AP EAMCET · Maths · Indefinite Integration
If \(I=\int_{-a}^a\left(x^4-2 x^2\right) d x\), then \(I\) is minimum at \(a=\)
- A 2
- B \(-\sqrt{2}\)
- C \(\sqrt{2}\)
- D -2
Answer & Solution
Correct Answer
(C) \(\sqrt{2}\)
Step-by-step Solution
Detailed explanation
\[ \begin{aligned} & \text { } I=\int_{-a}^a\left(x^4-2 x^2\right) d x \\ & \frac{d I}{d a}=\frac{d}{d a}\left[\int_{-a}^a\left(x^4-2 x^2\right) d x\right] \\ & =2 a^4-4 a^2 \\ & \text { and } \frac{d^2 I}{d a^2}=8 a^3-8 a \end{aligned} \] For minima, \(\frac{d I}{d \alpha}=0\)…
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