A screw factory has two machines, I and II, for the production of a certain type of screw.
In September, machine I produced $\frac{54}{100}$ of the total screws produced by the factory. Of the screws produced by this machine, $\frac{25}{1000}$ were defective. In turn, $\frac{38}{1000}$ of the screws produced in the same month by machine II were defective.
The combined performance of the two machines is classified according to the table, in which $P$ indicates the probability of a randomly chosen screw being defective.
$$\begin{aligned}
0 \leq P < \frac{2}{100} & \quad \text{Excellent} \\
\frac{2}{100} \leq P < \frac{4}{100} & \quad \text{Good} \\
\frac{4}{100} \leq P < \frac{6}{100} & \quad \text{Fair} \\
\frac{6}{100} \leq P < \frac{8}{100} & \quad \text{Poor} \\
\frac{8}{100} \leq P \leq 1 & \quad \text{Very Poor}
\end{aligned}$$
The combined performance of these machines in September can be classified as
(A) excellent.
(B) good.
(C) fair.
(D) poor.
(E) very poor.