若f(x)在x_0处可导，则lim_(x to x_0) (x_0 f(x)- xf(x_0))/(x - x_0)= A. x_0 f'(x_0)- f(x_0)B. f(x_0)- x_0 f'(x_0)C. f'(x_0)- x_0 f(x_0)D. x_0 f(x_0)- f'(x_0)

为了求解极限 $\lim_{x \to x_{0}} \frac{x_{0}f(x)-xf(x_{0})}{x-x_{0}}$，我们可以使用导数的定义和一些代数操作。让我们一步步来分析。 首先，考虑表达式 inside the limit: \[ \frac{x_{0}f(x)-xf(x_{0})}{x-x_{0}} \] 我们可以将分子 $x_{0}f(x) - xf(x_{0})$ 重写为: \[ x_{0}f(x) - xf(x_{0}) = x_{0}f(x) - x_{0}f(x_{0}) + x_{0}f(x_{0}) - xf(x_{0}) \] 这样，我们可以将原极限表达式拆分成两个部分: \[ \lim_{x \to x_{0}} \frac{x_{0}f(x) - x_{0}f(x_{0}) + x_{0}f(x_{0}) - xf(x_{0})}{x - x_{0}} \] 可以将这个极限分成两个极限的和: \[ \lim_{x \to x_{0}} \left( \frac{x_{0}f(x) - x_{0}f(x_{0})}{x - x_{0}} + \frac{x_{0}f(x_{0}) - xf(x_{0})}{x - x_{0}} \right) \] 根据极限的性质，可以将两个极限分别求解: \[ \lim_{x \to x_{0}} \frac{x_{0}f(x) - x_{0}f(x_{0})}{x - x_{0}} + \lim_{x \to x_{0}} \frac{x_{0}f(x_{0}) - xf(x_{0})}{x - x_{0}} \] 对于第一个极限: \[ \lim_{x \to x_{0}} \frac{x_{0}f(x) - x_{0}f(x_{0})}{x - x_{0}} = x_{0} \lim_{x \to x_{0}} \frac{f(x) - f(x_{0})}{x - x_{0}} \] 根据导数的定义，$\lim_{x \to x_{0}} \frac{f(x) - f(x_{0})}{x - x_{0}} = f'(x_{0})$，所以: \[ x_{0} \lim_{x \to x_{0}} \frac{f(x) - f(x_{0})}{x - x_{0}} = x_{0} f'(x_{0}) \] 对于第二个极限: \[ \lim_{x \to x_{0}} \frac{x_{0}f(x_{0}) - xf(x_{0})}{x - x_{0}} = f(x_{0}) \lim_{x \to x_{0}} \frac{x_{0} - x}{x - x_{0}} = f(x_{0}) \lim_{x \to x_{0}} (-1) = -f(x_{0}) \] 将两个极限的结果相加: \[ x_{0} f'(x_{0}) + (-f(x_{0})) = x_{0} f'(x_{0}) - f(x_{0}) \] 因此，原极限的值为: \[ \lim_{x \to x_{0}} \frac{x_{0}f(x)-xf(x_{0})}{x-x_{0}} = x_{0} f'(x_{0}) - f(x_{0}) \] 所以，正确答案是: \[ \boxed{A} \]