MHT CET · Maths · Trigonometric Equations
If for certain \(x, 3 \cos x \neq 2 \sin x\), then the general solution of, \(\sin ^2 x-\cos 2 x=2-\sin 2 x\), is
- A \((2 \mathrm{n}+1) \frac{\pi}{2}, \mathrm{n} \in \mathbb{Z}\)
- B \((2 \mathrm{n}+1) \frac{\pi}{4}, \mathrm{n} \in \mathbb{Z}\)
- C \(\mathrm{n} \pi+(-1)^{\mathrm{n}} \frac{\pi}{3}, \mathrm{n} \in \mathbb{Z}\)
- D \(\frac{n \pi}{2}+1, n \in \mathbb{Z}\)
Answer & Solution
Correct Answer
(A) \((2 \mathrm{n}+1) \frac{\pi}{2}, \mathrm{n} \in \mathbb{Z}\)
Step-by-step Solution
Detailed explanation
Given,
\(\begin{aligned}
& \sin ^2 x-\cos 2 x=2-\sin 2 x \\
& \Rightarrow 1-\cos ^2 x-\left(2 \cos ^2 x-1\right)-2+\sin 2 x=0 \\
& \Rightarrow 1-3 \cos ^2 x+1-2+2 \sin x \cdot \cos x \\
& \Rightarrow \cos x(2 \sin x-3 \cos x)=0 \\
& \Rightarrow \cos x=0 \text { or } 2 \sin x-3 \cos x=0
\end{aligned}\)
But \(2 \sin x \neq 3 \cos x\)
...[Given]
\(\begin{aligned}
& \Rightarrow \cos x=0 \\
& \Rightarrow x=(2 \mathrm{n}+1) \frac{\pi}{2}, \mathrm{n} \in \mathrm{Z}
\end{aligned}\)
\(\begin{aligned}
& \sin ^2 x-\cos 2 x=2-\sin 2 x \\
& \Rightarrow 1-\cos ^2 x-\left(2 \cos ^2 x-1\right)-2+\sin 2 x=0 \\
& \Rightarrow 1-3 \cos ^2 x+1-2+2 \sin x \cdot \cos x \\
& \Rightarrow \cos x(2 \sin x-3 \cos x)=0 \\
& \Rightarrow \cos x=0 \text { or } 2 \sin x-3 \cos x=0
\end{aligned}\)
But \(2 \sin x \neq 3 \cos x\)
...[Given]
\(\begin{aligned}
& \Rightarrow \cos x=0 \\
& \Rightarrow x=(2 \mathrm{n}+1) \frac{\pi}{2}, \mathrm{n} \in \mathrm{Z}
\end{aligned}\)
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