Prove that the angle subtended by an arc at the center is double the angle subtended by it at any point on the remaining part of the circle?
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Given : PQ is a chord where (i) PQ is minor arc, (ii) PQ is semicircular arc and (iii) PQ is major arc.
To prove : < POQ = 2 < PRQ.
To construct : Extend OR passing through center of circle.
Proof : Please refer to attachment above.
Concept used : Exterior angle property whivh states that sum of two interior opposite angle is equal to one exterior angle.
Mathematically, ext. < = opp. [ < interior + < interior ]
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