MCQMediumJEE 2025Circle Equation & Properties

JEE Mathematics 2025 Question with Solution

If the four distinct points (4,6)(4, 6), (1,5)(-1, 5), (0,0)(0, 0) and (k,3k)(k, 3k) lie on a circle of radius rr, then 10k+r210k + r^2 is equal to

  • A

    3232

  • B

    3333

  • C

    3434

  • D

    3535

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: The points (4,6)(4, 6), (1,5)(-1, 5), (0,0)(0, 0) and (k,3k)(k, 3k) lie on the same circle.

Find: The value of 10k+r210k + r^2.

Let the equation of the circle be

x2+y2+2gx+2fy+c=0x^2 + y^2 + 2gx + 2fy + c = 0

Since (0,0)(0, 0) lies on the circle, we get

c=0c = 0

Substitute (4,6)(4, 6):

16+36+8g+12f=016 + 36 + 8g + 12f = 0 8g+12f=528g + 12f = -52 2g+3f=13...(i)2g + 3f = -13 \quad \text{...(i)}

Substitute (1,5)(-1, 5):

1+252g+10f=01 + 25 - 2g + 10f = 0 2g+10f=26-2g + 10f = -26 g+5f=13...(ii)-g + 5f = -13 \quad \text{...(ii)}

Add (i)\text{(i)} and 2×(ii)2 \times \text{(ii)}:

2g+3f+2(g+5f)=13+2(13)2g + 3f + 2(-g + 5f) = -13 + 2(-13) 13f=3913f = -39 f=3f = -3

Substitute f=3f = -3 in (ii)\text{(ii)}:

g+5(3)=13-g + 5(-3) = -13 g15=13-g - 15 = -13 g=2-g = 2 g=2g = -2

Therefore, the circle is

x2+y24x6y=0x^2 + y^2 - 4x - 6y = 0

Its center is (2,3)(2, 3) and radius is

r=g2+f2c=(2)2+(3)2=13r = \sqrt{g^2 + f^2 - c} = \sqrt{(-2)^2 + (-3)^2} = \sqrt{13}

So,

r2=13r^2 = 13

Now (k,3k)(k, 3k) also lies on the circle, so substitute in the equation:

k2+(3k)24k6(3k)=0k^2 + (3k)^2 - 4k - 6(3k) = 0 k2+9k24k18k=0k^2 + 9k^2 - 4k - 18k = 0 10k222k=010k^2 - 22k = 0 2k(5k11)=02k(5k - 11) = 0

Since the four points are distinct, k0k \ne 0. Hence,

5k11=05k - 11 = 0 k=115k = \frac{11}{5}

Now compute:

10k+r2=10115+13=22+13=3510k + r^2 = 10 \cdot \frac{11}{5} + 13 = 22 + 13 = 35

Therefore, the correct option is D.

Using center and radius explicitly

Given: Three fixed points (4,6)(4, 6), (1,5)(-1, 5) and (0,0)(0, 0) determine the circle, and the fourth point (k,3k)(k, 3k) also lies on it.

Find: 10k+r210k + r^2.

From the general circle equation,

x2+y2+2gx+2fy+c=0x^2 + y^2 + 2gx + 2fy + c = 0

Using (0,0)(0, 0) gives c=0c = 0.

Using (4,6)(4, 6) and (1,5)(-1, 5) gives the two linear equations

2g+3f=132g + 3f = -13 g+5f=13-g + 5f = -13

Solving them gives

f=3,g=2f = -3, \qquad g = -2

Hence the circle is

x2+y24x6y=0x^2 + y^2 - 4x - 6y = 0

Comparing with standard form, the center is (2,3)(2, 3).

Now radius squared is the distance squared from the center to (0,0)(0, 0):

r2=(20)2+(30)2=4+9=13r^2 = (2-0)^2 + (3-0)^2 = 4 + 9 = 13

For the point (k,3k)(k, 3k) to lie on the same circle,

(k2)2+(3k3)2=13(k-2)^2 + (3k-3)^2 = 13

Expand:

k24k+4+9k218k+9=13k^2 - 4k + 4 + 9k^2 - 18k + 9 = 13 10k222k+13=1310k^2 - 22k + 13 = 13 10k222k=010k^2 - 22k = 0 2k(5k11)=02k(5k-11) = 0

Since k=0k = 0 would repeat the point (0,0)(0, 0), we must have

k=115k = \frac{11}{5}

Therefore,

10k+r2=10115+13=3510k + r^2 = 10 \cdot \frac{11}{5} + 13 = 35

So the required value is 3535.

Common mistakes

  • Taking k=0k = 0 from 2k(5k11)=02k(5k-11)=0 is incorrect because it makes the fourth point (k,3k)=(0,0)(k, 3k) = (0, 0), which violates the condition that the four points are distinct. Use the distinctness condition to reject k=0k=0.

  • Using the radius as 13\sqrt{13} and then adding it directly in 10k+r210k + r^2 is wrong. The expression asks for r2r^2, not rr. First compute r2=13r^2 = 13.

  • A common error is writing the radius formula incorrectly from the general equation of the circle. For x2+y2+2gx+2fy+c=0x^2 + y^2 + 2gx + 2fy + c = 0, use r=g2+f2cr = \sqrt{g^2 + f^2 - c}, so here r2=g2+f2cr^2 = g^2 + f^2 - c.

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