9.01 Translations

Describe the transformation in words.

We need to identify the direction the pre-image has been moved and the distance each point has moved to obtain the image.

The pre-image has been moved four units to the left and two units down to obtain the image.

It can be easier to work out the description by looking at one vertex and seeing how that moved. Then we can confirm by trying the same translation with the other vertices, or even other points on the sides of the triangle.

Write the transformation in function notation.

We know from part (a) that the pre-image has been moved four units to the left and two units down to obtain the image.

T_{\langle -4,-2 \rangle}\left(\triangle ABC\right) = \triangle A'B'C'

Use the definition of a translation to verify that the transformation is a translation.

Recall that, when a translation has occurred, any segments created by connecting points on the pre-image to their corresponding points on the image will be equal in length, parallel, and translate the points in the same direction.

Based on the description and function notation in parts (a) and (b), we can confirm that every point on the pre-image is moved the same distance and in the same direction to lead to the image.

We can connect each vertex on the pre-image to its corresponding vertex on its image and find their slopes and lengths.

We can find the slope of each segment by counting the vertical rise and horizontal run from one endpoint to the other. For the segment connecting the upper vertex of each triangle the \text{Rise } = -2 and the \text{Run }=-4 so the slope is \dfrac{-2}{-4}=\dfrac{1}{2}. Repeating this process for the other segments we will find that they each have a slope of \dfrac{1}{2}. Since all segments have the same slope, they are parallel.

To calculate the length of each segment we can use the slope triangles we have drawn and the Pythagorean theorem.

By repeating the same process for the other two directed segments we will find that they each have a length of \sqrt{20}.

Since the length of the segments from the vertices on the pre-image to its image are the same length and parallel to each other meaning every point on the pre-image is moved the same distance and in the same direction, the transformation is a translation.

Describe the translation represented by the directed line segment v.

We can identify the horizontal and vertical movement of the translation by considering the change in x- and y-values from the start to the end of the directed line segment.

For the directed line segment v, we can see that that starting point is \left(-2,4\right) and the ending point is \left(3,1\right).

Since the x-value for the directed line segment changes from x=-2 to x=3, the horizontal movement of the translation will be 3-(-2)=5 units to the right.

Since the y-value for the directed line segment changes from y=4 to y=1, the vertical movement of the translation will be 1-4=-3 units, which is equivalent to 3 units down.

Altogether, we can describe the translation represented by the directed line segment v to be 5 units right and 3 units down.

Translate the figure \triangle ABC by the directed line segment v.

We want to translate the whole triangle by the directed line segment. We can do this by translating just the vertices, then joining them up to form the full image.

To translate each vertex, we can apply the movements described in the previous part.

If we construct directed line segments from each vertex in the pre-image to its corresponding vertex in the image, we can see that they are all parallel to the directed line segment v, and are also the same length.