设函数y=y(x)y = y(x)y=y(x)由{x=2t−1y=t2+2\begin{cases}x = 2t - 1 \\ y = t^2 + 2\end{cases}{x=2t−1y=t2+2所确定,则dydx=\dfrac{dy}{dx}=dxdy=( ).
(A)2t
(B)t
(C)2
(D)t2t^2t2
已知曲线y=f(x)y = f(x)y=f(x)在点(2,−1)(2, -1)(2,−1)处的法线斜率为1,则f′(2)=f'(2)=f′(2)=( ).
(A)-1
(B)2
(C)1
(D)12\dfrac{1}{2}21
已知I1=∫01xdxI_1=\int_{0}^{1}x dxI1=∫01xdx,I2=∫01x3dxI_2=\int_{0}^{1}x^3 dxI2=∫01x3dx,则( ).
(A)I1>I2I_1 > I_2I1>I2
(B)I1<I2I_1 < I_2I1<I2
(C)I1=I2I_1 = I_2I1=I2
(D)I1I_1I1与I2I_2I2的大小关系无法判断
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