Tìm a, b để hàm số f ( x ) { a x 2 + b x + 1 k h i x ≥ 0 a sin x + b cos x k h i x < 0 có đạo hàm tại điểm x0 = 0
Để hàm số có đạo hàm tại x = 1 thì trước hết hàm số phải liên tục tại x = 1.
Ta có: f(0) = 1
\[\mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} {\rm{f}}\left( {\rm{x}} \right) = \mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} \left( {{\rm{a}}{{\rm{x}}^{\rm{2}}}{\rm{ + bx + 1}}} \right){\rm{ = 1 = f}}\left( {\rm{0}} \right)\]
\[\mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} {\rm{f}}\left( {\rm{x}} \right) = \mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} \left( {asinx + bcosx} \right) = b\]
Để hàm số liên tục tại x = 1 thì \[\mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} {\rm{f}}\left( {\rm{x}} \right) = \mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} {\rm{f}}\left( {\rm{x}} \right){\rm{ = f}}\left( {\rm{0}} \right) \Leftrightarrow {\rm{b}} = 1\]
Khi đó ta có: \[{\rm{f'}}\left( 0 \right) = \mathop {\lim }\limits_{{\rm{x}} \to 0} \frac{{{\rm{f}}\left( {\rm{x}} \right) - {\rm{f}}\left( 0 \right)}}{{{\rm{x}} - 0}}\]
\[\mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} \frac{{{\rm{f}}\left( {\rm{x}} \right) - {\rm{f}}\left( {\rm{0}} \right)}}{{{\rm{x}} - {\rm{0}}}} = \mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} \frac{{{\rm{a}}{{\rm{x}}^{\rm{2}}}{\rm{ + x + 1}} - {\rm{1}}}}{{\rm{x}}} = \mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} \left( {{\rm{ax + 1}}} \right) = 1\]
\[\mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} \frac{{{\rm{f}}\left( {\rm{x}} \right) - {\rm{f}}\left( {\rm{0}} \right)}}{{{\rm{x}} - {\rm{0}}}} = \mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} \frac{{{\rm{asinx + cosx}} - {\rm{1}}}}{{\rm{x}}}\]
\[ = \mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} \frac{{{\rm{2asin}}\frac{{\rm{x}}}{{\rm{2}}}{\rm{cos}}\frac{{\rm{x}}}{{\rm{2}}} - {\rm{2si}}{{\rm{n}}^{\rm{2}}}\frac{{\rm{x}}}{{\rm{2}}}}}{{\rm{x}}}\]
\[ = \mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} \frac{{\sin \frac{{\rm{x}}}{2}}}{{\frac{{\rm{x}}}{2}}}\mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} \left( {{\rm{acos}}\frac{{\rm{x}}}{{\rm{2}}} - {\rm{2sin}}\frac{{\rm{x}}}{{\rm{2}}}} \right) = {\rm{a}}\]
Để tồn tại \[{\rm{f'}}\left( 0 \right) \Leftrightarrow \mathop {\lim }\limits_{{\rm{x}} \to {0^ + }} \frac{{{\rm{f}}\left( {\rm{x}} \right) - {\rm{f}}\left( {\rm{0}} \right)}}{{{\rm{x}} - {\rm{0}}}} = \mathop {\lim }\limits_{{\rm{x}} \to {0^ - }} \frac{{{\rm{f}}\left( {\rm{x}} \right) - {\rm{f}}\left( {\rm{0}} \right)}}{{{\rm{x}} - {\rm{0}}}} \Leftrightarrow {\rm{a}} = 1.\]
Đáp án cần chọn là: A