Final answer:
To determine the coordinates of point M' after dilation by a factor of 1/4 with the center of dilation at (0,0), each coordinate of point M (20, -16) is multiplied by 1/4, resulting in the coordinates of M' being (5, -4).
Step-by-step explanation:
The student is asking about dilation, which is a transformation that produces an image that is the same shape as the original, but is a different size. To find the coordinates of point M' after dilation by a factor of 1/4 with the center of dilation at the origin (0,0), we apply the dilation factor to each of the coordinates of point M.
To dilate point M (20, -16), we multiply each coordinate by 1/4:
- X-coordinate after dilation: Mx' = 1/4 * 20 = 5
- Y-coordinate after dilation: My' = 1/4 * -16 = -4
Therefore, the coordinates of point M' after the dilation are (5, -4).