ABC and ADC are two right triangles with common hypotenuse AC. Prove that CAD = CBD

It is given in the question that,

Ac is the common hypotenuse



So, B = D = 90o


We have to prove that,


CAD = CBD


Proof: We know that,


ABC and ADC are 90o as these angles are in the semi-circle


Thus, both the triangles are lying in the semi-circle and both have same diameter i.e. AC


Points A, B, C and D are concyclic


Therefore, CD is the chord


So,


CAD = CBD (As, angles in the same segment are equal)


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