If two circles are given such that they neither intersect nor touches each other. Then the locus of centre of variable circle which touches both the circles externally is

circle

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parabola

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ellipse

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hyperbola

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Solution

The correct option is D hyperbola
Let the given two circles have centre $C_{1}$ and $C_{2}$ and radii as $r_{1}$ and $r_{2}$ .
Let the circle which touches given two circles have centre at $C$ and radius $r$ .

Now, $C C_{2} = r + r_{2}$ and $C C_{1} = r_{1} + r$
Hence, $C C_{1} - C C_{2} = r_{1} - r_{2} (= constant)$
Hence locus of $C$ is hyperbola whose foci are at $C_{1}$ and $C_{2}$ .

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