求f(x)=x^(2/3)e^(-x)的极值 高二导数:已知f(x)=(x^2-3x+3)e^x,求f'(...
f(x)=(x-2)x^(2/3) \u6c42f(x)\u7684\u6781\u503c
\u8bf7
f(x) = (x²-3x+3)e^x
f\u2032(x) = (2x-3)e^x+(x²-3x+3)e^x = (x²-x)e^x = x(x-1)e^x
\u589e\u533a\u95f4\uff1a\uff08-\u65e0\u7a77\u5927\uff0c0\uff09\uff0c\uff081\uff0c+\u65e0\u7a77\u5927\uff09
\u51cf\u533a\u95f4\uff1a\uff080\uff0c1)
x=0\u65f6\uff0c\u6781\u5927\u503cf(0)=(0-0+3)e^0 = 3
x=1\u65f6\uff0c\u6781\u5c0f\u503cf(1)=(1-3+3)e^1 = e
由:³√(x²) ≥ 0 ; e^(-x) > 0
∴ f(x) = ³√(x²) * e^(-x) ≥ f(0) = 0
即:x = 0 为函数的极小值点 , f(0)为函数的【极小值(最小值)】。
对 x ≠ 0 ,令:
f'(x) = [2/3*x^(-1/3) - x^(2/3)]*e^(-x) = 0
即: 2/3*x^(-1/3) - x^(2/3) = 0
解得唯一驻点: x = 2/3
又:
f'(x) = [2/3 - x]*e^(-x)*x^(-1/3)
由: 0<x<2/3 , f'(x)>0;
2/3<x , f'(x)<0
即得 f(x) 在 x=2/3 取得【极大值 f(2/3)】 。
你那e^(-x)是跟2/3一起在x的指数上啊 还是跟x是相乘的关系啊
如果是指数 就这么做
设y=x^(2/3)e^(-x) 等号两边以x为底取对数 然后再在等号两边一起求导
即y'/y=-(2/3)e^(-x)ln(2/3)e^(-x) 所以y'=-(2/3)e^(-2x)ln(2/3)y 吧y带进去就行了
如果是相乘就好办了 按照积的求导公式就成
f'(x)=[x^(2/3)]'e^(-x)+x^(2/3)[e^(-x)]'
=(2/3)x^(-1/3)'e^(-x)-x^(2/3)e^(-x)
=[(2/3)x^(-1/3)-x^(2/3)]e^(-x)
哎呦 好累啊
解答:
求一阶导数为:2/3*x^(-1/3)*e^(-x)-x^(2/3)*e^(-x)
令一阶导数为0,解得:x=2/3
讨论一阶导数在x=2/3两侧的正负号
在左侧,一阶导数大于0,在右侧一阶导数小于0,所以:x=2/3为极大值点
代入,求得极大值为:(2/3)^(2/3)*e^(-2/3)
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