The image of polygon MNOP after transformation is polygon WXYZ. Note that both figures are similar. Each side of MNOP is 2 times as long as the corresponding side of WXYZ. What is the scale factor of the dilation in the similarity transformation?

CHOICES: A.)4 B.)0.5 C.)2 D.)0.25

Original figure is MNOP. Dilated figure is WXYZ.
Sides of the original figure is 2 times as long as the sides of the dilated figure. This means that the original figure was compressed.

2x ==>> x
2x * 1/2 ==>> x

The scale factor of the dilation is B.) 0.5

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JeanaShupp JeanaShupp · Answer 2 · 2019-01-09T09:17:06+01:00

Answer: 0.5

Step-by-step explanation:

Given: The image of polygon MNOP after transformation is polygon WXYZ.

let x be any side length of polygon MNOP and y be the side length of polygon WXYZ.

We know that for dilation with scale factor k, the side length of the figure image is k times the side length of the given figure.

Thus, y=kx..........(1)

Since, each side of MNOP is 2 times as long as the corresponding side of WXYZ.

Then [tex]x=2y\\\Rightarrow\ y=\frac{x}{2}\\\Rightarrow\ y=0.5x[/tex].........(2)

Therefore, k=0.5 [from (1) and (2)]

Hence, the scale factor of the dilation in the similarity transformation= 0.5