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What transformations will produce a figure that is similar but not congruent to the original figure besides rotation?
Please don't write "the following" if you don't provide a list. We can't guess that list.
Are congruent figure similar?
Yes, congruent figures have to be similar
Are corresponding angles of similar figure always congruent?
Yes, they are.
Is a figure with a scale factor of 1 congruent or similar?
Congruent.
What is a similar figure with the same proportion?
A congruent figure.
Which transformations will produce a congruent figure?
A translation, a reflection and a rotation
Which transformations will always produce a congruent figure?
translation
What transformations will produce a figure that is similar but not congruent to the original figure besides rotation?
Please don't write "the following" if you don't provide a list. We can't guess that list.
What transformation will result in a similar figure?
An enlargement transformation will give the result of a similar shape.
What is the difference between a similar figure and a congruent figure?
A similar figure has the same interior angles as a congruent figure but its sides are in proportion to a congruent figure.
Are congruent figure similar?
Yes, congruent figures have to be similar
Are corresponding angles of similar figure always congruent?
Yes, they are.
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.
Is a figure with a scale factor of 1 congruent or similar?
Congruent.
What is a similar figure with the same proportion?
A congruent figure.
What transformations create similar figures?
An enlargement transformation will create a similar figure,
Can a reflection produce a congruent figure?
Yes
