Back to Understand that a two-dimensional figure is congruent to another if the second can be obtained from the first by a sequence of rotations, reflections, and translations — Problem 1 · Task Set 22

Exercises: Congruence Through Sequences of Rigid Motions

Work through each section in order. When you describe a sequence of rigid motions, name each transformation in order and give its parameters: direction and distance for a translation, the line of reflection for a reflection, and the center and angle (with direction) for a rotation. Two figures are congruent only when a sequence of rigid motions maps one exactly onto the other.

Grade 8·21 problems·~35 min·Common Core Math - Grade 8·container·8-g-a-2
Work through problems with immediate feedback
A

Recall / Warm-Up

These problems review skills you already know: performing single rigid motions and comparing measurements.

A coordinate grid with triangle ABC on the left and a congruent dashed triangle DEF the same shape farther right.
1.

Triangle ABCABC has vertices A(1,1)A(1, 1), B(4,1)B(4, 1), C(2,3)C(2, 3). Triangle DEFDEF has vertices D(7,1)D(7, 1), E(10,1)E(10, 1), F(8,3)F(8, 3). Which single transformation maps ABCABC onto DEFDEF?