slide
It is moving a figure horizontally and/or vertically but keeping it of the same size and orientation.
A figure resulting from a transformation is called an IMAGE
It is called "image".
In mathematics, displacement rotation refers to moving a geometrical figure from one location to another while simultaneously rotating it around a fixed point. This transformation involves both translation (changing the position of the figure) and rotation (changing the orientation of the figure). The displacement component involves shifting the figure horizontally and vertically, while the rotation component involves turning the figure around a specific point by a certain angle. This combined transformation results in a new position and orientation of the original figure.
Its a transformation called translation. Hope this helps :)
Horizontally
Slide it along the plane: horizontally and vertically.
It is moving a figure horizontally and/or vertically but keeping it of the same size and orientation.
A figure resulting from a transformation is called an IMAGE
A translation will slide a figure either horizontally, vertically, or both, without changing its orientation or shape. The position of every point on the figure is shifted by the same amount and in the same direction.
The angle, or pitch, of a roof is calculated by the number of inches it rises vertically for every 12 inches it extends horizontally.
It is called the IMAGE
A translation.
What is a preimage. (The new figure is called the image.)
It is called "image".
It is sometimes called the pre-image.
In mathematics, displacement rotation refers to moving a geometrical figure from one location to another while simultaneously rotating it around a fixed point. This transformation involves both translation (changing the position of the figure) and rotation (changing the orientation of the figure). The displacement component involves shifting the figure horizontally and vertically, while the rotation component involves turning the figure around a specific point by a certain angle. This combined transformation results in a new position and orientation of the original figure.