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In the adjoining figure, PA and PB are tangents from point P to a circle with centre O. If the radius of the circle is 5 cm and PA ⊥ PB, then the length OP is equal to

  1. 5 cm

  2. 10 cm

  3. 7.5 cm

  4. 5√2 cm

In the adjoining figure, PA and PB are tangents from point P to a circle with centre O. If the radius of the circle is 5 cm and PA ⊥ PB, then the length OP is equal to (a) 5 cm (b) 10 cm (c) 7.5 cm (d) 5√2 cm. Circles, ML Aggarwal Understanding Mathematics Solutions ICSE Class 10.

Circles

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Answer

Join OA as shown in the figure below:

In the adjoining figure, PA and PB are tangents from point P to a circle with centre O. If the radius of the circle is 5 cm and PA ⊥ PB, then the length OP is equal to (a) 5 cm (b) 10 cm (c) 7.5 cm (d) 5√2 cm. Circles, ML Aggarwal Understanding Mathematics Solutions ICSE Class 10.

OA ⊥ PA (∵ radius of a circle and tangent through that point are perpendicular to each other.)

∴ ∠OAP = 90°.

Given, PA ⊥ PB

∴ ∠APB = 90°.

∵ the tangents are equally inclined to the line joining the point and the centre of the circle.

∠APO = 12\dfrac{1}{2} x ∠APB = 45°.

Since, sum of angles in a triangle = 180°.

In △OAP,

⇒ ∠APO + ∠OAP + ∠AOP = 180°
⇒ 45° + 90° + ∠AOP = 180°
⇒ 135° + ∠AOP = 180°
⇒ ∠AOP = 180° - 135°
⇒ ∠AOP = 45°.

Since, ∠AOP = ∠APO hence, △OAP is an isosceles triangle with OA = AP = 5 cm.

In right angled triangle △OAP,

OP2=OA2+AP2OP2=52+52OP2=25+25OP2=50OP=50OP=52 cmOP^2 = OA^2 + AP^2 \\[1em] OP^2 = 5^2 + 5^2 \\[1em] OP^2 = 25 + 25 \\[1em] OP^2 = 50 \\[1em] OP = \sqrt{50} \\[1em] OP = 5\sqrt{2} \text{ cm}

Hence, Option 4 is the correct option.

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