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Question

If the pairs of lines x2+2xy+ay2=0 and ax2+2xy+y2=0 have exactly one line in common then the joint equation of the other two lines is given by


A

3x2+8xy3y2=0

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B

3x2+10xy+3y2=0

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C

y2+2xy3x2=0

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D

x2+2xy3y2=0

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Solution

The correct option is B

3x2+10xy+3y2=0


Let y = mx be a line common to the given pairs of lines, then
am2+2m+1=0 and m2+2m+a=0. Solving these two equations we get,
a = 1 or -3
But for a = 1, the two pairs have both the lines common, so a =-3 and m=(a+12)
m = 1
Now, x2+2xy+ay2=x2+2xy3y2
= (x - y) (x + 3y)
and ax2+2xy+y2=3x2+2xy+y2
= -(x - y) (3x + y)
So, the equation of the required lines is
(x + 3y) (3x + y) = 0 3x2+10xy+3y2=0


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