MCQEasyJEE 2026Conic Sections (Parabola, Ellipse, Hyperbola)

JEE Mathematics 2026 Question with Solution

An ellipse has its centre at (1,2)(1,-2), one focus at (3,2)(3,-2) and one vertex at (5,2)(5,-2). Then the length of its latus rectum is:

  • A

    163\dfrac{16}{\sqrt3}

  • B

    66

  • C

    434\sqrt3

  • D

    636\sqrt3

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: The centre is (1,2)(1,-2), one focus is (3,2)(3,-2), and one vertex is (5,2)(5,-2).

Find: The length of the latus rectum of the ellipse.

Since the centre, focus, and vertex all lie on the line y=2y=-2, the major axis is along the xx-axis.

For an ellipse with major axis along the xx-axis, the length of latus rectum is

Length of latus rectum=2b2a\text{Length of latus rectum} = \frac{2b^2}{a}

where aa is the semi-major axis, bb is the semi-minor axis, and cc is the distance of the focus from the centre. These satisfy

c2=a2b2c^2 = a^2 - b^2

From the centre (1,2)(1,-2) and focus (3,2)(3,-2),

c=31=2c = |3-1| = 2

From the centre (1,2)(1,-2) and vertex (5,2)(5,-2),

a=51=4a = |5-1| = 4

Now use the relation

c2=a2b2c^2 = a^2 - b^2

So,

22=42b22^2 = 4^2 - b^2 4=16b24 = 16 - b^2 b2=12b^2 = 12

Therefore, the length of the latus rectum is

L=2b2aL = \frac{2b^2}{a} L=2×124L = \frac{2\times 12}{4} L=6L = 6

Therefore, the correct option is B.

Parameter Identification

Given: The ellipse has centre (1,2)(1,-2), focus (3,2)(3,-2), and vertex (5,2)(5,-2).

Find: The latus rectum length.

The equal yy-coordinate in all three points shows that the major axis is horizontal. Hence the standard parameter meanings are:

  • aa = distance from centre to vertex
  • cc = distance from centre to focus
  • b2=a2c2b^2 = a^2-c^2

Now,

a=4,c=2a = 4, \quad c = 2

Thus,

b2=a2c2=164=12b^2 = a^2-c^2 = 16-4 = 12

The latus rectum length is

2b2a=2124=6\frac{2b^2}{a} = \frac{2\cdot 12}{4} = 6

Hence, the latus rectum length is 66.

Common mistakes

  • Using the formula for a parabola instead of an ellipse is incorrect because latus rectum formulas depend on the conic. For an ellipse, use 2b2a\frac{2b^2}{a}.

  • Taking cc as the distance from the focus to the vertex is wrong. Here cc is the distance from the centre to the focus, so c=31=2c=|3-1|=2.

  • Using b2=a2+c2b^2=a^2+c^2 is incorrect for an ellipse; that relation is for a hyperbola. For an ellipse, use c2=a2b2c^2=a^2-b^2, so b2=a2c2b^2=a^2-c^2.

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