The locus of the centre of a circle, which touches externally the circle x2+y2−6x−6y+14=0 and also touches the y-axis, is given by the equation
A
x2−6x−10y+14=0
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B
x2−10x−6y+14=0
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C
y2−6x−10y+14=0
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D
y2−10x−6y+14=0
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Solution
The correct option is Dy2−10x−6y+14=0 The circle x2+y2−6x−6y+14=0 is given Centre C1(3,3) and radius =2
Let the centre of another circle is C2(h,k) which is touching at y−axis so radius is h. So, C1C2=h+2 ⇒√(3−h)2+(3−k)2=h+2 ⇒k2−10h−6k+14=0 ⇒y2−10x−6y+14=0