Answer:
(3, 3)
(0, -1)
Yes, the glide reflection produces a triangle congruent to the original.
Step-by-step explanation:
A glide reflection is a type of transformation that combines a translation and a reflection.
Given glide reflection rule:
[tex]\boxed{(x,y) \rightarrow (x-3,4-y)}[/tex]
To complete the table using the given transformation rule, we can apply the rule to each input point.
[tex](1, 1) \rightarrow (1-3,4-1)=(-2,3)[/tex]
[tex](6, 1) \rightarrow (6-3,4-1)=(3,3)[/tex]
[tex](3,5) \rightarrow (3-3,4-5)=(0,-1)[/tex]
Therefore, the completed table is:
[tex]\begin{array}{|c|c|}\cline{1-2}\vphantom{\dfrac12} \sf I\:\!nput & \sf O\:\!utput\\\cline{1-2}\vphantom{\dfrac12} (1, 1) & (-2, 3)\\\cline{1-2}\vphantom{\dfrac12} (6, 1) & (3, 3)\\\cline{1-2}\vphantom{\dfrac12} (3, 5) & (0, -1)\\\cline{1-2}\end{array}[/tex]
The glide reflection is a series of transformations:
- x - 3 is a translation of 3 units left.
- 4 - y is a reflection in the x-axis, followed by a translation of 4 units up.
Therefore, the original triangle has been translated, reflected and translated.
A translation moves the figure to a new location. Every point of the figure is moved the same distance in the same direction, so a translation preserves shape and size. Therefore, the resulting figure will be congruent to the original figure.
A reflection creates a mirror image of the original figure in a line of reflection. Reflections preserve shape and size, so if a figure is reflected, the resulting figure will be congruent to the original.
Therefore, since translations and reflections preserve shape and size, the combination of these transformations results in a congruent figure.
So the glide reflection produces a triangle congruent to the original.
