问题
选择题
曲线y=x3-2x在点(1,-1)处的切线方程是( )
A.x-y-2=0
B.x-y+2=0
C.x+y+2=0
D.x+y-2=0
答案
由题意得,y′=3x2-2,
∴在点(1,-1)处的切线斜率是1,
∴在点(1,-1)处的切线方程是:y+1=x-1,即x-y-2=0,
故选A.
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曲线y=x3-2x在点(1,-1)处的切线方程是( )
A.x-y-2=0
B.x-y+2=0
C.x+y+2=0
D.x+y-2=0
由题意得,y′=3x2-2,
∴在点(1,-1)处的切线斜率是1,
∴在点(1,-1)处的切线方程是:y+1=x-1,即x-y-2=0,
故选A.