三阶麦克劳林公式可以写成:
f(x)=f(0)+f'(0)·x+f''(0)·x²/2!+f'''(0)·x³/3!+o(x³)
由f(x)=x²·sinx可得:
f(0)=0
f'(x)=x²·(sinx)'+(x²)'·sinx
=x²·cosx+2x·sinx
则:f'(0)=0
f''(x)=x²·(cosx)'+(x²)'·cosx+2x·(sinx)'+(2x)'·sinx
=x²·(-sinx)+2x·cosx+2x·cosx+2sinx
=-x²·sinx+4x·cosx+2sinx
则:f''(0)=2sin0=0
f'''(x)=-x²·(sinx)'-(x²)'·sinx+4x·(cosx)'+(4x)'·cosx+2cosx
=-x²·cosx-2x·sinx+4x·(-sinx)+4cosx+2cosx
=-x²·cosx-6x·sinx+6cosx
则:f'''(0)=6cos0=6
将f(0)、f'(0)、f''(0)、f'''(0)均代入三阶麦克劳林公式,可得:
x²sinx=0+0+0+6x³/3!+o(x³)=x³+o(x³)