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Which transformation does not always result in congruent figures in the coordinate plane?
A transformation that does not always result in congruent figures in the coordinate plane is dilation. While dilations can resize figures, they change the dimensions of the original shape, leading to figures that are similar but not congruent. In contrast, transformations like translations, rotations, and reflections preserve the size and shape of the figures, resulting in congruence.
Can congruent figures be similar figures?
All congruent figures are similar figures, and have identical sizes.
What transformation will produce a figure that is similar but not congruent?
A transformation that produces a figure that is similar but not congruent is a dilation. Dilation involves resizing a figure by a scale factor, which increases or decreases the size while maintaining the same shape and proportional relationships of the sides and angles. As a result, the new figure will have the same shape as the original but will differ in size, making them similar but not congruent.
Is congruent figures are always similar?
Are congruent figures always similar? Yes.
Figures with the same shape?
Are similar figures.
What transformations create similar figures?
An enlargement transformation will create a similar figure,
Can congruent figures be similar and can similar figures be congruent?
Congruent figures are always similar. However, similar figures are only sometimes congruent.
Can congruent figures be similar figures?
All congruent figures are similar figures, and have identical sizes.
What is the definition for similar figures?
Similar figures are geometrical figures, which have the same shape but not the same size
Is congruent figures are always similar?
Are congruent figures always similar? Yes.
What transformation will result in a similar figure?
An enlargement transformation will give the result of a similar shape.
Figures with the same shape?
Are similar figures.
Are similar figures also congruent figures?
no
Which figures are similar?
figures 1 and 2
How do you identify similar figures?
Similar figures have the same shape but not necessarily the same size
What is the definition for similar?
Similar figures are geometrical figures, which have the same shape but not the same size
What type of transformation are the pre-image and the image congruent figures?
isometry
