Solve each problem. See Example 2. Two planes leave Los Angeles at the same time. One heads south to San Diego, while the other heads north to San Francisco. The San Diego plane flies 50 mph slower than the San Francisco plane. In 1/2 hr, the planes are 275 mi apart. What are their speeds?

Relative speed refers to the combined speed of two objects moving in opposite directions. In this scenario, the planes are moving away from each other, so their speeds add up when calculating the distance between them. Understanding relative speed is crucial for determining how far apart the planes are after a certain time.

The distance formula relates distance, speed, and time, expressed as Distance = Speed × Time. This formula is essential for solving the problem, as it allows us to calculate how far each plane travels in the given time frame. By applying this formula, we can set up equations to find the speeds of the planes.

A system of equations is a set of two or more equations with the same variables. In this problem, we can create a system to represent the speeds of the two planes, incorporating the information that one plane is slower than the other. Solving this system will yield the individual speeds of both planes.