Of the 4 transformations it is an enlargement plotted on the Cartesian plane
dilations
A transformation determined by a center point and a scale factor is known as a dilation. In this transformation, all points in a geometric figure are moved away from or toward the center point by a factor of the scale. If the scale factor is greater than 1, the figure enlarges; if it is between 0 and 1, the figure shrinks. This transformation preserves the shape of the figure but alters its size.
A figure resulting from a transformation is called an IMAGE
A transformation that slides a figure horizontally is called a translation. A transformation that slides a figure vertically is also called a translation.
congruent figure
dilations
A variable
A variable
Dilation is a linear transformation that enlarges or shrinks a figure proportionally. It is also referred to as uniform scaling in Euclidean geometry.
A transformation determined by a center point and a scale factor is known as a dilation. In this transformation, all points in a geometric figure are moved away from or toward the center point by a factor of the scale. If the scale factor is greater than 1, the figure enlarges; if it is between 0 and 1, the figure shrinks. This transformation preserves the shape of the figure but alters its size.
A figure resulting from a transformation is called an IMAGE
It is the figure before any transformation was applied to it.
It is the image from the transformation.
A transformation that slides a figure horizontally is called a translation. A transformation that slides a figure vertically is also called a translation.
transformation
congruent figure
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.