A ship is sailing due north. At a certain point the bearing of a lighthouse 12.5 km away is N 38.8° E. Later on, the captain notices that the bearing of the lighthouse has become S 44.2° E. How far did the ship travel between the two observations of the lighthouse?

Bearing is a method of describing direction using angles measured clockwise from the north. In this question, bearings are given as N 38.8° E and S 44.2° E, indicating the angles relative to true north. Understanding how to interpret these bearings is crucial for visualizing the positions of the ship and the lighthouse in relation to each other.

Trigonometric functions, such as sine, cosine, and tangent, relate the angles of a triangle to the lengths of its sides. In this scenario, these functions can be used to calculate distances and angles in the triangle formed by the ship's path and the lighthouse's position. Mastery of these functions is essential for solving problems involving angles and distances in navigation.

The Law of Sines is a formula that relates the lengths of the sides of a triangle to the sines of its angles. It is particularly useful in non-right triangles, such as the one formed by the ship's two positions and the lighthouse. By applying this law, one can find unknown distances or angles, which is key to determining how far the ship traveled between the two observations.