AP EAMCET · Maths · Indefinite Integration
Evaluate \(\int \sin (\sqrt{k}) d k\) on \((0, \infty)\)
- A \(2[\cos (\sqrt{k})-\sqrt{k} \sin (\sqrt{k})]+c\)
- B \(2[\cos (\sqrt{k})+\sqrt{k} \sin (\sqrt{k})]+c\)
- C \(2[\sqrt{k} \cos (\sqrt{k})-\sqrt{k} \sin (\sqrt{k})]+c\)
- D \(2[\sin (\sqrt{k})-\sqrt{k} \cos (\sqrt{k})]+c\)
Answer & Solution
Correct Answer
(D) \(2[\sin (\sqrt{k})-\sqrt{k} \cos (\sqrt{k})]+c\)
Step-by-step Solution
Detailed explanation
\(I=\int \sin (\sqrt{k}) d k\) on \(k \in(0, \infty)\) Put \(k=t^2 \Rightarrow d k=2 t d t\) \(\begin{aligned} \therefore \quad I & =2 \int t \sin t d t \\ & =-2 t \cos t-2 \int 1.(-\cos t) d t \quad \text{(Integration by parts)} \end{aligned}\)…
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