MCQMediumJEE 2025Conic Sections (Parabola, Ellipse, Hyperbola)

JEE Mathematics 2025 Question with Solution

Let P(4,43)P(4, 4\sqrt{3}) be a point on the parabola y2=4axy^2 = 4ax and PQPQ be a focal chord of the parabola. If MM and NN are the foot of the perpendiculars drawn from PP and QQ respectively on the directrix of the parabola, then the area of the quadrilateral PQMNPQMN is equal to:

  • A

    26338\frac{263\sqrt{3}}{8}

  • B

    34338\frac{343\sqrt{3}}{8}

  • C

    3433\frac{34\sqrt{3}}{3}

  • D

    17317\sqrt{3}

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: P(4,43)P(4, 4\sqrt{3}) lies on the parabola y2=4axy^2 = 4ax, and PQPQ is a focal chord. Points MM and NN are the feet of perpendiculars from PP and QQ on the directrix.

Find: The area of quadrilateral PQMNPQMN.

Since P(4,43)P(4, 4\sqrt{3}) lies on y2=4axy^2 = 4ax,

(43)2=4a4(4\sqrt{3})^2 = 4a \cdot 4 48=16a48 = 16a

So,

4a=124a = 12

and the parabola is

y2=12xy^2 = 12x

For y2=4axy^2 = 4ax with 4a=124a = 12, we get

a=3a = 3

A point on the parabola in parametric form is (at2,2at)\left(at^2, 2at\right). For point P(4,43)P(4, 4\sqrt{3}),

2at=432at = 4\sqrt{3} 23t=432 \cdot 3 \cdot t = 4\sqrt{3} t1=23t_1 = \frac{2}{\sqrt{3}}

Since PQPQ is a focal chord, the parameters satisfy

t1t2=1t_1 t_2 = -1

Hence,

t2=1t1=32t_2 = -\frac{1}{t_1} = -\frac{\sqrt{3}}{2}

Therefore, the coordinates of QQ are

(at22,2at2)=(334,23(32))\left(at_2^2, 2at_2\right) = \left(3 \cdot \frac{3}{4}, 2 \cdot 3 \cdot \left(-\frac{\sqrt{3}}{2}\right)\right) Q=(94,33)Q = \left(\frac{9}{4}, -3\sqrt{3}\right)

The directrix of y2=4axy^2 = 4ax is

x=a=3x = -a = -3

Since perpendiculars are drawn to the directrix, PMPM and QNQN are horizontal distances from the points to x=3x = -3. Thus,

PM=4(3)=7PM = 4 - (-3) = 7 QN=94(3)=214QN = \frac{9}{4} - (-3) = \frac{21}{4}

Also, MNMN is the distance between the projections of PP and QQ on the vertical line x=3x = -3, so it equals the difference of their yy-coordinates:

MN=43(33)=73MN = 4\sqrt{3} - (-3\sqrt{3}) = 7\sqrt{3}

Now PQMNPQMN is a trapezium with parallel sides PMPM and QNQN, and height MNMN. Therefore,

Area=12×MN×(PM+QN)\text{Area} = \frac{1}{2} \times MN \times (PM + QN) =12×73×(7+214)= \frac{1}{2} \times 7\sqrt{3} \times \left(7 + \frac{21}{4}\right) =12×73×494= \frac{1}{2} \times 7\sqrt{3} \times \frac{49}{4} =34338= \frac{343\sqrt{3}}{8}

Therefore, the area of quadrilateral PQMNPQMN is 34338\frac{343\sqrt{3}}{8}. The correct option is B.

Note: The answer key marks option A, but the solution concludes option A while computing 34338\frac{343\sqrt{3}}{8}, which matches option B. Using the solution working, the defensible answer is B.

Geometric Interpretation

Given: The parabola is y2=12xy^2 = 12x, with directrix x=3x = -3. The focal chord has endpoints P(4,43)P(4, 4\sqrt{3}) and Q(94,33)Q\left(\frac{9}{4}, -3\sqrt{3}\right).

Find: Area of PQMNPQMN.

Because the directrix is a vertical line, the perpendiculars from PP and QQ to the directrix are horizontal. Hence PMPM and QNQN are parallel, and their lengths are the horizontal distances of PP and QQ from the directrix.

So,

PM=7,QN=214PM = 7, \qquad QN = \frac{21}{4}

The segment joining their feet on the directrix is vertical, with length

MN=43(33)=73MN = |4\sqrt{3} - (-3\sqrt{3})| = 7\sqrt{3}

Thus the quadrilateral is a trapezium with parallel sides PMPM and QNQN and distance between them equal to MNMN. Therefore,

Area of PQMN=12(PM+QN)MN=12(7+214)73=34338\text{Area of } PQMN = \frac{1}{2}(PM + QN) \cdot MN = \frac{1}{2} \left(7 + \frac{21}{4}\right) \cdot 7\sqrt{3} = \frac{343\sqrt{3}}{8}

Hence the correct option is B.

Common mistakes

  • Using the raw marked answer without checking the solution working. Here the computed value is 34338\frac{343\sqrt{3}}{8}, which matches option B, not option A. Always verify the final numerical result against the options.

  • Forgetting that for a focal chord of y2=4axy^2 = 4ax, the parameters satisfy t1t2=1t_1 t_2 = -1. Without this relation, the coordinates of QQ will be incorrect.

  • Using the wrong directrix. For y2=4axy^2 = 4ax, the directrix is x=ax = -a, not x=ax = a. This changes the lengths PMPM and QNQN completely.

  • Taking the trapezium area with incorrect parallel sides. The parallel sides are PMPM and QNQN because both are perpendicular to the vertical directrix, while MNMN is the distance between them.

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