Find the locus of the centre of the circ...

Find the locus of the centre of the circle touching the line `x+2y=0a n dx=2y=0.`

A

xy=0

B

x=0

C

y=0

D

none of these

Text Solution

Verified by Experts

The correct Answer is:

A

Let (h, k) be the centre and r be the radius of the circle. As it touches the lines x+2y=0 and x-2y=0.
`:. |(h+2k)/(sqrt(5))|=(h-2k)/(sqrt(5))|=`Radius
`rArrh+2k=pm(h-2k)`
`rArr k=0 or, h=0`
`rArr` Locus of (h, k) is x=0 or, y=0
Hence, the locus of (h, k) is xy=0.

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