Final answer:
A solution set in mathematics refers to the set of values that satisfy a given equation or inequality. To compare and describe solution sets, you need to consider the values that make the equation or inequality true.
Step-by-step explanation:
A solution set in mathematics refers to the set of values that satisfy a given equation or inequality. To compare and describe solution sets, you need to consider the values that make the equation or inequality true. Here's how you can describe and compare solution sets:
- Identify the given equations or inequalities.
- Find the solution set for each equation or inequality by solving for the values that make them true.
- Compare the solution sets by examining the values in each set. Look for any similarities or differences in the values.
For example, if you have two equations: x + 2 = 5 and 2x - 1 = 3, the solution set for the first equation is x = 3 and the solution set for the second equation is x = 2. So, the solution sets are different because they have different values for the variable x.