Question
How Do you see IT Point $C$ is the center of dilation of the images. The scale factor is $\frac{1}{3}$ . Which $\square$gure is the original $\square$gure? Which $\square$gure is the dilated $\square$gure? Explain your reasoning.
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Dilation is a transformation that changes the size of a figure without altering its shape. It is determined by the scale factor and the center of dilation. Show more…
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In Exercises $41-44$ , determine whether the dilated $\square$gure or the original $\square$gure is closer to the center of dilation. Use the given location of the center of dilation and scale factor $\mathrm{k}$ . Center of dilation: inside the $\square$gure; $k=3$
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Dilations
In Exercises $41-44$ , determine whether the dilated $\square$gure or the original $\square$gure is closer to the center of dilation. Use the given location of the center of dilation and scale factor $\mathrm{k}$ . Center of dilation: inside the $\square$gure; $\mathrm{k}=120 \%$
In Exercises $41-44$ , determine whether the dilated $\square$gure or the original $\square$gure is closer to the center of dilation. Use the given location of the center of dilation and scale factor $\mathrm{k}$ . Center of dilation: inside the $\square$gure; $\mathrm{k}=\frac{1}{2}$
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