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      <title>My forces and motion by Veronica Avila Perez</title>
      <link>https://padlet.com/3045353/vz7jzkpnuivm</link>
      <description>Made with magic</description>
      <language>en-us</language>
      <pubDate>2017-08-28 15:49:41 UTC</pubDate>
      <lastBuildDate>2017-08-28 16:15:33 UTC</lastBuildDate>
      <webMaster>hello@padlet.com</webMaster>
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      <item>
         <title>Net force</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183156447</link>
         <description><![CDATA[<div>A <strong>net force</strong> is <strong>defined</strong> as the sum of all the <strong>forces</strong> acting on an object. The equation below is the sum of N <strong>forces</strong> acting on an object. There may be several <strong>forces</strong> acting on an object, and when you add up all of those <strong>forces</strong>, the result is what we call the <strong>net force</strong> acting on the object.<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:300,&quot;url&quot;:&quot;http://zonalandeducation.com/mstm/physics/mechanics/forces/netForce/netf3.gif&quot;,&quot;width&quot;:400}" data-trix-content-type="image"><img src="http://zonalandeducation.com/mstm/physics/mechanics/forces/netForce/netf3.gif" width="400" height="300"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-28 15:55:10 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183156447</guid>
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      <item>
         <title>Balanced force </title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183157078</link>
         <description><![CDATA[<div><strong>Balance forces</strong> are two <strong>forces</strong> acting in opposite directions on an object, and equal in size. Anytime there is a <strong>balanced force</strong> on an abject, the object stays still or continues moving continues to move at the same speed and in the same direction.<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:233,&quot;url&quot;:&quot;http://eschooltoday.com/science/forces/images/reaction-force.jpg&quot;,&quot;width&quot;:480}" data-trix-content-type="image"><img src="http://eschooltoday.com/science/forces/images/reaction-force.jpg" width="480" height="233"><figcaption class="caption"></figcaption></figure></div>]]></description>
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         <pubDate>2017-08-28 15:57:16 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183157078</guid>
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      <item>
         <title>Motion</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183157684</link>
         <description><![CDATA[<div>the action or process of moving or being moved.<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:2000,&quot;url&quot;:&quot;http://www.inceif.org/wp-content/uploads/2016/08/sign.jpg&quot;,&quot;width&quot;:2000}" data-trix-content-type="image"><img src="http://www.inceif.org/wp-content/uploads/2016/08/sign.jpg" width="2000" height="2000"><figcaption class="caption"></figcaption></figure></div>]]></description>
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         <pubDate>2017-08-28 15:59:17 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183157684</guid>
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      <item>
         <title>Acceleration</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158007</link>
         <description><![CDATA[<div>a vehicle's capacity to gain speed within a short time<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:162,&quot;url&quot;:&quot;http://www.hk-phy.org/contextual/mechanics/kin/acceleration/4-03.gif&quot;,&quot;width&quot;:300}" data-trix-content-type="image"><img src="http://www.hk-phy.org/contextual/mechanics/kin/acceleration/4-03.gif" width="300" height="162"><figcaption class="caption"></figcaption></figure></div>]]></description>
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         <pubDate>2017-08-28 16:00:19 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158007</guid>
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      <item>
         <title>Friction</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158344</link>
         <description><![CDATA[<div>the resistance that one surface or object encounters when moving over another<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:249,&quot;url&quot;:&quot;http://eschooltoday.com/science/forces/images/frictional-force-illustration.jpg&quot;,&quot;width&quot;:480}" data-trix-content-type="image"><img src="http://eschooltoday.com/science/forces/images/frictional-force-illustration.jpg" width="480" height="249"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-28 16:01:23 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158344</guid>
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      <item>
         <title>Kinetic friction</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158696</link>
         <description><![CDATA[<div><strong>Kinetic friction</strong>, also known as sliding <strong>friction</strong> or moving <strong>friction</strong>, is the amount of retarding force between two objects that are moving relative to each other.<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:527,&quot;url&quot;:&quot;http://physics20project.weebly.com/uploads/1/6/4/8/16484122/6342090.png?705&quot;,&quot;width&quot;:702}" data-trix-content-type="image"><img src="http://physics20project.weebly.com/uploads/1/6/4/8/16484122/6342090.png?705" width="702" height="527"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-28 16:02:30 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158696</guid>
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      <item>
         <title>Static friction</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158922</link>
         <description><![CDATA[<div><strong>Static friction</strong> is the <strong>friction</strong> that exists between a stationary object and the surface on which it's resting. A <strong>frictional</strong> force occurs when you try to push an object alongside a surface. Once the objects have already started moving, kinetic <strong>friction</strong> takes over.<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:183,&quot;url&quot;:&quot;https://qph.ec.quoracdn.net/main-qimg-95a7c441cb9cb4c3f7c377ebf0cbd3e1-c&quot;,&quot;width&quot;:276}" data-trix-content-type="image"><img src="https://qph.ec.quoracdn.net/main-qimg-95a7c441cb9cb4c3f7c377ebf0cbd3e1-c" width="276" height="183"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-28 16:03:07 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183158922</guid>
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      <item>
         <title>Average Speed</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183159183</link>
         <description><![CDATA[<div>The <strong>average speed</strong> of an object in an interval of time is the distance travelled by the object divided by the duration of the interval; the instantaneous <strong>speed</strong> is the limit of the <strong>average speed</strong> as the duration of the time interval approaches zero.<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:207,&quot;url&quot;:&quot;http://clarkscience8.weebly.com/uploads/2/6/3/7/2637711/speed-formula_orig.png&quot;,&quot;width&quot;:673}" data-trix-content-type="image"><img src="http://clarkscience8.weebly.com/uploads/2/6/3/7/2637711/speed-formula_orig.png" width="673" height="207"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-28 16:03:51 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183159183</guid>
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      <item>
         <title>Speed</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183159458</link>
         <description><![CDATA[<div>the rate at which someone or something is able to move or operate.<figure class="attachment attachment-preview" 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&quot;,&quot;width&quot;:271}" 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" width="271" height="186"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-28 16:04:52 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183159458</guid>
      </item>
      <item>
         <title>Force</title>
         <author>3045353</author>
         <link>https://padlet.com/3045353/vz7jzkpnuivm/wish/183159478</link>
         <description><![CDATA[<div>strength or energy as an attribute of physical action or movement</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-08-28 16:04:59 UTC</pubDate>
         <guid>https://padlet.com/3045353/vz7jzkpnuivm/wish/183159478</guid>
      </item>
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