作业帮f(x)在x=0的领域内有二阶导数,又x→0时lim((sinx+xf(x))\x3)=0,求f(0),f'(0),f'
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f(x)在x=0的领域内有二阶导数,又x→0时lim((sinx+xf(x))\x3)=0,求f(0),f'(0),f''(0)
sinx=x+(1/3!)x³+0(x³)
f(x)=f(0)+f′(0)x+f″(0)x²+0(x³)
xf(x)=f(0)x+f′(0)x²+f″(0)x³+0(x³)
sinx+xf(x)=(1+f(0))x+f′(0)x²+[(1/3!)+f″(0)]x³+0(x³)
lim((sinx+xf(x))\x3)=0,
1+f(0)=0 f′(0)=0 (1/3!)+f″(0)=0
f(0)=-1 f′(0)=0 f″(0)=-(1/3!)
再问: f(x)和sinx的麦克劳林公式写错了 f(x)=f(0) f′(0)x (f″(0)/2)x² 0(x³) sinx=x-(1/3!)x^3 还有为什么1 f(0)=0 f′(0)=0 (1/3!) f″(0)=0 答案是f(0)=-1 f′(0)=0 f″(0)=1/3
f(x)=f(0)+f′(0)x+f″(0)x²+0(x³)
xf(x)=f(0)x+f′(0)x²+f″(0)x³+0(x³)
sinx+xf(x)=(1+f(0))x+f′(0)x²+[(1/3!)+f″(0)]x³+0(x³)
lim((sinx+xf(x))\x3)=0,
1+f(0)=0 f′(0)=0 (1/3!)+f″(0)=0
f(0)=-1 f′(0)=0 f″(0)=-(1/3!)
再问: f(x)和sinx的麦克劳林公式写错了 f(x)=f(0) f′(0)x (f″(0)/2)x² 0(x³) sinx=x-(1/3!)x^3 还有为什么1 f(0)=0 f′(0)=0 (1/3!) f″(0)=0 答案是f(0)=-1 f′(0)=0 f″(0)=1/3
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