Which transformation does not preserve the size of a figure? a. Reflect…
c. dilation by scale factor of -2 ### Turn 2 Answer
Question
Turn 1 Question
which sequence of transformations maps a rectangle from (1,2), (1,4), (3,4), and (3,2) to (-2,-4), (-2,-8), (-6,-8), and (-6,-4)?
a. translation by 9 units left and 12 units down
b. translation by 2 units right
c. dilation by scale factor of -2
d. dilation by scale factor of 2
Turn 2 Question
Which transformation does not preserve the size of a figure? a. Reflection b. Rotation c. Dilation d. Translation
Solution Steps
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Understand the question
Turn 1 Question
which sequence of transformations maps a rectangle from (1,2), (1,4), (3,4), and (3,2) to (-2,-4), (-2,-8), (-6,-8), and (-6,-4)?
a. translation by 9 units left and 12 units down
b. translation by 2 units right
c. dilation by scale factor of -2
d. dilation by scale factor of 2Turn 2 Question
Which transformation does not preserve the size of a figure? a. Reflection b. Rotation c. Dilation d. Translation
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Response
Turn 1 Answer
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Explanation
Step1: Pick a reference point
Take the point $(1,2)$ and its image $(-2,-4)$.
Step2: Test dilation factor
Check scaling: $1 \times k = -2$ and $2 \times k = -4$. Solve for $k$: $k = \frac{-2}{1} = -2$, $k = \frac{-4}{2} = -2$.
Step3: Verify with another point
Test $(1,4)$: $1 \times (-2) = -2$, $4 \times (-2) = -8$, which matches $(-2,-8)$.
Step4: Eliminate other options
Translation would add/subtract constants, not scale coordinates. Scale factor 2 would give positive values, not negative.
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Brief Explanations
Reflections, rotations, and translations are rigid transformations—they only change the position or orientation of a figure, keeping its side lengths, angles, and overall size identical. Dilation involves scaling a figure by a factor (other than 1), which increases or decreases its linear dimensions, thus changing its size.
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Final answer
c. dilation by scale factor of -2
Turn 2 Answer
Answer
Response
Turn 1 Answer
Explanation
Step1: Pick a reference point
Take the point $(1,2)$ and its image $(-2,-4)$.
Step2: Test dilation factor
Check scaling: $1 \times k = -2$ and $2 \times k = -4$. Solve for $k$: $k = \frac{-2}{1} = -2$, $k = \frac{-4}{2} = -2$.
Step3: Verify with another point
Test $(1,4)$: $1 \times (-2) = -2$, $4 \times (-2) = -8$, which matches $(-2,-8)$.
Step4: Eliminate other options
Translation would add/subtract constants, not scale coordinates. Scale factor 2 would give positive values, not negative.
Answer
c. dilation by scale factor of -2
Turn 2 Answer
Brief Explanations
Reflections, rotations, and translations are rigid transformations—they only change the position or orientation of a figure, keeping its side lengths, angles, and overall size identical. Dilation involves scaling a figure by a factor (other than 1), which increases or decreases its linear dimensions, thus changing its size.
Answer
c. Dilation
Question Analysis
Subject
mathematics
Sub Subject
geometry
Education Level
high school
Difficulty
unspecified
Question Type
multiple choice
Multi Question
Yes
Question Count
2
Analysis Status
completed
Analyzed At
2026-02-09T20:22:21
OCR Text
Show OCR extraction
Which transformation does not preserve the size of a figure? a. Reflection b. Rotation c. Dilation d. Translation
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