9) Dilate \(\triangle ABC\) with a scale factor of \(3\) where the center of dilation is at \((0, 0)\). Enter the coordinates for \(\triangle A'B'C'\) in the table to create the dilation.
10) Dilate \(\triangle ABC\) with a scale factor of \(\dfrac{1}{3}\) where the center of dilation is at \((0, 0)\). Enter the coordinates for \(\triangle A'B'C'\) in the table to graph the dilation.
15) Given the following graph, determine the scale factor and the center of dilation from \(\triangle ABC\) to \(\triangle A'B’C'\)
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18) A student says that \(\triangle DEF\) is a dilation of \(\triangle ABC\) with the center of dilation at the origin. But, the student has made a mistake. Where would the center of dilation be and what is the scale factor?
19) \(\overleftrightarrow{AB}\) is dilated by a scale factor of \(\dfrac{3}{2}\)from point \(P\). Plot \(A’\) and \(B’\) by replacing the ?'s with integers and decimals. [Be careful not to delete the comma or parenthesis in the ordered pair]