Transformations: Who Am I?
Translation right
* I always preserve the orientation of a figure * I always preserve the size of a figure * I increase (+) just the x-value in an ordered pair
Translation up
* I always preserve the orientation of a figure * I always preserve the size of a figure * I increase (+) just the y-value in an ordered pair
Reflection over the x-axis
* I do not preserve the orientation of a figure * My image and pre-image are mirror images * If I start in Quadrant II, I'll end up in Quadrant III.
Dilation (decrease)
* I preserve shape but not size * My image and pre-image will be similar * I am created by using a scale factor that is LESS than one.
Rotation 180 degrees clockwise
* I will not change the size of a figure * I will change the orientation of a figure * I can be represented by (-x, -y)
Reflection over the y-axis
* I will not change the size of a figure * I will change the orientation of a figure * I can be represented by (-x, y)
Translation down
* I will not change the size of a figure * I will not change the orientation of a figure * I can be represented by (x, y - n) where n is any positive number
Translation left
* I will not change the size of a figure * I will not change the way a shape is facing * I can be represented by (x - n, y), where n is any positive number
Rotation 90 degrees clockwise
* My image and pre-image will be congruent * I do not preserve orientation * If I start at (3, 4), I'll end up at (4, -3)
Rotation 270 degrees clockwise
* My image and pre-image will be congruent * If I start in Quadrant I, I'll end up in Quadrant II * I can be represented by (-y, x)
Dilation (Increase)
*I preserve orientation * My pre-image and image will be similar. * I can be represented by (ax, ay), where a is any number GREATER than one.
