Nếu tam giác \[MNP\] vuông tại \[M\] có \[NP = 7,\,\,\sin P = \frac{2}{9}\] thì \[MN\] bằng          

Đáp án: 1

Với \(0^\circ < \alpha < 70^\circ \), ta có: \[90^\circ - \left( {70^\circ - \alpha } \right) = \alpha + 20^\circ ;\,\,\,90^\circ - \left( {80^\circ - \alpha } \right) = \alpha + 10^\circ .\]

Do đó:

\[A = \tan \alpha \cdot \tan \left( {\alpha + 10^\circ } \right) \cdot \tan \left( {\alpha + 20^\circ } \right) \cdot \tan \left( {70^\circ - \alpha } \right) \cdot \tan \left( {80^\circ - \alpha } \right) \cdot \tan \left( {90^\circ - \alpha } \right)\]

\[\,\,\,\,\, = \tan \alpha \cdot \tan \left( {\alpha + 10^\circ } \right) \cdot \tan \left( {\alpha + 20^\circ } \right) \cdot \cot \left( {\alpha + 20^\circ } \right) \cdot \cot \left( {\alpha + 10^\circ } \right) \cdot \cot \alpha \]

\[\,\,\,\,\, = \left( {\tan \alpha \cdot \cot \alpha } \right) \cdot \left[ {\tan \left( {\alpha + 10^\circ } \right) \cdot \cot \left( {\alpha + 10^\circ } \right)} \right] \cdot \left[ {\tan \left( {\alpha + 20^\circ } \right) \cdot \cot \left( {\alpha + 20^\circ } \right)} \right]\]

\[\,\,\,\,\, = 1 \cdot 1 \cdot 1 = 1.\]

Đáp án: −4

Ta có: \(\frac{{{{\left( {\cos \alpha - \sin \alpha } \right)}^2} - {{\left( {\cos \alpha + \sin \alpha } \right)}^2}}}{{\cos \alpha .\sin \alpha }}\)

      \( = \frac{{\left( {\cos \alpha - \sin \alpha + \cos \alpha + \sin \alpha } \right)\left( {\cos \alpha - \sin \alpha - \cos \alpha - \sin \alpha } \right)}}{{\cos \alpha .\sin \alpha }}\)

      \( = \frac{{2\cos \alpha .\left( { - 2\sin \alpha } \right)}}{{\cos \alpha .\sin \alpha }}\)

      \( = \frac{{ - 4\cos \alpha .\sin \alpha }}{{\cos \alpha .\sin \alpha }} = - 4\).

Vậy \[a = - 4\].