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Question

If the lines x−2y+3=0 and 3x+ky+7=0 cut the coordinate axes in concyclic points, then

A
k=32
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B
k=32
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C
Equation of circle passing through those points is (x+83)2+(y3712)2=138512
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D
Center of circle is (83,3712)
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Solution

The correct options are
B k=32
D Center of circle is (83,3712)
If lines a1x+b1y+c1=0 and a2x+b2y+c2=0 cut axes at concyclic points then
(i) a1a2=b1b2
(ii) Circle equation is (a1x+b1y+c1)(a2x+b2y+c2)(a1b2+a2b1)xy=0
So, for
x2y+3=0 and 3x+ky+7=0
1(3)=2(k)
k=32
circle equation passing through concyclic point is (x2y+3)(6x3y+14)(312)xy=0
6x2+6y2+32x37y+42=0
x2+y2+163x376y+7=0
Centre=(83,3712)
radius=(83)2+(3712)27
=1364+13691663
=138512

Alternate Solution:
For points to be concyclic all 4 points should be in 2nd Quadrant
Given AB:x2y+3=0
and 2p=3/27/k
center will lie on perpendicular bisector of AB whose equation will be
2x+y=9/4(1)
Now putting the center coordinates in (1)
163+3472k=94k=3/2
Hence center coordinates (83,3712)
radius =(83+3)2+(3712)2
=138512 units
Hence, circle equation is (x+83)2+(y3712)2=1385144

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