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The values for counts of drivers are tabulated under different categories.

When two events take place simultaneously, the probability of joint occurrences is equivalent to the product of their individual probabilities.

In case the events are dependent, the probabilities change with each successive occurrence. The condition when selections are made without replacement describes the occurrence of dependent events.

Sum up all row and column totals.

Define the events as follows:

E: The first randomly selected driver use a seatbelt

F: The second randomly selected driver use a seatbelt

A: The two drivers randomly selected without replacement use seatbelts

The number of drivers who use seatbelts is 10660.

The total number of drivers surveyed is 18102.

Thus, the probability that the first driver selected uses a seatbelt is:

$P\left(E\right)=\frac{10660}{18102}$

The number of drivers left who use seatbelts, after selecting the first driver, is 10659.

The total number of drivers left after the first selection is 18101.

The probabilities that the second driver uses a seatbelt is:

$P\left(F\right)=\frac{10659}{18101}$

The probability that two drivers randomly selected without replacement use seatbelts is:

$$\begin{gathered} P\left(E\text{and}F\right)=P\left(E\right)脳P\left(F\right) \\ =\frac{10660}{18102}脳\frac{10659}{18101} \\ =0.347 \end{gathered}$$

Thus, the probability that two drivers randomly selected without replacement use seatbelts is 0.347.