32. In the given figure, OP is equal to the diameter of a circle with

1.	32. In the given figure, OP is equal to the diameter of a circle with centre O and PA and PB are tangents. Prove that ABP is an equilateral triangle.APOoQB
Answer» nd PB are the tangents to the circle. ∴ OA⊥PA ⇒ ∠OAP=90° In ΔOPA, sin∠OPA= OP OA = 2r r [Given OP is the diameter of the circle] ⇒ sin∠OPA= 2 1 =sin30⁰ ⇒ ∠OPA=30° Similarly, it can be PROVED that ∠OPB=30°. Now, ∠APB=∠OPA+∠OPB=30°+30°=60° In ΔPAB, PA=PB [lengths of tangents drawn from an external point to a circle are equal] ⇒∠PAB=∠PBA....(1) [Equal SIDES have equal angles opposite to them] ∠PAB+∠PBA+∠APB=180° [Angle SUM property] ⇒∠PAB+∠PAB=180°–60°=120° [Using (1)] ⇒2∠PAB=120° ⇒∠PAB=60° .(2) From (1) and (2) ∠PAB=∠PBA=∠APB=60° ∴ ΔPAB is an EQUILATERAL triangle. helpful to you

32. In the given figure, OP is equal to the diameter of a circle with centre O and PA and PB are tangents. Prove that ABP is an equilateral triangle.APOoQB

Answer»

nd PB are the tangents to the circle.

∴ OA⊥PA

⇒ ∠OAP=90°

In ΔOPA,

sin∠OPA=

[Given OP is the diameter of the circle]

⇒ sin∠OPA=

=sin30⁰

⇒ ∠OPA=30°

Similarly, it can be PROVED that ∠OPB=30°.

Now, ∠APB=∠OPA+∠OPB=30°+30°=60°

In ΔPAB,

PA=PB [lengths of tangents drawn from an external point to a circle are equal]

⇒∠PAB=∠PBA....(1) [Equal SIDES have equal angles opposite to them]

∠PAB+∠PBA+∠APB=180° [Angle SUM property]

⇒∠PAB+∠PAB=180°–60°=120° [Using (1)]

⇒2∠PAB=120°

⇒∠PAB=60° .(2)

From (1) and (2)

∠PAB=∠PBA=∠APB=60°

∴ ΔPAB is an EQUILATERAL triangle.

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