What is the rule for translating point A to point D?

The translation rule for moving point A to point D involves moving the point 4 units to the right and 2 units down. This can be expressed as the transformation (x, y) → (x + 4, y - 2). This type of translation is a common concept in transformations, specifically in coordinate geometry.

How do you find the coordinates of a vertex after a reflection?

To find the coordinates of vertex H' after a reflection over the x-axis, you change the sign of the y-coordinate. For example, if the original coordinates of vertex H are (2, 3), the reflected coordinates H' would be (2, -3). This principle applies to all points reflected over the x-axis.

What are the coordinates of point C after dilation?

Point C, originally at (4, 0), is dilated from the origin by a scale factor of 2. To find the new coordinates after dilation, you multiply both the x and y coordinates by the scale factor. Thus, the new coordinates of point C after dilation are (4 * 2, 0 * 2), which results in (8, 0).

What transformation is applied to triangle RUN to get triangle R'U'N'?

Triangle RUN is transformed into triangle R'U'N' through a series of transformations that include a reflection and a translation. Specifically, the transformation rule used is (x, y) → (x - 2, y + 5). This means that each point of triangle RUN is moved left by 2 units and up by 5 units to obtain the corresponding points in triangle R'U'N'.

Which image shows a 90° clockwise rotation about the origin?

To determine which image shows a 90° clockwise rotation about the origin, one must visualize how each point of a shape moves. The correct image would have the original shape rotated such that points that were initially in the first quadrant move to the fourth quadrant, and so on. The answer is depicted in option (c), where the shape's orientation aligns with the expected transformation.

How do you describe the transformation to match two polygons?

To describe how to move the solid polygon to exactly match the dashed polygon, you can use a combination of translations and reflections. For instance, you might first translate the solid polygon to the left and up, and then reflect it over the x-axis. This two-step process effectively aligns the two figures.

Unit 3 Transformations Answer Key PDF Download

Unit 3 Transformations Answer Key provides detailed solutions for transformation problems in geometry, focusing on translations, rotations, and reflections. This resource is essential for students studying transformations in mathematics, particularly in high school geometry courses. It includes answers to various exercises and problems, making it a valuable tool for exam preparation and homework assistance. Ideal for educators and students alike, this answer key supports understanding of key transformation concepts.

Key Points

Includes solutions for translation, rotation, and reflection problems in geometry.
Covers multiple exercises related to geometric transformations for high school students.
Serves as a study aid for understanding transformation concepts and preparing for exams.
Provides clear answers to help students verify their work and improve their skills.