Vertical shrink by a factor of c units. Notice that a horizontal stretch is the same as a vertical shrink, and a horizontal shrink is the same as a vertical stretch.

Lines of symmetry are examples of lines of reflection. Reflections are isometric, but do not preserve orientation. Translations are a slide or shift. Translations can be achieved by …

Skills Practice Describe the composition of transformations that result in figure 1 moving onto figure 2. G(-2,4), and H(-4,-4). Graph the image composition of the transformations in the …

(There are three transformations that you have to perform in this problem: shift left, stretch, and flip. You have to do all three, but the order in which you do them isn’t important. You’ll get the …

Transformations allow us to modify functions to shift, stretch, compress, or re ect their graphs. Understanding transformations is key to graphing functions quickly and interpreting their …

Transformations Review Packet Transformations Notes Directions: For each design, determine if it has reflection symmetry. If it does, draw all of the lines of symmetry and write how many …

Do the ways that we describe transformations deepen our understanding of the mathematics? The main goal here is for students to recognize and be able to describe when they see …