JEE Advanced · Mathematics · 27. Definite Integration
Let \(f:[-1,2] \rightarrow[0, \infty)\) be a continuous function such that \(f(x)=f(1-x)\) for all \(x \in[-1,2]\). Let \(R_1=\int_{-1}^2 x f(x) d x\) and \(R_2\) be the area of the region bounded by \(y=f(x), x=-1, x=2\) and the \(X\)-axis. Then,
- A
\(R_1=2 R_2\)
- B
\(R_1=3 R_2\)
- C
\(2 R_1=R_2\)
- D
\(3 R_1=R_2\)
Answer & Solution
Correct Answer
(C)
\(2 R_1=R_2\)
Step-by-step Solution
Detailed explanation
Here, \(R_1=\int_{-1}^2 x f(x) d x\)
Using, \(\quad \int_a^b f(x) d x=\int_a^b f(a+b-x) d x\)
\[
\begin{aligned}
& R_1=\int_{-1}^2(1-x) f(1-x) d x, \\
\therefore \quad & \left.R_1=\int_{-1}^2(1-x) f(x) d x \quad \ldots(1-x)\right]
\end{aligned}
\]
Given, \(R_2\) is area bounded by
\[
\begin{aligned}
& f(x), x-1 \text { and } x=2 \\
\therefore & R_2=\int_{-1}^2 f(x) d x
\end{aligned}
\]
Adding Eqs. (i) and (ii), we get
\[
2 R_1=\int_{-1}^2 f(x) d x
\]
\(\therefore\) From Eqs. (iii) and (iv), we get
\[
2 R_1=R_2
\]
Using, \(\quad \int_a^b f(x) d x=\int_a^b f(a+b-x) d x\)
\[
\begin{aligned}
& R_1=\int_{-1}^2(1-x) f(1-x) d x, \\
\therefore \quad & \left.R_1=\int_{-1}^2(1-x) f(x) d x \quad \ldots(1-x)\right]
\end{aligned}
\]
Given, \(R_2\) is area bounded by
\[
\begin{aligned}
& f(x), x-1 \text { and } x=2 \\
\therefore & R_2=\int_{-1}^2 f(x) d x
\end{aligned}
\]
Adding Eqs. (i) and (ii), we get
\[
2 R_1=\int_{-1}^2 f(x) d x
\]
\(\therefore\) From Eqs. (iii) and (iv), we get
\[
2 R_1=R_2
\]
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