Giải câu 7 bài Ôn tập chương 6 sgk Đại số 10 trang 156

a. \({{1 - \cos x + \cos 2x} \over {\sin 2x - {\mathop{\rm s}\nolimits} {\rm{in x}}}} \)

\(= {{1 + \cos 2x - \cos x} \over {2\sin x\cos x - {\mathop{\rm sinx}\nolimits} }} \)

\(= {{\cos x(2\cos x - 1)} \over {{\mathop{\rm s}\nolimits} {\rm{inx}}(2\cos x - 1)}} \)

\(= \cot x\)(đpcm)

b. \( {{{\mathop{\rm sinx}\nolimits} + sin{x \over 2}} \over {1 + \cos x + \cos {x \over 2}}}\)

\(= {{2\sin {x \over 2}\cos {x \over 2} + \sin {x \over 2}} \over {2{{\cos }^2}{x \over 2} + \cos {x \over 2}}}\)

\(= {{\sin {x \over 2}(2\cos {x \over 2} + 1)} \over {\cos {x \over 2}(2\cos {x \over 2} + 1)}}\)

\(=\tan {x \over 2} \)(đpcm)

c. \({{2\cos 2x - \sin 4x} \over {2\cos 2x + \sin 4x}}\)

\(= {{2\cos 2x - 2\sin2 x\cos 2x} \over {2\cos 2x + 2\sin 2x\cos 2x}}\)

\(=\frac{2cos\,2x(1-sin\,2x)}{2cos\,2x(1+sin\,2x)}\)

\(= {{1 - \sin 2x} \over {1 + \sin 2x}}\)

\(= {{1 - \cos \left ( {\pi \over 2} - 2x \right )} \over {1 + \cos \left ( {\pi \over 2} - 2x \right )}}\)

\(= {{2{{\sin }^2}\left ( {\pi \over 4} - x \right )} \over {2{{\cos }^2}\left ( {\pi \over 4} - x \right )}}\) 

\(= {\tan ^2}\left ( {\pi \over 4} - x \right ) \)(đpcm)

d. \(\tan x - \tan y\)

\(= {{{\mathop{\rm sinx}\nolimits} } \over {{\mathop{\rm cosx}\nolimits} }} - {{\sin y} \over {\cos y}}\)

\(= {{\sin {\rm{x}}\cos y - \cos x\sin y} \over {\cos x\cos y}}\)

\(= {{\sin (x - y)} \over {\cos x\cos y}}\)(đpcm)