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Question

The locus of the point of intersection of perpendicular tangent drawn to each one of the parabola y2=4x+4 and y2=8x+16 is

A
x=3
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B
x=12
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C
x=8
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D
x=4
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Solution

The correct option is A x=3
Given parabolas are y2=4x+4 and y2=8x+16
Let the slope of one tangent be m, so the slope of other tangent is 1m
( They are perpendicular to each other)
Now, the equation of tangent to the parabola y2=4x+4 is
y=m(x+1)+1m (1)
The equation of tangent to parabola y2=8x+16 is
y=1m(x+2)2m (2)

Solving equation (1) and (2), we get
m(x+1)+1m=1m(x+2)2m3m+x(m+1m)+3m=0(m+1m)(x+3)=0
Since (m+1m)0, we get
x=3

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