MHT CET · Maths · Trigonometric Equations
If \(3 \cos x \neq 2 \sin x\), then the general solution of \(\sin ^{2} x-\cos 2 x=2-\sin 2 x\) is
- A \(x=n \pi+\frac{\pi}{2}, \quad n \in Z\)
- B \(x=n\left(\frac{\pi}{2}\right)+\pi, \quad n \in Z\)
- C \(x=n\left(\frac{\pi}{2}\right)+\frac{\pi}{3}, \quad n \in Z\)
- D \(x=(2 n+1) \pi, \quad n \in Z\)
Answer & Solution
Correct Answer
(A) \(x=n \pi+\frac{\pi}{2}, \quad n \in Z\)
Step-by-step Solution
Detailed explanation
Given \(\sin ^{2} x-\cos 2 x=2-\sin 2 x\)
\(\therefore \sin ^{2} x-1+2 \sin ^{2} x=2-\sin 2 x \quad \ldots\left[\because \cos 2 \theta=1-2 \sin ^{2} \theta\right]\)
\(3 \sin ^{2} x \quad=3-\sin 2 x \Rightarrow \sin 2 x=3\left(1-\sin ^{2} x\right)\)
\(2 \sin x \cos x=3 \cos ^{2} x \Rightarrow \cos x(3 \cos x-2 \sin x)=0\)
\(\therefore \cos x=0\) or \(3 \cos x=2 \sin x\)
But \(3 \cos x \neq 2 \sin x\) as per condition given
\(\therefore \cos \mathrm{x}=0 \Rightarrow \mathrm{x}=\mathrm{n} \pi+\frac{\pi}{2}, \mathrm{n} \in \mathrm{Z}\)
\(\therefore \sin ^{2} x-1+2 \sin ^{2} x=2-\sin 2 x \quad \ldots\left[\because \cos 2 \theta=1-2 \sin ^{2} \theta\right]\)
\(3 \sin ^{2} x \quad=3-\sin 2 x \Rightarrow \sin 2 x=3\left(1-\sin ^{2} x\right)\)
\(2 \sin x \cos x=3 \cos ^{2} x \Rightarrow \cos x(3 \cos x-2 \sin x)=0\)
\(\therefore \cos x=0\) or \(3 \cos x=2 \sin x\)
But \(3 \cos x \neq 2 \sin x\) as per condition given
\(\therefore \cos \mathrm{x}=0 \Rightarrow \mathrm{x}=\mathrm{n} \pi+\frac{\pi}{2}, \mathrm{n} \in \mathrm{Z}\)
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