Use the following information for questions 2–5. Questions 2–4 are the steps in a proof, and question 5 is the conclusion to that proof.

Given: triangleABD congruent to triangleCDB, modifying above upper A upper B with bar||modifying above Upper C Upper D with barA parallelogram is shown. Its points from bottom left moving clockwise are A, B, C, and D. Two diagonal lines go from point A to C and point B to D. The intersection of the lines in the middle is marked point E.
Prove:triangleABE congruent to triangleCDE
Question
Using the Given information above, which of the following statements can be proved by CPCTC (Corresponding Parts of Congruent Triangles are Congruent) and is needed to work toward the prove statement?
(1 point)
Responses

angle Upper D Upper C Upper E approximately-equals angle Upper B Upper A Upper E
Image with alt text: angle Upper D Upper C Upper E approximately-equals angle Upper B Upper A Upper E

angle Upper B Upper A Upper D approximately-equals angle Upper D Upper C Upper B
Image with alt text: angle Upper B Upper A Upper D approximately-equals angle Upper D Upper C Upper B

Modifying over Upper A Upper D with bar approximately-equals Modifying over Upper C Upper B with bar
Image with alt text: Modifying over Upper A Upper D with bar approximately-equals Modifying over Upper C Upper B with bar

Modifying over Upper A Upper B with bar approximately-equals Modifying over Upper C Upper D with bar
Image with alt text: Modifying over Upper A Upper B with bar approximately-equals Modifying over Upper C Upper D with bar
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