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Question

Let P(x1,y1) and Q(x2,y2) where y1,y2<0, be the end points of the latus rectum of the ellipse x2+4y2=4. Then equation(s) of the parabola with latus rectum PQ is/are

A
x2+23y=3+3
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B
x223y=3+3
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C
x2+23y=33
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D
x223y=33
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Solution

The correct options are
B x223y=3+3
C x2+23y=33

The given ellipse is
x24+y21=1
e=114=32

Hence, the end points P and Q of the latus rectum are given by
P(3,12) and
Q(3,12) (given y1,y2<0)

Coordinates of midpoint of PQ are
R(0,12)
Length of latus rectum PQ=23

Hence, two parabolas are possible whose vertices are
(0,1232)
and
(0,12+32) be on

So the equation(s) of the parabola are
(x0)2=23(y+12+32) and (x0)2=23(y+1232)
x223y=3+3 and x2+23y=33

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