Let a circle is touching exactly two sides of a square ABCD and passes through exactly one of its vertices. If area of the square ABCD is 1 sq. units, then the radius of the circle (in units) is
A
2−√2
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B
√2−1
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C
12
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D
1√2
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Solution
The correct option is A2−√2 Let A=(0,0), so B=(0,1),C=(1,1),D=(1,0)
The centre of the circle is O=(r,r), so the equation of the circle is (x−r)2+(y−r)2=r2 It passes through (1,1), so (1−r)2+(1−r)2=r2⇒2(1−r)2=r2⇒2+2r2−4r=r2⇒r2−4r+2=0⇒r=4±√82∴r=2−√2(∵r<1)