设 $f(x, y)$ 与 $\varphi(x, y)$ 均为可微函数,且 $\varphi_y^{\prime}\left(x_0, y_0\right) \neq 0$ .已知 $\left(x_0, y_0\right)$ 是 $f(x, y)$ 在约束条件 $\varphi(x, y)=0$ 下的一个极值点,下列选项正确的是
A
若 $f_x^{\prime}\left(x_0, y_0\right)=0$ ,则 $f_y^{\prime}\left(x_0, y_0\right)=0$ .
B
若 $f_x^{\prime}\left(x_0, y_0\right)=0$ ,则 $f_y^{\prime}\left(x_0, y_0\right) \neq 0$ .
C
若 $f_x^{\prime}\left(x_0, y_0\right) \neq 0$ ,则 $f_y^{\prime}\left(x_0, y_0\right)=0$ .
D
若 $f_x^{\prime}\left(x_0, y_0\right) \neq 0$ ,则 $f_y^{\prime}\left(x_0, y_0\right) \neq 0$ .
E
F