying it down)</li><li>
Different ideograms → Non moving line (lay down the card as it is)</li><li>
Same ideograms → Moving line (lay down the card as it is)</li><li>Different ideograms → Non moving line (rotate the card before laying it down) </li></ol><p>Probabilities are the same as the yarrow stalk method.<br /></p><p></p><p></p><p><b>Two cards</b> <br /></p><p>If you do not want to bring with you seven cards, you can go with just two. Simply use the same process described above but draw the diagram using pen and paper instead.</p><p><b>One cards</b> <br /></p><p>And if two cards are still too much to carry around, you can use just one card with two operations for each line:</p><ul style="text-align: left;"><li>Turn and flip the card at will, orient it with the longer side at the bottom and draw the line you see and the red ideogram you see at the top left corner.<br /></li><li>Turn and flip the card at will, orient it with the shorter side at the bottom and draw the black ideogram you see at the top left corner</li><li>If the two ideogram are the same, it's a moving line.<br /></li></ul><p><b>The hexagram index</b></p><p>It may not be apparent at first sight but the circles in the centers can be used to determine the number of the hexagram. The line at the center is line 1 and you move around by matching the other lines.<br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgeC6sYjCE1KOMAQQYVGOaSkz4fTAI3G9AW6ymJnZAoXiDkcfPH5E4mJOYjQDvo5qLErOJvTUyxmMr40ZFNDCa-3-4DjoMaUZtphirXO_NqaQHqHWOLoSNFt0tS2JAhAEvUO8Aqpbk4KBzI/s352/circle.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="348" data-original-width="352" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgeC6sYjCE1KOMAQQYVGOaSkz4fTAI3G9AW6ymJnZAoXiDkcfPH5E4mJOYjQDvo5qLErOJvTUyxmMr40ZFNDCa-3-4DjoMaUZtphirXO_NqaQHqHWOLoSNFt0tS2JAhAEvUO8Aqpbk4KBzI/s320/circle.png" width="320" /></a></div><br /><p>Let's say you got hexagam 59 : </p><p></p><p style="text-align: center;"><img alt="" src="data:image/png;base64,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" /></p><p>Moving from line 1 up, you look at the circle that has a yin line in the center and yang lines around. Then you look top or bottom part of the cirle depending on the third line and so on until you reach the sixth line and get the hexagram number:</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiGD8uvve_N1mxJP0Q_1fpKGe6YI-u2B-sBv0tlfZ3df5ui7yCeJkE6zr458nUh9niqUF-6fmxpU5aFomFFVriNKb3A-YHz8gm0OVfYgGPV6EqAOR-gdy9QgnxHfxkVJ3s3bQuXhesyCLhc/s352/circle2.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="348" data-original-width="352" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiGD8uvve_N1mxJP0Q_1fpKGe6YI-u2B-sBv0tlfZ3df5ui7yCeJkE6zr458nUh9niqUF-6fmxpU5aFomFFVriNKb3A-YHz8gm0OVfYgGPV6EqAOR-gdy9QgnxHfxkVJ3s3bQuXhesyCLhc/s320/circle2.png" width="320" /></a></div><p><br />It needs a little bit of practice but it's not as difficult as it seems.</p><p>You may also think about it as follows:</p><ul style="text-align: left;"><li>Use the two bottom lines to select one of the circles.</li><li>Look for the trigram corresponding to lines 3,4 and 5.</li><li>Use line 6 to select one of the two numbers above the trigram.</li></ul><p style="text-align: center;"><img alt="" src="data:image/png;base64,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" /> </p><p style="text-align: center;"> <br /></p><br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-90296282911743293192021-05-09T14:44:00.005+02:002021-05-09T14:46:25.576+02:00Eight Sticks (reprise)<p><img border="0" data-original-height="224" data-original-width="429" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjPGGxJQScEf7rtDD8XUeRu5fVP-RZX1Q_Ol5n0uXjAXKS7Uj_E5DxBY_xoLofKDbBlF9IF-XRbWY6Z0cNJReMCYedXouKFClGoalWyKtrpOoO28D0tHKUKmSJxj6gLGyfYYHXVH1IUwrCt/s320/8sticks2_1.png" style="display: none;" width="320" /> In a <a href="https://www.castingiching.com/2016/07/i-ching-eight-sticks.html">previous post</a> I hosted an article by Joel Benson who presented a method he devised to use eight sticks. Having fewer stalks to handle (and less steps to take) with respect to the traditional 50 stalks method is much easier!</p><p> After many years, I decided to build for myself a set of eight sticks that followed those priciples. </p><p> I came up with a red/black marking scheme:</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3CVkBsQArOP6kDz5CMk9WZ234mWqw_pfgaHtqbF3TF6DROEfTR3Gz0Y__B4YTcqhVKYY012qmiSMoI2C2QRjRfdFOH_GkGJvdUsY5xTOwNqWAl5Q2ZvnEmBJUOWpIP0nXKGoJjNRcLsb2/s580/immagine.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="422" data-original-width="580" height="291" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3CVkBsQArOP6kDz5CMk9WZ234mWqw_pfgaHtqbF3TF6DROEfTR3Gz0Y__B4YTcqhVKYY012qmiSMoI2C2QRjRfdFOH_GkGJvdUsY5xTOwNqWAl5Q2ZvnEmBJUOWpIP0nXKGoJjNRcLsb2/w400-h291/immagine.png" width="400" /></a></div><p></p><p>to be used as follows:</p><ol style="text-align: left;"><li>Without looking split the stalks in two groups.</li><li>Rotate one group and put the eight stalks together again.</li><li>Repeat steps 1-2 other two times</li><li>Pick one stick covering one of the tips with your hand and look at the other tip:<br /></li><ul><li>If there is a <i>black mark</i>, draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="32" /> , otherwise draw <img align="bottom" border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="32" /> ;<br /></li>
<li>If there is a red mark, it's a moving line.</li></ul></ol><p></p><p>The picture shows the correspondance between marks and lines.</p><p>To remember it easily, you may notice that the black marks represent the <i>central portion</i> of the line, so there is a black mark for solid lines and nothing for broken lines.<br /></p><ol style="text-align: left;"><ul>
</ul></ol><p> Any type of stick will do, as long as they are more or less equal. I quickly made a set using bamboo chopsticks (sorry for the uneven marking, I'm sure you can do better than that!) :</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi4EDqaQMftkMRF1LhUOm6DYWj7qaZ7-sqI7dukqkQxSyQb6JGlA0BvZp1mr93CfJO05MmFgNdw16lYTMNFlqixjTZ57Mok4hymDqTjA2BxYHlbTG34xgOu3HZJRPHsJr_IGX6xH8IFmVQ3/s3251/immagine%25281%2529.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="918" data-original-width="3251" height="147" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi4EDqaQMftkMRF1LhUOm6DYWj7qaZ7-sqI7dukqkQxSyQb6JGlA0BvZp1mr93CfJO05MmFgNdw16lYTMNFlqixjTZ57Mok4hymDqTjA2BxYHlbTG34xgOu3HZJRPHsJr_IGX6xH8IFmVQ3/w521-h147/immagine%25281%2529.png" width="521" /></a></div><p></p><p> I have to say I did not really expect it but it's rather satisfying to shuffle the chopsticks, split them, shuffle them again and so on.</p><p> All in all it's a very nice and portable method with the same statistical properties of the traditional yarrow stalks method, I hope you will want to give them a try.<br /></p>Unknownnoreply@blogger.com0Chill spot Appia antica, Parco dell'Appia Antica, Via della Caffarella, 40, 00178 Roma RM, Italy41.862257799999988 12.520146341.759938507689625 12.3828171984375 41.96457709231035 12.6574754015625tag:blogger.com,1999:blog-709198572941428830.post-65651038644771289462021-05-09T12:13:00.005+02:002021-05-09T13:53:12.381+02:00Magnetic I Ching<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhpw1kSkG0VH-56iJ0iP_kyOHqjfiupNuGoKIHpza8yhnpb952YnlAe8ttJ5CUkzzK77lEt_ys0-nVR48R1i1NgPj5pK469-cMz2o_-kqWDpabz0hK69fJLbkKEWFFJzWb88sJN2pEQZoS0/s188/magnetic.png" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="166" data-original-width="188" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhpw1kSkG0VH-56iJ0iP_kyOHqjfiupNuGoKIHpza8yhnpb952YnlAe8ttJ5CUkzzK77lEt_ys0-nVR48R1i1NgPj5pK469-cMz2o_-kqWDpabz0hK69fJLbkKEWFFJzWb88sJN2pEQZoS0/s0/magnetic.png" /></a></div>I was made aware of a method that used magnets to cast hexgrams. It's an interesting idea developed and commercialized by <i>Paradoxy Products </i>which relates the opposite poles of magnets to <i>yin</i> and <i>yang</i>.<br /><p></p><p>Frankly, I'm not clear why this is advertised as <i>authentic</i> (implying that the other methods are <i>fake</i>?) and <i>direct</i> (like any other method, it randomly selects one of the states of a physical object to draw the hexagram one line at the time, so it's <i>direct</i> or <i>indirect</i> like any other method).</p><p>Nevertheless it is an ingenius method and I'll leave the consideration above to your judgement. You can see the full video on <a href="https://youtu.be/2GN7Lj2XREg" rel="nofollow" target="_blank">YouTube</a>.<br /></p><p>The wooden base has a slot on the top housing a long magnet and, at the bottom, a <i>reaction channel</i> where you can slide two square magnets. </p><p>You flip and turn the square magnets and, when you're satisfied, you slide them in the wooden base from opposite directions. <br /></p><p>The two magnets will repel or attract each other (giving you a broken or a solid line) and will (fully or partially) attract or repel the long magnet above them. </p><p>If a solid line fully repels the long magnet, or if a broken line fully attracts it, then it's a changing line.</p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhN0YJ2JWY5HcniEet6edss4646RqoHIbGuWl1bQyV7W63Ct3QEnQ6zHyUCpgBXVCd2eDywouth15a5snjgnJj7X1-cRh081HpZYAa748GSoSeQvgkN6AEGP3kVhb-NBP2XEG2dJlVSUo3E/s768/magnetic2.png" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" data-original-height="768" data-original-width="691" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhN0YJ2JWY5HcniEet6edss4646RqoHIbGuWl1bQyV7W63Ct3QEnQ6zHyUCpgBXVCd2eDywouth15a5snjgnJj7X1-cRh081HpZYAa748GSoSeQvgkN6AEGP3kVhb-NBP2XEG2dJlVSUo3E/s320/magnetic2.png" /></a></div>I don't have the device so my analysis of probabilites is just a speculation based on the possible outcomes presented in the video at 1:45 and reported in the following picture. Feel free to point out in the comments any suggestion or feedback.<br /><p></p><p></p><p></p><p></p><p>Only 8 of the possible 16 configurations are reported in the picture. Considering how magnetism works I'm inclined to think that those outcome are spread evenly meaning that this method, from a probabilistic point of view, is fully equivalent to the three coins method:<br />
</p><div style="text-align: center;">
<span class="prob">Prob</span>(6) = <span class="prob">Prob</span>(9) = <sup>1</sup>/<sub>8</sub> = 12.5%<br />
<span class="prob">Prob</span>(8) = <span class="prob">Prob</span>(7) = <sup>3</sup>/<sub>8</sub> = 37.5%<br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<br />A definitive conclusion may be made by testing all the 16 possibile configuration and count how many of them gives the results depicted in the figure. Especially, how many configuration fully repel or attract the long magnet.<br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-71266232274810736092017-01-28T14:47:00.002+01:002017-08-24T11:37:03.262+02:00Building an I-Ching bead bracelet<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgJZHQUWfhtF9y2NUXn8-UN9YU3N_0rpHQMDntkv1mJdDFsmgRYYNXBO2bPdw418ojRNkirMf8fPle75EKKS0pRT_eyq9nXckDdlf9rXw5lfPFY9vBiTMx6IfGgi-iQBk-zftTfI6AlzqSD/s1600/beads_make_0.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="205" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgJZHQUWfhtF9y2NUXn8-UN9YU3N_0rpHQMDntkv1mJdDFsmgRYYNXBO2bPdw418ojRNkirMf8fPle75EKKS0pRT_eyq9nXckDdlf9rXw5lfPFY9vBiTMx6IfGgi-iQBk-zftTfI6AlzqSD/s320/beads_make_0.jpg" width="320" /></a></div>
<br />
If you want to build your own <a href="http://www.castingiching.com/2016/05/i-ching-bracelet.html" target="_blank">I Ching bead bracelet</a>, here are some more detailed instructions. Feel free to ask if you need any more clarity.<br />
<br />
<h3>
Types of I-Ching bracelets</h3>
The first step is to decide <i>what</i> are you going to build:<br />
<ol>
<li>A four color bracelet. </li>
<li>A two color bracelet</li>
<li>A single color bracelet</li>
</ol>
I will assume you want a bracelet with yarrow stalks probability, let me know if you're aiming to a different probability distribution.<br />
The bead patterns for each type of bracelet are described at the end of this post.<br />
<br />
<h3>
Procuring the beads </h3>
This can be as simple as recycling an old bracelet or necklace or going to a shop close to you.<br />
Another option is buying from online shops: some are specialized in selling jewelry related items (like <a href="https://www.beadaholique.com/" target="_blank">Beadholic</a>) others are big on line shops that also offer a large variety of beads (like <a href="https://www.aliexpress.com/wholesale?catId=0&initiative_id=SB_20170128011248&SearchText=wooden+beads" target="_blank">Aliexpress</a>). Depending on why you are building an I Ching bracelet (for yourself, as a gift, to sell them, ...) one option might be better than others.<br />
<br />
Here are some examples of beads you can easily buy online:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgs0NWrsdwnnI3MkmQf2A9gNfyVmlexsp2B6yeGHG_imzXs8SM3Q5JvJ7GJ6KAKEipG8gNJhlq8S4509l5Jw-I6CqxE_F9xLHmhWCv9-jJWdskrGkXYFkjtmetB5LOFBhGWXXo2KSiEKDWA/s1600/beads_make_1.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="164" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgs0NWrsdwnnI3MkmQf2A9gNfyVmlexsp2B6yeGHG_imzXs8SM3Q5JvJ7GJ6KAKEipG8gNJhlq8S4509l5Jw-I6CqxE_F9xLHmhWCv9-jJWdskrGkXYFkjtmetB5LOFBhGWXXo2KSiEKDWA/s320/beads_make_1.jpg" width="320" /></a></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjFjr3idpF2J8Xk4NBWSyyvb77T7KH_68RmdKNUlG5QwFxxmTl_xsLI6_2IXB3iN9McQ18zq_dz5NsuLDmTniCS82219C1W1uSFskOGTGhegRsCn14BpqpjoVcnBzImXp_uD2jq9i2DLsUD/s1600/beads_make_2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjFjr3idpF2J8Xk4NBWSyyvb77T7KH_68RmdKNUlG5QwFxxmTl_xsLI6_2IXB3iN9McQ18zq_dz5NsuLDmTniCS82219C1W1uSFskOGTGhegRsCn14BpqpjoVcnBzImXp_uD2jq9i2DLsUD/s320/beads_make_2.jpg" width="320" /></a></div>
<br />
An important point is that<br />
<div style="text-align: center;">
<span style="color: #990000;"><span style="font-size: large;"><b>the only difference between any two beads should be their color</b></span>.</span></div>
This means that you should not mix beads of different size or material to avoid that some bead is selected more often than others.<br />
<br />
<h3>
Choosing a cord</h3>
The cord plays an extremely important part in the bracelet. More precisely, what's important is the thickness of the cord with respect to the hole of the beads:<br />
<ul>
<li>If you use beads on just one color, it should be thick enough so that the beads couldn't cross the knots that separate the beads groups.</li>
<li>If you use more colors, the beads <i>should</i> be able to cross the knot that closes the bracelet itself.</li>
</ul>
You can choose among many colors and material for the cord, including elasic cord that will make the bracelet easy to wear:<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg7yrUVYs0GMimfE6Bcpu3IFKz3F9zJrE69sYDRNvxF_Et_efeIRYvjt6jMWg3SG8PArTr12ykt8EeRVk9zqNTrdI6FQZQebif9d_qfoHQF6BBkY1XgK1DXnKkAXST36FEE2_-kwh76V46z/s1600/beads_make_3.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="194" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg7yrUVYs0GMimfE6Bcpu3IFKz3F9zJrE69sYDRNvxF_Et_efeIRYvjt6jMWg3SG8PArTr12ykt8EeRVk9zqNTrdI6FQZQebif9d_qfoHQF6BBkY1XgK1DXnKkAXST36FEE2_-kwh76V46z/s320/beads_make_3.jpg" width="320" /></a></div>
<h3>
Putting it together</h3>
For two or four color bracelets, the simplest way is to add the beads to the string and tie the string to close bracelet. The most important thing is that<br />
<br />
<div style="text-align: center;">
<span style="color: #990000;"><span style="font-size: large;"><b>there should be no <i>begin</i> or <i>end</i> in the sequence of beads</b></span>.</span></div>
<div style="text-align: center;">
<br /></div>
This is to avoid that some bead become more <i>recognizable</i> than others.<br />
The <a href="https://www.cutoutandkeep.net/projects/marbleized-wood-bead-bracelet" target="_blank">picture below</a> shows a good example of a (non I Ching) bracelet where it is impossible to distinguish a <i>beginning</i> or an <i>end</i>:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh49qi7YLGSPooPivaFV5ilLfk2hJt48g3RonAa1jbRzRJ9vz8ZPktv0ndh6PnXmcoEQaPEttWVa0h8Tan13e86y4FaIR8tbQeVzvF6EoDfF8A_qsPbrBpQ_eqWgjr_Bu-n5FG04L6LIZQj/s1600/beads_make_4.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="186" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh49qi7YLGSPooPivaFV5ilLfk2hJt48g3RonAa1jbRzRJ9vz8ZPktv0ndh6PnXmcoEQaPEttWVa0h8Tan13e86y4FaIR8tbQeVzvF6EoDfF8A_qsPbrBpQ_eqWgjr_Bu-n5FG04L6LIZQj/s400/beads_make_4.jpg" width="400" /></a></div>
<br />
A way to do it is to tuck the closing knots into the hole of one of the beads, so that it becomes invisible, and glue it. <br />
On the <a href="http://madeinaday.com/2016/06/06/wood-stone-bead-bracelets/" target="_blank">Made in a Day</a> blog you can find an illustration on how to tie tight knots:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUdeJWYC_jYeFpPydxPN5soomXI3k_RoMBFOa5lrtNTrASWMJTvn9mhG_Cds1YNg5eokBYP9q716OYV1YOvsGSlrrWJLlxarj0ANqh6TuWejyZfQg57enZOGtI803pZBYMJLQaSBDa9kuC/s1600/beads_make_5.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="181" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUdeJWYC_jYeFpPydxPN5soomXI3k_RoMBFOa5lrtNTrASWMJTvn9mhG_Cds1YNg5eokBYP9q716OYV1YOvsGSlrrWJLlxarj0ANqh6TuWejyZfQg57enZOGtI803pZBYMJLQaSBDa9kuC/s200/beads_make_5.jpg" width="200" /></a></div>
<br />
You may want to try some more complicated ways to put together the beads like <a href="https://youtu.be/SCa_jbvksnI" target="_blank">this one</a>:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiasOWp1HAbM5aGMi05l8_IDnEn37SVUwYOYzX-AN2TfaLC4Yf0SWjj33_CLAPqM1mQqhyhIKusJVT3WU958Ksot4RoyIi2jcb6RN00W1cHX7bEtOmxyCJovS9zOod2EMxos26D12jg1bxl/s1600/beads_make_6.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="113" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiasOWp1HAbM5aGMi05l8_IDnEn37SVUwYOYzX-AN2TfaLC4Yf0SWjj33_CLAPqM1mQqhyhIKusJVT3WU958Ksot4RoyIi2jcb6RN00W1cHX7bEtOmxyCJovS9zOod2EMxos26D12jg1bxl/s320/beads_make_6.jpg" width="320" /></a></div>
Remember that the challenge is to tie the ends so to make it seamless: no begin, no end!<br />
<br />
<h3>
Four color pattern</h3>
Actually, there is no need for a pattern if you're using four color. Say you're using the colors described in the <a href="http://www.castingiching.com/2016/05/method-of-16.html" target="_blank">sexteen marbles</a> method page: <b>1</b> black, <b>7</b> gray, <b>5</b> orange, <b>3</b> red, you can place them as you like best and consider the bracelet as a way to carry your I Ching beads with you. Easier than using a small bag and safer against the risk of losing one of the beads should they fall and scatter around .<br />
Remember: <span style="color: #990000;"><b>make sure that the beads can freely move along the cord</b></span>.<br />
<br />
<h3>
Two color pattern (alternate)</h3>
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiDRtgbIL2dPbfF4rqyrMqAal4DGT2pjTPRjeyAwQBR56tEu86yiOVa9zAu0KdJn_etBnqDDXS5ui6msBB_-me8Od_-qwuC6PkKlreV0xmYnEC2PWKKEAPssi5CXsEwH7tYPOuQYXVqSGPO/s1600/beads_make_8.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="120" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiDRtgbIL2dPbfF4rqyrMqAal4DGT2pjTPRjeyAwQBR56tEu86yiOVa9zAu0KdJn_etBnqDDXS5ui6msBB_-me8Od_-qwuC6PkKlreV0xmYnEC2PWKKEAPssi5CXsEwH7tYPOuQYXVqSGPO/s200/beads_make_8.jpg" width="120" /></a><br />
This is the simplest pattern. Assuming you are using eight black beads and eight white beads, you alternate them with the proportion 1b/5w/7b/3w to allow you to <a href="/2016/05/i-ching-bracelet.html">identify which line corresponds to each bead</a>.<br />
Remember: <span style="color: #990000;"><b>make sure that the beads can freely move along the cord</b></span>.<br />
<br />
<h3>
Two color pattern (De Bruijn)</h3>
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjIvObBj3INY2uXr5fQMEYbMTQu2xmHt1mk3VuTWkgemHpkmaTm1b4UTw3D0Dyp4tKOzQzLsgayNGEZu16wLLKbbPaM3As4HgicQu9YwD8VA1FuGA3zp8334qlKp4rQ41T5qRx5QN7dyCq8/s1600/beads_make_7.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="120" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjIvObBj3INY2uXr5fQMEYbMTQu2xmHt1mk3VuTWkgemHpkmaTm1b4UTw3D0Dyp4tKOzQzLsgayNGEZu16wLLKbbPaM3As4HgicQu9YwD8VA1FuGA3zp8334qlKp4rQ41T5qRx5QN7dyCq8/s200/beads_make_7.jpg" width="120" /></a><br />
This follows a De Bruijn patterns. I like this better than the alternatate pattern but it's a little bit more tricky to <a href="/2016/06/I-ching-memory-wheels.html">use for divination</a>.
<br />
Remember: <span style="color: #990000;"><b>make sure that the beads can freely move along the cord</b></span>.<br />
<br />
<h3>
One color pattern</h3>
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgiPZulbj-aznRQDWffXKbDvsvtj2RmN8ELU1qAWJQQWbsW9HANug0wsy1kN1mN63hzYFyXYa6nY7DSqioUm14zA5VjjAkwOgKepd_q1JelZjM6ybcErCONVDMe44P7ibCGqd_nu8NJ9u5a/s1600/beads_make_9.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="120" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgiPZulbj-aznRQDWffXKbDvsvtj2RmN8ELU1qAWJQQWbsW9HANug0wsy1kN1mN63hzYFyXYa6nY7DSqioUm14zA5VjjAkwOgKepd_q1JelZjM6ybcErCONVDMe44P7ibCGqd_nu8NJ9u5a/s200/beads_make_9.jpg" width="120" /></a><br />
With a single color, which is the one I lke the most, the groups 1:5:7:3 are separated with knots. I prefer to leave the beads a little bit loose on the cord.<br />
Remember: <span style="color: #990000;"><b>make the knots big enough so that the beads can not move over them</b></span>.<br />
<br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-40773511288886669992016-07-10T15:00:00.001+02:002017-08-24T10:52:54.846+02:00Book's page<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEge3Dnu4aLUba4JHTisC50kEtgrZAzSmGQ0pWZifByW0xwZjzsk-2lLK01XS7fcv0fuHM_niVKAnb0B2GfquH7fmr_eEzzK7eyCPPuJoLR_GZzwjac_7OuWoHKUmiqSWr9Gb0oDf3W2TFSs/s1600/fanbook.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="217" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEge3Dnu4aLUba4JHTisC50kEtgrZAzSmGQ0pWZifByW0xwZjzsk-2lLK01XS7fcv0fuHM_niVKAnb0B2GfquH7fmr_eEzzK7eyCPPuJoLR_GZzwjac_7OuWoHKUmiqSWr9Gb0oDf3W2TFSs/s320/fanbook.jpg" width="320" /></a></div>
Book pages can be very helpful to cast I Ching hexagrams. Russell Cottrell devised a simple method that uses <i>even </i>book's pages. Directly from <a href="http://www.onlineclarity.co.uk/friends/showthread.php?22844-An-article-on-creating-I-Ching-hexagam-casting-methods&p=227591#post227591" target="_blank">his post </a>on Clarity:<br />
<ol>
<li>Fan the pages of a book (such as the <i>I Ching</i>).</li>
<li>Very casually divide the pages at a random position, as if cutting a deck of cards.</li>
<li>Look at the last two digits of the number of the even-numbered page (generally on the left).</li>
<li>If it is divisible by four, count it as “tails” or 2.</li>
<li>If not, count it as “heads” or 3.</li>
<li>To make the math easier, subtract a multiple of 4 from the page number, such as 40 or 80.</li>
<li>Three divisions determine one line, just like using coins.</li>
</ol>
[...]
The edges of the pages must be fairly clean and smooth, without irregularities that could throw off the results.<br />
<br />
<br />
<h4>
Probabilities</h4>
As Russel suggested, the probabilities are the same as the <a href="http://www.castingiching.com/2016/05/three-coins.html" target="_blank">three coins method</a>. In fact, picking at random an even number, the chance of it being divisible by 4 is 1/2 and hence:<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <span class="prob">Prob</span>(9) = <sup>1</sup>/<sub>8</sub> = 12.5%<br />
<span class="prob">Prob</span>(8) = <span class="prob">Prob</span>(7) = <sup>3</sup>/<sub>8</sub> = 37.5%<br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-90731347347013293372016-07-03T08:59:00.000+02:002016-07-03T08:59:26.672+02:00Two dice (1d20+1d8)<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiFZEcBtUis5Ad4k0M1jT1-0N8F7yZv7zB-Yno4U_xadHN7_KHMPyZKR0XGZIy3MPskPI0kFqtz023g94Vaa1fFTZq-sC_X3xcCUBE7YfVkD3cg9nbCecKg0aQf0_zeY8pncSn0O2QMWAr6/s1600/1d20%252B1d8.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="103" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiFZEcBtUis5Ad4k0M1jT1-0N8F7yZv7zB-Yno4U_xadHN7_KHMPyZKR0XGZIy3MPskPI0kFqtz023g94Vaa1fFTZq-sC_X3xcCUBE7YfVkD3cg9nbCecKg0aQf0_zeY8pncSn0O2QMWAr6/s200/1d20%252B1d8.jpg" width="200" /></a></div>
This method was devised by Jason A. Wolcott and recorded in the <a href="http://www.luckymojo.com/esoteric/occultism/divination/iching/methods.html" target="_blank">I Ching methods page</a> on the Lucky Mojo site.<br />
It uses two dices: one with 20 faces (1d20) and one with eight faces (1d8) which are very easy to find being commonly used for bard games.<br />
It proceeds as follows:<br />
<ol>
<li>Roll the dice;</li>
<li>Draw the line:
<ul>
<li>If the 20 sided die shows an even number (<b>2</b>,<b>4</b>,<b>...,20</b>), draw <img align="bottom" border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="32" /> ;</li>
<ul>
<li>If the 8 sided die shows <b>1</b>, it's a moving line</li>
</ul>
<li>If the 20 sided die shows an odd number (<b>1</b>,<b>3</b>,<b>...,19</b>), draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="32" /> ;</li>
<ul>
<li> If the 8 sided die shows <b>6</b>, <b>7</b> or <b>8</b>, it's a moving line</li>
</ul>
</ul>
</li>
<li>Repeat steps 1-2 other five times drawing the hexagram from the bottom to the top</li>
</ol>
<h4>
Probabilities</h4>
The 20 sided die gives the nature of the line (yin or yang) with probability 1/2. The process is designed to give the same probability of the Method of 16 one:<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <sup>1</sup>/<sub>2</sub> * <sup>1</sup>/<sub>8</sub> = <sup>1</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(8) = <sup>1</sup>/<sub>2</sub> * <sup>7</sup>/<sub>8</sub> = <sup>7</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(7) = <sup>1</sup>/<sub>2</sub> * <sup>5</sup>/<sub>8</sub> = <sup>5</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(9) = <sup>1</sup>/<sub>2</sub> * <sup>3</sup>/<sub>8</sub> = <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<h4>
Variations</h4>
Since the the 20 sided die is only used for even/odd probability it can be replaced by any die with an even number of faces.Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-20391705240400538942016-07-02T15:39:00.000+02:002017-08-24T10:52:34.446+02:00Eight Sticks<h3 style="text-align: center;">
Improved Yarrow Stalk Divination </h3>
<div style="text-align: center;">
<i>by Joel Benson</i></div>
<div style="text-align: center;">
<i> </i> </div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj196BoiaP9Eu3EvqZkI9uNsPt4CsSSZxY5Wld3YUxeTaJh_dVvZfqJwMaFX76UriCAGK2Nz_2aydOjBuxvBShSw-z5OOcz1M_dxTw3wHK9_9ho7XHMq1HkgLZ-Tl6IL2POMSQVzRoQDmpc/s1600/8sticks_1.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="139" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj196BoiaP9Eu3EvqZkI9uNsPt4CsSSZxY5Wld3YUxeTaJh_dVvZfqJwMaFX76UriCAGK2Nz_2aydOjBuxvBShSw-z5OOcz1M_dxTw3wHK9_9ho7XHMq1HkgLZ-Tl6IL2POMSQVzRoQDmpc/s200/8sticks_1.jpg" width="200" /></a></div>
The traditional forty-nine-stalk method of divination has long been known and has been supplanted by the quicker three-coin method and other relatively rapid modern methods, for example involving special dice or sixteen ritual objects such as colored marbles.<br /> I found it odd that in all the literature I examined, the assumption seems to be that yarrow divination is necessarily limited to the ancient method of sorting, counting and adding random bundles of thin sticks. I decided there has to be an easier way to perform a Yi Jing divination with yarrow, while enhancing the wonderful tactile feel and spiritual presence of yarrow stalks.<br /> After some thought I realized there is a simpler, quicker way to manipulate a limited number of sturdy, relatively thick yarrow stalks to randomly define primary hexagrams using the established Yi Jing yarrow probabilities.<br /> In my improved divination method only eight yarrow stalks are required. I prefer stalks about 10 inches long and about .25 inches in diameter. Each of the stalks has yin and yang ends that are marked in any way that may be preferred to designate old or young yin/yang in the accepted yarrow divination proportions.<br /> My preferred way of marking the eight yang ends of the stalks is to insert a magnetized pin in each yang end. So the yang ends generate magnetic energy in accordance with their yang nature. The yin ends have no such pins and are therefore identified by their receptive, non-energy nature. A black end color is used to designate a single old yin end and three old yang ends, as required for yarrow divination. The remaining ends that are not blackened define seven young yin and five young yang ends.<br /> In the divination ritual, the eight stalks are shuffled and then an end of one stalk is selected at random to designate the first level of the primary hexagram. The selected stalk is then returned to the group of eight, the stalks are shuffled again and a random end of a stalk is selected to define the second level of the primary hexagram. This is continued until the six-line hexagram is defined.<br /> This method is similar to Rule of 16 divinations, except colors need not be memorized and only eight sturdy yarrow stalks are used. Also, the magnetic yang ends may be detected by a compass to add a mystical touch to the divination.<br /> So a few substantial yarrow stalks may be used in an easy, quick and modern style of divination. Following is an image of eight yarrow stalks of the type described and an image of a magnetic pin inserted at the yang end of a stalk to illustrate how the yang ends of the stalks are marked.<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgaNcfyfbaUVJ3JcsSq2rVHWcYCU3Em9-wGT8XkAieQLX0IT6jEO4UbT3iaknjpP3t8mGDem0NUpLBbL8hbFGe1IvT-4V7dDoOuB-OsR406jDDdSjrsLdtmt8-lEzKwdkjZKM4ggaC20xq-/s1600/8sticks_2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="237" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgaNcfyfbaUVJ3JcsSq2rVHWcYCU3Em9-wGT8XkAieQLX0IT6jEO4UbT3iaknjpP3t8mGDem0NUpLBbL8hbFGe1IvT-4V7dDoOuB-OsR406jDDdSjrsLdtmt8-lEzKwdkjZKM4ggaC20xq-/s320/8sticks_2.jpg" width="320" /></a></div>
Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-86070700122423949912016-07-02T14:59:00.000+02:002017-08-24T10:53:37.162+02:00Bagua tablet<img border="0" height="168" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg3t8k-XdjxA12sE73E1KgVzpf0eJ9Ot9Xe8FA4Fq9aVd36HO3YJdEahEtGmJRy_XnWiinoSfjQiWdbkO19G8GQUXeMFWY3Yeh6RyoPXU0-oa1DIxGaTPYHyfL3Su1_a-wFCRtq43Q8apz0/s320/octa_ico.jpg" style="display: none;" width="320" />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiiK71njXMKjJLdKRfyfUohmArawEWoWKOtzYSiqFuiL4fmEvmLVg4XqHM5FrLx4im24mS9xuIia6GV55NEcAIkrPQPUwzx5IXgY6B0sbn5zbQgLeGyfSUGTp9xi4HK4rJhFveI8Gi2cE8g/s1600/octa_both.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="310" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiiK71njXMKjJLdKRfyfUohmArawEWoWKOtzYSiqFuiL4fmEvmLVg4XqHM5FrLx4im24mS9xuIia6GV55NEcAIkrPQPUwzx5IXgY6B0sbn5zbQgLeGyfSUGTp9xi4HK4rJhFveI8Gi2cE8g/s640/octa_both.jpg" width="640" /></a></div>
<br />
<br />
In the picture you can see a simple device to cast hexagrams: an octagonal tablet (around 5cm wide) with one face displaying the <a href="https://en.wikipedia.org/wiki/Bagua" target="_blank">eight trigram</a> in the Fuxi <i>Earlier Heaven</i> arrangement and the other side with trigrams in the King Wen <i>Later Heaven</i> arrangement. Four lines, two on each side, are painted so that three yang (solid) lines and one yin (broken) lines are red.<br />
To cast a hexagram the process is as follows:<br />
<ol>
<li>Turn and flip the tablet without looking;</li>
<li>Stop and put a finger on one of the sides;</li>
<li>Draw the topmost line on that side. If it's red, it's a moving line;</li>
<li>Repeat steps 1-3 other five times drawing the hexgram from bottom to top</li>
</ol>
I built the one you see in the picture with laminated cardboard. You can see it is a little bit damaged in certain points due to the overuse (it has been my preferred method for more than a year). I believe it would be great if casted (or 3d printed) in metal.<br />
<br />
<h4>
Probabilities</h4>
Considering the two faces, the eight sides and the way the red lines are painted, the probabilities are the same as the <a href="http://www.castingiching.com/2016/05/method-of-16.html" target="_blank"><i>Method of 16</i></a>:<br />
<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <sup>1</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(8) = <sup>7</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(7) = <sup>5</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(9) = <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-4321978714148235202016-07-02T10:52:00.000+02:002017-08-24T10:54:59.610+02:00I Ching Book<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgm4OauMP7eU_XjBSpCDhFmORSiG95ghbwlVlBS5FTuFFV4UcmwrY7SDP7gxJhNxx0oUfkh2yPOoN2vdZql0IOs4XOWeG8go8Vr8oewCbnnaJc56QqPCmZyn_47hYfkeGPTRWbvtqqTZ9ZY/s1600/book_1.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="185" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgm4OauMP7eU_XjBSpCDhFmORSiG95ghbwlVlBS5FTuFFV4UcmwrY7SDP7gxJhNxx0oUfkh2yPOoN2vdZql0IOs4XOWeG8go8Vr8oewCbnnaJc56QqPCmZyn_47hYfkeGPTRWbvtqqTZ9ZY/s200/book_1.jpg" width="200" /></a></div>
This method was devised and <a href="http://www.luckymojo.com/avidyana/huntun/i.change-oracle.html" target="_blank">published on the internet</a> by <a href="mailto:nagasiva@yronwode.com" target="_blank">i@no-self</a> in 2001. I took the liberty of changing the procedure a little to make it easier to memorize.<br />
<br />
In this method, an hexagram is selected at random and the line is derived on the basis of the upper and lower trigrams:<br />
<br />
<ol>
<li>Open an I Ching book to a random page and look at the hexagram that page relates to;</li>
<li>If the lower trigram has one or three <i>yin </i>(broken) lines, you got a <i>yin </i>line:</li>
<ul>
<li>if the upper trigram has <i>three </i>broken line, draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqKQHSL1r6lZ3O6gyIbk6N8Tscg2D7_OPrVC9N6WLSK3hwBNmECtBNgGUZyUCHOxoSDBL9L9l-2LE3CPc4t3bUwI4XTyWcb39nEWh2pKdPcqlmSZ582LOKgiWAc90GHn4QPNBgrxuJbZx7/s1600/6.jpg" width="32" /> ;</li>
<li>otherwise draw <img align="bottom" border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="32" /> ;</li>
</ul>
<li>If the lower trigram has one or three <i>yang </i>(solid) lines, you got a <i>yang</i> line:</li>
<ul>
<li>if the upper trigram has <i>exactly one </i>solid line, draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUgfVENqLAqtmuWaV_cEhiwsommhs_GAmJ9xqhKYOBcTAuWsoV5eaxQEd5m5iJGXpA0-d23lioLszCNX1hN5EimVbyJzoZzRrx20ST1kWgBF5W5T67kfT3caJMIuP3CloVq0bF0p79jMfr/s1600/9.jpg" width="32" /> ; </li>
<li>otherwise draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="32" /> ;</li>
</ul>
<li>Repeat steps 1-2 other five times drawing the hexagram from bottom to top.</li>
</ol>
If you find difficult to memorize the rules, you can use the table below which is structured according the original formulation by i@no-self.<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiR0BttZhEq3VUPvwKGZ9m2slg0z16Lrz-SiYoZf3NeJnivfUiZwjkfJSAaPPlLNAHgIqM72Hvp-F9Uxx3Fc2oASWUs4FKNasURQ9iBnxIFTog9OHOhfWnQk3yZUxM2lqv2ketNFBk9FO-i/s1600/book_2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="291" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiR0BttZhEq3VUPvwKGZ9m2slg0z16Lrz-SiYoZf3NeJnivfUiZwjkfJSAaPPlLNAHgIqM72Hvp-F9Uxx3Fc2oASWUs4FKNasURQ9iBnxIFTog9OHOhfWnQk3yZUxM2lqv2ketNFBk9FO-i/s400/book_2.jpg" width="400" /></a></div>
<br />
<br />
<h4>
Probabilities</h4>
The actual probabilities of each line depends on how the book has been typeset (some hexagram may have more pages than others) and by how much one is inclined to pick up the pages that are towards the end or the beginning of the book.<br />
Assuming, everything considered, that any combination of upper/lower trigrams has the same probability to be selected, the probabilities for each line are the same as the <a href="http://www.castingiching.com/2016/05/method-of-16.html" target="_blank"><i>Method of 16</i></a>:<br />
<br />
<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <sup>1</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(8) = <sup>7</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(7) = <sup>5</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(9) = <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<br />
<br />
<br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-87430559532134123582016-07-01T23:00:00.000+02:002016-07-02T11:23:11.383+02:00One die (1d6)<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiHNDOh71MrieWRFvGJkFnD3DW5RLKhyphenhyphenL_NQRQAQI-Xq52_TGGHf6-iIccOGyzBMKjExwyf7_oDWjayeEl3GDkb_XtRjz5yQaKW6hN0hu07BJKDpor6UMHJPKcy_zS1x2qOeA9IH9EDrgTL/s1600/1d6_2.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="236" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiHNDOh71MrieWRFvGJkFnD3DW5RLKhyphenhyphenL_NQRQAQI-Xq52_TGGHf6-iIccOGyzBMKjExwyf7_oDWjayeEl3GDkb_XtRjz5yQaKW6hN0hu07BJKDpor6UMHJPKcy_zS1x2qOeA9IH9EDrgTL/s320/1d6_2.jpg" width="320" /></a></div>
Anoher method using a single dice:<br />
<ol>
<li>Roll a die;</li>
<li>Draw the line:
<ul>
<li>If it's an even number (<b>2</b>,<b>4</b>,<b>6</b>), draw <img align="bottom" border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="32" /> ;</li>
<li>If it's an odd number (<b>1</b>,<b>3</b>,<b>5</b>), draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="32" /> ;</li>
</ul>
</li>
<li>If it's <b>1</b> or <b>6</b>, it's a moving line;</li>
<li>Repeat steps 1-3 other five times drawing the hexagram from the bottom to the top. </li>
</ol>
<h4>
Probabilities </h4>
The probabilities are similar to the three coins one but there are more chances of producing moving lines:<br />
<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <span class="prob">Prob</span>(9) = <sup>1</sup>/<sub>6</sub> = 16.7%<br />
<span class="prob">Prob</span>(8) = <span class="prob">Prob</span>(7) = <sup>2</sup>/<sub>6</sub> = 33.3%<br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub></div>
<br />
<h4>
Variations</h4>
I've found that the company <i><a href="http://www.ichingoracle.com/index.php" target="_blank">Antony Publishing</a> </i>sells dice that works with the same principle but can directly provide the resulting line (moving lines are marked with a dot). These two images have been taken directly from their site:<br />
<br />
<br />
<table style="width: 100%px;"><tbody>
<tr><td><table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh3Ymj6FkM-wEido5LPH6fAhTuFaPYjn1EM56XGhDR5JxYinqkLrVnC9Qe7fvlIvuswoxKCVtpLpQYUwJ5LAD9KCtUmmNKxF7uWm-XMQkDIkpzU6PoF565hNUTRYk91P1GbyZcrCw_MyrV1/s1600/1d6_special.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh3Ymj6FkM-wEido5LPH6fAhTuFaPYjn1EM56XGhDR5JxYinqkLrVnC9Qe7fvlIvuswoxKCVtpLpQYUwJ5LAD9KCtUmmNKxF7uWm-XMQkDIkpzU6PoF565hNUTRYk91P1GbyZcrCw_MyrV1/s1600/1d6_special.jpg" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;"><a href="http://www.ichingoracle.com/show_book.php?ID=32" target="_blank">Single die</a></td></tr>
</tbody></table>
</td><td><table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh8wSNWEO8fct8QdVNbGAQd6ce9NkhHCnyvoGYWDhR3lkEREb2tx-o0zdoVkfiwxWeiEHfP1JXG0okEs0vCGY5a77HL5eNNaRYJml1l8nSfFEi4L58pmnHYIqVBDzUSgXtOHcN-1bA3nmgc/s1600/1d6_special_6.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh8wSNWEO8fct8QdVNbGAQd6ce9NkhHCnyvoGYWDhR3lkEREb2tx-o0zdoVkfiwxWeiEHfP1JXG0okEs0vCGY5a77HL5eNNaRYJml1l8nSfFEi4L58pmnHYIqVBDzUSgXtOHcN-1bA3nmgc/s1600/1d6_special_6.jpg" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;"><a href="http://www.ichingoracle.com/show_book.php?ID=35" target="_blank"><br />Set of six dice</a></td></tr>
</tbody></table>
</td></tr>
</tbody></table>
<br />Unknownnoreply@blogger.com4tag:blogger.com,1999:blog-709198572941428830.post-47127571038041065292016-06-29T21:44:00.000+02:002016-10-13T12:27:38.792+02:00Three cards<img border="0" height="258" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjO97Xb9ZXvmGONycpLjogj71OCxqPM5r1zS4qDqrWB-F1VvLf327frUZJlVmbZrZ-l4xyidFAS9Hct-GD0q1AI_9iDE5b87qCwGar4vvFVoq-3N-Slrb16nierEPd054PbYxXeHmGzIoJX/s320/3cards_ico.jpg" style="display: none;" width="320" />
One of the drawbacks of using just one or two cards is that when shuffling them it may be possible to keep track of their orientation and position even without looking; it
could take quite some time before losing track of which face is which.<br />
Using three cards (considering only one face and two orientations) provides 48 combinations which make the result dependant on the orientation and the position of each card (and it is much more difficult to keep track of three cards at the same time).<br />
<br />
I designed the following three cards (these are scanned images as I lost the original jpg!):<br />
<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiTXOfn5gegsy56EbbbrSMdOSG0XjfKmJ4JyFn79YE8VCDwJ09OmRVz3NApzV5sMkhK-aQA6WqZhyphenhyphenTuVzTHWIdHcvjaAUA3vT-4y_yn1XjpThXlwr_udRZIexfP30xysfFCtF39Ip1eVPGp/s1600/scansione0003.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="230" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiTXOfn5gegsy56EbbbrSMdOSG0XjfKmJ4JyFn79YE8VCDwJ09OmRVz3NApzV5sMkhK-aQA6WqZhyphenhyphenTuVzTHWIdHcvjaAUA3vT-4y_yn1XjpThXlwr_udRZIexfP30xysfFCtF39Ip1eVPGp/s320/scansione0003.jpg" width="320" /></a></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEijT-yIaWMvTiq8ZMa4RUaKYjdUw0gBEvzaZBGjZzqHaS2cJa1SLt7TvCEHWrJTripxVtSt6fQ_1NdnY9UDmVlZcXC8cHtl4PsUsHvn-bEI_zaLP5JR6DRbNv80CvP88lVf6pQmv9nF34nN/s1600/scansione0003.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><br /></a></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgEljpVH3inGr4lDxrUzpYMp87tKSQCNLriH2Ldaj2ENtPogccyksWxVn1wW_Q6w9xOCiNmgXuUO8lBT76MnNYUylltKLBJx4pXTXe8VyAlHfY5ie5N-eGtOkCpN1dxXghvkF63bxjYtQmD/s1600/scansione0004.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="229" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgEljpVH3inGr4lDxrUzpYMp87tKSQCNLriH2Ldaj2ENtPogccyksWxVn1wW_Q6w9xOCiNmgXuUO8lBT76MnNYUylltKLBJx4pXTXe8VyAlHfY5ie5N-eGtOkCpN1dxXghvkF63bxjYtQmD/s320/scansione0004.jpg" width="320" /></a></div>
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhAt-luu1awHcWY0e9bzV6sRAQr7UAa6-uAvmXW08POT2DQ0jYNB59gzSkp6f8GJuekhjPGAP9EpAGEaR9RpzLdNjUS7lLalgAqB7BRPQDVrHjJ2N4Xl-wzLLsMoqC-XjlI3Ay9D13N9jSc/s1600/scansione0005.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="230" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhAt-luu1awHcWY0e9bzV6sRAQr7UAa6-uAvmXW08POT2DQ0jYNB59gzSkp6f8GJuekhjPGAP9EpAGEaR9RpzLdNjUS7lLalgAqB7BRPQDVrHjJ2N4Xl-wzLLsMoqC-XjlI3Ay9D13N9jSc/s320/scansione0005.jpg" width="320" /></a></div>
<br />
<br />
<br />
where each card can result in being yin or yang depending on both the other two cards.<br />
They are to be used as follow:<br />
<ol>
<li>Shuffle the three cards at will; remember to rotate one of two of them from time to time while shuffling (it is important!);</li>
<li>Turn the cards and look at the three ideograms on the upper left corner;</li>
<li>If the same <b>sequence </b>appears on the left of one line, draw that line. Otherwise draw the other line. Note that any ideogram can be placed where a red circle appears.</li>
<li>Repeat steps 1-4 other five times drawing the hexagram from bottom to top.</li>
</ol>
The following pictures show some examples.<br />
<br />
<table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUmA-sAzVN6kpOk7B_mESDOpRhdTw5_z0RGTOn1g8wnHeocIuCO1kERyjgLw48_xR0g2uzRnGFHtiYC9nSStR9yXahnAC9upegZDEEmUzsGJbK3KxWZdHODYCSHngZjWk2BWuAgbC961oc/s1600/scansione0006.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUmA-sAzVN6kpOk7B_mESDOpRhdTw5_z0RGTOn1g8wnHeocIuCO1kERyjgLw48_xR0g2uzRnGFHtiYC9nSStR9yXahnAC9upegZDEEmUzsGJbK3KxWZdHODYCSHngZjWk2BWuAgbC961oc/s320/scansione0006.jpg" width="305" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;"><b>Result</b>: <i>yin</i> (broken line) as the sequence of the three upper ideograms doesn't appear at the left of any line</td></tr>
</tbody></table>
<br />
<table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhEiu6inDLBG5R_p6uIBHZ_IF3oDtpZ3XfbvIFJHwSJtNjQoIyvrY9bc26IeHzB6u_ubINZlLy1ntrsZpsF0lMzA0OG7xa_4PQbbr5Tuy9oFaK_YcjBZIKZuT3m_XcwVe8eYYY1pqfW5vm3/s1600/scansione0007.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhEiu6inDLBG5R_p6uIBHZ_IF3oDtpZ3XfbvIFJHwSJtNjQoIyvrY9bc26IeHzB6u_ubINZlLy1ntrsZpsF0lMzA0OG7xa_4PQbbr5Tuy9oFaK_YcjBZIKZuT3m_XcwVe8eYYY1pqfW5vm3/s320/scansione0007.jpg" width="305" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;"><b>Result</b>: <i>moving yin</i> (broken line) as the sequence of three upper ideograms appears at the left of any line (the red circle can be replaced by any ideogram)</td></tr>
</tbody></table>
<br />
<table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhNMqejUYLNbQpLTd7qVZSbqCniSV2N2ddSOii2XNoSxhpTZkbCBYAFtq_Kx1CXbIMWjmmvcWA8VMUpuwjHYeuT7WFWol4rvtSA-Q1SO3uLEEcix15sA2krlQYV-UlNRV_h6Dy5SiFrb8Po/s1600/scansione0008.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" height="317" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhNMqejUYLNbQpLTd7qVZSbqCniSV2N2ddSOii2XNoSxhpTZkbCBYAFtq_Kx1CXbIMWjmmvcWA8VMUpuwjHYeuT7WFWol4rvtSA-Q1SO3uLEEcix15sA2krlQYV-UlNRV_h6Dy5SiFrb8Po/s320/scansione0008.jpg" width="320" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;"><b>Result</b>: <i>yang</i> (solid line) as the sequence of the three upper ideograms appears at the left of any line</td></tr>
</tbody></table>
<br />
<table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEidFyedLU4vfBFevMzzrPWB0PW13_QQAJVOv2_q3gDA3OYbYS9uxsQ5HGEKTmvoa8vIphqB4RxnYxnvAMH8muYy7uIph9KbtOeQZJk5H-tFK05Qsp6oQt67ohKePyFpv-Glr5HlcmDdBrN0/s1600/scansione0009.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEidFyedLU4vfBFevMzzrPWB0PW13_QQAJVOv2_q3gDA3OYbYS9uxsQ5HGEKTmvoa8vIphqB4RxnYxnvAMH8muYy7uIph9KbtOeQZJk5H-tFK05Qsp6oQt67ohKePyFpv-Glr5HlcmDdBrN0/s320/scansione0009.jpg" width="305" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;"><b>Result</b>: <i>moving yang</i> (solid line) as the sequence of the three upper ideograms doesn't appear at the left of any line</td></tr>
</tbody></table>
<br />
Note that if you hold them in your rught hand is even easier to read them as your hand will cover the right side of card which is not relevat for the result.<br />
<br />
<h4>
Probabilities</h4>
The lines and the ideograms are set to provide exactly the same probabilities of the sixteen marbles method:<br />
<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <sup>1</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(8) = <sup>7</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(7) = <sup>5</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(9) = <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<br />
<br />Unknownnoreply@blogger.com2tag:blogger.com,1999:blog-709198572941428830.post-88205874945233226452016-06-29T15:34:00.002+02:002021-05-11T10:06:10.215+02:00Aleister Crowley's sticks<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgfrg3dS3NJxV_snZr2J54qnG_nFYDLCzgYmJlS2RoNC37zlztyk6S7bPjJ9q_XaPC_fGU9isW_79JphqHyeYNC9dKLrTvLN0oXbbw3gnfdKfIAtzNYrImZgFnM0SzUMrgpZnkbrxKFr_p5/s1600/6_sticks_hex.jpg" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgfrg3dS3NJxV_snZr2J54qnG_nFYDLCzgYmJlS2RoNC37zlztyk6S7bPjJ9q_XaPC_fGU9isW_79JphqHyeYNC9dKLrTvLN0oXbbw3gnfdKfIAtzNYrImZgFnM0SzUMrgpZnkbrxKFr_p5/s320/6_sticks_hex.jpg" width="264" /></a>This method is attributed to the controversial occultist <a href="https://en.wikipedia.org/wiki/Aleister_Crowley" target="_blank">Aleister Crowley</a>. It <a href="http://www.cornelius93.com/Grady-OnKnowingAleisterCrowley-2.html" target="_blank">has been reported</a> that he used six flat sticks prepared as shown in the image (a 3D reconstruction).<br />
Each stick has one side completely flat (representing <i>yang</i>, solid lines) and one side with a circular groove painted in red (representig <i>yin</i>, broken lines).<br />
One of the sticks has one side painted in black, that stick represents a moving line. <br />
<br />
The images shows the hexagram 31.5>62.<br />
<br />
The method proceeds as follows:<br />
<ol>
<li>Without looking mix and shuffle the six sticks;</li>
<li>Throw them on the table;</li>
<li>Align them, always without looking, to form the hexagram;</li>
<li>Look at the formed hexagram.</li>
</ol>
<h4>
Probabilities</h4>
This method, which is identical to the <a href="http://www.castingiching.com/2016/05/i-ching-six-coins.html" target="_blank">six coins one</a>, always produces <i>exactly one</i> changing line meaning that there are only 276 possible responses (out of the 4096 that are theoretically possible).<br />
<br />
The probabilities for each lines are:<br />
<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <span class="prob">Prob</span>(9) = <sup>1</sup>/<sub>6</sub> * <sup>1</sup>/<sub>2</sub> = 8.33%<br />
<span class="prob">Prob</span>(8) = <span class="prob">Prob</span>(7) = <sup>5</sup>/<sub>6</sub> * <sup>1</sup>/<sub>2</sub> = 41.67%<br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhrVGa0OLvOBN9h3qR1XWHcmvjH4N9ES1CRKPGSykgkt7OSWl8eYVVpRiF5pH4qB2pVWR7iAhLHqlGIB0y3ADw2mBW7c0LUGVahjZ360ybqAQ6veTEdarTAL7_NmbEWyMUrYIE3LGEEItEL/s1600/sixcoins_ico.jpg" style="margin-left: 1em; margin-right: 1em;"><br /></a></div>
<br />Unknownnoreply@blogger.com4tag:blogger.com,1999:blog-709198572941428830.post-1268484919299680772016-06-26T16:34:00.002+02:002021-03-25T12:36:02.940+01:00Creating a casting method<img border="0" height="265" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg7QMxn-sNVO4pcVYLniHO-uZSL4eTvB8bFCcqnVml3w_XnxgzfgWUeBexnolJXwVSXAFwAsw6G9j6L9pvUMiwEFRlVDaLV9nk41PlIgLxo_is2mygqbQHlP4Gj7D5WhycQ9p0iA-V0uJmO/s320/process_paper.jpg" style="display: none;" width="320" />At this point in time, or probably even earlier, you may be asking what this site is all about. Yes, I gave a brief explanation in the <a href="http://www.castingiching.com/2016/05/about-this-site.html" target="_blank"><i>About</i></a> page but the fundamental problem still remains: is there any real need of so many methods for casting hexagrams? What is needed to create a new method? And, most importantly, why should anyone do it?<br />
<br />
We all know (having tested it on the field) that the meaningfulness and the accuracy of I Ching responses do not depend on the method used but only on the ability to relate the question to the response. That's why formulating a good question is so important.<br />
<br />
However, I believe, the hexagram casting process plays a key role in setting the right mindset which will lead to a successful interpreation. The problem is that what works for some, may not work for others. The long process of using yarrow stalks puts people in a right meditative state, they say, but for others the long time needed is distracting; their minds keep wandering making them unable to focus on the question. The instantaneous response of a computer program can be a striking revelation for some, but may look cheap and impersonal to others. As always happens, no size fits all and the many existing methods are there to prove that many people tried to find their own way to connect to the I Ching.<br />
<br />
What follows are just ideas that, I hope, could motivate anyone who feels uneasy with their current casting method to create their personal casting method to better fits their needs. Should this ever happen, I would declare full success for my efforts.<br />
<br />
<h4>
Why creating a new method?</h4>
I think there at least two key aspects:<br />
<ul>
<li><i>Practicality</i>: you may want to be able to cast I Ching hexagrams in a small space (e.g. a plane seat) or making no noise, or using as least objects as possible, or making it with as few passages as possible, etc.;</li>
<li><i>Connection</i>: you may want to use a set of objects that have a special meaning to you. They may be something from a beloved person or something that reminds you of an important place or time. Or they just make you feel more inclined to hear what the I Ching has to say to you.</li>
</ul>
I would add a third one that is important to me: <i>aesthetic</i>. It can be something pleasant to the touch or to the eye; something mathematically elegant or uttely chaothic. Whatever appeals to your own sense of <i>beauty</i>.<br />
<br />
As a motivation, making money from patenting and selling a casting method may seems appealing but, looking back, many already tried and failed to become rich this way.<br />
<br />
<h4>
How to create a new method? </h4>
<h4>
</h4>
These are the three requirements I feel important for any new casting methods:<br />
<ol>
<li>Each one of the 64 hexagram should be <b>possible</b> in the response. </li>
<li>The 64 hexagrams should all be <b>equiprobable</b> in the response. </li>
<li>Each one of the 4096 possible outcomes (considering the moving linese) should be possible.</li>
</ol>
Only the requirement 1 is absolutely critical: a method that would rule out a group of hexagrams (say, all those whose second line is <i>yin</i>) would seem just plainly wrong to me.<br />
<br />
Requirements 1 and 2 would be fullfilled by any method which assigns to each line the same probability of being <i>yin</i> or <i>yang</i>.<br />
<br />
You may note that I refered to the method <a href="http://www.castingiching.com/2016/05/i-ching-events-probabilites.html" target="_blank">probabilities</a> to determine which requirements are more important. This reflects my view that randomness play a key role in the casting process as it determines the <i>relevance</i> of certain aspects (e.g. the number of moving lines) over other.<br />
If you feel that randomness does not play such a key role you can determine which requirements are more important to you.<br />
<br />
During the creation steps you will go through the following steps (not necessarily in this order)<br />
<ul>
<li>Choose which objects to use and count the <i>events</i> you can generate with them;</li>
<li>Decide on a probability distribution;</li>
<li>Define a process to combine/manipulate the objects that will generate the hexagram lines with the desired probability.</li>
</ul>
As illustrated in the image below, you will probably move from one step to another refiing the method. <br />
<ul>
</ul>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjHa3CLtKrUz7pPy74f8R0644FGb0y0cbjvD0ORUv1HhcO6QEn02nE3qnRO4uncKdUn-Oltz3Tz-JtMtzZoXo_CJJOCYMLRKhyphenhyphen3xfMleLB6e8k29z98gMwi4ftf8IVsRfSyddAHKTj20KG7/s1600/process_white.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="264" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjHa3CLtKrUz7pPy74f8R0644FGb0y0cbjvD0ORUv1HhcO6QEn02nE3qnRO4uncKdUn-Oltz3Tz-JtMtzZoXo_CJJOCYMLRKhyphenhyphen3xfMleLB6e8k29z98gMwi4ftf8IVsRfSyddAHKTj20KG7/s320/process_white.jpg" width="320" /></a></div>
<br />
Let's go through a full example: the creatione of the <i>one card method</i>.<br />
<br />
In this case the need was to have something very portable to tuck into my pocket copy of the <a href="https://www.amazon.it/I-Ching-libro-della-mutazione/dp/8811904153" target="_blank">I Ching</a> and a single card seemed to be the right choice.<br />
Let's examine our <i>object</i>: a card has two sides (<i>front</i> and <i>back</i>) and two possible orientations (<i>up</i> and <i>down</i>). This means that if we, during the <i>process</i>, rotate and turn the card multiple times we can generate four possible <i>events</i> as the card may end up showing:<br />
<ul>
<li>front side/upward</li>
<li>front side/downward</li>
<li>back side/upward</li>
<li>front side/downward </li>
</ul>
We could also reduce the number of events, for example we could limit ourselves to only two possible events by having the back of the card to be neutral (like in the regular playing cards) and only considering the orientation. Or by not considering the orientation at all and only considering wether the front or the back face is showing.<br />
<br />
Now, if we wanted to mimic the three coins method probabilities ( 1/8 ) we would need to combine at least two operation with the card so to have 16 possible events (4*4).<br />
<br />
It is important that the association between the outcomes and the lines are as simple as possible, the users should not be forced to memorize too many things. For example the three coins method requires the user to remember just one things: which side is 2 (the other being 3), the sixteen marbles method requires the user to remember four things: the association between each color and the line types.<br />
<br />
That said, for a one card (our <i>object</i>) method with the same probabilities as the three coins method, we need 8 events that we could by combining two operation in the <i>process</i>:<br />
<ul>
<li>The first operation will give yin or yang (e.g by using front/back of the card): 1/2;</li>
<li>The second operation will tell if it's a moving line by considering which of the four possible outcomes happened: 1/4.</li>
</ul>
For the first point we could mark the front of the card with a yang line and the back; for the second point we can mark one of the corner of the front face (e.g. the upper left one) with a dot so we will be able to tell the orientation:<br />
<ul>
<li>front/up → dot in the upper left corner</li>
<li>front/down → dot in the lower right corner</li>
<li>back/up → no dot visible</li>
<li>back/down → no dot visible</li>
</ul>
we can not tell the two last event apart but we don't really need it. Just being able to identify one of the events (front/up) is enough for our needs.<br />
Here is a possible design for the card:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6T4ViAl-0K9KrrXEztZhUlDpv86xcN-oODGs7X7QAg8VmV-gdQVQXPdthwtoQ5qESWYphZkqGafYN0nIcvSgZzhdJmenM2a2CK69lRVpXQsY8_hw8Eey4RYU0J8y0z2bI4h5yLD5pTPcP/s1600/1_card_create_A.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="155" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6T4ViAl-0K9KrrXEztZhUlDpv86xcN-oODGs7X7QAg8VmV-gdQVQXPdthwtoQ5qESWYphZkqGafYN0nIcvSgZzhdJmenM2a2CK69lRVpXQsY8_hw8Eey4RYU0J8y0z2bI4h5yLD5pTPcP/s400/1_card_create_A.jpg" width="400" /></a></div>
that you can use with this <i>process</i>:<br />
<ol>
<li>Without looking, flip, turn and rotate the card. </li>
<li>When you feel it's the right time look at the card</li>
<li>Draw the line you see on the card</li>
<li>Again, without looking, flip, turn and rotate the card. </li>
<li>When you feel it's the right time look at the card</li>
<li>If you see a red circle on the upper left corner of the card, it's a moving line.</li>
</ol>
And that is done, you can start testing the new method.<br />
<br />
Howewer you can start thinking about siimplifying the <i>process</i> considering that many other methods assing the same <i>probabilities</i> to each line. So you can think about modifying the card (your <i>object</i>) to make it possible to generate a line with a single operation:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhfQiBLJeH_8hoenZbO140efxz_6vis9gLMr5IAO_Wlxkh6PXXJiMFTdBzoLIL0G-VLblz_AJ8bZYo8Exuh4jVFjcd30E1yltbdoJ5M322zBe0BEOHj0mG89ZINkcqvTmCWRR0WGwwt8lnM/s1600/1_card_create_B.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="155" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhfQiBLJeH_8hoenZbO140efxz_6vis9gLMr5IAO_Wlxkh6PXXJiMFTdBzoLIL0G-VLblz_AJ8bZYo8Exuh4jVFjcd30E1yltbdoJ5M322zBe0BEOHj0mG89ZINkcqvTmCWRR0WGwwt8lnM/s400/1_card_create_B.jpg" width="400" /></a></div>
Now you can define a new <i>process </i>for casting lines:<br />
<ol>
<li>Without looking, flip, turn and rotate the card. </li>
<li>When you feel it's the right time look at the card</li>
<li>Draw the line you see on the card</li>
<li>If you see a red symbol on the upper left corner of the card, it's a moving line.</li>
</ol>
Pretty easy, right?<br />
<br />
I won't go into the details needed to define a process that would give the yarrow stalks probabilities, you can see how it is done in the <a href="http://www.castingiching.com/2016/06/i-ching-one-card.html" target="_blank">one card method</a> that I published already.<br />
<br />
There you will also see how I tried to add some image to make it look <i>better</i>. I used some free clipart, a design from a real artist would have made the card 100 times better.<br />
<br />
This is just a simple example. Do not hesitate to contact me if you want any more detail.<br />
<br />
<h4>
What about rituals?</h4>
Being a very rational person, I feel rather uneasy discussing this topic. Personally, I do not follow any type of ritual. To me the I Ching is a <i>possibility multiplier</i>, an <a href="https://aeon.co/essays/forget-prophecy-the-i-ching-is-an-uncertainty-machine" target="_blank"><i>uncertainty machine</i></a>, a mirror which reflects my <a href="https://en.wikipedia.org/wiki/Self_in_Jungian_psychology" target="_blank"><i>self</i></a> I don't feel the need for any ritual in the casting process.<br />
However, I know that rituals are important for many people. They help focusing, they provide additional (sometimes deeper) meaning to the whole process.<br />
Unforunately I have no suggestion about them. I've read many suggestions like: using linen cloths to protect the I Ching book, consacrating (whatever it means) the objects used for casting, point toward East, keeping everything at eye level, etc.<br />
My only advice about this is to experiment: find what it works best for you; everything that helps you focusing better, interpreting the response better, etc. it's, by definition, good. And you may want to ask the I Ching himself for advice about how good rituals are for you.<br />
<br />
<br />
<br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-1174835578542509842016-06-25T01:17:00.002+02:002016-07-02T10:54:12.431+02:00EZ Ching (4d4)<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjcydv5FuxJ6pGGsGIQp1At1MGlMdccZ3DROoHs35wRaUch7ICV80YHsJ39nfsXnD0obqT6mCh7B52v-dzeMHFe6OIhEFDv3aVZhA0ABBK4Pt2LZxAUlvAPGHjVFg1nQkrWpltHCw-DugFG/s1600/ez_ching_ico.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="137" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjcydv5FuxJ6pGGsGIQp1At1MGlMdccZ3DROoHs35wRaUch7ICV80YHsJ39nfsXnD0obqT6mCh7B52v-dzeMHFe6OIhEFDv3aVZhA0ABBK4Pt2LZxAUlvAPGHjVFg1nQkrWpltHCw-DugFG/s200/ez_ching_ico.jpg" width="200" /></a></div>
This method, using four 4-sided dice, was devised and made available commercially by Christopher and Avonne Thomson. These dice are no longer available on the internet but there is still a mention of them on <a href="https://www.amazon.com/EzChing-Ching-Made-Easier/dp/1604027754?ie=UTF8&*Version*=1&*entries*=0" target="_blank">Amazon</a>. The original site (www.ezching.com) seems to have disappeard between 2008 and 2010 (according to the <a href="https://web.archive.org/web/20040925131553/http://www.ezching.com/" target="_blank">Way Back machine</a>).<br />
The four dice were, supposedly, hand made and were engraved so that for each group (yellow or blue) the eight trigrams appeared exactly onc. <br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEii5s28-BcPrR37mKe8aMKa6jMJzB4aaJMou8my7MTWYGfAiJ7Xwtd_ouozJ_q0O62xnV-6OuwohrIGzVKPJmTpBUFJQi5dlxpePKeQrgNL_FT6Q8ZkLwNIhRjIqgVFqGXqiYPh098X5c-S/s1600/ez_ching.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEii5s28-BcPrR37mKe8aMKa6jMJzB4aaJMou8my7MTWYGfAiJ7Xwtd_ouozJ_q0O62xnV-6OuwohrIGzVKPJmTpBUFJQi5dlxpePKeQrgNL_FT6Q8ZkLwNIhRjIqgVFqGXqiYPh098X5c-S/s1600/ez_ching.jpg" /></a></div>
<br />
They were used as follows:<br />
<ol>
<li>Throw the four dice;</li>
<li>Pick the blue dice for the lower trigram; </li>
<li>Pick the yellow dice for the upper trigram;</li>
</ol>
This method generates each hexagram with probability 1/64.<br />
<br />
To add changing lines <a href="http://www.onlineclarity.co.uk/friends/showthread.php?2822-Has-anyone-tried-EzChing" target="_blank">it was suggested</a> to use a regular die (1d6) to identify the moving line.<br />
<br />
You can also use these dice to generate an hexagram and then derive a single line as described in the <a href="http://www.castingiching.com/2016/07/i-ching-book.html" target="_blank"><i>I Ching Book</i></a> method.<br />
<br />
<br />
<br />
<br />Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-14980163267067071252016-06-25T00:02:00.000+02:002016-06-25T08:26:18.860+02:00Two Cards<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgGyThjBZmzKClgnMw2dhV6TG2kaLs_5-wv4lG6KP7XSTtybQyBo5fXcsb79LPZFF18yKp2Zi2AXcEcyVzl-8o9AQfki2OdWTXQtycSghyphenhyphenuP9ojMkJvKP4_nMUcfXqn7XrhEwklxE2D2Swj/s1600/2cards_ico.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="124" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgGyThjBZmzKClgnMw2dhV6TG2kaLs_5-wv4lG6KP7XSTtybQyBo5fXcsb79LPZFF18yKp2Zi2AXcEcyVzl-8o9AQfki2OdWTXQtycSghyphenhyphenuP9ojMkJvKP4_nMUcfXqn7XrhEwklxE2D2Swj/s200/2cards_ico.jpg" width="200" /></a></div>
This is just another version of the "<a href="http://www.castingiching.com/2016/06/i-ching-two-aces.html" target="_blank">Two Aces</a>" method and provides lines with the same probability distribution.<br />
Instead of using two regular playing cards, I've devised a design for two special cards so that you can use them to cast hexagrams.<br />
The pictures below shows the faces of the two cards. I've also made them available as <a href="https://sites.google.com/site/castingiching/downloads/2cards_300dpi.zip" target="_blank">300dpi images</a> in case you want to print them with your printer or through a custom playing cards service.<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjQoCDc2UQ83xlIkc2cEe03YOYcOWR8I2jgYz6R8quLKDFxoqUQOLg2vn7bpV-J5VquLES7zQSgBwAS2fDk26X3v8NqHNtcHIGTSPFdB-CIvh4AHxvIZ1pWL4cnAEn5ObritFQJrjLztyGK/s1600/2cards_yang_small.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="213" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjQoCDc2UQ83xlIkc2cEe03YOYcOWR8I2jgYz6R8quLKDFxoqUQOLg2vn7bpV-J5VquLES7zQSgBwAS2fDk26X3v8NqHNtcHIGTSPFdB-CIvh4AHxvIZ1pWL4cnAEn5ObritFQJrjLztyGK/s320/2cards_yang_small.png" width="320" /></a></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKG4L6Ni1bv1KJckwfknt25ezW2St7PbMcsziE_kMij8Qq0iBh_vKMjtmlb-rkfsjdIivl6y-adYvrmyezvEpNyrVCs8GswL8fvNbyHisfK2k4BmwcmWGyIUT62EzX0pxV7CTlk7z3hknZ/s1600/2cards_yin_small.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="213" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKG4L6Ni1bv1KJckwfknt25ezW2St7PbMcsziE_kMij8Qq0iBh_vKMjtmlb-rkfsjdIivl6y-adYvrmyezvEpNyrVCs8GswL8fvNbyHisfK2k4BmwcmWGyIUT62EzX0pxV7CTlk7z3hknZ/s320/2cards_yin_small.jpg" width="320" /></a></div>
<br />
<br />
To cast a hexagram proceed as follows:<br />
<ol>
<li>Shuffle the two cards rotating one of them while shuffling (this is important);</li>
<li>Turn them and put them one on the other so that two symbols in the upper left corner can be seen;</li>
<li>Draw the same line you see on the top card;</li>
<li>If the two symbols in the upper left corner are the same, it's a moving line.</li>
<li>Repeat steps 1-4 other five times drawing the hexagram from bottom to top.</li>
</ol>
The image below provides some examples:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgusXqF-vr28As7ATyZughjaRYcltxta5mipuqINLbAV9ahks8nkNJ3kP3ZWmPjxnkMzBeqqOxhVypb_PsVdP0It9bqPvdFD5oMkQNAmSSQdOOvwzBMLijsIFT8XFAHY4ldotBIDxCqYeR_/s1600/2cards_examples.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="286" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgusXqF-vr28As7ATyZughjaRYcltxta5mipuqINLbAV9ahks8nkNJ3kP3ZWmPjxnkMzBeqqOxhVypb_PsVdP0It9bqPvdFD5oMkQNAmSSQdOOvwzBMLijsIFT8XFAHY4ldotBIDxCqYeR_/s400/2cards_examples.jpg" width="400" /></a></div>
<br />
<br />
<a href="http://creativecommons.org/licenses/by-nc/4.0/" rel="license"><img alt="Creative Commons License" height="21" src="https://i.creativecommons.org/l/by-nc/4.0/88x31.png" style="border-width: 0;" width="59" /></a><span style="font-size: x-small;">
This work is licensed under a <a href="http://creativecommons.org/licenses/by-nc/4.0/" rel="license">Creative Commons Attribution-NonCommercial 4.0 International License</a>.</span>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-76326330478065000052016-06-19T19:27:00.004+02:002016-06-19T19:29:52.222+02:00Thirtytwo Tarot Cards<img border="0" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgn9D4FBw2W-ad_pINHBFRv4hvslIwOwH2gJbZz8olK2LQ8uikCLEWPe0GQR1pNjorEPqKEqgIYyz-TUQZ4lsJ1Lczq5Ign1OLpmHIFtMjAtnsZGeFTfWbyRnGo1i84y79Pu7WhqqnAupsv/s200/uno_denari.jpg" style="display: none;" width="180" /><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiYtC3wXVbihiN2EO3WtdbRYbmYR5NSOhjwQa3EmnIu-SVKOVyk0VPEe9YOHCCClJqUpFGYzrP8zmEYqTZw3xCQdBXD1LGbcxzBML8nMrkLPvUvSlaT1fe7yN5TSf5GCgA-Sm2cbckAxpib/s1600/uno_denari.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiYtC3wXVbihiN2EO3WtdbRYbmYR5NSOhjwQa3EmnIu-SVKOVyk0VPEe9YOHCCClJqUpFGYzrP8zmEYqTZw3xCQdBXD1LGbcxzBML8nMrkLPvUvSlaT1fe7yN5TSf5GCgA-Sm2cbckAxpib/s320/uno_denari.jpg" width="165" /></a>
In an <a href="http://www.accessnewage.com/articles/Tarot/GAULT1.HTM" target="_blank">online article</a>, <a href="http://yunchtime.net/?p=1371" target="_blank">Richard T Gault</a> suggested a way to use 32 tarots to cast I Ching hexagrams. The idea is simple:<br />
<ul>
<li>Represent yin lines with <i>Cups</i> and <i>Pentacles</i> (<i>Coins</i>) as they are round and receptive (feminine);</li>
<li>Represent yang lines with <i>Swords</i> and <i>Wands</i> as they are aggressive and strong (masculine);</li>
<li>Include cards in a proportion that mimics the yarrow stalks probabilities:</li>
<ul>
<li> 2 cards of <i><b>Cups</b></i>;</li>
<li>14 cards of <b><i>Pentacles</i></b>;</li>
<li>10 cards of <b><i>Swords</i></b>; </li>
<li> 6 cards of <b><i><b><i>Wands</i></b>;</i></b></li>
</ul>
</ul>
Once the association has been memorized, the method is very simple:<br />
<ul>
</ul>
<ol>
<li>Shuffle the 32 cards and pick a card;</li>
<li>Draw a line based on the card suit:
<ul>
<li>
If it's <i><b>Cups</b></i>, draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqKQHSL1r6lZ3O6gyIbk6N8Tscg2D7_OPrVC9N6WLSK3hwBNmECtBNgGUZyUCHOxoSDBL9L9l-2LE3CPc4t3bUwI4XTyWcb39nEWh2pKdPcqlmSZ582LOKgiWAc90GHn4QPNBgrxuJbZx7/s1600/6.jpg" width="32" /> ;</li>
<li>If it's <b><i>Pentacles</i></b>, draw <img align="bottom" border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" width="32" /> ;</li>
<li>If it's<i> </i><b><i><b><i>Swords</i></b></i></b>, draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" width="32" /> ;</li>
<li>If it's<i> </i><b><i>Wands</i></b>, draw <img border="0" height="14" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUgfVENqLAqtmuWaV_cEhiwsommhs_GAmJ9xqhKYOBcTAuWsoV5eaxQEd5m5iJGXpA0-d23lioLszCNX1hN5EimVbyJzoZzRrx20ST1kWgBF5W5T67kfT3caJMIuP3CloVq0bF0p79jMfr/s1600/9.jpg" width="32" /> ; </li>
</ul>
</li>
<li>Reinsert the card in the deck;</li>
<li>Repeat steps 1-3 five more times drawing the hexagram from bottom to top</li>
</ol>
<h4>
Probabilites</h4>
By construction, the method provides the same probabilities as the <i><a href="http://www.castingiching.com/2016/05/method-of-16.html" target="_blank">Method of 16</a> </i>one.<br />
<br />
<br />
<br />
<span style="font-size: x-small;">Cards images: <a href="https://commons.wikimedia.org/wiki/Category:Minor_Arcana" target="_blank">WikiMedia Commons</a></span><br />
<span style="font-size: x-small;"> </span> Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-34706913965039484462016-06-19T16:49:00.000+02:002017-08-24T10:24:37.549+02:00Paper Die (1d4)<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiFge4s7T9jwcbuAhpmqViDTVY77Pr0sUbvI4NdXqCriW1_mFv-NyPHyhif4e3TlfrpDTxx10SZvDLWNwg_Lqy3Rx6j_Ql2iBV9YdUVN0dxwFDMPppx6EEA2WofiyQr0gcR48gyBWk7taHU/s1600/paperdie_16.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="171" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiFge4s7T9jwcbuAhpmqViDTVY77Pr0sUbvI4NdXqCriW1_mFv-NyPHyhif4e3TlfrpDTxx10SZvDLWNwg_Lqy3Rx6j_Ql2iBV9YdUVN0dxwFDMPppx6EEA2WofiyQr0gcR48gyBWk7taHU/s200/paperdie_16.jpg" width="200" /></a></div>
In the first post about <a href="http://www.castingiching.com/2016/05/i-ching-paper-die.html" target="_blank">paper dice</a>, I said I was not satisfied with the version that was marked to generate hexagrams with yarrow stalks probabilities: it could lead to getting too many (or too few) moving yin lines.<br />
I found that the solution to this problem is to consider the paper die as having only four possible outcome (instead of eight) and use the same mechanic of the <a href="http://www.castingiching.com/2016/06/i-ching-one-card.html" target="_blank">one card method</a>.<br />
I created another <a href="https://sites.google.com/site/castingiching/downloads/paper_dice_ys.pdf?attredirects=0&d=1" target="_blank">sheet to be printed</a> for your convenience but you can simply fold the die from a blank sheet and draw the dots with a pen.<br />
Each strip (remember: to be split in two squares) would appear like this:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhH6jZttBYTIAw6Las19DS2jFQNHlCmX3oiQjLm8YR8rdm5jDOJpwrGvcxaIsuc2-MmSYbMwQ0QdAZUKtzPk4_MSLm8unHGqKri5OiPVW_uXZ0dvfQQfHy9kIJZyK58EwKw-zMVrMVxT2QE/s1600/paper_die_345.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="163" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhH6jZttBYTIAw6Las19DS2jFQNHlCmX3oiQjLm8YR8rdm5jDOJpwrGvcxaIsuc2-MmSYbMwQ0QdAZUKtzPk4_MSLm8unHGqKri5OiPVW_uXZ0dvfQQfHy9kIJZyK58EwKw-zMVrMVxT2QE/s320/paper_die_345.jpg" width="320" /></a></div>
<br />
After folding the die, two faces will have 4 dots, one face will have three dots and one will have five dots of which one red. If you are going to draw the dots with a pen, leave the central dot white and fill the other ones (or do the opposite).<br />
<br />
To cast a line you need two operations. Proceed as follows:<br />
<ol>
<li>Without looking, turn and roll the die in your hand;</li>
<li>When you feel the time is right, pick one of the faces and write down the number of <i>black</i> <i>dots </i>(either 3 or 4) you see;</li>
<li>Repeat step 1;</li>
<li>When you feel the time is right, pick one of the faces and write down the number of <i>dots</i>, regardless the color, (either 3, 4 or 5) you see;</li>
<li>Sum up the numbers and draw the line according the following table:<br />
<table class="center" style="width: 340px;">
<tbody>
<tr><td align="center" style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">6</td>
<td style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">7</td>
<td style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">8</td>
<td style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">9</td></tr>
<tr>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqKQHSL1r6lZ3O6gyIbk6N8Tscg2D7_OPrVC9N6WLSK3hwBNmECtBNgGUZyUCHOxoSDBL9L9l-2LE3CPc4t3bUwI4XTyWcb39nEWh2pKdPcqlmSZ582LOKgiWAc90GHn4QPNBgrxuJbZx7/s1600/6.jpg" /></td>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" /></td>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" /></td>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUgfVENqLAqtmuWaV_cEhiwsommhs_GAmJ9xqhKYOBcTAuWsoV5eaxQEd5m5iJGXpA0-d23lioLszCNX1hN5EimVbyJzoZzRrx20ST1kWgBF5W5T67kfT3caJMIuP3CloVq0bF0p79jMfr/s1600/9.jpg" /></td>
</tr>
</tbody></table>
</li>
<li>Repeat steps 1-5 other five times and draw theline from th bottom to the top of the hexagram.</li>
</ol>
<b>Probabilities</b><br />
The faces are marked so that the first time
we can get four possible outcomes: 3,4,4,4 while the second time we can
get 3,4,4,5. Summing up as shown in the following table:<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg5g456IqQcWqSxoqIYy1IfLlAuyi1dSyxaRBqzBVL-ZF2eOtpC2k_UizgXTMIF_8rae15scBnPUhrp8w2ZC3sv3GuDhI9tyTOU0qdIfyeMig3ZyDK-fmtkVFy4oRWcVxVz3OTP-uuPmOtl/s1600/dots_prob_345.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg5g456IqQcWqSxoqIYy1IfLlAuyi1dSyxaRBqzBVL-ZF2eOtpC2k_UizgXTMIF_8rae15scBnPUhrp8w2ZC3sv3GuDhI9tyTOU0qdIfyeMig3ZyDK-fmtkVFy4oRWcVxVz3OTP-uuPmOtl/s1600/dots_prob_345.jpg" /></a></div>
<br />
gives the same probabilities of the yarrow stalks method:<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <sup>1</sup>/<sub>16</sub> = 6.25%<br />
<span class="prob">Prob</span>(8) = <sup>7</sup>/<sub>16</sub> = 43.75%<br />
<span class="prob">Prob</span>(7) = <sup>5</sup>/<sub>16</sub> = 31.25%<br />
<span class="prob">Prob</span>(9) = <sup>3</sup>/<sub>16</sub> = 18.75%<br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
<br />
<h4>
Variants</h4>
Should you like the method but wanting the three coins pronbabilities you can use exactly the same method but marking the faces as follows:<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6jTzGRUtNrxLMRRScUkmz-rcrIdRIEy4DNngO073F6UiPs7aLa2389IfQ9rMkNMqdcby2YOgAEnI5a9V9EHP6dp91GUBKQ0SdPBNqMmxE1FNLRfHncDs62YEG4WEqRCA4O9_Y7rEizhXl/s1600/paper_die_344.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="163" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6jTzGRUtNrxLMRRScUkmz-rcrIdRIEy4DNngO073F6UiPs7aLa2389IfQ9rMkNMqdcby2YOgAEnI5a9V9EHP6dp91GUBKQ0SdPBNqMmxE1FNLRfHncDs62YEG4WEqRCA4O9_Y7rEizhXl/s320/paper_die_344.jpg" width="320" /></a></div>
Note that now there are <i>two</i> red dots in the group of five.<br />
A file ready to be print is <a href="https://docs.google.com/viewer?a=v&pid=sites&srcid=ZGVmYXVsdGRvbWFpbnxjYXN0aW5naWNoaW5nfGd4OjczY2JkYTEyMDM1YjEyNjA" target="_blank">available</a> (remember to print it at 100% of its size, with no automatic resize).<br />
<br />
<br />
Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-709198572941428830.post-44485014349003198432016-06-19T15:22:00.005+02:002016-06-19T15:22:52.112+02:00Three long dice (3d4)<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEihCfyZgBWEeXZ1LHNhF67LheErcdn-PqKNNHlH4Ecc6EVj8jgZ_ZbTqcIPAUkjh19ovhdJw-1AToFaefFT7beGTsi5K0SHaG4aw3j3vsWIML_j9nedGs4_UEhnDyrGhPlg7IqwqLPhlHKz/s1600/lpk_3dice.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="243" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEihCfyZgBWEeXZ1LHNhF67LheErcdn-PqKNNHlH4Ecc6EVj8jgZ_ZbTqcIPAUkjh19ovhdJw-1AToFaefFT7beGTsi5K0SHaG4aw3j3vsWIML_j9nedGs4_UEhnDyrGhPlg7IqwqLPhlHKz/s320/lpk_3dice.jpg" width="320" /></a></div>
<a href="http://www.lpkaster.com/" target="_blank">Lawrence P Kaster</a>, created these three <a href="https://en.wikipedia.org/wiki/Long_dice" target="_blank">long dice</a> to cast I Ching hexagrams. Two of them are marked (2,2,3,3) the other one is marked (2,3,3,3). Lawrence sells them on <a href="https://www.etsy.com/listing/280382026/ebony-long-dice-or-zhang-shaizi-to?ref=related-4" target="_blank">Etsy</a> in many variations together with other I Ching related creations.<br />
I don't have them but from the images I feel they are nice to the touch and really pleasant to throw while casting hexagrams.<br />
<br />
The method is rather intuitive:<br />
<ol>
<li>Roll the three dices</li>
<li>Sum the face values and draw the line according the following table:<br />
<table class="center" style="width: 340px;">
<tbody>
<tr><td align="center" style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">6</td>
<td style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">7</td>
<td style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">8</td>
<td style="font-size: large; font-weight: bold; text-align: center !important;" width="25%">9</td></tr>
<tr>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqKQHSL1r6lZ3O6gyIbk6N8Tscg2D7_OPrVC9N6WLSK3hwBNmECtBNgGUZyUCHOxoSDBL9L9l-2LE3CPc4t3bUwI4XTyWcb39nEWh2pKdPcqlmSZ582LOKgiWAc90GHn4QPNBgrxuJbZx7/s1600/6.jpg" /></td>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIdKKtoajT-pzkqiXPf6cI60GyQMo-BK3cyMnayJhHNLHTsE1TfuCJcDOwnP3I5-7VDxwYg0qdPwWw85T2FNYrSv6FJasVB1UaYNd0-sCxFojde_oGRDg6v0Y_gYghV3kKxFOBDKEEJ6Od/s1600/7.jpg" /></td>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0xuLSq52e0yRvkBT_QafuHzDSF4JvHMY_qAqnOQyxJW4vdHtd3NmOS6RSW7GvhheL8wy3rdRrPG7Juz78djtBamdX6cGRO6vYk3yfs5qrYej9c_f-532y0_BvbjdRGysvdWEy3InE2Fil/s1600/8.jpg" /></td>
<td style="text-align: center !important;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUgfVENqLAqtmuWaV_cEhiwsommhs_GAmJ9xqhKYOBcTAuWsoV5eaxQEd5m5iJGXpA0-d23lioLszCNX1hN5EimVbyJzoZzRrx20ST1kWgBF5W5T67kfT3caJMIuP3CloVq0bF0p79jMfr/s1600/9.jpg" /></td>
</tr>
</tbody></table>
</li>
<li>Repeat steps 1-2 other five times drawing the hexagram from bottom to top.</li>
</ol>
<h4>
Probabilities</h4>
Assuming the first die is the one marked (2,3,3,3) we have the following possibilities:<br />
<div style="text-align: center;">
<b>6</b> = (2+2+2) </div>
<div style="text-align: center;">
<b>9</b> = (3+3+3) </div>
<div style="text-align: center;">
<b>8</b> = (2+3+3) or (3+3+2) or (3+2+3)</div>
<div style="text-align: center;">
<b>7</b> = (2+2+3) or (2+3+2) or (3+2+2)</div>
that lead to the following probabilities:<br />
<div style="text-align: center;">
<span class="prob">Prob</span>(6) = <sup>1</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> = <sup>4</sup>/<sub>64</sub> = <sup>1</sup>/<sub>16</sub> <br />
<span class="prob">Prob</span>(9) = <sup>3</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> = <sup>12</sup>/<sub>64</sub> = <sup>3</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(8) = (<sup>1</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub>) + (<sup>3</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub>) <complete id="goog_733124045">+ </complete> (<sup>3</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub>) = <sup>28</sup>/<sub>64</sub> = <sup>7</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(7) = (<sup>1</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub>) + (<sup>1</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub>) + (<sup>3</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub> * <sup>2</sup>/<sub>4</sub>) = <sup>20</sup>/<sub>64</sub> = <sup>5</sup>/<sub>16</sub><br />
<span class="prob">Prob</span>(<i>yin</i>) = <span class="prob">Prob</span>(<i>yang</i>) = <sup>1</sup>/<sub>2</sub>
</div>
which are the same as the <a href="http://www.castingiching.com/2016/05/yarrow-stalks.html" target="_blank">yarrow stalk method</a>.<br />
<br />
To get the <a href="http://www.castingiching.com/2016/05/three-coins.html" target="_blank">three coins method</a> probablities, the three dice should have all be marked with (2,2,3,3).<br />
<br />
Unknownnoreply@blogger.com0