Use the image to answer the question.
Two triangles, a larger one and a smaller one, are plotted in quadrant 1 of a coordinate plane. Both triangles have vertices plotted on the y-axis and vertices plotted on the x-axis.
What type of transformation can map ΔABC→ΔA′B′C′
?
Without the image, it is difficult to determine the specific type of transformation. However, based on the given information, the type of transformation that could map ΔABC to ΔA'B'C' could be a dilation or a reflection.
Since we cannot see the image, I cannot analyze the specific triangles and vertices. However, based on the given information that both triangles have vertices plotted on the y-axis and vertices plotted on the x-axis, we can conclude that the transformation could be a reflection, rotation, or a combination of both.
To determine the exact type of transformation, we would need to examine the relative positions and orientations of the triangles' vertices and compare them before and after the transformation.
To determine the transformation that maps ΔABC to ΔA'B'C', we need to analyze the changes in the positions of the vertices.
The image shows two triangles, with ΔABC being the larger triangle and ΔA'B'C' being the smaller triangle.
To identify the type of transformation, we should compare the corresponding vertices of the two triangles. Let's look at each pair of corresponding vertices:
- The vertex A has been mapped to the vertex A'.
- The vertex B has been mapped to the vertex B'.
- The vertex C has been mapped to the vertex C'.
Based on these observations, we can see that all the corresponding vertices have been moved vertically to a greater height. This means that the transformation that maps ΔABC to ΔA'B'C' is a vertical translation (or shift) upwards.
Therefore, the correct answer is: Vertical translation (upwards)