triangle abc is similar to triangle abc. which sequence of similar transformations could map △abc onto △abc…

triangle abc is similar to triangle abc. which sequence of similar transformations could map △abc onto △abc? dilation and reflection dilation and translation translation and rotation translation and reflection
Answer
Explanation:
Step1: Analyze similarity - size change
The two triangles have different sizes. Dilation is a transformation that changes the size of a figure while maintaining its shape, so a dilation is needed to adjust the size of $\triangle ABC$ to match $\triangle A'B'C'$.
Step2: Analyze orientation - no flip
The orientation of the two triangles is the same. A reflection would flip the triangle over a line, which is not the case here. Also, rotation is not needed as the orientation is already correct. A translation can be used to move $\triangle ABC$ to the position of $\triangle A'B'C'$ after dilation.
Answer:
dilation and translation