1. here are three pairs of figures.
pair 1
pair 2
pair 3
a. which transformation takes figure a to figure d in pair 1: a translation, rotation, or reflection?
b. which transformation takes figure a to figure b in pair 2: a translation, rotation, or reflection?
c. which transformation takes figure a to figure b in pair 3: a translation, rotation, or reflection?
2. identify the sequence when a rotation, reflection, and/or translation is applied. (b.g.a.1)
all of these sequences of transformations would return a shape to its original position except?
a. translate 3 units up, then 3 units down.
b. reflect over line q, then reflect over line p again.
c. translate 1 unit to the right, then 4 units to the left, then 3 units to the right.
d. rotate 120° counterclockwise around center c, then rotate 220° counterclockwise around c again.

Question

1. here are three pairs of figures.
pair 1
pair 2
pair 3
 a. which transformation takes figure a to figure d in pair 1: a translation, rotation, or reflection?
 b. which transformation takes figure a to figure b in pair 2: a translation, rotation, or reflection?
 c. which transformation takes figure a to figure b in pair 3: a translation, rotation, or reflection?
2. identify the sequence when a rotation, reflection, and/or translation is applied. (b.g.a.1)
all of these sequences of transformations would return a shape to its original position except?
a. translate 3 units up, then 3 units down.
b. reflect over line q, then reflect over line p again.
c. translate 1 unit to the right, then 4 units to the left, then 3 units to the right.
d. rotate 120° counterclockwise around center c, then rotate 220° counterclockwise around c again.

Accepted Answer

# Explanation:
## Step1: Analyze translation - only
Translation is a slide. For a shape to return to its original position after a sequence of translations, the net displacement in each direction must be zero. In option A, 3 units up and 3 units down cancel each other out, but there is no information about horizontal displacement.
## Step2: Analyze translation - reflection - translation
In option B, translating, reflecting, and then translating again does not guarantee a return to the original position as the reflection changes the orientation and the subsequent translation is not in a way to reverse all changes.
## Step3: Analyze reflection - translation - reflection
In option C, reflecting over line $q$, then translating, and reflecting over line $p$ again. Reflections and translations do not necessarily cancel each other out in this combination to return the shape to its original position.
## Step4: Analyze rotation - rotation
In option D, rotating $120^{\circ}$ counter - clockwise and then $240^{\circ}$ counter - clockwise around the same center $C$. The sum of the rotation angles $120^{\circ}+240^{\circ}=360^{\circ}$, which is a full - turn. A full - turn rotation around a center will return a shape to its original position.

# Answer:
D

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QUESTION IMAGE

Question

Explanation:

Step1: Analyze translation - only

Step2: Analyze translation - reflection - translation

Step3: Analyze reflection - translation - reflection

Step4: Analyze rotation - rotation

Answer: