Geometry behind a painting: an exploration

In this activity, you will explore how concepts of triangle congruency is presented on the Geometric Abstraction 1, a painting by James Clarke. Two triangles are said to be congruent if it both has the same shape and size even if it shares a common side or it was reflected or rotated. Directions: In the applet below,

1.      Use the Reflect about line tool to reflect triangle CDE, use line segment CD as the line of reflection. ·        highlight triangle CDE then click side CD 2.      Use the Reflect about Point tool to reflect triangle JLK. Use point F as the point reflection. ·        highlight triangle JLK then click point F 3.      Use the Rotate around point tool, highlight triangle ABI and input 180⁰,then click point F. 4.      Use the Distance or length tool to measure the side lengths of each triangle (click on the tool then click on a side of a particular triangle you want to measure). Do this on all triangles and all sides of a triangle. Take note of your observations. Feel free to trace other triangles found on the geometric abstract using Polygon tool (You may also try reflecting/rotating those).

Once done, answer the questions below.

Clarke, J. (2016). Geometric abstraction 1. Retrieved from https://pixels.com/featured/geometric-abstraction-1-james-clarke.html Congruent Triangles (2011). Math Open Reference. https://www.mathopenref.com/congruenttriangles.html Lee, A. (n.d.). congruence. Retrieved from https://www.geogebra.org/m/qVy3qV8e