MCQMediumJEE 2024Circle Equation & Properties

JEE Mathematics 2024 Question with Solution

Let the circles C1C_1: (xa)2+(y3)2=r2(x - a)^2 + (y - 3)^2 = r^2 and C2C_2: (x8)2+(y1)2=(r/2)2(x - 8)^2 + (y - 1)^2 = (r/2)^2 touch each other externally at the point (6,6)(6,6). If the point (6,6)(6,6) divides the line segment joining the centers of the circles C1C_1 and C2C_2 internally in the ratio 2:12:1, then:

(a+b)+4.(r+r3)(a + b) + 4.(r + r^3) equals:

  • A

    110110

  • B

    130130

  • C

    125125

  • D

    145145

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: The circles have centers (a,3)(a,3) and (8,1)(8,1) from the question, and they touch externally at (6,6)(6,6). The solution working uses the intended center of the second circle as (8,152)\left(8,\frac{15}{2}\right) and evaluates the required expression as (α+β)+4(r12+r22)(\alpha + \beta) + 4(r_1^2 + r_2^2).

Find: The value of the required expression and hence the correct option.

Using the section formula for internal division in the ratio 2:12:1:

16+α3=6\frac{16 + \alpha}{3} = 6 15+β3=6\frac{15 + \beta}{3} = 6

So,

α=2,β=3\alpha = 2, \qquad \beta = 3

Hence the center of C1C_1 is (2,3)(2,3).

Now the distance between the centers is

(28)2+(3152)2\sqrt{(2-8)^2 + \left(3-\frac{15}{2}\right)^2} =36+814=2254=152= \sqrt{36 + \frac{81}{4}} = \sqrt{\frac{225}{4}} = \frac{15}{2}

Since the circles touch externally,

r1+r2=152r_1 + r_2 = \frac{15}{2}

Also, the common point (6,6)(6,6) lies on C1C_1, so

(62)2+(63)2=r12(6-2)^2 + (6-3)^2 = r_1^2 16+9=2516 + 9 = 25

Thus,

r1=5r_1 = 5

Therefore,

r2=1525=52r_2 = \frac{15}{2} - 5 = \frac{5}{2}

Now,

α+β=2+3=5\alpha + \beta = 2 + 3 = 5

and

r12+r22=25+(52)2=25+254=1254r_1^2 + r_2^2 = 25 + \left(\frac{5}{2}\right)^2 = 25 + \frac{25}{4} = \frac{125}{4}

Hence,

4(r12+r22)=1254(r_1^2 + r_2^2) = 125

Therefore,

(α+β)+4(r12+r22)=5+125=130(\alpha + \beta) + 4(r_1^2 + r_2^2) = 5 + 125 = 130

So the correct option is B.

Note: The given question text and the first solution contain notation inconsistencies, but the second solution clearly concludes the answer as 130130.

Using the touching point directly

Given: The touching point is (6,6)(6,6) and the point divides the line joining the centers internally in the ratio 2:12:1.

Find: The final numerical value.

From the solution, let the centers be (α,β)(\alpha,\beta) and (8,152)\left(8,\frac{15}{2}\right). By section formula,

6=28+α36 = \frac{2\cdot 8 + \alpha}{3} 6=2152+β36 = \frac{2\cdot \frac{15}{2} + \beta}{3}

This gives

α=2,β=3\alpha = 2, \qquad \beta = 3

So one center is (2,3)(2,3).

Because (6,6)(6,6) is the point of contact, it lies on the first circle. Hence its radius is the distance from (2,3)(2,3) to (6,6)(6,6):

r1=(62)2+(63)2r_1 = \sqrt{(6-2)^2 + (6-3)^2} =16+9=5= \sqrt{16+9} = 5

The distance between centers is

(82)2+(1523)2=152\sqrt{(8-2)^2 + \left(\frac{15}{2}-3\right)^2} = \frac{15}{2}

For external touching,

r1+r2=152r_1 + r_2 = \frac{15}{2}

Therefore,

r2=1525=52r_2 = \frac{15}{2} - 5 = \frac{5}{2}

Now compute

(α+β)+4(r12+r22)(\alpha + \beta) + 4(r_1^2 + r_2^2) =(2+3)+4(25+254)= (2+3) + 4\left(25 + \frac{25}{4}\right) =5+41254= 5 + 4\cdot \frac{125}{4} =5+125=130= 5 + 125 = 130

Therefore, the required value is 130130, so the correct option is B.

Common mistakes

  • Using the section formula in the wrong order. For internal division, the coordinates must be weighted according to the opposite segments. Reversing the weights gives the wrong center, so write the formula carefully before substituting.

  • Forgetting that the touching point lies on both circles. The point (6,6)(6,6) can be used directly to find a radius from the corresponding center. Ignoring this makes the problem unnecessarily complicated.

  • Using the condition for internal touching instead of external touching. Here the distance between centers is the sum of radii, not the difference. Always check whether the circles touch externally or internally.

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