【考研数学】设f(x)可导,F(x)=f(x)(1+|sin x|)则f(0)=0是F(x)在x=0处可导的( )条件
如题,A.充要B.充分非必要C.必要非充分D.非充分非必要求高手!!!~要详细的解答过程啊,一定要有步骤啊,我知道选什么,谢谢啦!!!~...
如题,A. 充要 B. 充分非必要 C. 必要非充分 D. 非充分非必要
求高手!!!~要详细的解答过程啊,一定要有步骤啊,我知道选什么,谢谢啦!!!~ 展开
求高手!!!~要详细的解答过程啊,一定要有步骤啊,我知道选什么,谢谢啦!!!~ 展开
2个回答
2011-08-22
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用导数的定义
当x趋向于正零时,F(x)在0处的导为:
lim (F(x)-F(0)) / x = lim (f(x) + f(x)sinx - f(0)) / x = lim (f(x) - f(0)) / x + lim f(x)sinx / x = f'(0) + f(0)
当x趋向于负零时,F(x)在0处的导为:
lim (F(x)-F(0)) / x = lim (f(x) - f(x)sinx - f(0)) / x = lim (f(x) - f(0)) / x - lim f(x)sinx / x = f'(0) - f(0)
F(x)在0处可导,则f'(0) + f(0) = f'(0) - f(0),f(0) = 0
当x趋向于正零时,F(x)在0处的导为:
lim (F(x)-F(0)) / x = lim (f(x) + f(x)sinx - f(0)) / x = lim (f(x) - f(0)) / x + lim f(x)sinx / x = f'(0) + f(0)
当x趋向于负零时,F(x)在0处的导为:
lim (F(x)-F(0)) / x = lim (f(x) - f(x)sinx - f(0)) / x = lim (f(x) - f(0)) / x - lim f(x)sinx / x = f'(0) - f(0)
F(x)在0处可导,则f'(0) + f(0) = f'(0) - f(0),f(0) = 0
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