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      <title>Derivatives by </title>
      <link>https://padlet.com/dvasu64/6tj3fz229k04</link>
      <description>Post some examples of the rules to follow when finding the derivative of a function.</description>
      <language>en-us</language>
      <pubDate>2017-04-06 22:26:14 UTC</pubDate>
      <lastBuildDate>2026-03-18 04:50:35 UTC</lastBuildDate>
      <webMaster>hello@padlet.com</webMaster>
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      <item>
         <title>Single Derivatives</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279237</link>
         <description><![CDATA[<div>f(x) = 4x^5&nbsp;<br>f'(x) = 20x^4</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:27:41 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279237</guid>
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      <item>
         <title>Working with multiple derivatives in a function</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279289</link>
         <description><![CDATA[<div>f(x) = x^2 + 3x + 5<br>f'(x) = 2x+3</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:28:31 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279289</guid>
      </item>
      <item>
         <title>Working with derivatives of two different variables in a function</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279377</link>
         <description><![CDATA[<div>f(x) = 2(x^3 y) + 6xy+ x+ 5y + 3<br>f'(x) = 6(x^2 y) + 6y + 1</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:30:12 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279377</guid>
      </item>
      <item>
         <title>Product Rule</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279473</link>
         <description><![CDATA[<div>f(x) = (20x^4 + 3x) (5x+2)<br>f'(x) = 240x^3(5x+2) + 5(20x^4 + 3x) = 1,300x^4 + 480x^3 + 15x or 5x(260x^3 + 96x^2 + 3)</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:32:04 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279473</guid>
      </item>
      <item>
         <title>Quotient Rule</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279481</link>
         <description><![CDATA[<div>f(x) = (x + 3) / (3x+1)<br>f'(x) = (3(x+3) - (3x+1))/(3x+1)^2 = 2/(3x+1)^2</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:32:14 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165279481</guid>
      </item>
      <item>
         <title>Derivative of sin(x)</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165280084</link>
         <description><![CDATA[<div>f(x) = sin(x)<br>f'(x) = cos(x)</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:42:06 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165280084</guid>
      </item>
      <item>
         <title>Derivative of cos(x)</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165280130</link>
         <description><![CDATA[<div>f(x) = cos(x)<br>f'(x) = -sin(x)</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:42:46 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165280130</guid>
      </item>
      <item>
         <title>Derivative of tan(x)</title>
         <author>dvasu64</author>
         <link>https://padlet.com/dvasu64/6tj3fz229k04/wish/165280164</link>
         <description><![CDATA[<div>f(x) = tan(x)<br>f'(x) = 1/cos^2(x) or sec^2(x)</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-06 23:43:18 UTC</pubDate>
         <guid>https://padlet.com/dvasu64/6tj3fz229k04/wish/165280164</guid>
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