Đề bài
Giải phương trình:
a) \(\sin \left( {2x - \frac{\pi }{6}} \right) = - \frac{1}{2}\)
b) \(\sin \left( {\frac{x}{3} + \frac{\pi }{2}} \right) = \frac{{\sqrt 3 }}{2}\)
c) \(\cos \left( {2x + \frac{\pi }{5}} \right) = \frac{{\sqrt 2 }}{2}\)
d) \(2\cos \frac{x}{2} + \sqrt 3 = 0\)
e) \(\sqrt 3 \tan \left( {2x + \frac{\pi }{3}} \right) - 1 = 0\)
g) \(\cot \left( {3x + \pi } \right) = - 1\)
Phương pháp giải - Xem chi tiết
Sử dụng các kết quả sau:
- \(\sin x = \sin \alpha \Leftrightarrow \left[ \begin{array}{l}x = \alpha + k2\pi \\x = \pi - \alpha + k2\pi \end{array} \right.\)\(\left( {k \in \mathbb{Z}} \right)\)
- \(\cos x = \cos \alpha \Leftrightarrow \left[ \begin{array}{l}x = \alpha + k2\pi \\x = - \alpha + k2\pi \end{array} \right.\)\(\left( {k \in \mathbb{Z}} \right)\)
- \(\tan x = \tan \alpha \Leftrightarrow x = \alpha + k\pi \)\(\left( {k \in \mathbb{Z}} \right)\)
- \(\cot x = \cot \alpha \Leftrightarrow x = \alpha + k\pi \)\(\left( {k \in \mathbb{Z}} \right)\)
Lời giải chi tiết
a) Ta có \(\sin \left( { - \frac{\pi }{6}} \right) = - \frac{1}{2}\), phương trình trở thành:
\(\sin \left( {2x - \frac{\pi }{6}} \right) = \sin \left( { - \frac{\pi }{6}} \right) \Leftrightarrow \left[ \begin{array}{l}2x - \frac{\pi }{6} = - \frac{\pi }{6} + k2\pi \\2x - \frac{\pi }{6} = \pi + \frac{\pi }{6} + k2\pi \end{array} \right. \Leftrightarrow \left[ \begin{array}{l}2x = k2\pi \\2x = \frac{{4\pi }}{3} + k2\pi \end{array} \right. \Leftrightarrow \left[ \begin{array}{l}x = k\pi \\x = \frac{{2\pi }}{3} + k\pi \end{array} \right.\left( {k \in \mathbb{Z}} \right)\)
b) Ta có \(\sin \frac{\pi }{3} = \frac{{\sqrt 3 }}{2}\), phương trình trở thành:
\(\sin \left( {\frac{x}{3} + \frac{\pi }{2}} \right) = \sin \frac{\pi }{3} \Leftrightarrow \left[ \begin{array}{l} + \frac{\pi }{2} = \frac{\pi }{3} + k2\pi \\\frac{x}{3} + \frac{\pi }{2} = \pi - \frac{\pi }{3} + k2\pi \end{array} \right. \Leftrightarrow \left[ \begin{array}{l}\frac{x}{3} = - \frac{\pi }{6} + k2\pi \\\frac{x}{3} = \frac{\pi }{6} + k2\pi \end{array} \right. \Leftrightarrow \left[ \begin{array}{l}x = - \frac{\pi }{2} + k6\pi \\x = \frac{\pi }{2} + k6\pi \end{array} \right.\left( {k \in \mathbb{Z}} \right)\)
c) Ta có \(\cos \frac{\pi }{4} = \frac{{\sqrt 2 }}{2}\), phương trình trở thành:
\(\cos \left( {2x + \frac{\pi }{5}} \right) = \cos \frac{\pi }{4} \Leftrightarrow \left[ \begin{array}{l}2x + \frac{\pi }{5} = \frac{\pi }{4} + k2\pi \\2x + \frac{\pi }{5} = - \frac{\pi }{4} + k2\pi \end{array} \right. \Leftrightarrow \left[ \begin{array}{l}2x = \frac{\pi }{{20}} + k2\pi \\2x = - \frac{{9\pi }}{{20}} + k2\pi \end{array} \right.\left[ \begin{array}{l}x = \frac{\pi }{{40}} + k\pi \\x = - \frac{{9\pi }}{{40}} + k\pi \end{array} \right.\left( {k \in \mathbb{Z}} \right)\)
d) \(2\cos \frac{x}{2} + \sqrt 3 = 0 \Leftrightarrow \cos \frac{x}{2} = - \frac{{\sqrt 3 }}{2}\)
Ta có \(\cos \frac{{5\pi }}{6} = - \frac{{\sqrt 3 }}{2}\), phương trình trở thành:
\(\cos \frac{x}{2} = \cos \frac{{5\pi }}{6} \Leftrightarrow \left[ \begin{array}{l}\frac{x}{2} = \frac{{5\pi }}{6} + k2\pi \\\frac{x}{2} = - \frac{{5\pi }}{6} + k2\pi \end{array} \right. \Leftrightarrow \left[ \begin{array}{l}x = \frac{{5\pi }}{3} + k4\pi \\x = - \frac{{5\pi }}{3} + k4\pi \end{array} \right.\left( {k \in \mathbb{Z}} \right)\)
e) \(\sqrt 3 \tan \left( {2x + \frac{\pi }{3}} \right) - 1 = 0 \Leftrightarrow \tan \left( {2x + \frac{\pi }{3}} \right) = \frac{1}{{\sqrt 3 }}\)
Ta có \(\tan \frac{\pi }{6} = \frac{1}{{\sqrt 3 }}\), phương trình trở thành:
\(\tan \left( {2x + \frac{\pi }{3}} \right) = \tan \frac{\pi }{6} \Leftrightarrow 2x + \frac{\pi }{3} = \frac{\pi }{6} + k\pi \Leftrightarrow 2x = - \frac{\pi }{6} + k\pi \Leftrightarrow x = - \frac{\pi }{2} + k\frac{\pi }{2}\left( {k \in \mathbb{Z}} \right)\)
f) Ta có \(\cot \left( { - \frac{\pi }{4}} \right) = - 1\), phương trình trở thành:
\(\cot \left( {3x + \pi } \right) = \cot \frac{{ - \pi }}{4} \Leftrightarrow 3x + \pi = \frac{{ - \pi }}{4} + k\pi \Leftrightarrow 3x = \frac{{ - \pi }}{4} + k\pi \Leftrightarrow x = \frac{{ - \pi }}{{12}} + k\frac{\pi }{3}\left( {k \in \mathbb{Z}} \right)\)
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