MCQMediumJEE 2024Circle Equation & Properties

JEE Mathematics 2024 Question with Solution

If one of the diameters of the circle x2+y210x+4y+13=0x^2 + y^2 - 10x + 4y + 13 = 0 is a chord of another circle CC, whose center is the point of intersection of the lines 2x+3y=122x + 3y = 12 and 3x2y=53x - 2y = 5, then the radius of circle CC is:

  • A

    20\sqrt{20}

  • B

    44

  • C

    66

  • D

    353\sqrt{5}

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: One diameter of the circle x2+y210x+4y+13=0x^2 + y^2 - 10x + 4y + 13 = 0 is a chord of another circle CC. The center of circle CC is the intersection point of 2x+3y=122x + 3y = 12 and 3x2y=53x - 2y = 5.

Find: The radius of circle CC.

First, write the given circle in standard form.

(x210x)+(y2+4y)=13(x^2 - 10x) + (y^2 + 4y) = -13 (x5)225+(y+2)24=13(x-5)^2 - 25 + (y+2)^2 - 4 = -13 (x5)2+(y+2)2=16(x-5)^2 + (y+2)^2 = 16

So the center of this circle is M(5,2)M(5,-2) and its radius is 44.

Now find the center of circle CC by solving

2x+3y=122x + 3y = 12

and

3x2y=53x - 2y = 5

Multiply the first equation by 22 and the second by 33:

4x+6y=244x + 6y = 24 9x6y=159x - 6y = 15

Adding,

13x=39x=313x = 39 \Rightarrow x = 3

Substitute in 2x+3y=122x + 3y = 12:

2(3)+3y=123y=6y=22(3) + 3y = 12 \Rightarrow 3y = 6 \Rightarrow y = 2

Hence the center of circle CC is C(3,2)C(3,2).

A diameter of the first circle is a chord of circle CC. Any diameter passes through the center M(5,2)M(5,-2), so the midpoint of that chord is MM. Therefore, the perpendicular distance from the center C(3,2)C(3,2) of circle CC to this chord is

CM=(53)2+(22)2=4+16=20CM = \sqrt{(5-3)^2 + (-2-2)^2} = \sqrt{4+16} = \sqrt{20}

The chord is a diameter of the first circle, so its half-length is equal to the radius of the first circle, namely 44. For circle CC,

(radius)2=(distance from center to chord)2+(half chord)2(\text{radius})^2 = (\text{distance from center to chord})^2 + (\text{half chord})^2

Thus,

R2=(20)2+42=20+16=36R^2 = (\sqrt{20})^2 + 4^2 = 20 + 16 = 36 R=6R = 6

Therefore, the radius of circle CC is 66. The correct option is C.

Using chord-length relation

Given: The center of circle CC is the intersection of 2x+3y=122x + 3y = 12 and 3x2y=53x - 2y = 5. A diameter of the circle x2+y210x+4y+13=0x^2 + y^2 - 10x + 4y + 13 = 0 is a chord of circle CC.

Find: Radius of circle CC.

For the given circle,

(x5)2+(y+2)2=16(x-5)^2 + (y+2)^2 = 16

so its center is M(5,2)M(5,-2) and radius is 44. Hence any diameter of this circle has length 88.

The center of circle CC is obtained by solving the pair of lines, giving C(3,2)C(3,2). The distance between C(3,2)C(3,2) and M(5,2)M(5,-2) is

CM=(35)2+(2+2)2=20CM = \sqrt{(3-5)^2 + (2+2)^2} = \sqrt{20}

Since the diameter of the first circle is a chord of circle CC, its length in circle CC is also 88. For a circle of radius RR, if the perpendicular distance from the center to a chord is dd and half-chord length is \ell, then

R2=d2+2R^2 = d^2 + \ell^2

Here d=20d = \sqrt{20} and =4\ell = 4, so

R2=20+16=36R^2 = 20 + 16 = 36 R=6R = 6

Hence the correct option is C.

Common mistakes

  • Taking the radius of circle CC as CM+4CM + 4 is incorrect. The center of a circle to a chord does not add linearly with half the chord length. Use the right-triangle relation R2=d2+2R^2 = d^2 + \ell^2 instead.

  • Using the full diameter 88 in place of the half-chord length causes an error. In the chord formula, the required quantity is half of the chord length, so here it must be 44, not 88.

  • Finding the wrong intersection point of the lines 2x+3y=122x + 3y = 12 and 3x2y=53x - 2y = 5 leads to the wrong distance from the center to the chord. Solve the linear equations carefully to get the center of circle CC as (3,2)\left(3,2\right).

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