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Question

Consider a triangle Δ whose two sides lie on the xaxis and the line x+y+1=0. If the orthocenter of Δ is (1,1), then the equation of the circle passing through the vertices of the triangle Δ is

A
x2+y23x+y=0
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B
x2+y2+x+3y=0
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C
x2+y2+2y1=0
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D
x2+y2+x+y=0
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Solution

The correct option is B x2+y2+x+3y=0
As we know mirror image of orthocenter lie on circumcircle.
Image of (1,1) in xaxis is (1,1)

Image of (1,1) in x+y+1=0 is given by
x11=x11=2(1+1+1)12+12
x=2 and y=2
Image of (1,1) in x+y+1=0 is (2,2).
and intersection of x axis and line x+y+1=0 is (1,0).
The required circle will be passing through the points (1,1),(2,2) and (1,0),
Hence, the equation of circle is x2+y2+x+3y=0

Alternative solution:
Let the equation of circle
x2+y2+2gx+2fy+c=0
At (1,1):
2g2f+c+2=0 (1)
At (1,0):
2g+c+1=0 (2)
At (2,2):
4g+4fc8=0 (3)
From (1),(2) and (3), we get
g=12,f=32 and c=0
So, equation of circle is x2+y2+x+3y=0

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