9.01 Dilations

Dilate the figure using the rule (x,y) \to (4x, 4y).

Since the center of dilation is the origin, (0,0), and the scale factor is 4 based on the coordinate mapping, we can take the coordinates of each point in the pre-image and multiply them by the scale factor to get the vertices of the image.

We have:

(4, 8) \to (16, 32)

(10, 8) \to (40, 32)

(4, 14) \to (16, 56)

Describe how the pre-image and its image are related.

Using the figure and its image, connect the corresponding vertices of the pre-image and image. Also, compare corresponding segments between pre-image and image.

We would expect that the image would be 4 times farther from the center of dilation than the pre-image is, which appears to be true based on the graph.

We should also expect the segment lengths of A'B'C' to be 4 times longer than the corresponding segments of ABC. We can spot check one of the segments to verify this:AB = 10 - 4 = 6 \text{ and } A'B' = 40-16 = 24 \text{ and } 6 \times 4 = 24

We can see that corresponding segements are parallel to one another: \overline{AB} is a horizontal line with a slope of 0, as is \overline{A'B'}. We can see both \overline{AC} and \overline{A'C'} are vertical with no slope. Both \overline{CB} and \overline{C'B'} are decreasing lines with a slope of -1.

Dilate the figure using the function rule D_{4, (7,8)}(\triangle ABC).

The function notation means that the center of dilation is located at \left(7, 8 \right) and the scale factor is four. Determine translations from the figure's vertices to the center of dilation, apply the scale factor to each translation, and perform the new translations to the center of dilation to plot the image.

We can determine the translation from each vertex to the center of dilation, then apply the scale factor to the translations.

1. Determine the translations from the center of dilation to the vertices of the figure:
   • \left(7,8\right)\to\left(4,8\right): translate 3 units left and 0 units up or down
   • \left(7,8\right)\to\left(10,8\right): translate 3 units right and 0 units up or down
   • \left(7,8\right)\to\left(4,14\right): translate 3 units left and 6 units up
2. Multiply these translations by the scale factor, 4, to find the images of these points under the dilation in relation to the center of dilation:
   • Translate 12 units left and 0 units up or down
   • Translate 12 units right and 0 units up or down
   • Translate 12 units left and 24 units up

From the center of dilation, (7,8), we can plot the vertices of the image after multiplying the translation from each vertex to the center of dilation by the scale factor:

Compare the effects of the dilation when the center of dilation is on a line segment of the pre-image to when the center of dilation is not on the pre-image.

Consider the location of the center of dilation when the center of dilation is a point that does not lie on the pre-image and when the center of dilation is a point that lies on the pre-image.

Since the center of dilation lies on \overline{AB}, it also lines on the corresponding \overline{A'B'}.

We can see how the pre-image was enlarged by drawing segments from the center of dilation to each vertex on the pre-image and its image.

When the center of dilation is not a point on the pre-image, as shown in worked question 1, the line segments of the image are parallel to the line segments of the pre-image. In this case, when the center of dilation lies on one of the pre-image segments, \overline{AB}, we see that the corresponding segment \overline{A'B'} is also on the same line.

Apply the dilation D_{\frac{1}{2},\left(6,7\right)} to the figure.

We can determine the translation from each vertex to the center of dilation, then apply the scale factor to the translations.

1. Determine the translations from the center of dilation to the vertices of the figure:
   • \left(6,7\right)\to\left(2,1\right): translate 4 units left and 6 units down
   • \left(6,7\right)\to\left(8,3\right): translate 2 units right and 4 units down
   • \left(6,7\right)\to\left(12,9\right): translate 6 units right and 2 units up
   • \left(6,7\right)\to\left(4,11\right): translate 2 units left and 4 units up
2. Multiply these translations by the scale factor, \dfrac{1}{2}, to find the images of these points under the dilation in relation to the center of dilation:
   • Translate 2 units left and 3 units down
   • Translate 1 unit right and 2 units down
   • Translate 3 units right and 1 unit up
   • Translate 1 unit left and 2 units up
3. Apply these translations to the center of dilation, \left(6,7\right), to determine the coordinates of the images of the vertices under dilation:
   • Translating \left(6,7\right) by 2 units left and 3 units down gives us \left(4,4\right)
   • Translating \left(6,7\right) by 1 unit right and 2 units down gives us \left(7,5\right)
   • Translating \left(6,7\right) by 3 units right and 1 unit up gives us \left(9,8\right)
   • Translating \left(6,7\right) by 1 unit left and 2 units up gives us \left(5,9\right)
4. Plot the image of the dilation, using the images of the vertices determined in the previous step.

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Compare the pre-image with its image after performing the dilation.

Use the figure and its image sketched in part (a) and what we know about dilating a figure around a central point.

The pre-image and its image have the same orientation. The pre-image and its image are not congruent because the side lengths of the image are not preserved with a dilation.

The side lengths of the image are parallel to the side lengths of the pre-image.

Since all corresponding side lengths are parallel, each pair of corresponding interior angles will be congruent.

The scale factor is \dfrac{1}{2}, meaning that the side lengths of the image should be half the length of the pre-image side lengths. This visually appears to be true.

The distance between the center of a dilation and any point on the image appears to be equal to half of the distance between the dilation center and the corresponding point on the pre-image, shown on the grid below.

We could calculate slopes and use the distance formula to verify each segment matches the given criteria. Or, we could use a ruler and protractor to verify corresponding segments are an equal distance apart (thus parallel), that the length of each segment on the image is \dfrac{1}{2} the size of the corresponding segemnt of the pre-image, and that corresponding angles are congruent.