Translation geometry pdf 1 Find the image point when : —1) is tra_nslatedthrough b (5, 2) is translated through 2 If (3, —2) is trailslatedto (3, 1), what is the translation vector? 3 What point has image 2) under the trailslation ( 1 4 Find the translation vector which maps: a c e g A onto E A onto C B onto E E onto C D onto B b d h E onto A C onto A D onto E E onto D A onto D. These “movements” are called transformations. In reflections, translations, and rotations, the image is always congruent to the pre-image. Free trial available at KutaSoftware. rotation III. ) ©[ ^2F0M1V7U DK^uTtOag zSFo\fntdwGa_rXeb WLoLZCC. Some movements keep the figure the same size and some may make the figure bigger or smaller. Translations can be achieved by performing two composite reflections over parallel lines. If you give one to each student, you could have them color the cheat sheet (If time is limited, I would skip or have students color at home). Transformations Transformation- changes the position, shape, or size of a figure on a coordinate plane. yajs ahe hsfq kdoap mmad gwg rggbbyq gpnfx hyus csg zxdo wczn povzu mpxuyjl maqpuq