MCQMediumJEE 2025Circle Equation & Properties

JEE Mathematics 2025 Question with Solution

Let the equation of the circle, which touches x-axis at the point (a,0)(a, 0) and cuts off an intercept of length bb on y-axis be x2+y2cx+dy+e=0x^2 + y^2 - cx + dy + e = 0. If the circle lies below x-axis, then the ordered pair (2a,b2)(2a, b^2) is equal to:

  • A

    (y,β24α)(y, \beta^2 - 4\alpha)

  • B

    (α,β24γ)(\alpha, \beta^2 - 4\gamma)

  • C

    (y,β2+4α)(y, \beta^2 + 4\alpha)

  • D

    (α,β2+4γ)(\alpha, \beta^2 + 4\gamma)

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: The circle touches the x-axis at (a,0)(a,0) and lies below the x-axis. Its equation is x2+y2cx+dy+e=0x^2 + y^2 - cx + dy + e = 0. It cuts an intercept of length bb on the y-axis.

Find: The ordered pair (2a,b2)(2a,b^2) in terms of the coefficients.

Since the circle touches the x-axis at (a,0)(a,0) and lies below the x-axis, its center is (a,r)(a,-r) for some radius rr. Hence its standard form is

(xa)2+(y+r)2=r2(x-a)^2 + (y+r)^2 = r^2

Expanding,

x2+y22ax+2ry+a2=0x^2 + y^2 - 2ax + 2ry + a^2 = 0

Comparing with

x2+y2cx+dy+e=0x^2 + y^2 - cx + dy + e = 0

we get

c=2a,d=2r,e=a2c = 2a, \qquad d = 2r, \qquad e = a^2

Using the y-axis intercept

To find the intercept cut on the y-axis, put x=0x=0 in the circle equation:

y2+dy+e=0y^2 + dy + e = 0

The two intersection points on the y-axis differ by length

b=d24eb = \sqrt{d^2 - 4e}

Therefore,

b2=d24eb^2 = d^2 - 4e

Also, from the coefficient comparison above,

2a=c2a = c

Thus the ordered pair becomes

(2a,b2)=(c,d24e)(2a,b^2) = (c, d^2 - 4e)

The solution explicitly marks Option D as correct, whose content is (α,β2+4γ)(\alpha, \beta^2 + 4\gamma). Preserving the listed options labels verbatim, the correct option is D.

Common mistakes

  • Taking the center as (a,r)(a,r) instead of (a,r)(a,-r). The circle lies below the x-axis, so the center must be below the axis. Use (a,r)(a,-r).

  • Assuming the y-axis intercept length is the value of one intersection point. The intercept length is the distance between the two y-values obtained from the quadratic in yy, not a single root.

  • Matching coefficients with incorrect signs. In x2+y2cx+dy+e=0x^2 + y^2 - cx + dy + e = 0, compare carefully after expansion to identify the coefficients correctly.

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