The hypothesis that "BDC and AED are right angles" (option A) is sufficient to demonstrate that the three triangles in question are equivalent.
The triangles CEA and CDB are quite similar to one another. It is sufficient to verify that the provided triangles are comparable by using the figure, which states that "BDC and AED are right angles."
If we assume that BDC and AED are right angles and base our assumption on the information shown in the picture, then we may draw the following conclusions:
BDC and AED both lie on the same side as EC and form a perpendicular. Because BDC and AED are equal, AE and BD will be in parallel with one another.
Now, the side AC is the one that intersects with AE and BD, whereas BD and AE are parallel. Since CAE and CBD are equivalent angles, their respective measures will naturally be the same as one another.
Based on the findings presented here, it is possible to draw the conclusion that CEA and CDB are comparable since both figures possess two angles of equal measure and satisfy the AA similarity requirements.
As a result, the hypothesis that "BDC and AED are right angles" (option A) is sufficient to demonstrate that the three triangles in question are equivalent.
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