Transformations

A transformation in geometry is an operation that moves or changes a shape in some way to produce a new shape. The main types of transformations are translations, rotations, reflections, and dilations.

Translation is a type of transformation that slides a shape from one position to another without turning it. Each point of the shape moves the same distance in the same direction.

A rotation is a transformation that turns a shape around a fixed point, known as the center of rotation, by a certain angle in a specific direction.

Reflection is a transformation that flips a shape over a line, known as the line of reflection, creating a mirror image of the original shape.

Dilation is a transformation that changes the size of a shape but keeps its proportions the same. It involves a center of dilation and a scale factor.

Rigid transformations (translations, rotations, reflections) preserve the shape and size of the figure, while non-rigid transformations (dilations) change the size but not the shape.

To translate the point (3, 4) by the vector (2, -3), add the vector components to the point's coordinates: (3+2, 4-3) = (5, 1).

After reflecting a point (x, y) over the x-axis, the new coordinates will be (x, -y).

To rotate the point (1, 0) 90 degrees counterclockwise around the origin, the new coordinates will be (0, 1).

The scale factor in a dilation is a number that describes how much the shape is enlarged or reduced. A scale factor greater than 1 enlarges the shape, while a scale factor between 0 and 1 reduces it.