MCQMediumJEE 2025Conic Sections (Parabola, Ellipse, Hyperbola)

JEE Mathematics 2025 Question with Solution

Let the point PP of the focal chord PQPQ of the parabola y2=16xy^2 = 16x be (1,4)(1, -4). If the focus of the parabola divides the chord PQPQ in the ratio m:nm : n, gcd(m,n)=1\gcd(m, n) = 1, then m2+n2m^2 + n^2 is equal to:

  • A

    1717

  • B

    1010

  • C

    3737

  • D

    2626

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The parabola is y2=16xy^2 = 16x and point P(1,4)P(1,-4) lies on the focal chord PQPQ.

Find: If the focus divides PQPQ in the ratio m:nm:n, find m2+n2m^2+n^2.

Compare with the standard form

y2=4axy^2 = 4ax

So,

4a=16    a=44a = 16 \implies a = 4

Hence the focus is

S=(4,0)S = (4,0)

A general point on the parabola is

(at2,2at)(at^2, 2at)

For point P(1,4)P(1,-4),

2at1=42at_1 = -4

Substituting a=4a=4,

8t1=4    t1=128t_1 = -4 \implies t_1 = -\frac{1}{2}

Since PQPQ is a focal chord, the parameters satisfy

Therefore,

(12)t2=1    t2=2\left(-\frac{1}{2}\right)t_2 = -1 \implies t_2 = 2

So the other end point is

Q(at22,2at2)=(422,242)=(16,16)Q(at_2^2, 2at_2) = (4\cdot 2^2, 2\cdot 4\cdot 2) = (16,16)

Now compute the distances from the focus:

PF=(41)2+(0(4))2=32+42=5PF = \sqrt{(4-1)^2 + (0-(-4))^2} = \sqrt{3^2+4^2} = 5 FQ=(164)2+(160)2=122+162=20FQ = \sqrt{(16-4)^2 + (16-0)^2} = \sqrt{12^2+16^2} = 20

Hence,

mn=PFFQ=520=14\frac{m}{n} = \frac{PF}{FQ} = \frac{5}{20} = \frac{1}{4}

So m=1m=1 and n=4n=4. Therefore,

m2+n2=12+42=1+16=17m^2+n^2 = 1^2+4^2 = 1+16 = 17

Thus, the correct option is A.

Using section ratio directly

Given: The parabola is y2=16xy^2 = 16x, point P(1,4)P(1,-4) is one end of a focal chord, and the focus is required to divide chord PQPQ in the ratio m:nm:n.

Find: The value of m2+n2m^2+n^2.

From

y2=16x=4axy^2 = 16x = 4ax

we get

a=4a=4

and the focus is

(4,0)(4,0)

Write point PP in parametric form:

P=(at12,2at1)P=(at_1^2,2at_1)

Using P=(1,4)P=(1,-4),

8t1=4    t1=128t_1=-4 \implies t_1=-\frac{1}{2}

For a focal chord,

t1t2=1t_1t_2=-1

Hence,

t2=2t_2=2

and so

Q=(at22,2at2)=(16,16)Q=(at_2^2,2at_2)=(16,16)

Let the focus divide PQPQ internally in the ratio λ:1\lambda:1. Using the section formula for the yy-coordinate,

λ16+1(4)λ+1=0\frac{\lambda \cdot 16 + 1\cdot(-4)}{\lambda+1} = 0

Thus,

16λ4=0    λ=1416\lambda - 4 = 0 \implies \lambda = \frac{1}{4}

Therefore,

mn=14\frac{m}{n} = \frac{1}{4}

So,

m2+n2=12+42=17m^2+n^2 = 1^2+4^2 = 17

Therefore, the required value is 1717 and the correct option is A.

Common mistakes

  • Using the point P(1,4)P(1,-4) without converting it to parametric form correctly. For y2=4axy^2=4ax, the parametric point is (at2,2at)(at^2,2at), not (at,2at)(at,2at). Use 2at=42at=-4 to get t=12t=-\frac{1}{2}.

  • Forgetting the focal chord property t1t2=1t_1t_2=-1. This relation is specific to endpoints of a focal chord of the parabola. Without it, the second point QQ cannot be determined correctly.

  • Taking the division ratio as FQ:PFFQ:PF instead of PF:FQPF:FQ. If the focus divides PQPQ in the ratio m:nm:n, then the order follows the segment from PP to focus and focus to QQ, so use PF:FQPF:FQ.

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