If a line segment joining two points of tense equal angles at two other points lying on the same side of the line containing the line segment the Four Points lie on a circle prove this
Answers
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Step-by-step explanation:
Given: AB is a line segment and C and D are two points lying on the same side of AB such that ∠ACB = ∠ADB.
To prove: A, B, C and D are concyclic.
Proof:
If possible, suppose D does not lie on this circle. Let D´ be the point which lies on the circle.
Since, C and D´ are two point on the circle lying on the same side of AB.
∴ ∠ACB = ∠AD´B (Angles in the same segment are equal)
∠ADB = ∠AD´B (∠ACB = ∠ADB)
∴ An exterior of ΔDBD´ is equal to the interior opposite angle. But, an exterior angle of a triangle can never be equal to its interior opposite angle.
∴ ∠ADB = ∠AD´B
⇒ D coincides with D´.
⇒ D lies on the circle passing through the points A, B and C.
Hence, the points A, B, C and D are concyclic.