In the diagram below, . Which sequence of transformations maps onto ?
On the set of axes below, congruent quadrilaterals and are graphed. Describe a sequence of transformations that would map quadrilateral ROCK onto quadrilateral .
Describe a sequence of transformations that would map quadrilateral ROCK onto quadrilateral .
Which figure always has exactly four lines of reflection that map the figure onto itself?
On the set of axes below, is graphed with coordinates , and . Triangle , the image of , is graphed with coordinates , and . Describe a sequence of transformations that would map onto .
Describe a sequence of transformations that would map onto .
In regular hexagon shown below, , and all intersect at .
When is reflected over and then rotated about point , is mapped onto
The line is transformed by a dilation centered at the origin. Which linear equation could represent its image?
A line that passes through the points whose coordinates are and is dilated by a scale factor of 3 and centered at the origin. The image of the line
On the set of axes below, the endpoints of have coordinates and . If is dilated by a scale factor of 2 centered at , what are the coordinates of the endpoints of its image, ?
The image of after a dilation of scale factor centered at point is , as shown in the diagram below. Which statement is always true?
Which transformation carries the parallelogram below onto itself?