ABCD is a trapezium where $A B ∥ C D$ and AD = BC.Prove that ABCD is cyclic.

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Solution

Given: ABCD is a trapezium where $A B ∥ C D$ and AD = BC
To prove: ABCD is cyclic
Construction: Draw $D L ⊥ A B$ and $C M ⊥ A B$

Proof: In $Δ A L D$ and $Δ B M C$ ,
AD = BC (given)
DL = CM (distance between parallel sides)
$∠ A L C = ∠ B M C (90^{\circ})$
$Δ A L D ≅ Δ B M C$ (RHS congruence criterion)
$\Rightarrow ∠ D A L + ∠ A D C = 180^{\circ}$ (sum of adjacent interior angles is supplementary)
$\Rightarrow ∠ C B M + ∠ A D C = 180^{\circ}$ (from (1))
$\Rightarrow$ ABCD is a cyclic trapezium (Sum of opposite angles is supplementary)

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