设f(x)在x=0处存在二阶导数,且lim(x→0)(xf(x)-ln(1+x))/x^3=1/3求f(0),f'(0)

设f(x)在x=0处存在二阶导数,且lim(x→0)(xf(x)-ln(1+x))/x^3=1/3求f(0),f'(0) 设 f(x)在x=0存在二阶导数,lim(x→0)[xf(x)-ln(x+1)]/x^3求f(0)f'(0)f''(0) 设f(x)在x=0的某邻域内连续,且lim x→0 [xf(x)-ln(1+x)]/x^2=2,求f(0),并证明f`（ 设函数f(x)在x=0处具有二阶导数,且f(0)=0,f’(0)=1,f’’(0)=3,求极限lim(x->0)(f(x 求lim（x→0）[(xf'(x))/(2f(x))]^(1/x),其中f(x)在x=0点某邻域内有三阶连续导数,f(0 已知f(x)=ln(1+x) 求lim(x→0) f(x)/x f(x)在x=0的领域内有二阶导数,又x→0时lim((sinx+xf(x))\x3)=1/2,求f(0),f'(0), 设函数f(x)具有连续导数,且当x趋近于0时极限[F(x)/x+ln(1+x)/x^2]=3/2求f(0)和在0处的导数 高数 设f(x)具有连续的二阶导数,且lim[f(x)/x]=0,在x趋向于0的时候.且f’‘（x）=4,求lim[1+ 已知lim(x→0)(sinx+xf(x))/x^3=1/3,求f(0),f'(0),f"(0) 设f(x)有二阶导数,且f''(X)>0,lim(x趋于0）f(x)/x=1 ..证明：当x>0时,有f(x)>x 当x→0时,lim[ln(1+2x)+xf(x)]/x^2=2,求lim[2+f(x)]/x 要求详细解释