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What is the transformation that reduces or enlarges a figure?
congruent figure
Which transformation does not produce a congruent image?
A transformation that does not produce a congruent image is a dilation. While dilations change the size of a figure, they maintain the shape, meaning the resulting image is similar but not congruent to the original. In contrast, transformations such as translations, rotations, and reflections preserve both size and shape, resulting in congruent images.
Which of the transformations will produce a similar but not congruent figure?
A dilation would produce a similar figure.
Which figure does not always have congruent diagnals?
rhombus
Is a figure and its slide image always congruent?
no
Which of the following transformation will always produce a congruent figure?
The identity transformation.
Which transformation does not always result in an image that is congruent to the original figure?
A dilation (or scaling) is a transformation that does not always result in an image that is congruent to the original figure. While translations, rotations, and reflections always produce congruent figures, dilations change the size of the figure, which means the image may be similar to, but not congruent with, the original figure.
What transformation always produce a congruent figure?
Reflections, translations, rotations.
Which of the following transformation will always produce a congruent figure a rotation b contraction c dilation d expansion?
A. Rotation
What is the transformation that reduces or enlarges a figure?
congruent figure
Which transformations will always produce a congruent figure?
translation
Which of the transformations will produce a similar but not congruent figure?
A dilation would produce a similar figure.
Can a reflection produce a congruent figure?
Yes
Is a figure and its slide image always congruent?
no
Which figure does not always have congruent diagnals?
rhombus
Is a figure always congruent to its reflection?
Yes, due to the definition of congruent figures.
Which transformations will produce a congruent figure?
A translation, a reflection and a rotation
