MCQMediumJEE 2023Properties of Definite Integrals

JEE Mathematics 2023 Question with Solution

Let f(x)f(x) be a function satisfying f(x)+f(πx)=π2f(x) + f(\pi - x) = \pi^2, for all xRx \in \mathbb{R}. Then 0πf(x)sinxdx\int_0^{\pi} f(x)\sin x \, dx is equal to:

  • A

    π22\frac{\pi^2}{2}

  • B

    π2\pi^2

  • C

    2π22\pi^2

  • D

    π24\frac{\pi^2}{4}

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: f(x)+f(πx)=π2f(x) + f(\pi - x) = \pi^2 for all xRx \in \mathbb{R}.

Find: I=0πf(x)sinxdxI = \int_0^{\pi} f(x)\sin x \, dx

Let

I=0πf(x)sinxdxI = \int_0^{\pi} f(x)\sin x \, dx

Using the symmetry transformation,

I=0πf(πx)sin(πx)dx=0πf(πx)sinxdxI = \int_0^{\pi} f(\pi - x)\sin(\pi - x) \, dx = \int_0^{\pi} f(\pi - x)\sin x \, dx

Adding the two expressions,

2I=0π(f(x)+f(πx))sinxdx2I = \int_0^{\pi} \left(f(x) + f(\pi - x)\right)\sin x \, dx

Now substitute f(x)+f(πx)=π2f(x) + f(\pi - x) = \pi^2:

2I=0ππ2sinxdx2I = \int_0^{\pi} \pi^2 \sin x \, dx

So,

2I=π20πsinxdx=π2×22I = \pi^2 \int_0^{\pi} \sin x \, dx = \pi^2 \times 2

Hence,

I=π2I = \pi^2

Therefore, the correct option is B, and the value of the integral is π2\pi^2.

Symmetry Trick

Given: f(x)+f(πx)=π2f(x) + f(\pi - x) = \pi^2.

Find: 0πf(x)sinxdx\int_0^{\pi} f(x)\sin x \, dx

Because sin(πx)=sinx\sin(\pi - x) = \sin x, the weight function remains unchanged under the transformation xπxx \mapsto \pi - x. So averaging the integral with its transformed form gives

I=120π(f(x)+f(πx))sinxdxI = \frac{1}{2}\int_0^{\pi} \left(f(x) + f(\pi - x)\right)\sin x \, dx

Now use the given relation:

I=120ππ2sinxdx=π222=π2I = \frac{1}{2}\int_0^{\pi} \pi^2 \sin x \, dx = \frac{\pi^2}{2} \cdot 2 = \pi^2

Therefore, the correct option is B.

Common mistakes

  • Using sin(πx)=sinx\sin(\pi - x) = -\sin x is incorrect. The correct identity is sin(πx)=sinx\sin(\pi - x) = \sin x. Always verify the trigonometric transformation before substituting.

  • Substituting f(πx)=π2f(\pi - x) = \pi^2 is wrong because the given relation is f(x)+f(πx)=π2f(x) + f(\pi - x) = \pi^2, not either term individually. Add the two integral forms first, then apply the condition.

  • Forgetting the factor of 22 after adding the two equal expressions for II leads to a wrong final answer. Once the two forms are added, the left side becomes 2I2I, not II.

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