Translation
In mathematics, translation refers to the transformation of a shape or object by moving it in a certain direction without changing its size, shape, or orientation
In mathematics, translation refers to the transformation of a shape or object by moving it in a certain direction without changing its size, shape, or orientation. This is achieved by sliding the shape along a straight line in a particular direction.
A translation is determined by two key components: the direction and the distance. The direction can be described by specifying the horizontal and vertical shifts, often denoted as (a, b). The distance refers to how far the shape is moved, and it is usually represented by a positive or negative value.
To perform a translation, each point of the shape is shifted horizontally by the value of “a” and vertically by the value of “b”. This creates a new position for each point, resulting in the entire shape being moved without any change to its internal angles or lengths.
For example, if we have a triangle with vertices at coordinates (1,1), (3,4), and (5,2), and we want to translate it by (2, -3), we would add 2 to the x-coordinate of each point and subtract 3 from the y-coordinate of each point. Thus, the new coordinates of the translated triangle would be (3, -2), (5, 1), and (7, -1).
Translations are commonly used in geometry to describe movements in space, and they are also important in algebra and linear equations. They play a significant role in understanding how to graph equations and solve problems involving coordinate systems.
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