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General Equation of Hyperbola

If a circle C...

Question

If a circle C, whose radius is 3, touches externally the circle, $x^{2} + y^{2} + 2 x - 4 y - 4 = 0$ at the point $(2, 2)$ , then the length of the intercept cut by this circle C, on the $X$ -axis is equal to :

2 \sqrt{3}

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\sqrt{5}

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3 \sqrt{2}

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2 \sqrt{5}

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Solution

The correct option is D $2 \sqrt{5}$
centre of the given circle $= (- 1, 2)$
and radius = $3$
By section formula:
Centre of the required circle= $(5, 2)$
Radius = $3$
So required circle C is $x^{2} + y^{2} - 10 x - 4 y + 20 = 0$
length of $X$ intercept $= 2 \sqrt{g^{2} - c} = 2 \sqrt{5}$

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