On a common hypotenuse $A B$ , two right triangles $△ A C B$ and $△ A D B$ are situated on opposite sides. Prove that $∠ B A C = ∠ B D C$ .

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Solution

Given that:
$△ A C B$ and $△ A D B$ are situated on opposite sides of a common hypotenuse $A B$
To Prove
$∠ B A C = ∠ B D C$
Proof
$△ A C B$ and $△ A D B$ are right angled triangles,
Then,
$∠ C + ∠ D = 90 ° + 90 ° ∠ C + ∠ D = 180 °$
Therefore $A D B C$ is a cyclic quadrilateral.
Sum of opposite angles of a cyclic quadrilateral $= 180 °$
As we know,
Angles formed in the same segment of a circle are equal.
$∠ B A C$ and $∠ B D C$ lie in the same segment of chord $B C$ .
Hence, it is proved that $∠ B A C = ∠ B D C$ .

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