A tangent is drawn to a circle of radius r from an external point P .If length of tangent from a point to the circle is twice the minimum distance between circle and the point, what is the length of the tangent?

$\frac{3}{2 r}$

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3 r

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$\frac{2 r}{3}$

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$\frac{4 r}{3}$

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Solution

The correct option is D
$\frac{4 r}{3}$

Lets draw tje corc;e, the external point P and the tangents as per given conditions.

Here we can see that PR is the minimum distance between P and circle. Let it be x. its then given that PQ

= $2 x$

$△ O P Q$ is a right angled triangle

$i . e ., (x + r)^{2} = r^{2} + 4 x^{2}$

$i . e ., x^{2} + r^{2} + 2 r x = r^{2} + 4 x^{2}$

$3 x^{2} - 2 r x = 0$

$x (x - \frac{2 r}{3}) = 0$

here $x = 0$ means P is on the circle itself. But its given that P is outside the circle.

$∴ x - \frac{2 r}{3} = 0$

$\Rightarrow x = \frac{2 r}{3}$

$∴$ Length of tangent =2x

$= \frac{4 r}{3}$

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