<?xml version="1.0"?>
<rss version="2.0">
   <channel>
      <title>School Notebook by Avery Fernandez (Avery&#39;s animations)</title>
      <link>https://padlet.com/avery8871/pduanbvziy7t</link>
      <description>Made out of Sweat and Blood</description>
      <language>en-us</language>
      <pubDate>2016-08-29 23:44:16 UTC</pubDate>
      <lastBuildDate>2026-02-13 04:18:57 UTC</lastBuildDate>
      <webMaster>hello@padlet.com</webMaster>
      <image>
         <url>https://padlet-assets.s3.amazonaws.com/icons/Ninja.png</url>
      </image>
      <item>
         <title>Vocab</title>
         <author>avery8871</author>
         <link>https://padlet.com/avery8871/pduanbvziy7t/wish/122264238</link>
         <description><![CDATA[<div>equilateral triangle- all sides are congruent<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:160,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:177}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="177" height="160"><figcaption class="caption"></figcaption></figure><br>isosceles triangle- at least two sides are congruent<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:160,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:103}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="103" height="160"><figcaption class="caption"></figcaption></figure><br>quadrilateral- a 4 sided closed shape<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:176,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:176}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="176" height="176"><figcaption class="caption"></figcaption></figure><br>regular polygon- a polygon that is equiangular and equilateral<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:135,&quot;url&quot;:&quot;data:image/jpeg;base64,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&quot;,&quot;width&quot;:217}" data-trix-content-type="image"><img src="data:image/jpeg;base64,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" width="217" height="135"><figcaption class="caption"></figcaption></figure><br>trapezoid- quadrilateral with exactly one pair of parallel sides<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:139,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:252}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="252" height="139"><figcaption class="caption"></figcaption></figure><br>polygon- many angled closed shape<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:166,&quot;url&quot;:&quot;data:image/jpeg;base64,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&quot;,&quot;width&quot;:229}" data-trix-content-type="image"><img src="data:image/jpeg;base64,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" width="229" height="166"><figcaption class="caption"></figcaption></figure><br>parrallelogram- a quadrilateral with both pairs of opposite sides parallel<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:99,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:164}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="164" height="99"><figcaption class="caption"></figcaption></figure><br>rectangle- a quadrilateral with 4 right angles<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:157,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:217}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="217" height="157"><figcaption class="caption"></figcaption></figure><br>rhombus- a quadrilateral with 4 congruent sides<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:166,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:303}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="303" height="166"><figcaption class="caption"></figcaption></figure><br>kite- a quadrilateral that has two pairs of congruent sides, but opposite sides are not congruent<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:148,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:121}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="121" height="148"><figcaption class="caption"></figcaption></figure><br>square- a quadrilateral with four right angles and four congruent sides<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:225,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:225}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="225" height="225"><figcaption class="caption"></figcaption></figure><br>pentagon- a 5-sided polygon<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:226,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:223}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="223" height="226"><figcaption class="caption"></figcaption></figure><br>hexagon- a 6-sided polygon<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:160,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:156}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="156" height="160"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2016-09-07 20:00:22 UTC</pubDate>
         <guid>https://padlet.com/avery8871/pduanbvziy7t/wish/122264238</guid>
      </item>
   </channel>
</rss>
