Math, asked by Anonymous, 1 year ago

prove that the tangent drawn from the endpoint of the chord of a circle make equal angle with chord , de re koi toh answer de

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Answered by Anonymous
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Let PQ be the chord of a circle with center O Let AP and AQ be the tangents at points P and Q respectively. Let us assume that both the tangents meet at point A.  Join points O, P. Let OA meets PQ at R Here we have to prove that ∠APR = ∠AQR Consider, ΔAPR and ΔAQR AP = AQ [Tangents drawn from an internal point to a circle are equal] ∠PAR = ∠QAR AR = AR [Common side] ∴ ΔAPR ≅ ΔAQR [SAS congruence criterion] Hence ∠APR = ∠AQR [CPCT]
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