MCQMediumJEE 2026Conic Sections (Parabola, Ellipse, Hyperbola)

JEE Mathematics 2026 Question with Solution

Let one end of a focal chord of the parabola y2=16xy^2 = 16x be (16,16)(16, 16). If P(α,β)P(\alpha, \beta) divides this focal chord internally in the ratio 5:25 : 2, then the minimum value of α+β\alpha + \beta is equal to :

  • A

    55

  • B

    77

  • C

    1616

  • D

    2222

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: The parabola is y2=16xy^2 = 16x, so comparing with y2=4axy^2 = 4ax gives a=4a = 4. One end of a focal chord is A(16,16)A(16,16).

Find: The minimum value of α+β\alpha + \beta, where P(α,β)P(\alpha,\beta) divides the focal chord internally in the ratio 5:25:2.

For a point on the parabola y2=4axy^2 = 4ax in parametric form, the coordinates are

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

Since A(16,16)=(4t12,8t1)A(16,16) = (4t_1^2, 8t_1), from 8t1=168t_1 = 16 we get

t1=2t_1 = 2

Because the chord is a focal chord, the parameters of its endpoints satisfy

t1t2=1t_1 t_2 = -1

Hence

t2=12t_2 = -\frac{1}{2}

So the other end BB is

B=(at22,2at2)=(4(12)2,24(12))=(1,4)B = (at_2^2, 2at_2) = \left(4\left(-\frac{1}{2}\right)^2, 2 \cdot 4 \cdot \left(-\frac{1}{2}\right)\right) = (1,-4)

Now P(α,β)P(\alpha,\beta) divides ABAB internally in the ratio 5:25:2. Two internal orders are possible.

Case 1: Ratio 5:25:2 from AA to BB. Using the section formula,

α=5(1)+2(16)5+2=377,β=5(4)+2(16)5+2=127\alpha = \frac{5(1) + 2(16)}{5+2} = \frac{37}{7}, \qquad \beta = \frac{5(-4) + 2(16)}{5+2} = \frac{12}{7}

Therefore,

α+β=377+127=497=7\alpha + \beta = \frac{37}{7} + \frac{12}{7} = \frac{49}{7} = 7

Case 2: Ratio 5:25:2 from BB to AA. Then

α=5(16)+2(1)7=827,β=5(16)+2(4)7=727\alpha = \frac{5(16) + 2(1)}{7} = \frac{82}{7}, \qquad \beta = \frac{5(16) + 2(-4)}{7} = \frac{72}{7}

So,

α+β=827+727=1547=22\alpha + \beta = \frac{82}{7} + \frac{72}{7} = \frac{154}{7} = 22

The minimum of the two values is 77. Therefore, the correct option is B.

Using focal chord parameter relation

Given: One endpoint of a focal chord of y2=16xy^2 = 16x is (16,16)(16,16).

Find: The least value of α+β\alpha + \beta for the internal division point.

For y2=4axy^2 = 4ax, the focus is (a,0)(a,0) and any point with parameter tt is

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

Here a=4a = 4, so the point corresponding to parameter tt is

(4t2,8t)(4t^2, 8t)

Matching with (16,16)(16,16) gives

8t=16t=28t = 16 \Rightarrow t = 2

The endpoints of a focal chord satisfy

t1t2=1t_1 t_2 = -1

Thus

t2=1t1=12t_2 = -\frac{1}{t_1} = -\frac{1}{2}

Hence the second endpoint is

(414,8(12))=(1,4)\left(4\cdot \frac{1}{4}, 8 \cdot \left(-\frac{1}{2}\right)\right) = (1,-4)

Now apply the internal section formula carefully, because the statement 5:25:2 can be interpreted in either order along the segment.

If AP:PB=5:2AP:PB = 5:2, then

P=(5xB+2xA7,5yB+2yA7)P = \left(\frac{5x_B + 2x_A}{7}, \frac{5y_B + 2y_A}{7}\right)

Substituting A(16,16)A(16,16) and B(1,4)B(1,-4),

P=(51+2167,5(4)+2167)=(377,127)P = \left(\frac{5\cdot 1 + 2\cdot 16}{7}, \frac{5\cdot (-4) + 2\cdot 16}{7}\right) = \left(\frac{37}{7}, \frac{12}{7}\right)

So

α+β=497=7\alpha + \beta = \frac{49}{7} = 7

If BP:PA=5:2BP:PA = 5:2, then

P=(5xA+2xB7,5yA+2yB7)P = \left(\frac{5x_A + 2x_B}{7}, \frac{5y_A + 2y_B}{7}\right)

Therefore

P=(516+217,516+2(4)7)=(827,727)P = \left(\frac{5\cdot 16 + 2\cdot 1}{7}, \frac{5\cdot 16 + 2\cdot (-4)}{7}\right) = \left(\frac{82}{7}, \frac{72}{7}\right)

Thus

α+β=1547=22\alpha + \beta = \frac{154}{7} = 22

Among the possible internal division points, the minimum value of α+β\alpha + \beta is 77. Hence the correct option is B.

Common mistakes

  • Using the wrong parameter relation for a focal chord. For a focal chord of y2=4axy^2 = 4ax, the endpoints satisfy t1t2=1t_1 t_2 = -1, not t1+t2=0t_1 + t_2 = 0. Use the focal chord condition first to find the second endpoint correctly.

  • Applying the section formula in the wrong order. In internal division, the coordinates of the opposite endpoint are multiplied by the corresponding ratio part. Check both possible interpretations of 5:25:2 before taking the minimum.

  • Incorrectly identifying aa from the parabola. From y2=16xy^2 = 16x, comparing with y2=4axy^2 = 4ax gives 4a=164a = 16 and hence a=4a = 4. Taking a=16a = 16 makes every subsequent coordinate wrong.

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