Length of Intercept Made by a Circle on a Straight Line
The equation ...
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 √3y−x=0, is
A
x2+y2−4x+2=0
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B
x2+y2−3y+2=0
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C
x2+y2−4x−3y+2=0
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D
x2+y2=2
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Solution
The correct option is Ax2+y2−4x+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 x−y=0, ∴r=a√2.
Also the circle cuts off a chord of length 2 units along the line x−√3y=0
length of the perpendicular from (a,0) on the line x−√3y=0, d=a2
Hence, length of the chord =2√r2−d2 2=2√a22−a24⇒a=2(∵a>0)
Thus, centre of the circle is at (2,0) and radius =a√2=√2
Hence, equation of required circle is (x−2)2+(y−0)2=(√2)2 ⇒x2+y2−4x+2=0