We are given a two-way probability table.
We are asked to find the conditional probability that it was a coupe, given that the selected vehicle was Brand 1.
P(coupe | Brand 1) = ?
Recall that the conditional property is given by
[tex]P(coupe|Brand\: 1)=\frac{P(coupe\: and\: Brand\: 1)}{P(Brand\text{ 1)}}[/tex]
From the given table we see that,
[tex]\begin{gathered} P(coupe\: and\: Brand\: 1)=75 \\ P(Brand\: 1)=315 \end{gathered}[/tex]
So, the probability is
[tex]\begin{gathered} P(coupe|Brand\: 1)=\frac{P(coupe\: and\: Brand\: 1)}{P(Brand\text{ 1)}} \\ P(coupe|Brand\: 1)=\frac{75}{315} \\ P(coupe|Brand\: 1)=0.2381 \end{gathered}[/tex]
Therefore, the probability that a vehicle was a coupe, given that it was Brand 1, is found to be 0.2381
