NVAMediumJEE 2024Applications of Integrals (Area)

JEE Mathematics 2024 Question with Solution

Let the area of the region {(x,y):0x3,0ymin(x2+2,2x+2)}\{(x, y) : 0 \le x \le 3, 0 \le y \le \min(x^2 + 2, 2x + 2)\} be AA. Then 12A12A is equal to:

Answer

Correct answer:164

Step-by-step solution

Standard Method

Given: The region is 0x30 \le x \le 3 and 0ymin(x2+2,2x+2)0 \le y \le \min(x^2 + 2, 2x + 2).

Find: The value of 12A12A, where AA is the area of the region.

The upper boundary is the smaller of the two curves y=x2+2y = x^2 + 2 and y=2x+2y = 2x + 2. Their intersection point is found from

x2+2=2x+2x^2 + 2 = 2x + 2

which gives

x22x=0x^2 - 2x = 0 x(x2)=0x(x-2)=0

So the relevant changeover point in the interval [0,3][0,3] is x=2x = 2.

Hence,

A=02(x2+2)dx+23(2x+2)dxA = \int_{0}^{2} (x^2 + 2) \, dx + \int_{2}^{3} (2x + 2) \, dx

Now evaluate each integral:

02(x2+2)dx=[x33+2x]02=83+4=203\int_{0}^{2} (x^2 + 2) \, dx = \left[ \frac{x^3}{3} + 2x \right]_0^2 = \frac{8}{3} + 4 = \frac{20}{3} 23(2x+2)dx=[x2+2x]23=(9+6)(4+4)=7\int_{2}^{3} (2x + 2) \, dx = \left[ x^2 + 2x \right]_2^3 = (9+6) - (4+4) = 7

Therefore,

A=203+7=413A = \frac{20}{3} + 7 = \frac{41}{3}

So,

12A=12×413=16412A = 12 \times \frac{41}{3} = 164

Therefore, the required value is 164164.

Check using the solution conclusion

The solution explicitly concludes that

A=413A = \frac{41}{3}

and therefore

12A=12×413=16412A = 12 \times \frac{41}{3} = 164

So the numerical value answer is 164164.

There is a discrepancy in the second approach shown in the working: it writes an incorrect intermediate integral limit, but its final conclusion still states 164164. The first approach is consistent and gives the correct result.

Common mistakes

  • Using the larger curve instead of the minimum function. Here the upper boundary is min(x2+2,2x+2)\min(x^2+2, 2x+2), so for each interval you must choose the smaller of the two curves, not the larger one.

  • Not splitting the integral at the intersection point. The active upper curve changes at x=2x=2, so integrating with one expression over the entire interval [0,3][0,3] gives the wrong area.

  • Solving x2+2=2x+2x^2 + 2 = 2x + 2 incorrectly. If the intersection point is found wrongly, the interval split is wrong; first reduce it to x22x=0x^2 - 2x = 0 and factor carefully.

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