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Question

The equation of circle touching the line 2x+3y+1=0 at (1,1) and cutting orthogonally the cirlce having line segment joining (0,3) and (2,1) as diameter is

A
2x2+2y2+10x+5y+1=0
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B
2x2+2y210x5y+1=0
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C
2x2+2y210x10y+10=0
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D
2x2+2y210x10y+20=0
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Solution

The correct option is B 2x2+2y210x5y+1=0
We are given that line
2x+3y+1=0 touches a circle S=0 at (1,1)


So, equation of this circle can be given by (x1)2+(y+1)2+λ(2x+3y+1)=0,λϵR
or x2+y2+2x(λ1)+y(3λ+2)+(λ+2)=0........(i)

But given that this circle is orthogonal to the circle, the extremities of whose diameter are (0,3) and (2,1)

i.e., x(x+2)+(y3)(y+1)=0
or x2+y2+2x2y3=0 ........(ii)

Applying the condition of orthogonality for Eqs. (i) and (ii), we get

2(λ1)×1+2(3λ+22)×(1)=λ+23
2 λ 23 λ2=λ1
2 λ=3
λ=32

Substituting this value of 1 in Eq. (i) we get the required circle as
x2+y25x52y+12=0

or 2x2+2y210x5y+1=0

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