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      <title>Composition Functions by Andrea Roland</title>
      <link>https://padlet.com/andrea_roland1/sows6rqle7lb</link>
      <description>Research the concept of composition fucntions</description>
      <language>en-us</language>
      <pubDate>2017-04-03 00:27:50 UTC</pubDate>
      <lastBuildDate>2026-02-25 00:02:00 UTC</lastBuildDate>
      <webMaster>hello@padlet.com</webMaster>
      <image>
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      <item>
         <title></title>
         <author>j_mayfield720</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872034</link>
         <description><![CDATA[<div>: a <strong>function</strong> whose values are found from two given <strong>functions</strong> by applying one <strong>function</strong> to an independent variable and then applying the second <strong>function</strong> to the result and whose domain consists of those values of the independent variable for which the result yielded by the first <strong>function</strong> lies in the domain of the second.</div><div><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:36:25 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872034</guid>
      </item>
      <item>
         <title></title>
         <author>m_villalobos965</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872362</link>
         <description><![CDATA[<div><br>"Function Composition" is applying one function to the results of another</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:37:22 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872362</guid>
      </item>
      <item>
         <title>Composing Functions at Points. Suppose you are given the two functions f (x) = 2x + 3 and g(x) = –x2 + 5. Composition means that you can plug g(x) into f (x). This is written as &quot;( f o g)(x)&quot;, which is pronounced as &quot;f-compose-g of x&quot;</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872406</link>
         <description><![CDATA[<div> functions compostion- is applying one function to the results of another</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:37:30 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872406</guid>
      </item>
      <item>
         <title>Domain of Composite Function. You must get both Domains right (the composed function and the first function used). When doing, for example, (g º f)(x) = g(f(x)): Make sure you get the Domain for f(x) right, Then also make sure that g(x) gets the correct Domain.</title>
         <author>s_babovec137</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872429</link>
         <description><![CDATA[]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:37:33 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872429</guid>
      </item>
      <item>
         <title></title>
         <author>n_iwuoha382</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872433</link>
         <description><![CDATA[<div>Is applying one function to the results of another: The result of f() is sent through g() It is written: (g º f)(x)</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:37:34 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872433</guid>
      </item>
      <item>
         <title>The composition of one-to-one functions is always one-to-one. Similarly, the composition of two onto functions is always onto. It follows that composition of two bijections is also a bijection. The inverse function of a composition (assumed invertible) has the property that (f ∘ g)−1 = ( g−1 ∘ f −1).</title>
         <author>a_khalaf494</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872502</link>
         <description><![CDATA[]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:37:47 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872502</guid>
      </item>
      <item>
         <title></title>
         <author>t_pennington722</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872860</link>
         <description><![CDATA[<div>two or m<del>ore functi</del>ons, one to one</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:38:49 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164872860</guid>
      </item>
      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873223</link>
         <description><![CDATA[<div><strong><em>function composition is the pointwise application of one&nbsp;function to the result of another to produce a third function.&nbsp;</em></strong></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:39:51 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873223</guid>
      </item>
      <item>
         <title>Composition Function(s)</title>
         <author>j_valentin599</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873311</link>
         <description><![CDATA[<div><strong>Composition</strong> means that you can plug g(x) into f (x).&nbsp; a function whose values are found from two given functions by applying one function to an independent variable and then applying the second function to the result and whose domain consists of those values of the independent variable for which the result yielded by the first function lies in the domain of the second</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:40:05 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873311</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>m_stretch508</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873584</link>
         <description><![CDATA[<div><br>"Function Composition" is applying one function to the results of another:<br><br></div><div><br><figure class="attachment attachment-preview"><img src="https://www.mathsisfun.com/sets/images/function-composition.gif" width="329" height="45"><figcaption class="caption"></figcaption></figure><br><br></div><div><br>The result of f() is sent through g()<br><br></div><div><br>It is written: <strong>(g º f)(x)<br></strong><br></div><div><br>Which means: <strong>g(f(x))<br></strong><br></div><div><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:40:43 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873584</guid>
      </item>
      <item>
         <title></title>
         <author>d_contreras988</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873842</link>
         <description><![CDATA[<div>Composition of Functions is the process of combining two functions where one function is performed first and the result of which is substituted in place of each x in the other function.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:41:29 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164873842</guid>
      </item>
      <item>
         <title></title>
         <author>m_stretch508</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874373</link>
         <description><![CDATA[<div><br>The symbol for composition is a small circle:</div><div><strong>(g º f)(x)<br>Not a filled in circle that means multiplication.&nbsp;</strong>You cannot have the square root of a negative number  so we must <strong>exclude</strong> negative numbers.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:42:57 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874373</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874594</link>
         <description><![CDATA[<div>Composition of functions is when one&nbsp;function is inside&nbsp;of another&nbsp;function. -Dallas<br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:43:29 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874594</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>r_carlos392</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874722</link>
         <description><![CDATA[<div>The composition of functions is a special case of the composition of relations, so all properties of the latter are true of composition of functions. The composition of functions has some additional properties.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:43:50 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874722</guid>
      </item>
      <item>
         <title>Bijection</title>
         <author>j_valentin599</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874984</link>
         <description><![CDATA[<div>one-to-one correspondence is a function between the elements of two sets, where each element of one set is paired with exactly one element of the other set, and each element of the other set is paired with exactly one element of the first set.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:44:28 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164874984</guid>
      </item>
      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164876975</link>
         <description><![CDATA[<div>Composition means that you can plug <em>g</em>(<em>x</em>) into  <em>f</em> (<em>x</em>). And "(<em> f</em> o <em>g</em>)(<em>x</em>)" means "<em> f</em> (<em>g</em>(<em>x</em>))". That is, you plug something in for <em>x</em>, then you plug that value into <em>g</em>, simplify, and then plug the result into  <em>f</em>.<br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:50:22 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164876975</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>r_carlos392</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164877720</link>
         <description><![CDATA[<div>The composition of functions is a special case of the composition of relations, so all properties of the latter are true of composition of functions. The composition of functions has some additional properties.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 13:52:50 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164877720</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>a_tuten213</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920105</link>
         <description><![CDATA[<div>A Composition Function is a function that includes another function inside of it. Ex. F(G(x)). This is one way to solve functions with multiple variables and used when a function is multiplied by another.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:47:03 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920105</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920344</link>
         <description><![CDATA[<div>Composition means that you can plug g(x) into f(x), which is written as (f o g)(x).&nbsp;-Austin H.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:47:42 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920344</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>m_gentry963</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920542</link>
         <description><![CDATA[<div>definition: applying one function to the results of another<br>notation: (gf)(x)<br>key characteristics: composing two functions is a chaining process in which the output of the inner function becomes the input of the outer function.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:48:15 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920542</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920709</link>
         <description><![CDATA[<div>It is a&nbsp;function whose values are found from two given functions by applying one function to an independent variable and then applying the second function to the result and whose domain consists of those values of the independent variable for which the result yielded by the first function lies in the domain of the second.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:48:41 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920709</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>d_watts019</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920773</link>
         <description><![CDATA[<div><figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:284,&quot;url&quot;:&quot;http://3.bp.blogspot.com/-kgATvEPETIQ/UKwME42wckI/AAAAAAAAHdM/QK8rA1bKb1U/s1600/def02.PNG&quot;,&quot;width&quot;:287}" data-trix-content-type="image"><img src="http://3.bp.blogspot.com/-kgATvEPETIQ/UKwME42wckI/AAAAAAAAHdM/QK8rA1bKb1U/s1600/def02.PNG" width="287" height="284"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:48:53 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164920773</guid>
      </item>
      <item>
         <title></title>
         <author>d_watts019</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164921012</link>
         <description><![CDATA[]]></description>
         <enclosure url="http://3.bp.blogspot.com/-kgATvEPETIQ/UKwME42wckI/AAAAAAAAHdM/QK8rA1bKb1U/s1600/def02.PNG" />
         <pubDate>2017-04-05 15:49:27 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164921012</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164921026</link>
         <description><![CDATA[<div>means that you can plug g(x) into f (x). This is written as "( f o g)(x)", which is pronounced as "f-compose-g of x". </div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:49:30 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164921026</guid>
      </item>
      <item>
         <title>Trihexamil</title>
         <author>f_scott467</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164921347</link>
         <description><![CDATA[<div>43 6f 6d 70 6f 73 69 74 65 20 66 75 6e 63 74 69 6f 6e 73 20 61 72 65 20 64 65 73 63 72 69 62 65 64 20 61 73 20 67 65 74 74 69 6e 67 20 62 6f 74 68 20 64 6f 6d 61 69 6e 73 20 72 69 67 68 74 2e 20</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:50:18 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164921347</guid>
      </item>
      <item>
         <title>It is possible to composite functions. If g and h are functions then the composite function can be described by the following equation:[g∘h](x)=g[h(x)][g∘h](x)=g[h(x)]</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164922100</link>
         <description><![CDATA[]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:52:41 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164922100</guid>
      </item>
      <item>
         <title>Definition of a Complex Function</title>
         <author>j_coursey681</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164922471</link>
         <description><![CDATA[<div>&nbsp;a <strong>function</strong> whose values are found from two given <strong>functions</strong> by applying one <strong>function</strong> to an singular variable, and then applying the second <strong>function</strong> to the result and whose domain consists of those values of the singular variable for which the result yielded by the first <strong>function</strong> lies in the domain of the second.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:53:50 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164922471</guid>
      </item>
      <item>
         <title>Composition Functions </title>
         <author>c_laicer609</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164922764</link>
         <description><![CDATA[<div>a <strong>function</strong> whose values are found from two given <strong>functions</strong> by applying one <strong>function</strong> to an independent variable and then applying the second <strong>function</strong> to the result and whose domain consists of those values of the independent variable for which the result yielded by the first <strong>function</strong> lies in the domain of the second.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:54:41 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164922764</guid>
      </item>
      <item>
         <title>errolyn </title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923234</link>
         <description><![CDATA[<div>a <strong>function</strong> whose values are found from two given <strong>functions</strong> by applying one <strong>function</strong> to an independent variable and then applying the second <strong>function</strong> to the result and whose domain consists of those values of the independent variable for which the result yielded by the first <strong>function</strong> lies in the domain of the other </div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:56:01 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923234</guid>
      </item>
      <item>
         <title></title>
         <author>d_smith772</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923387</link>
         <description><![CDATA[<div>Composing <strong>Functions</strong> at Points. Suppose you are given the two <strong>functions</strong> f (x) = 2x + 3 and g(x) = –x<sup>2</sup> + 5. <strong>Composition</strong> means that you can plug g(x) into f (x). This is written as "( f o g)(x)", which is pronounced as "f-compose-g of x".</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:56:27 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923387</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>t_sharpe219</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923446</link>
         <description><![CDATA[<div>a <strong>function</strong> whose values are found from two given <strong>functions</strong> by applying one <strong>function</strong> to an independent variable and then applying the second <strong>function</strong> to the result and whose domain consists of those values of the independent variable for which the result yielded by the first <strong>function</strong> lies in the domain of the second.<br><br>Notation is (f o g)(x) as g(x) is plugged into f(x)<br><br>Appearance and restrictions are based on the combined equation and is directly related to domain.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:56:36 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923446</guid>
      </item>
      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923701</link>
         <description><![CDATA[<div><br>"Function Composition" is applying one function to the results of another:<br><br></div><div><br><figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:45,&quot;url&quot;:&quot;https://www.mathsisfun.com/sets/images/function-composition.gif&quot;,&quot;width&quot;:329}" data-trix-content-type="image"><img src="https://www.mathsisfun.com/sets/images/function-composition.gif" width="329" height="45"><figcaption class="caption"></figcaption></figure><br><br></div><div><br>The result of f() is sent through g()<br><br></div><div><br>It is written: <strong>(g º f)(x)<br></strong><br></div><div><br>Which means: <strong>g(f(x))<br></strong><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:57:19 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164923701</guid>
      </item>
      <item>
         <title>a function whose values are found from two given functions by applying one function to an independent variable and then applying the second function to the result and whose domain consists of those values of the independent variable for which the result yielded by the first function lies in the domain of the other</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164924010</link>
         <description><![CDATA[]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:58:06 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164924010</guid>
      </item>
      <item>
         <title>Meme Page</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164924110</link>
         <description><![CDATA[<div>We should just create this place into a meme page<br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:58:21 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164924110</guid>
      </item>
      <item>
         <title>E?</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164924285</link>
         <description><![CDATA[<div>you use a function of G to solve the fuction of F<br><br>F(X) 3x+6   G(x) 2x-9<br>F(G(X)) 3(2x-9)+6<br>6x-27+6<br>f(g(x)) 6x+33</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 15:58:42 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164924285</guid>
      </item>
      <item>
         <title>Meme</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164926845</link>
         <description><![CDATA[<div><br></div><div><br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 16:06:19 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164926845</guid>
      </item>
      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927007</link>
         <description><![CDATA[]]></description>
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         <pubDate>2017-04-05 16:06:52 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927007</guid>
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      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927023</link>
         <description><![CDATA[]]></description>
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         <pubDate>2017-04-05 16:06:54 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927023</guid>
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      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927380</link>
         <description><![CDATA[]]></description>
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         <pubDate>2017-04-05 16:07:36 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927380</guid>
      </item>
      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927615</link>
         <description><![CDATA[]]></description>
         <enclosure url="https://thechive.files.wordpress.com/2016/03/some-dank-memes-for-the-weekend-30-photos-7.jpg?quality=85&amp;strip=info&amp;w=600" />
         <pubDate>2017-04-05 16:08:31 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164927615</guid>
      </item>
      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164928135</link>
         <description><![CDATA[<div>Of this class</div>]]></description>
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         <pubDate>2017-04-05 16:10:05 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164928135</guid>
      </item>
      <item>
         <title></title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164928487</link>
         <description><![CDATA[]]></description>
         <enclosure url="https://www.google.com/imgres?imgurl=https%3A%2F%2Fmedia4.giphy.com%2Fmedia%2Fehc19YLR4Ptbq%2F200_s.gif&amp;imgrefurl=http%3A%2F%2Fgiphy.com%2Fsearch%2Fmemes&amp;docid=T-iQWBgK8-g1UM&amp;tbnid=qnJPgfTvVR5FAM%3A&amp;vet=10ahUKEwjko6bw2Y3TAhVC7GMKHZsOA3oQMwiGASgFMAU..i&amp;w=253&amp;h=200&amp;safe=active&amp;bih=654&amp;biw=1366&amp;q=%20memes&amp;ved=0ahUKEwjko6bw2Y3TAhVC7GMKHZsOA3oQMwiGASgFMAU&amp;iact=mrc&amp;uact=8" />
         <pubDate>2017-04-05 16:11:03 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164928487</guid>
      </item>
      <item>
         <title>caylin</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164951987</link>
         <description><![CDATA[<div>composition of functions is when one function is inside another function.&nbsp;<br>The&nbsp;notation used&nbsp;for the&nbsp;composition of functions looks like&nbsp;this, (f o g)(x).<br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:21:48 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164951987</guid>
      </item>
      <item>
         <title>chirsten</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164952181</link>
         <description><![CDATA[<div>The composition of one-to-one functions is always one-to-one. Similarly, the composition of two onto functions is always onto. It follows that composition of two bijections is also a bijection.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:22:08 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164952181</guid>
      </item>
      <item>
         <title></title>
         <author>c_poor837</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164952406</link>
         <description><![CDATA[<div>Function composition is applying one function to the results of another, as what you put into f(x). Ex: f(g(x)). Essentially, you place a function inside of another.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:22:50 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164952406</guid>
      </item>
      <item>
         <title>A composite function is when a function is inside another function. It is written like , (f o g)(x), so basically, its g(f(x). </title>
         <author>v_prewitt533</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953086</link>
         <description><![CDATA[]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:24:53 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953086</guid>
      </item>
      <item>
         <title></title>
         <author>o_brooks001</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953279</link>
         <description><![CDATA[<div>Composition of functions is when one function is inside another function.&nbsp;<br>The notation used for the composition of functions looks like this, (f o g)(x)</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:25:19 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953279</guid>
      </item>
      <item>
         <title>Composition Function - Victoria Zapata</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953288</link>
         <description><![CDATA[<div>a <strong>function</strong> whose values are found from two given <strong>functions</strong> by applying one <strong>function</strong> to an independent variable and then applying the second <strong>function</strong> to the result and whose domain consists of those values of the independent variable for which the result yielded by the first <strong>function</strong> lies in the domain of the second.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:25:20 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953288</guid>
      </item>
      <item>
         <title>Composition Functions</title>
         <author>m_watts939</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953617</link>
         <description><![CDATA[<div><strong>Composition</strong> of <strong>Functions</strong>: Composing <strong>Functions</strong> at Points. Suppose you are given the two <strong>functions</strong> f (x) = 2x + 3 and g(x) = –x<sup>2</sup> + 5. <strong>Composition</strong> means that you can plug g(x) into f (x). This is written as "( f o g)(x)", which is pronounced as "f-compose-g of x".</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:26:28 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164953617</guid>
      </item>
      <item>
         <title>composition functions - katy palmer</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954165</link>
         <description><![CDATA[<div><br>"Function Composition" is applying one function to the results of another:<figure class="attachment attachment-preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:45,&quot;url&quot;:&quot;https://www.mathsisfun.com/sets/images/function-composition.gif&quot;,&quot;width&quot;:329}" data-trix-content-type="image"><img src="https://www.mathsisfun.com/sets/images/function-composition.gif" width="329" height="45"><figcaption class="caption"></figcaption></figure></div><div>The result of f() is sent through g()</div><div>It is written: <strong>(g º f)(x)</strong></div><div>Which means: <strong>g(f(x))<br></strong><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:27:43 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954165</guid>
      </item>
      <item>
         <title></title>
         <author>k_hogwood448</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954247</link>
         <description><![CDATA[<div><strong>Composition</strong> of <strong>Functions</strong>: Composing <strong>Functions</strong> at Points. Suppose you are given the two <strong>functions</strong> f (x) = 2x + 3 and g(x) = –x<sup>2</sup> + 5. <strong>Composition</strong> means that you can plug g(x) into f (x). This is written as "( f o g)(x)", which is pronounced as "f-compose-g of x".</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:27:59 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954247</guid>
      </item>
      <item>
         <title>composition of functions</title>
         <author>r_taylor690</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954655</link>
         <description><![CDATA[<div>Composition of functions is when one function is inside another function.&nbsp;<br>The notation used for the composition of functions looks like this, (f o g)(x)</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:28:54 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954655</guid>
      </item>
      <item>
         <title>Compo-Jazz</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954707</link>
         <description><![CDATA[<div> a function is like a machine.Therefore, a composition of functions occurs when the output, or results, of one functions becomes the input of another function. For functions represented by f(x) or g(x), the composition would be represented by f(g(x)) or g(f(x)).</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:29:04 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954707</guid>
      </item>
      <item>
         <title></title>
         <author>a_enriquez004</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954731</link>
         <description><![CDATA[<div><strong>Composition</strong> of <strong>Functions</strong>: Composing <strong>Functions</strong> at Points. Suppose you are given the two <strong>functions</strong> f (x) = 2x + 3 and g(x) = –x<sup>2</sup> + 5. <strong>Composition</strong> means that you can plug g(x) into f (x). This is written as "( f o g)(x)", which is pronounced as "f-compose-g of x".</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:29:09 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954731</guid>
      </item>
      <item>
         <title></title>
         <author>h_wheeler732</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954865</link>
         <description><![CDATA[<div>Composition of functions is when one&nbsp;function is inside&nbsp;of another&nbsp;function.&nbsp;<br>The&nbsp;notation used&nbsp;for the&nbsp;composition of functions is (f o g)(x)<br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:29:33 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164954865</guid>
      </item>
      <item>
         <title>Dulce Hernandez </title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164955222</link>
         <description><![CDATA[<div>For instance, the <strong>functions</strong> f : X → Y and g : Y → Z can be composed to yield a <strong>function</strong> which maps x in X to g(f(x)) in Z. Intuitively, if z is a <strong>function</strong> of y, and y is a <strong>function</strong> of x, then z is a<strong>function</strong> of x. ... The <strong>composition of functions</strong> has some additional properties.</div><div><figure class="attachment attachment-preview" 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&quot;,&quot;width&quot;:176}" 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" width="176" height="228"><figcaption class="caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:30:16 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164955222</guid>
      </item>
      <item>
         <title></title>
         <author>d_nau390</author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164955750</link>
         <description><![CDATA[<div>&nbsp;Composition of functions is when one function is inside of another function.&nbsp;</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:31:59 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164955750</guid>
      </item>
      <item>
         <title>Erin Porras</title>
         <author></author>
         <link>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164955957</link>
         <description><![CDATA[<div>In mathematics, function composition is the point wise application of one function to the result of another to produce a third function is denoted g* f : X -&gt; Z, defined by (g * f) (x) = g<br>(f(X)) for all x in X.</div>]]></description>
         <enclosure url="" />
         <pubDate>2017-04-05 17:32:41 UTC</pubDate>
         <guid>https://padlet.com/andrea_roland1/sows6rqle7lb/wish/164955957</guid>
      </item>
   </channel>
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