Solve each problem using a system of equations in two variables. See Example 6. Find two numbers whose squares have a sum of 100 and a difference of 28.

A system of equations consists of two or more equations that share the same variables. To solve such a system, one must find the values of the variables that satisfy all equations simultaneously. Common methods for solving include substitution, elimination, and graphing. In this problem, we will set up two equations based on the conditions given and solve for the two unknown numbers.

Quadratic relationships involve equations where the highest exponent of the variable is two, typically represented as x². In this problem, the conditions about the squares of the numbers lead to a quadratic equation when expressed mathematically. Understanding how to manipulate and solve quadratic equations is essential for finding the required numbers whose squares meet the specified criteria.

The difference and sum of squares refer to mathematical expressions that relate to the squares of two numbers. In this case, we need to express the conditions of the problem—specifically, that the sum of the squares equals 100 and the difference equals 28. Recognizing how to translate these conditions into equations is crucial for setting up the system that will lead to the solution.