MCQMediumJEE 2026Circle Equation & Properties

JEE Mathematics 2026 Question with Solution

Let the set of all values of rr, for which the circles (x+1)2+(y+4)2=r2(x + 1)^2 + (y + 4)^2 = r^2 and x2+y24x2y4=0x^2 + y^2 - 4x - 2y - 4 = 0 intersect at two distinct points be the interval (α,β)(\alpha, \beta). Then αβ\alpha\beta is equal to

  • A

    2525

  • B

    2121

  • C

    2424

  • D

    2020

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The circles are (x+1)2+(y+4)2=r2(x + 1)^2 + (y + 4)^2 = r^2 and x2+y24x2y4=0x^2 + y^2 - 4x - 2y - 4 = 0.

Find: The value of αβ\alpha\beta where the values of rr for intersection at two distinct points form the interval (α,β)(\alpha, \beta).

For the first circle, the center is C1(1,4)C_1(-1,-4) and the radius is rr.

For the second circle, complete the square:

x24x+y22y=4x^2 - 4x + y^2 - 2y = 4 (x2)2+(y1)2=9(x - 2)^2 + (y - 1)^2 = 9

So its center is C2(2,1)C_2(2,1) and its radius is 33.

Now find the distance between the centers:

d=(2+1)2+(1+4)2=32+52=34d = \sqrt{(2+1)^2 + (1+4)^2} = \sqrt{3^2 + 5^2} = \sqrt{34}

For two circles to intersect at two distinct points, the condition is:

r3<34<r+3|r-3| < \sqrt{34} < r+3

From

34<r+3\sqrt{34} < r+3

we get

r>343r > \sqrt{34} - 3

From

r3<34|r-3| < \sqrt{34}

we get

34<r3<34-\sqrt{34} < r-3 < \sqrt{34}

So,

r<3+34r < 3 + \sqrt{34}

Hence,

(α,β)=(343,34+3)(\alpha, \beta) = (\sqrt{34} - 3, \sqrt{34} + 3)

Therefore,

αβ=(343)(34+3)=349=25\alpha\beta = (\sqrt{34} - 3)(\sqrt{34} + 3) = 34 - 9 = 25

So the correct option is A.

Using circle intersection condition

Given: Two circles with centers and radii obtained from their standard forms.

Find: The product αβ\alpha\beta.

The second circle is first converted to standard form:

x2+y24x2y4=0x^2 + y^2 - 4x - 2y - 4 = 0 x24x+y22y=4x^2 - 4x + y^2 - 2y = 4 (x2)2+(y1)2=9(x-2)^2 + (y-1)^2 = 9

Thus the two circles have:

  • center (1,4)(-1,-4) and radius rr
  • center (2,1)(2,1) and radius 33

Distance between centers:

d=(2(1))2+(1(4))2=32+52=34d = \sqrt{(2-(-1))^2 + (1-(-4))^2} = \sqrt{3^2 + 5^2} = \sqrt{34}

For two distinct intersection points, the distance must satisfy:

r1r2<d<r1+r2|r_1-r_2| < d < r_1+r_2

Substituting r1=rr_1=r, r2=3r_2=3 and d=34d=\sqrt{34}:

r3<34<r+3|r-3| < \sqrt{34} < r+3

This gives:

r>343r > \sqrt{34}-3

and

r<34+3r < \sqrt{34}+3

Therefore,

α=343,β=34+3\alpha = \sqrt{34}-3, \qquad \beta = \sqrt{34}+3

Now multiply:

αβ=(343)(34+3)\alpha\beta = (\sqrt{34}-3)(\sqrt{34}+3) αβ=349=25\alpha\beta = 34-9 = 25

Therefore, the required value is 2525.

Common mistakes

  • Using the condition for circles touching instead of intersecting at two distinct points. Tangency requires equality, but here both inequalities must be strict: r1r2<d<r1+r2|r_1-r_2| < d < r_1+r_2.

  • Not converting the second circle into standard form before reading its center and radius. The equation x2+y24x2y4=0x^2 + y^2 - 4x - 2y - 4 = 0 must be completed into squares first.

  • Making a sign error while finding the center of the first circle. From (x+1)2+(y+4)2=r2(x+1)^2 + (y+4)^2 = r^2, the center is (1,4)(-1,-4), not (1,4)(1,4).

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