MCQMediumJEE 2023Conic Sections (Parabola, Ellipse, Hyperbola)

JEE Mathematics 2023 Question with Solution

Let A be a point on the x-axis. Common tangents are drawn from A to the curves x2+y2=8x^2 + y^2 = 8 and y2=16xy^2 = 16x. If one of these tangents touches the two curves at Q and R, then (QR)2(QR)^2 is equal to:

  • A

    6464

  • B

    7676

  • C

    8181

  • D

    7272

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: Common tangents are drawn from a point A on the x-axis to the circle x2+y2=8x^2 + y^2 = 8 and the parabola y2=16xy^2 = 16x.

Find: The value of (QR)2(QR)^2, where Q and R are the points of contact on the two curves.

Take the common tangent in slope form as

y=mx+m4y = mx + \frac{m}{4}

For the circle x2+y2=8x^2 + y^2 = 8, the perpendicular distance from the centre to the tangent equals the radius. Hence,

1+m2m4=22\frac{\sqrt{1+m^2}}{\left|\frac{m}{4}\right|} = 2\sqrt{2}

Therefore,

m=±1m = \pm 1

So the common tangents are

y=±x±4y = \pm x \pm 4

Point of contact on parabola: let m=1m = 1. Using the parametric point of contact form shown in the solution,

(m2a,m2a)\left(\frac{m^2}{a}, \frac{m}{2a}\right)

we get

R(4,8)R(4,8)

Point of contact on circle is

Q(2,2)Q(-2,2)

Now,

(QR)2=(4(2))2+(82)2(QR)^2 = (4-(-2))^2 + (8-2)^2 =62+62= 6^2 + 6^2 =36+36=72= 36 + 36 = 72

Therefore, the value of (QR)2(QR)^2 is 7272. The correct option is D. The source solution labels it as option C, but the computed value 7272 matches option D in the given options.

Working from the tangent condition

Given: A common tangent touches the circle x2+y2=8x^2 + y^2 = 8 at Q and the parabola y2=16xy^2 = 16x at R.

Find: (QR)2(QR)^2.

Write the tangent in slope form for the parabola y2=4axy^2 = 4ax with 4a=164a = 16, so a=4a = 4:

y=mx+am=mx+4my = mx + \frac{a}{m} = mx + \frac{4}{m}

The extracted solution text displays the tangent in an equivalent slope setup and then uses the tangency condition with the circle to obtain m=±1m = \pm 1.

Using the circle tangency condition, the solution arrives at

m=±1m = \pm 1

Choosing m=1m = 1 gives the relevant contact points reported in the solution:

R(4,8),Q(2,2)R(4,8), \quad Q(-2,2)

Hence the squared distance is

(QR)2=(4+2)2+(82)2=62+62=72(QR)^2 = (4+2)^2 + (8-2)^2 = 6^2 + 6^2 = 72

So the required value is 7272.

Common mistakes

  • Using the option label from the solution without checking the computed value. The solution text says option C, but the working gives 7272. Always match the final numerical result with the listed options.

  • Applying the tangent formula of the parabola incorrectly. For y2=4axy^2 = 4ax, students often confuse the slope form and the point-of-contact form. Use one consistent tangent representation before applying the common tangency condition.

  • Computing QRQR instead of (QR)2(QR)^2. The question asks for the square of the distance, so after finding coordinate differences, do not take the square root.

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