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.
The new resulting figure after transformation depends on the specific type of transformation applied, such as translation, rotation, reflection, or scaling. Each transformation alters the original figure's position, orientation, or size while maintaining its fundamental shape and properties. To determine the exact resulting figure, details about the transformation parameters and the original figure are necessary. Without that information, it's impossible to specify the new figure accurately.
Transformation
transformation Displacement
a transformation.
A figure resulting from a transformation is called an IMAGE
It is the image from the transformation.
What is a preimage. (The new figure is called the image.)
Transformation
transformation Displacement
a transformation.
A figure resulting from a transformation is called an IMAGE
It is the figure before any transformation was applied to it.
our apprehension of the figure as got more exacting in definition, the figure as not changed but our understanding of it does, be it the correct or incorrect.
The new images can be: A translation, a reflexion, an enlargement and a rotation.
A transformation: there are many different types of transformations.
A transformation that slides a figure horizontally is called a translation. A transformation that slides a figure vertically is also called a translation.
The transformation rule states that a transformation is an operation that moves, flips, or changes the size or shape of a figure to create a new figure that is congruent to the original. This rule is used in geometry to describe how geometric figures can be altered while maintaining their essential properties.