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A cartoonist draws two congruent rocket nose cones with her geometry software. Determine whether the transformation shown is a reflection. Answer yes or no?
Updated: 10/17/2024
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Earn +20 ptsQ: A cartoonist draws two congruent rocket nose cones with her geometry software. Determine whether the transformation shown is a reflection. Answer yes or no?
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Is a figure always congruent to its reflection?
Yes, due to the definition of congruent figures.
What is the transformation that reduces or enlarges a figure?
congruent figure
What is a congruence transformation A.Shrinking B.Rotating C.Stretching?
Rotation is congruent.
What is true about the result of a rigid transformation?
The object and its image are congruent.
Is reflecting a congruence transformation?
YES ---- Explanation: An isometry is a distance-preserving mapping. . Geometric figures which can be related by an isometry are called congruent. Reflection preserves distance so it is an isometry. It reverses orientation so it is called an indirect orientationl
Related questions
Two congruent triangles are drawn with geometry software. Determine whether the transformation shown is a translation. Answer yes or no?
yes
A student draws two congruent triangles with geometry software. Determine whether the transformation shown is a rotation. Answer yes or no?
yes
Which of the following transformation will always produce a congruent figure?
The identity transformation.
Is a figure still congruent if if it has a reflection?
No its not
What is a reflection for circumference of a circle?
The reflection in a line will be another congruent circle.
Is a figure always congruent to its reflection?
Yes, due to the definition of congruent figures.
Which transformations will always produce a congruent figure?
translation
Can a reflection produce a congruent figure?
Yes
What is the transformation that reduces or enlarges a figure?
congruent figure
Is a preimage and image are always congruent in a reflection?
Yup
What is a congruence transformation A.Shrinking B.Rotating C.Stretching?
Rotation is congruent.
What is true about the result of a rigid transformation?
The object and its image are congruent.
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