MCQMediumJEE 2026Applications of Integrals (Area)

JEE Mathematics 2026 Question with Solution

The area of the region, inside the ellipse x2+4y2=4x^2+4y^2=4 and outside the region bounded by the curves y=x1y=x-1 and y=1xy=1-x, is:

  • A

    2π12\pi-1

  • B

    3(π1)3(\pi-1)

  • C

    2(π1)2(\pi-1)

  • D

    2π122\pi - \frac{1}{2}

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: The ellipse is x2+4y2=4x^2+4y^2=4 and the answer must correspond to the area inside the ellipse and outside the excluded region.

Find: The required area.

From the solution working, the wording about the region bounded by y=x1y=x-1 and y=1xy=1-x is treated as ambiguous. The solution interprets the excluded region as the rhombus bounded by the four lines y=x1y=x-1, y=1xy=1-x, y=x1y=-x-1, and y=x+1y=x+1, whose equation is x+y=1|x|+|y|=1.

First, write the ellipse in standard form:

x24+y2=1\frac{x^2}{4}+y^2=1

So, its semi-axes are a=2a=2 and b=1b=1. Therefore, the area of the ellipse is

Aellipse=πab=π(2)(1)=2πA_{\text{ellipse}}=\pi ab=\pi(2)(1)=2\pi

Now consider the excluded rhombus with vertices (1,0),(0,1),(1,0),(0,1)(1,0), (0,1), (-1,0), (0,-1). Its diagonals are

d1=2,d2=2d_1=2, \qquad d_2=2

Hence its area is

Arhombus=12d1d2=12(2)(2)=2A_{\text{rhombus}}=\frac{1}{2}d_1 d_2=\frac{1}{2}(2)(2)=2

Therefore, the required area is

Arequired=AellipseArhombus=2π2=2(π1)A_{\text{required}}=A_{\text{ellipse}}-A_{\text{rhombus}}=2\pi-2=2(\pi-1)

Therefore, the correct option is C.

Explanation of the Intended Interpretation

Given: the solution itself notes that the statement about the region bounded by the two lines is ambiguous.

Find: The interpretation used to match the answer.

The solution explicitly says the answer choices suggest a result of the form area of ellipse minus a simple geometric area. Since the ellipse has area 2π2\pi and the accepted answer is 2π22\pi-2, the excluded area must be 22.

A natural region of area 22 formed by the relevant family of lines is the rhombus x+y=1|x|+|y|=1. This rhombus has diagonals both equal to 22, so its area is 22. Subtracting this from the ellipse area gives 2(π1)2(\pi-1).

The solution also notes a discrepancy in wording: only two lines are named in the question text, while the interpreted bounded region actually uses four lines. Nevertheless, the solution concludes that this is the intended reading and selects option C.

Common mistakes

  • Interpreting the two lines y=x1y=x-1 and y=1xy=1-x alone as a closed bounded region. Two intersecting lines by themselves do not enclose a finite area here, so the interpretation must be checked against the solution working.

  • Using the ellipse area formula incorrectly by taking a=4a=4 and b=1b=1 from x2+4y2=4x^2+4y^2=4. First convert to standard form x24+y2=1\frac{x^2}{4}+y^2=1, then use a=2a=2 and b=1b=1.

  • Computing the rhombus area as side squared or as d1d2d_1 d_2 without the factor 12\frac{1}{2}. For a rhombus, the correct formula is 12d1d2\frac{1}{2}d_1 d_2.

Practice more Applications of Integrals (Area) questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.

Related questions