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Question

The equation of the circle which is touched by y=x, has its centre on the positive direction of the x-axis and cuts off a chord of length 2 units along the line 3yx=0, is

A
x2+y24x+2=0
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B
x2+y23y+2=0
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C
x2+y24x3y+2=0
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D
x2+y2=2
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Solution

The correct option is A x2+y24x+2=0
Since the required circle has its centre on positive x-axis, so, let the coordinates of the centre be C(a,0), where a>0.

The circle touches y=x.
Therefore, Radius = length of the from (a,0) on the line xy=0,
r=a2.
Also the circle cuts off a chord of length 2 units along the line x3y=0

length of the perpendicular from (a,0) on the line x3y=0,
d=a2
Hence, length of the chord =2r2d2
2=2a22a24a=2 (a>0)
Thus, centre of the circle is at (2,0) and radius =a2=2
Hence, equation of required circle is
(x2)2+(y0)2=(2)2
x2+y24x+2=0

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