Question

Abcd is a cyclic quadrilateral with ad || bc. Prove that ab = dc.

Answer 1

Answer:

Step-by-step explanation:Here is the answer to your question.

Given: ABCD is a cyclic quadrilateral and AD || BC.

To prove: AB = CD

Construction: Draw AE ⊥ BC and DF ⊥ BC.

Proof: AD || BC

∴ ∠ADC + ∠DCF = 180° (sum of adjacent interior angles is 180°)

∠ABE + ∠ADC = 180° (sum of opposite angles of cyclic quadrilateral is 180°)

⇒ ∠ADC + ∠DCF = ∠ABE + ∠ADC

⇒ ∠DCF = ∠ABE

In DABE and DDCF, we have

∠ABE = ∠DCF (proved)

∠AEB = ∠DFC (90°)

AE = DF (distance between the parallel sides is same)

∴ DABE ≅ DDCF (AAS congruence criterion)

⇒ AB = CD (C.P.C.T)

Hope it helps

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