if the angle between to tangents from an external point P to a circle of radius A and the centre O is 60°, then find the lenght of OP.
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Let AP and BP are two tangents from an external point P on a circle with center O, at points A and B respectively.
Angle with AP and BP, ∠APB = 60° [Given]
In ΔAOP and ΔBOP
AP = BP [Tangents drawn from an external point to a circle are equal]
OP = OP [Common]
OA = OB [Radii of same circle]
ΔAOP ≅ ΔBOP [By Side-Side-Side Criterion]
∠OPA = ∠OPB [Corresponding parts of congruent triangles are equal]
Also,
∠OPA + ∠OPB = ∠APB
⇒ ∠OPA + ∠OPA = 60°
⇒ 2∠OPA = 60°
⇒ ∠OPA = 30°
Also, OA ⏊ AP [Tangent drawn at a point on the circle is perpendicular to the radius through point of contact]
In ΔOAP,
[As OA = radius of circle = a]
⇒ OP = 2a
Angle with AP and BP, ∠APB = 60° [Given]
In ΔAOP and ΔBOP
AP = BP [Tangents drawn from an external point to a circle are equal]
OP = OP [Common]
OA = OB [Radii of same circle]
ΔAOP ≅ ΔBOP [By Side-Side-Side Criterion]
∠OPA = ∠OPB [Corresponding parts of congruent triangles are equal]
Also,
∠OPA + ∠OPB = ∠APB
⇒ ∠OPA + ∠OPA = 60°
⇒ 2∠OPA = 60°
⇒ ∠OPA = 30°
Also, OA ⏊ AP [Tangent drawn at a point on the circle is perpendicular to the radius through point of contact]
In ΔOAP,
[As OA = radius of circle = a]
⇒ OP = 2a
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