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Which sequence of tranformations may result in an image that is similar but not congruent to the original figure?
The transformation process is an 'enlargement'
What type of tranformation does not result in a figure that is congruent to the original one?
An enlargement. In general, a non-linear transformation.
What is the converse of if a figure is a square then it is a quadrilateral?
A figure does not have a converse in the normal sense of the word. A converse may be considered as a transformation of a figure resulting from a projection from a point but then the result depends on where the centre of projection is located.
What is The new figure that is produced in a transformation?
It is the image from the transformation.
Change in position shape or size of a figure?
transformation
Which sequence of tranformations may result in an image that is similar but not congruent to the original figure?
The transformation process is an 'enlargement'
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.
A transformation in which a figure and its image are similar?
Dilation
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 transformations create similar figures?
An enlargement transformation will create a similar figure,
What transformation produces a figure that is similar but not congruent?
A transformation that produces a figure that is similar but not congruent is a dilation. In a dilation, a figure is resized proportionally from a center point, resulting in a shape that maintains the same angles but alters side lengths. This means that while the two figures have the same shape, they differ in size, making them similar but not congruent.
What term describes a transformation that does not change a figure's size or shape?
The term that describes a transformation that does not change a figure's size or shape is "isometry." Isometric transformations include translations, rotations, and reflections, which maintain the original dimensions and angles of the figure. As a result, the pre-image and image of the transformation are congruent.
What is the result of figure being flipped over a line?
When a figure is flipped over a line, it undergoes a transformation known as reflection. The result is a mirror image of the original figure, where each point on the figure is mapped to a corresponding point on the opposite side of the line at an equal distance. This transformation preserves the shape and size of the figure but reverses its orientation. For example, if the original figure is oriented to the right, the reflected figure will be oriented to the left.
A figure resulting from a transformation?
A figure resulting from a transformation is called an IMAGE
What is The original figure in a transformation?
It is the figure before any transformation was applied to it.
What type of tranformation does not result in a figure that is congruent to the original one?
An enlargement. In general, a non-linear transformation.
What is the new figure after a transformation is performed?
The new figure after a transformation is the result of applying specific changes to the original shape, such as translation, rotation, reflection, or scaling. Each transformation alters the figure's position, orientation, or size while maintaining its fundamental properties. To determine the coordinates or characteristics of the new figure, one must apply the transformation rules to the original figure's vertices or points accordingly. The resulting figure can vary in appearance but retains the same overall structure and proportions as the original.
