![]() You'll be amazed that the "conservation of shape" we are demonstrating also means that the shapes do continue to tessellate! Try it on a scrap of copy paper. Do we really have to match up those corners? Try it, trace it, and see what happens. Cut a square from one corner to an adjacent corner, pull it across and tape it down. ![]() The movements or rigid motions of the shapes that define tessellations are classified as translations, rotations, reflections, or glide reflections. The piece of paper should correspond to the volume of your tessellation. There are three hexagons meeting at each vertex. It's this trial and error that fuels STEAM education in art.įor example, the Translation method is the most common for tessellations. Download Article 1 Find an A4 size piece of paper. Experimentation is something we can do more of in our classes. Most people work with just squares, but did you know many of the same techniques work just as well with rectangles? We have been told to "line up the corners," but in actuality, for many techniques, you don't have to. By expanding the techniques beyond the basic square and rudimentary techniques, life can be breathed back into the work and even offer opportunities for expression. A plane of tessellations has the following properties: Patterns are repeated and fill the plane. ![]() Though tessellations can be fun, with great connections to math and geometry, they can become tedious and mechanical.
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |