Final Answer:
The type of transformation undergone by triangle XYZ to form triangle X'Y'Z' is c. Reflection.
Step-by-step explanation:
In a reflection, each point of the original figure is mirrored across a line, creating a symmetrical image. To identify the type of transformation, we can examine the relationship between corresponding points in the original and transformed triangles. If the corresponding points are equidistant from the line of reflection, a reflection has occurred.
In a reflection, the distance from a point to the line of reflection is preserved. Let's denote the vertices of the original triangle as X[sub]1[/sub]Y[sub]1[/sub]Z[sub]1[/sub], and the corresponding vertices of the transformed triangle as X[sub]1'[/sub]Y[sub]1'[/sub]Z[sub]1'[/sub]. If the distance from X[sub]1[/sub] to the line of reflection is equal to the distance from X[sub]1'[/sub] to the same line, and similarly for Y and Z, then it confirms a reflection. This holds true for all corresponding points.
Therefore, by examining the distances between corresponding points and the line of reflection, we can conclusively determine that the transformation is a reflection.
Understanding geometric transformations is essential for solving problems in geometry and is a fundamental concept in mathematics. Reflections, along with translations, rotations, and dilations, are key tools in studying the properties and relationships of geometric figures.
Therefore, the correct option is c. Reflection