f(x)=ax³+bx²+cxf`(x)=3ax²+2bx+cx=0处的切线的斜率为-3f`(0)=c=-3f`(x)=3ax²+2bx-3x=±1处取得极值x1+x2=-2b/6a=0b=0x1*x2=-3/3a=-1a=1f`(x)=3x²-3f(x)=x³-3x