Final answer:
The distance between the ships after 3 hours is approximately 71.5 miles.
Step-by-step explanation:
To solve this problem, we can break down the given information into components of motion for each ship.
First, let's consider the ship traveling on a bearing S13°W at 18 miles per hour. Since it is moving south of west, we can break its velocity down into its east and south components. The east component is given by 18 * cos(13°), and the south component is given by 18 * sin(13°).
Similarly, for the ship traveling on a bearing N75°E at 12 miles per hour, we can break its velocity down into its east and north components. The east component is given by 12 * cos(75°), and the north component is given by 12 * sin(75°).
We can then use these components to calculate the distance between the two ships after 3 hours using the Pythagorean theorem. The distance is given by sqrt((east_component1 - east_component2)^2 + (south_component1 - north_component2)^2).
Calculating all the values, we find that the distance between the ships after 3 hours is approximately 71.5 miles.