Answer:
The image of A(-12, 3) after dilation by a scale factor of 1/3 will be: A'(-4, 1)
Step-by-step explanation:
Given the coordinates of the point
Let suppose the given point is A(-12, 3)
We know that when an object is dilated by a scale factor, it gets reduced, stretched, or remains the same, depending upon the value of the scale factor.
If the scale factor > 1, the image is enlarged
If the scale factor is between 0 and 1, it gets shrunk
If the scale factor = 1, the object and the image are congruent
Rule to calculate the dilation by a scale factor 1/3 centered at the origin
P(x, y) → P'(1/3x, 1/3y)
Here, P'(1/3, 1/3y) is the image of P(x, y).
Thus,
A(-12, 3) → A'(1/3(-12), 1/3(3)) = A'(-4, 1)
Therefore, the image of A(-12, 3) after dilation by a scale factor of 1/3 will be: A'(-4, 1)
