The circle C passing through the origin, has the line 3x+4y=0 as its tangent at the origin. If the image of the centre of C w.r.t the line x253+y254=1 lies on the line 3x+4y=0, then the equation of C is
A
(x−6)2+(y−8)2=100
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B
(x−6)2+(y−0)2=100
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C
x2+y2=100
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D
(x+6)2+(y+8)2=100
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Solution
The correct option is A(x−6)2+(y−8)2=100 Equation of the line which contains the origin and centre of the circle is perpendicular to line 3x+4y=0 ∴The equation of the line is 4x−3y=0 ∵4x−3y=0 is also perpendicular to x253+y254=1 ∴ Image of the the centre of the circle w.r.t line x253+y254=1 is origin.
Distance of the line from the origin is 5 ∵ centre lies on the line 4x−3y=0 and at a distance of 5 from x253+y254=1
So, centre of the circle is (6,8)
So, the equation of the circle is (x−6)2+(y−8)2=100