http://wiki.googology.top/index.php?action=history&feed=atom&title=IBLP%E5%88%86%E6%9E%90Part1 2026-04-22T21:58:22Z 本wiki上该页面的版本历史 MediaWiki 1.43.1 http://wiki.googology.top/index.php?title=IBLP%E5%88%86%E6%9E%90Part1&diff=2773&oldid=prev 2026-02-21T12:40:52Z

<p></p> <table style="background-color: #fff; color: #202122;" data-mw="interface"> <col class="diff-marker" /> <col class="diff-content" /> <col class="diff-marker" /> <col class="diff-content" /> <tr class="diff-title" lang="zh-Hans-CN"> <td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">←上一版本</td> <td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">2026年2月21日 (六) 20:40的版本</td> </tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l443">第443行：</td> <td colspan="2" class="diff-lineno">第443行：</td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>|1,2,4,8,10</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>|1,2,4,8,10</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>|}</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>|}</div></td></tr> <tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">[[分类:分析]]</ins></div></td></tr> </table>

Z http://wiki.googology.top/index.php?title=IBLP%E5%88%86%E6%9E%90Part1&diff=2671&oldid=prev 2026-02-20T06:43:49Z

<p>创建页面，内容为“{| class=&quot;wikitable&quot; |Infinite Basic Laver Pattern |ω-Y Sequence |- |(1,0)1 |1 |- |(1,0)1(2,0)1 |1,1 |- |(1,0)1(2,0)1(3,0)1 |1,1,1 |- |(1,0)1(2,1)1 |1,2 |- |(1,0)1(2,1)1(3,0)1 |1,2,1 |- |(1,0)1(2,1)1(3,0)1(4,3)1 |1,2,1,2 |- |(1,0)1(2,1)1(3,1)1 |1,2,2 |- |(1,0)1(2,1)1(3,1)1(4,0)1(5,4)1(6,4)1 |1,2,2,1,2,2 |- |(1,0)1(2,1)1(3,1)1(4,1)1 |1,2,2,2 |- |(1,0)1(2,1)1(3,2)1 |1,2,3 |- |(1,0)1(2,1)1(3,2)1(4,1)1 |1,2,3,2 |- |(1,0)1(2,1)1(3,2)1(4,1)1(5,4)1 |1,2,3,2,3 |- |(1,…”</p> <p><b>新页面</b></p><div>{| class=&quot;wikitable&quot;<br /> |Infinite Basic Laver Pattern<br /> |ω-Y Sequence<br /> |-<br /> |(1,0)1<br /> |1<br /> |-<br /> |(1,0)1(2,0)1<br /> |1,1<br /> |-<br /> |(1,0)1(2,0)1(3,0)1<br /> |1,1,1<br /> |-<br /> |(1,0)1(2,1)1<br /> |1,2<br /> |-<br /> |(1,0)1(2,1)1(3,0)1<br /> |1,2,1<br /> |-<br /> |(1,0)1(2,1)1(3,0)1(4,3)1<br /> |1,2,1,2<br /> |-<br /> |(1,0)1(2,1)1(3,1)1<br /> |1,2,2<br /> |-<br /> |(1,0)1(2,1)1(3,1)1(4,0)1(5,4)1(6,4)1<br /> |1,2,2,1,2,2<br /> |-<br /> |(1,0)1(2,1)1(3,1)1(4,1)1<br /> |1,2,2,2<br /> |-<br /> |(1,0)1(2,1)1(3,2)1<br /> |1,2,3<br /> |-<br /> |(1,0)1(2,1)1(3,2)1(4,1)1<br /> |1,2,3,2<br /> |-<br /> |(1,0)1(2,1)1(3,2)1(4,1)1(5,4)1<br /> |1,2,3,2,3<br /> |-<br /> |(1,0)1(2,1)1(3,2)1(4,2)1<br /> |1,2,3,3<br /> |-<br /> |(1,0)1(2,1)1(3,2)1(4,3)1<br /> |1,2,3,4<br /> |-<br /> |(1,0)1(2,1)1(3,2)1(4,3)1(5,4)1<br /> |1,2,3,4,5<br /> |-<br /> |(1,0)1(2,1,0)1<br /> |1,2,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,0)1<br /> |1,2,4,1<br /> |-<br /> |(1,0)1(2,1,0)1(3,0)1(4,3,0)1<br /> |1,2,4,1,2,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1<br /> |1,2,4,2<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1(4,3)1<br /> |1,2,4,2,3<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1(4,3)1(5,4)1<br /> |1,2,4,2,3,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1(4,3,1)1<br /> |1,2,4,2,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1(4,3,1)1(5,1)1(6,5,1)1<br /> |1,2,4,2,4,2,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1(4,3,1)1(5,3)1<br /> |1,2,4,3<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1(4,3,1)1(5,3)1(6,5)1<br /> |1,2,4,3,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,1)1(4,3,1)1(5,3)1(6,5,1)1<br /> |1,2,4,3,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,1,0)1<br /> |1,2,4,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,1,0)1(4,1)1(5,4,1)1(6,4,1)1<br /> |1,2,4,4,2,4,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,1,0)1(4,1,0)1<br /> |1,2,4,4,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1<br /> |1,2,4,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,1)1(5,4,1)1<br /> |1,2,4,5,2,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,1)1(5,4,1)1(6,5)1<br /> |1,2,4,5,2,4,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,1,0)1<br /> |1,2,4,5,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,1,0)1(5,1,0)1<br /> |1,2,4,5,4,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,1,0)1(5,4)1<br /> |1,2,4,5,4,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,2)1<br /> |1,2,4,5,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,2)1(5,2)1<br /> |1,2,4,5,5,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3)1<br /> |1,2,4,5,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3)1(5,4)1<br /> |1,2,4,5,6,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1<br /> |1,2,4,5,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,1,0)1<br /> |1,2,4,5,7,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,1,0)1(6,5)1(7,6,5)1<br /> |1,2,4,5,7,4,5,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,2)1<br /> |1,2,4,5,7,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,2)1(6,5,2)1<br /> |1,2,4,5,7,5,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,3)1<br /> |1,2,4,5,7,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,3)1(6,5,3)1<br /> |1,2,4,5,7,6,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,3,2)1<br /> |1,2,4,5,7,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,4)1<br /> |1,2,4,5,7,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2)1(4,3,2)1(5,4)1(6,5,4)1<br /> |1,2,4,5,7,8,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2<br /> |1,2,4,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,0)1(5,4,0)1(6,5,4,0)2<br /> |1,2,4,6,1,2,4,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,1,0)1<br /> |1,2,4,6,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,1,0)1(5,4)1<br /> |1,2,4,6,4,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,1,0)1(5,4)1(6,5,4)1<br /> |1,2,4,6,4,5,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,1,0)1(5,4)1(6,5,4)1(7,6,5,4)2<br /> |1,2,4,6,4,5,7,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,1,0)1(5,4)1(6,5,4)1(7,6,5,4)2(8,5,4)1<br /> |1,2,4,6,4,5,7,9,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,1,0)1(5,4,1,0)2<br /> |1,2,4,6,4,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,2)1<br /> |1,2,4,6,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,2)1(5,4,2)1(6,5,4,2)2<br /> |1,2,4,6,5,7,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,2,1,0)2<br /> |1,2,4,6,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,2,1,0)2(5,2,1,0)2<br /> |1,2,4,6,6,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3)1<br /> |1,2,4,6,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3)1(5,4,3)1<br /> |1,2,4,6,7,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3)1(5,4,3)1(6,5,4,3)2<br /> |1,2,4,6,7,9,11<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3<br /> |1,2,4,6,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,1,0)1<br /> |1,2,4,6,8,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,1,0)1(6,5,1,0)2(7,6,5,1,0)3<br /> |1,2,4,6,8,4,6,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,2)1<br /> |1,2,4,6,8,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,2,1,0)2<br /> |1,2,4,6,8,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,3)1<br /> |1,2,4,6,8,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,3,2,1,0)3<br /> |1,2,4,6,8,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4)1<br /> |1,2,4,6,8,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4)1(6,5,4)1(7,6,5,4)2(8,7,6,5,4)3<br /> |1,2,4,6,8,9,11,13,15<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,2,1,0)3<br /> |1,2,4,6,8,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,2,1,0)3(6,5,2,1,0)3<br /> |1,2,4,6,8,10,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1<br /> |1,2,4,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,1,0)1<br /> |1,2,4,7,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,1,0)1(7,6,1,0)2(8,7,6,1,0)3(9,8,7)1<br /> |1,2,4,7,4,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,2)1<br /> |1,2,4,7,5<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,2,1,0)2<br /> |1,2,4,7,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1<br /> |1,2,4,7,6,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,3)1<br /> |1,2,4,7,6,9,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,3,2,1,0)3<br /> |1,2,4,7,6,9,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,3,2,1,0)3(7,6,3)1<br /> |1,2,4,7,6,9,8,11<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,4)1<br /> |1,2,4,7,6,9,8,11,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,4,2,1,0)3<br /> |1,2,4,7,6,9,8,11,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,4,2,1,0)3(7,6,4)1<br /> |1,2,4,7,6,9,8,11,10,13<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,4,2,1,0)3(7,6,4)1(8,6,2,1,0)3(9,8,6)1<br /> |1,2,4,7,6,9,8,11,10,13,12,15<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,4,3)1<br /> |1,2,4,7,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5)1<br /> |1,2,4,7,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5)1(7,6,5)1<br /> |1,2,4,7,8,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5)1(7,6,5)1(8,7,6,5)2(9,8,7,6,5)3(10,9,8)1<br /> |1,2,4,7,8,10,13<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3<br /> |1,2,4,7,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,2,1,0)3<br /> |1,2,4,7,9,11<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,5)1<br /> |1,2,4,7,9,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,5)1(8,4,3)1<br /> |1,2,4,7,9,12,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,5)1(8,5,2,1,0)3(9,8,5)1<br /> |1,2,4,7,9,12,9,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,5)1(8,6,2,1,0)3(9,8,6)1<br /> |1,2,4,7,9,12,11,14<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,5)1(8,6,5)1<br /> |1,2,4,7,9,12,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,5)1(8,7)1<br /> |1,2,4,7,9,12,13<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,2,1,0)3(7,6,5)1(8,7,2,1,0)3(9,8,7)1<br /> |1,2,4,7,9,12,14,17<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2<br /> |1,2,4,7,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,4,3)1(8,7,4,3)2<br /> |1,2,4,7,10,7,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,5,2,1,0)3<br /> |1,2,4,7,10,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,5,4,3)2<br /> |1,2,4,7,10,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6)1<br /> |1,2,4,7,10,11<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,2,1,0)3<br /> |1,2,4,7,10,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,2,1,0)3(8,7,6)1<br /> |1,2,4,7,10,12,15<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2<br /> |1,2,4,7,10,12,15,18<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3<br /> |1,2,4,7,10,13<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,5,4,3)3<br /> |1,2,4,7,10,13,16<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1<br /> |1,2,4,7,11<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1(9,7,6)1<br /> |1,2,4,7,11,11<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1(9,8)1<br /> |1,2,4,7,11,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1(9,8,2,1,0)3<br /> |1,2,4,7,11,13<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1(9,8,5,4,3)3<br /> |1,2,4,7,11,14<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1(9,8,7,6)2<br /> |1,2,4,7,11,15<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> |1,2,4,7,11,15,19<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,4,3)1(6,5,4,3)2(7,6,5,4,3)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3(11,10,9)1<br /> |1,2,4,7,11,16<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3<br /> |1,2,4,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,1,0)1<br /> |1,2,4,8,4<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,1,0)1(7,6,1,0)2(8,7,6,1,0)3(9,8,7)1<br /> |1,2,4,8,4,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,1,0)1(7,6,1,0)2(8,7,6,1,0)3(9,*8,7,6,1,0)3<br /> |1,2,4,8,4,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2<br /> |1,2,4,8,6<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3<br /> |1,2,4,8,6,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1<br /> |1,2,4,8,6,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,10,9)1<br /> |1,2,4,8,6,9,13<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3<br /> |1,2,4,8,6,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,6,2,1,0)3<br /> |1,2,4,8,6,10,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,6,2,1,0)3(13,12,6)1(14,13,12,6)2(15,14,13,12,6)3(16,*15,14,13,12,6)3<br /> |1,2,4,8,6,10,8,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,7,2,1,0)3<br /> |1,2,4,8,6,10,8,12,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,7,6)1<br /> |1,2,4,8,7<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,7,6)1(13,12,7,6)2(14,13,12,7,6)3(15,*14,13,12,7,6)3<br /> |1,2,4,8,7,12<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,8,2,1,0)3<br /> |1,2,4,8,7,12,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,8,7,6)2<br /> |1,2,4,8,7,12,10<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,8,7,6)2(13,12,8,7,6)3(14,13,12)1<br /> |1,2,4,8,7,12,10,14<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,8,7,6)2(13,12,8,7,6)3(14,13,12)1(15,14,13,12)2(16,15,14,13,12)3(17,*16,15,14,13,12)3<br /> |1,2,4,8,7,12,10,15<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,7,6)1(9,8,7,6)2(10,9,8,7,6)3<br /> (11,*10,9,8,7,6)3(12,8,7,6)2(13,12,8,7,6)3(14,13,12)1(15,14,13,12)2(16,15,14,13,12)3<br /> (17,*16,15,14,13,12)3(18,13,12)1<br /> |1,2,4,8,7,12,11<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,*7,6,2,1,0)3<br /> |1,2,4,8,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,2,1,0)2(7,6,2,1,0)3(8,*7,6,2,1,0)3(9,2,1,0)2<br /> (10,9,2,1,0)3(11,*10,9,2,1,0)3<br /> |1,2,4,8,8,8<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,3)1<br /> |1,2,4,8,9<br /> |-<br /> |(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2,1,0)3(5,*4,3,2,1,0)3(6,3,2,1,0)3<br /> |1,2,4,8,10<br /> |}</div>

Baixie01000a7