minor edit of md file

index.xml

@@ -90,7 +90,7 @@
       <link>https://jimishol.github.io/post/pyramid-torus/</link>
       <pubDate>Wed, 14 May 2014 00:00:00 +0000</pubDate>
       <guid>https://jimishol.github.io/post/pyramid-torus/</guid>
-      <description>Paper cut unfold of a Császár polyhedron It is called Császár polyhedron&#xA;(Its dual is the Szilassi polyhedron).&#xA;Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.&#xA;Algebraic start The Euler characteristic X of a torus is zero.&#xA;So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.&#xA;We can assume all faces are triangles. So, E=3F/2 (cause with 3F we count each edge twice).</description>
+      <description>Photo of paper Császár polyhedron Paper cut unfold of a Császár polyhedron The article is about Császár polyhedron.&#xA;(Its dual is the Szilassi polyhedron).&#xA;Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.&#xA;Algebraic start The Euler characteristic X of a torus is zero.&#xA;So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.&#xA;We can assume all faces are triangles.</description>
     </item>
     <item>
       <title>About</title>

post/index.html

@@ -374,12 +374,12 @@ <h1 class="f3 near-black">
       </a>
     </h1>
     <div class="nested-links f5 bg-black lh-copy nested-copy-line-height">
-      Paper cut unfold of a Császár polyhedron It is called Császár polyhedron
+      Photo of paper Császár polyhedron Paper cut unfold of a Császár polyhedron The article is about Császár polyhedron.
 (Its dual is the Szilassi polyhedron).
 Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.
 Algebraic start The Euler characteristic X of a torus is zero.
 So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.
-We can assume all faces are triangles. So, E=3F/2 (cause with 3F we count each edge twice).
+We can assume all faces are triangles.
     </div>
   </div>
 

post/index.xml

@@ -90,7 +90,7 @@
       <link>https://jimishol.github.io/post/pyramid-torus/</link>
       <pubDate>Wed, 14 May 2014 00:00:00 +0000</pubDate>
       <guid>https://jimishol.github.io/post/pyramid-torus/</guid>
-      <description>Paper cut unfold of a Császár polyhedron It is called Császár polyhedron&#xA;(Its dual is the Szilassi polyhedron).&#xA;Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.&#xA;Algebraic start The Euler characteristic X of a torus is zero.&#xA;So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.&#xA;We can assume all faces are triangles. So, E=3F/2 (cause with 3F we count each edge twice).</description>
+      <description>Photo of paper Császár polyhedron Paper cut unfold of a Császár polyhedron The article is about Császár polyhedron.&#xA;(Its dual is the Szilassi polyhedron).&#xA;Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.&#xA;Algebraic start The Euler characteristic X of a torus is zero.&#xA;So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.&#xA;We can assume all faces are triangles.</description>
     </item>
   </channel>
 </rss>

post/pyramid-torus/index.html

@@ -44,7 +44,7 @@
   <meta itemprop="description" content="A tutorial to find by mathematics and to 3D print or paper cut construct.">
   <meta itemprop="datePublished" content="2014-05-14T00:00:00+00:00">
   <meta itemprop="dateModified" content="2014-05-14T00:00:00+00:00">
-  <meta itemprop="wordCount" content="946">
+  <meta itemprop="wordCount" content="952">
   <meta itemprop="keywords" content="Mathematics">
   <meta name="twitter:card" content="summary">
   <meta name="twitter:title" content="The polyhedron with the minimum of vertices, which considers itself a doughnut">
@@ -167,12 +167,17 @@ <h1 class="f1 athelas mt3 mb1">The polyhedron with the minimum of vertices, whic
 
 
     </header>
-    <div class="nested-copy-line-height lh-copy serif f4 nested-links white pr4-l w-two-thirds-l"><p><figure><img src="/images/pyramid-torus3.png"><figcaption>
-      <h4>Paper cut unfold of a Császár polyhedron</h4>
+    <div class="nested-copy-line-height lh-copy serif f4 nested-links white pr4-l w-two-thirds-l"><p><figure><img src="/images/pyramid-torus-photo.jpg"><figcaption>
+      <h4>Photo of paper Császár polyhedron</h4>
     </figcaption>
 </figure>
 
-It is called <a href="https://en.wikipedia.org/wiki/Cs%C3%A1sz%C3%A1r_polyhedron">Császár polyhedron</a></p>
+<figure><img src="/images/pyramid-torus3.png"><figcaption>
+      <h4>Paper cut unfold of a Császár polyhedron</h4>
+    </figcaption>
+</figure>
+</p>
+<p>The article is about <a href="https://en.wikipedia.org/wiki/Cs%C3%A1sz%C3%A1r_polyhedron">Császár polyhedron</a>.</p>
 <p>(Its dual is the <a href="https://en.wikipedia.org/wiki/Szilassi_polyhedron">Szilassi polyhedron</a>).</p>
 <h1 id="tutorial">Tutorial</h1>
 <p>I was never able to construct <em>Szilassi</em> by myself, but there it follows how i constructed <em>Császár polyhedron.</em></p>

tags/index.html

@@ -179,12 +179,12 @@ <h1 class="f3 near-black">
       </a>
     </h1>
     <div class="nested-links f5 bg-black lh-copy nested-copy-line-height">
-      Paper cut unfold of a Császár polyhedron It is called Császár polyhedron
+      Photo of paper Császár polyhedron Paper cut unfold of a Császár polyhedron The article is about Császár polyhedron.
 (Its dual is the Szilassi polyhedron).
 Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.
 Algebraic start The Euler characteristic X of a torus is zero.
 So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.
-We can assume all faces are triangles. So, E=3F/2 (cause with 3F we count each edge twice).
+We can assume all faces are triangles.
     </div>
   </div>
 

tags/mathematics/index.html

@@ -175,12 +175,12 @@ <h1 class="f3 near-black">
       </a>
     </h1>
     <div class="nested-links f5 bg-black lh-copy nested-copy-line-height">
-      Paper cut unfold of a Császár polyhedron It is called Császár polyhedron
+      Photo of paper Császár polyhedron Paper cut unfold of a Császár polyhedron The article is about Császár polyhedron.
 (Its dual is the Szilassi polyhedron).
 Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.
 Algebraic start The Euler characteristic X of a torus is zero.
 So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.
-We can assume all faces are triangles. So, E=3F/2 (cause with 3F we count each edge twice).
+We can assume all faces are triangles.
     </div>
   </div>
 

tags/mathematics/index.xml

@@ -20,7 +20,7 @@
       <link>https://jimishol.github.io/post/pyramid-torus/</link>
       <pubDate>Wed, 14 May 2014 00:00:00 +0000</pubDate>
       <guid>https://jimishol.github.io/post/pyramid-torus/</guid>
-      <description>Paper cut unfold of a Császár polyhedron It is called Császár polyhedron&#xA;(Its dual is the Szilassi polyhedron).&#xA;Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.&#xA;Algebraic start The Euler characteristic X of a torus is zero.&#xA;So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.&#xA;We can assume all faces are triangles. So, E=3F/2 (cause with 3F we count each edge twice).</description>
+      <description>Photo of paper Császár polyhedron Paper cut unfold of a Császár polyhedron The article is about Császár polyhedron.&#xA;(Its dual is the Szilassi polyhedron).&#xA;Tutorial I was never able to construct Szilassi by myself, but there it follows how i constructed Császár polyhedron.&#xA;Algebraic start The Euler characteristic X of a torus is zero.&#xA;So our torus has V-E+F=0, where V=vertices, E=edges and F=faces.&#xA;We can assume all faces are triangles.</description>
     </item>
   </channel>
 </rss>