MHT CET · Maths · Indefinite Integration
\(\int \cos \sqrt{x} \mathrm{~d} x=\)
(where \(C\) is a constant of integration.)
- A \(2[\sqrt{x} \sin \sqrt{x}+\cos \sqrt{x}]+C\)
- B \([\sqrt{x} \sin \sqrt{x}-\cos \sqrt{x}]+C\)
- C \(2[\sqrt{x} \sin \sqrt{x}-\cos \sqrt{x}]+C\)
- D \([\sqrt{x} \sin \sqrt{x}+\cos \sqrt{x}]+C\)
Answer & Solution
Correct Answer
(A) \(2[\sqrt{x} \sin \sqrt{x}+\cos \sqrt{x}]+C\)
Step-by-step Solution
Detailed explanation
\(\int \cos \sqrt{x} d x\) let \(\sqrt{x}=t\) i.e. \(\mathrm{d} x=2 t \mathrm{~d} t\)
\(=2 \int t \cos t \mathrm{~d} t=2\left[t \sin t-\int \sin t \mathrm{~d} t\right]\) [integrating by parts]
\(=2[t \cdot \sin t+\cos t]+C=2[\sqrt{x} \sin \sqrt{x}+\cos \sqrt{x}]+C\)
\(=2 \int t \cos t \mathrm{~d} t=2\left[t \sin t-\int \sin t \mathrm{~d} t\right]\) [integrating by parts]
\(=2[t \cdot \sin t+\cos t]+C=2[\sqrt{x} \sin \sqrt{x}+\cos \sqrt{x}]+C\)
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