**Contents**show

## What transformations can map one triangle to another?

Students may have other similarity transformations that map one triangle to the other consisting of **translations, reflections, rotations, and dilations**.

## Which transformations can map triangle PQR onto Triangle Stu?

Which transformation(s) can map triangle PQR onto STU? D) reflection, then translation. You just studied 10 terms!

## What are the rigid transformations that will map?

**Reflections, translations, rotations, and combinations** of these three transformations are “rigid transformations”. While the pre-image and the image under a rigid transformation will be congruent, they may not be facing in the same direction.

## Which transformations can be used to map triangle RST onto triangle VWX?

Which tranformation(s) can be used to map RST onto VWX? **d.** **rotation, then translation**.

## Which congruence theorem can be used to prove triangle ABC is congruent to triangle DEC?

If two angles and the included side of one triangle are congruent to two angles and the included side of a second triangle, then the two triangles are congruent. Use **the ASA and AAS Congruence Theorems**. are congruent. By the ASA Congruence Theorem, △ABC ≅ △DEF.

## Which triangle congruence theorem can be used to prove?

**Side-Angle-Side** is a rule used to prove whether a given set of triangles are congruent. The SAS rule states that: If two sides and the included angle of one triangle are equal to two sides and included angle of another triangle, then the triangles are congruent. An included angle is an angle formed by two given sides.

## Which best explains whether or not triangles RST and ACB are congruent quizlet?

Which best explains whether or not triangles RST and ACB are congruent? **The figures are congruent**. ΔRST can be mapped to ΔACB by a reflection over the x-axis and a translation 2 units to the left.

## What are the rigid transformations that will map ABC def?

What are the rigid transformations that will map△ABC to △DEF? **Translate vertex A to vertex D, and then reflect△ABC across the line containing AC**. Translate vertex B to vertex D, and then rotate△ABC around point B to align the sides and angles.

## Which transformations are rigid transformations?

The rigid transformations include **rotations, translations, reflections, or their combination**.

## Is there a series of rigid transformations that would map QRS to ABC?

Two rigid transformations are used to map ABC to QRS. The first is **a translation of vertex B to vertex R**. … Two rigid transformations are used to map ΔHJK to ΔLMN.