Radio direction finders are placed at points A and B, which are 3.46 mi apart on an east-west line, with A west of B. From A the bearing of a certain radio transmitter is 47.7°, and from B the bearing is 302.5°. Find the distance of the transmitter from A.

Bearings are a way of describing direction using angles measured clockwise from the north. In this problem, the bearings from points A and B to the transmitter are given as 47.7° and 302.5°, respectively. Understanding how to interpret these angles is crucial for visualizing the positions of the points and the transmitter in a coordinate system.

The Law of Sines relates the lengths of the sides of a triangle to the sines of its angles. It states that the ratio of a side length to the sine of its opposite angle is constant for all three sides of the triangle. This law is essential for solving the triangle formed by points A, B, and the transmitter, allowing us to find the unknown distances.

Understanding the properties of triangles, including the sum of angles and the relationship between sides and angles, is fundamental in trigonometry. In this scenario, we can use the properties of triangles to set up equations based on the bearings and distances, enabling us to solve for the distance from point A to the transmitter effectively.