Rút gọn biểu thức P = s i n ( − 23 4 0 ) − c o s 21 6 0 s i n 14 4 0 − c o s 12 6 0 . t a n 3 6 0
\[{\rm{P = }}\frac{{{\rm{sin}}\left( { - {\rm{23}}{{\rm{4}}^{\rm{0}}}} \right) - {\rm{cos21}}{{\rm{6}}^{\rm{0}}}}}{{{\rm{sin14}}{{\rm{4}}^{\rm{0}}} - {\rm{cos12}}{{\rm{6}}^{\rm{0}}}}}{\rm{.tan3}}{{\rm{6}}^{\rm{0}}} = \frac{{ - sin\left( {{{180}^0} + {{54}^0}} \right) - cos\left( {{{180}^0} + {{36}^0}} \right)}}{{sin\left( {{{180}^0} - {{36}^0}} \right) - cos\left( {{{90}^0} + {{36}^0}} \right)}}{\rm{.tan3}}{{\rm{6}}^{\rm{0}}}\]
\[ = \frac{{sin{{54}^0} + cos{{36}^0}}}{{sin{{36}^0} + sin{{36}^0}}}{\rm{.tan3}}{{\rm{6}}^{\rm{0}}} = \frac{{sin\left( {{{90}^0} - {{36}^0}} \right) + cos{{36}^0}}}{{sin{{36}^0} + sin{{36}^0}}}{\rm{.tan3}}{{\rm{6}}^{\rm{0}}}\]
\[ = \frac{{cos{{36}^0} + cos{{36}^0}}}{{sin{{36}^0} + sin{{36}^0}}}{\rm{.tan3}}{{\rm{6}}^{\rm{0}}} = 2\frac{{cos{{36}^0}}}{{sin{{36}^0}}}{\rm{.tan3}}{{\rm{6}}^{\rm{0}}} = 2\cot {36^0}{\rm{.tan3}}{{\rm{6}}^{\rm{0}}} = 2\]
Chọn đáp án B.
Đáp án cần chọn là: B