Cho sin ( α ) = 1 √ 3 với 0 < α < π 2 . Tính giá trị của sin ( α + π 3 )
Ta có\[\sin \left( \alpha \right) = \frac{1}{{\sqrt 3 }}\], \[{\rm{si}}{{\rm{n}}^{\rm{2}}}\left( {\rm{\alpha }} \right){\rm{ + co}}{{\rm{s}}^{\rm{2}}}\left( {\rm{\alpha }} \right){\rm{ = 1}} \Rightarrow {\rm{co}}{{\rm{s}}^{\rm{2}}}\left( {\rm{\alpha }} \right){\rm{ = 1}} - \frac{{\rm{1}}}{{\rm{3}}}{\rm{ = }}\frac{{\rm{2}}}{{\rm{3}}}\]
Vì \(0 < \alpha < \frac{\pi }{2}\)nên \[\cos \left( \alpha \right) > 0 \Rightarrow \cos \left( \alpha \right) = \sqrt {\frac{2}{3}} \]</>
\[ \Rightarrow {\rm{sin}}\left( {{\rm{\alpha + }}\frac{{\rm{\pi }}}{{\rm{3}}}} \right){\rm{ = sin}}\left( {\rm{\alpha }} \right){\rm{cos}}\left( {\frac{{\rm{\pi }}}{{\rm{3}}}} \right){\rm{ + cos}}\left( {\rm{\alpha }} \right){\rm{sin}}\left( {\frac{{\rm{\pi }}}{{\rm{3}}}} \right){\rm{ = }}\frac{{\rm{1}}}{{\sqrt {\rm{3}} }}{\rm{.}}\frac{{\rm{1}}}{{\rm{2}}}{\rm{ + }}\sqrt {\frac{{\rm{2}}}{{\rm{3}}}} {\rm{.}}\frac{{\sqrt {\rm{3}} }}{{\rm{2}}}{\rm{ = }}\frac{{\sqrt {\rm{3}} }}{{\rm{6}}}{\rm{ + }}\frac{{\sqrt {\rm{2}} }}{{\rm{2}}}\]
Đáp án cần chọn là: D