<?xml version="1.0"?>
<rss version="2.0">
   <channel>
      <title>1°A - Sociologia -  Auguste comte, Durkheim by STE Pedro Mendes</title>
      <link>https://padlet.com/projetostepmf/r6xx81orez8</link>
      <description>Professor: José Lima /
Grupo 2 -
Katyucia, Enikésia e Rayssa</description>
      <language>en-us</language>
      <pubDate>2017-08-04 13:48:46 UTC</pubDate>
      <lastBuildDate>2025-11-20 22:38:58 UTC</lastBuildDate>
      <webMaster>hello@padlet.com</webMaster>
      <image>
         <url>https://padlet-assets.s3.amazonaws.com/icons/Apple.png</url>
      </image>
      <item>
         <title>Biografia de Auguste   Comte</title>
         <author>projetostepmf</author>
         <link>https://padlet.com/projetostepmf/r6xx81orez8/wish/180132289</link>
         <description><![CDATA[<div>    Em 1814, com 16 anos de idade, Auguste comte  ingressou na Escola politécnica de Paris,pelo seu interesse em ciências naturais<br> <figure class="attachment attachment-preview"><img width="257" height="196"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-04 14:54:31 UTC</pubDate>
         <guid>https://padlet.com/projetostepmf/r6xx81orez8/wish/180132289</guid>
      </item>
      <item>
         <title>Auguste comte</title>
         <author>projetostepmf</author>
         <link>https://padlet.com/projetostepmf/r6xx81orez8/wish/180132873</link>
         <description><![CDATA[<div> Foi um dos mais importantes filósofos e sociólogos franceses.<br>   Foi considerado o pai  da disciplina Sociologia, bem como a corrente filosófica, política e científica conhecida como Positivismo.</div><div>    Sua contribuição teórica ainda é importante, com o conceito político da "Lei dos Três Estados".<br><br></div><div><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-04 15:01:59 UTC</pubDate>
         <guid>https://padlet.com/projetostepmf/r6xx81orez8/wish/180132873</guid>
      </item>
      <item>
         <title></title>
         <author>projetostepmf</author>
         <link>https://padlet.com/projetostepmf/r6xx81orez8/wish/180133126</link>
         <description><![CDATA[<div><figure class="attachment attachment-preview"><img src="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcSlUNOWrbXTMU7qiFES6Wri5zjtGSy0kgoheFzZJipVb68x_Vgj" width="259" height="194"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-04 15:06:11 UTC</pubDate>
         <guid>https://padlet.com/projetostepmf/r6xx81orez8/wish/180133126</guid>
      </item>
      <item>
         <title></title>
         <author>projetostepmf</author>
         <link>https://padlet.com/projetostepmf/r6xx81orez8/wish/180133537</link>
         <description><![CDATA[<div>A filosofia positiva de Comte nega que a explicação dos fenômenos naturais, assim como sociais, provenha de um só princípio. A visão positiva dos fatos abandona a consideração das <em>causas</em> dos fenômenos (<a href="https://pt.wikipedia.org/wiki/Deus">Deus</a> ou <a href="https://pt.wikipedia.org/wiki/Natureza">natureza</a>) e pesquisa suas <em>leis</em>, vistas como relações abstratas e constantes entre fenômenos observáveis.<br><br></div><div><br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-04 15:11:17 UTC</pubDate>
         <guid>https://padlet.com/projetostepmf/r6xx81orez8/wish/180133537</guid>
      </item>
      <item>
         <title></title>
         <author>projetostepmf</author>
         <link>https://padlet.com/projetostepmf/r6xx81orez8/wish/180133737</link>
         <description><![CDATA[<div><figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:196,&quot;url&quot;:&quot;data:image/jpeg;base64,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&quot;,&quot;width&quot;:257}" data-trix-content-type="image"><img src="data:image/jpeg;base64,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" width="257" height="196"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-04 15:14:10 UTC</pubDate>
         <guid>https://padlet.com/projetostepmf/r6xx81orez8/wish/180133737</guid>
      </item>
   </channel>
</rss>
