The coordinates of quadrilateral VWXY are given below. Find the coordinates of its image after a dilation with the given scale factor. V (6, 2) W (-2, 4) X (-3, -2) Y (3, -5) scale factor of 2
anonymous u r rude
i got the answer,
all u need to do is multiply all the coordinates by the scale factor
V(6,2)=V'(12,4)
plz help with this question because i have the same question and need help plz
To find the coordinates of the image after a dilation with a given scale factor, you need to multiply the coordinates of each vertex by the scale factor.
Given Quadrilateral VWXY with vertices:
V (6, 2)
W (-2, 4)
X (-3, -2)
Y (3, -5)
Dilation Scale Factor = 2
Let's apply the scale factor of 2 to each vertex:
For vertex V (6, 2), we multiply each coordinate by 2:
V' (6 * 2, 2 * 2) = V' (12, 4)
For vertex W (-2, 4), we multiply each coordinate by 2:
W' (-2 * 2, 4 * 2) = W' (-4, 8)
For vertex X (-3, -2), we multiply each coordinate by 2:
X' (-3 * 2, -2 * 2) = X' (-6, -4)
For vertex Y (3, -5), we multiply each coordinate by 2:
Y' (3 * 2, -5 * 2) = Y' (6, -10)
So, the coordinates of the image of quadrilateral VWXY after a dilation with a scale factor of 2 are:
V' (12, 4)
W' (-4, 8)
X' (-6, -4)
Y' (6, -10)