Given: ABCD is a ∥-gram; DE ∩ AB =F Prove: △ADF∼△CDE

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Bholtbholt · Answer 1 · 2020-06-25T05:35:28+0000

Answer:

By AA similarity

Explanation:

We have been given that ABCD is a parallelogram

So, by the property of parallelogram AB ||CD and FD is cutting the line BC

Hence, FD is transverse line. In transverse line alternate angles are equal.

Therefore, ∠AFD=∠EDC (alternate interior angles)

And ∠FAD=∠ECD (opposite angles in parallelogram)

Therefore, by AA similarity △ADF∼△CDE