Answer:
EF corresponds to E'F'.
∠EDG Is-congruent-to ∠E'D'G'
∠DEF Is-congruent-to ∠D'E'F'
The transformation is a rigid transformation.
Step-by-step explanation:
Which statements are true regarding the transformation? Check all that apply.
EF corresponds to E'F'.
FG corresponds to G'D'.
∠EDG Is-congruent-to ∠E'D'G'
∠DEF Is-congruent-to ∠D'E'F'
The transformation is not isometric.
The transformation is a rigid transformation.
Answer: Transformation is the moving of the location of a point from one place to another. If an object is transformed, all the points of the object are also transformed. There are four types of transformation: reflection, dilation, rotation and translation.
Points DEFG is mapped to D’E’F’G, The corresponding lengths and angles of the parallelogram still remains the same, Therefore the following applies:
EF corresponds to E'F'.
∠EDG Is-congruent-to ∠E'D'G'
∠DEF Is-congruent-to ∠D'E'F'
FG does not corresponds to G'D' because their lengths are not corresponding but are adjacent.
The transformation is a rigid transformation. A rigid transformation (isometric) preserves the length of the object.
