设f(x)可导,且满足 lim _(xarrow 0)dfrac (f(1)-f(1-2x))(x)=-2, 则曲线 =f(x) 在点(1,f(1))处的切线斜率为.-|||-()-|||-

设 函数 f ( x ) 在 x = 1 处可导且lim _(xarrow 0)dfrac (f(1)-f(1-x))(2x)=1则 lim _(xarrow

设 函数 f ( x ) 在 x = 0 处可导，且lim _(xarrow 0)dfrac (f(2x)-f(0))(ln (1+3x))=1，则f(0)=(

1.设f(x)为可导函数,且 lim _(xarrow 0)dfrac (f(1)-f(1-x))(2x)=-1 ,则 f(1)= __

1．设f(x)在x=0处可导，且f(0)=0,则lim _(xarrow 0)dfrac (f(3x)-f(x))(x)-|||-__=______.1．设f(

①,设f(x)是以2为周期的可导函数,且 lim _(xarrow 1)dfrac (f(2x-1)-2f(3-2x))(ln x)=3 则-|||-lim _

8.设函数f(x)在点 x=1 处连续,且 lim _(xarrow 1)dfrac (f(x)-2)(x-1) 存在,则 f(1)= __

设函数f(x)在 x=1 处可导,且 lim _(xarrow 1)dfrac (f(x))({x)^2-1}=2, 则 () .(单选题-|||-(1分-||

设f(x)在R上有定义, (0)=1, 且满足:-|||-lim _(xarrow 0)dfrac (ln (1-2x)+2xf(x))({x)^2}=0-||

[题目]设f(x)在 x=0 处连续,且 lim _(xarrow 0)dfrac ((f(x)+1){x)^2}(x-sin x)=2,-|||-则曲线 =f

已知f(x)满足 lim _(xarrow 1)dfrac (f(x))(ln x)=1, 则 () .-|||-(A) f(1)=0 (B) lim _(xa