Es gilt nach Definition an einer Stelle \color{blue}{x_0}:

\displaystyle f'(\color{blue}{x_0}) = \lim_{x \to \color{blue}{x_0}}\, \frac{f(x)-f( \color{blue}{x_0})}{x- \color{blue}{x_0}}.

Einsetzen des Funktionsterms von f ergibt:

\displaystyle f'(\color{blue}{x_0}) = \lim_{x \to \color{blue}{x_0}}\, \frac{(Ax^2+Bx +C)-(A\cdot \color{blue}{x_0}^2+B\cdot \color{blue}{x_0}+C)}{x- \color{blue}{x_0}}

\displaystyle = \lim_{x \to \color{blue}{x_0}}\, \frac{A (x^2- \color{blue}{x_0}^2) + B(x- \color{blue}{x_0})}{x- \color{blue}{x_0}} = \lim_{x \to \color{blue}{x_0}}\, \frac{A(x+ \color{blue}{x_0})(x- \color{blue}{x_0}) + B(x- \color{blue}{x_0})}{x- \color{blue}{x_0}}

\displaystyle = \lim_{x \to \color{blue}{x_0}}\, [A(x+ \color{blue}{x_0}) + B] = A(\color{blue}{x_0}+\color{blue}{x_0}) + B = 2*A\color{blue}{x_0}+B.

Das gilt für alle \color{blue}{x_0} in der Definitionsmenge von f, d.h. f' ist definiert durch f'(x) = 2*Ax+B.