1. Given a scale factor of 2, find the coordinates for the dilation of the line segment with endpoints (–1, 2) and (3, –3). (1 point)(–2, 4) and (6, 6)
(2, 4) and (6, 6)
(–2, 4) and (6, –6)
(2, –1) and (–3, 3)
Just multiply each coordinate by two (–1, 2) and (3, –3) gives ( -2 . . . . )
ok thanks c:
To find the coordinates for the dilation of the line segment with a scale factor of 2, you need to multiply the x and y coordinates of each endpoint by the scale factor.
Let's start with the first endpoint, (-1, 2). Multiply the x-coordinate (-1) by 2 and the y-coordinate (2) by 2 to get (-1 * 2, 2 * 2) = (-2, 4).
Now let's move on to the second endpoint, (3, -3). Multiply the x-coordinate (3) by 2 and the y-coordinate (-3) by 2 to get (3 * 2, -3 * 2) = (6, -6).
Therefore, the coordinates for the dilation of the line segment with endpoints (-1, 2) and (3, -3) and a scale factor of 2 are (-2, 4) and (6, -6).
So, the correct answer choice is (–2, 4) and (6, –6).