two tangents PQ and PR are drawn from an external point to a circle with centre O. Prove that QORP is a cyclic quadrilateral
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Answered by
402
Since tangent at a point to a circle is perpendicular to the radius through the point.
OP ⊥ QP and OR ⊥ RP.
∠OQP = 90° and ∠ORP = 90°
∠OQP + ∠ORP =( 90° + 90° )= 180°
∠OQP + ∠ORP = 180°……………(1)
In quadrilateral OQPR
∠OQP + ∠QPR+ ∠QOR + ∠ORP = 360°
(∠QPR + ∠QOR)+ (∠OQP + ∠ORP) = 360°
(∠QPR + ∠QOR) + 180° = 360° [ From (1) ]
∠QPR + ∠QOR = 180° ................ (2)
From (1) and (2), we can say that the sum of a pair of opposite angles of a quadrilateral QORP is 180° .
Hence, quadrilateral QORP is cyclic quadrilateral.
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Hope this will help you.....
OP ⊥ QP and OR ⊥ RP.
∠OQP = 90° and ∠ORP = 90°
∠OQP + ∠ORP =( 90° + 90° )= 180°
∠OQP + ∠ORP = 180°……………(1)
In quadrilateral OQPR
∠OQP + ∠QPR+ ∠QOR + ∠ORP = 360°
(∠QPR + ∠QOR)+ (∠OQP + ∠ORP) = 360°
(∠QPR + ∠QOR) + 180° = 360° [ From (1) ]
∠QPR + ∠QOR = 180° ................ (2)
From (1) and (2), we can say that the sum of a pair of opposite angles of a quadrilateral QORP is 180° .
Hence, quadrilateral QORP is cyclic quadrilateral.
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Hope this will help you.....
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Answered by
112
To prove that it is cyclic you have to 1st prove that the opp angles are supplementary.
HOPE IT HELPS....
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