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Question

Circle C1:x2+y2=16 intersects another circle C2 of radius 6 in such a manner that their common chord is of maximum length and has slope equal to 12. Then the co-ordinates of the centre of the circle(s) C2 is (are)

A
(2,4)
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B
(2,4)
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C
(2,4)
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D
(2,4)
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Solution

The correct options are
C (2,4)
D (2,4)
According to the question, the chord is of maximum possible length
The diameter of the circle C1:x2+y2=16 is our required common chord .
Slope of the chord is given as 12,
Slope of line perpendicular to the chord would be 2 and its equation would be L:2x+y=c
L will pass through both of the centres of the circles.
L:2x+y=0
Let the centre of the circle C2 be Q(h,k)
2h+k=0 ...(1)

Now, In ΔPAQ
62=42+AQ2and AQ2=h2+k2h2+k2=20 ...(2)
Using (1) and (2), we get
h=±2k=4
The co-ordinates of the circle C2 are (2,4) and (2,4).

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